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ƒGƒrƒ“ƒOƒnƒEƒX‘¼i¬–Ø—E•v–ójF”iãE‰ºj (H. D. EbbinghausFNumbers) i’†“‡ ˆêj················································· 46|077
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D. E. Knuth’˜, “‡“à„ˆêŠÄ–óFThe Art of Computer
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D. B. ƒUƒMƒ„[i•ÐŽRFŽŸ–ójF”˜_“ü–å@@@@@@irìP’jj 46|083
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E.
J. ƒnƒiƒ“FŽžŒn—ñ‰ðÍi“¡ˆäŒõºj· 28|177
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ƒ{ƒzƒi[F‰ÈŠwŽj‚É‚¨‚¯‚锊wŽj@@@@@@@@@@i’†‘ºKŽl˜Yj 24|247
ƒ~ƒ‰[FLieŒQ‚Æ“ÁŽêŠÖ”i–{˜a•Fj· 28|380
O. A. ƒ‰ƒWƒ[ƒ“ƒXƒJƒ„F@@@@@@@@@@@@@”ñˆ³k”S«—¬‚Ì”Šw“I—˜_i‹V‰ä”üˆêj 38|285
E. L. ƒŒ[ƒ}ƒ“Fƒmƒ“ƒpƒ‰ƒƒgƒŠƒbƒNƒXG‡ˆÊ‚É‚à‚Ƃ“Œv“I•û–@i”’ŠøTŒáj 32|188
ŠO‘Œê
Robert D. M. AccolaFTopics in the Theory of
Riemann Surfaces (ЯԼGK) 49|431
J. F. AdamsFLectures on Lie groups@@@@@@@@(r–Ø·˜N) 23|071
Colin C. AdamsFThe Knot Book, @@@@@@@@An Elementary Introduction
to the Mathematical Theory of Knots@@@@@@@ (‹àM‘ב¢)··································· 49|326
L.
V. AhlforsFComplex analysis (‹T’JrŽi) 06|122
L.
V. AhlforsFComplex analysis (‹T’JrŽi) 21|231
Lars. AhlforsFLectures on quasiconformal
mappings (‹yìL‘¾˜Y) 19|187
A. C. AitkenFThe case against decimalisation (•ÒW•”) 15|191
M. Akahira, K. TakeuchiFAsymptotic @@@efficiency of statistical
estimators. @Concepts and higher order asymptotic
efficiency (ˆîŠ_é¶)···················· 35|093
Masafumi AkahiraFThe Structure of @Asymptotic Deficiency of
Estimators@@@@ (]Œû^“§)················································· 42|186
M. Akahira, K. TakeuchiFNon–Regular Statistical
Estimation (‹v•Û–Ø‹vF) 50|102
G. AlexitsFConvergence problems of @orthogonal series (ˆê¼@M) 14|253
S. AmariFDifferential–geometrical
methods in statistics (]Ξ^Ҥ) 39|181
American Mathematical Society•ÒF@Experimental arithmetic high
computing @and mathematics (ˆê¼@M)················································· 20|062
F. W. AndersonCK. R. FullerFRings and categories modules (’rŠ°ŽO) 29|179
V. I. ArnoldFMathematical methods of @@@classical mechanics (–{˜a•F) 30|172
V. I. ArnoldFGeometrical methods in the theory of
ordinary differential equations
(‰F•~dL)················································· 37|287
V. I. Arnol'dFOrdinary Differential
Equations @@(ˆÉ“¡Gˆê) 46|082
E. ArtinFGeometric algebra
@@(œ\‰i¹‹gE‹Ê‰ÍP•v) 11|124
M. AschbacherFFinite group theory @@(ŒÜ–¡Œ’ì) 40|273
K. B. Athreya & P. E. NeyF
Branching processes (“c’†Œ’ˆê) 27|184
M. AtiyahF
–Theory (‹g‘º‘Pˆê)······· 21|306
L. AuslanderFDifferential geometry
@@(–ΖØ@—E) 21|154
Y. Bar–Hillel (editor)FMathematical logic and
foundations of set theory (•ŸŽR@Ž) 24|250
W. Barth, C. Peters, A. Van de VenF@@@@@Complex analytic surfaces (‹{‰ª—mˆê) 37|285
T. Bartoszyński, H. JudahFSet Theory, @@@@On The structure of the real
line @@@@@@(‰Á–ÎÕv)················································· 50|320
J. BarwiseFAdmissible sets and
structures @@(ŽÂ“cŽõˆê) 31|183
J. Barwise, S. Feferman (Ed.)FModel–theoretic logics (’؈䖾l) 40|089
N. K. BaryFA treatise of trigonometric
series, 1, 2 (–î–ì–ÎŽ÷) 18|186
H. BassFAlgebraic K–theory (‘å—Ñ’‰•v) 23|072
D. Bättig, H. KnörrerFSingularitäten @@(–m•”“Œ‰î) 47|419
Alan F. BeardonFIteration of Rational @Functions (‰F•~dL) 45|283
E. F. Beckenbach•ÒFApplied combinatorial
mathematics (ˆê¼@M) 17|252
E. F. Beckenbach-R. BellmanF@@@@@@@Inequalities (ˆê¼@M) 14|251
J. L. Bell & A. B. SlomsonFModels and ultraproducts:
An introduction (ã]F’‰O) 23|236
R. BellmanFStability theory of
differential equations (“ì‰_“¹•v) 08|182
R. Bellman-K. L. CookeFDifferential–difference
equations (™ŽR¹•½) 15|241
R. Benedetti & J. J. RislerFReal algebraic and semi–algebraic
sets (‰–“c¹O) 43|281
A. Bensoussan, J. L. Lions and
G.PapanicolaouFAsymptotic analysis for periodic structures @@(“n•Ó“ñ˜Y)················································· 33|093
C. BergeFTopological spaces (F”V“àŽ¡’j) 17|056
J. O. BergerFStatistical decision
theory @@(ŽÂèM—Y) 34|185
S. BergmanFThe kernel function and @conformal mapping (ˆê¼@M) 04|107
P. Bernays-A. A. FraenkelF
Axiomatic set theory (‹ß“¡Šî‹g) 12|128
A. L. BesseFManifolds all of whose
geodesics @are closed (’†ì‹v—Y) 01|378
L. BesseFEinstein manifolds (“ñ–غl) 40|187
P. BillingsleyFErgodic theory and
information @@(‹v•Û@ò) 24|249
G. BirkhoffFLattice theoryCrevised edition @@(Šâ‘º@—ü) 02|373
G. Birkhoff-S. MacLaneFA survey of modern algebra (ˆî—t‰hŽŸ) 06|181
B. L. Bishop-R. J. CrittendenFGeometry of manifolds (’Ë–{—z‘¾˜Y) 18|058
E. BishopFFoundations of constructive @analysis (‹ß“¡Šî‹g) 28|275
B. BlackadarF
–Theory for Operator Algebras @@(’†_Ëb) 41|279
R. M. Blumenthal-R. K. GetoorFMarkov processes and
potential theory@@@@@@@ (_“c@Œì)················································· 22|236
R. P. Boas, Jr.FEntire functions (Îì@C) 11|119
R. P. Boas and R. C. BuckFPolynomial expansions of
analytic functions@@@@@@ (’M–{_ˆê)················································· 17|058
Salomon BochnerFThe role of mathematics in the rise of science
(’|“à@Œ[) 20|248
S. Bochner-K. ChandrasckharanFFourier transforms (‰Í“c—³•v) 08|246
S. Bochner-W. T. MartinFSeveral complex variables (ˆê¼@M) 02|269
F. F. BonsallCJ. DuncanFComplete normed algebras (˜a“c~‘ ) 28|277
A. BorelFIntroduction aux groupes arithmetiques (“câ—²Žm) 23|314
A. BorelFLinear algebraic groups
(ˆ¢•”‰pˆê) 24|348
A. Borel et al.FSeminar on algebraic groups and related finite groups (Šâ–x’·Œc) 24|338
A. Borovik, A. NesinFGroups of Finite Morley Rank
(“c’†ŽŒÈ) 48|097
S. Bosch, W. Lütkebohmert, M. RaynaudF@Néron Models (Ö“¡•F) 48|071
N. BourbakiFThéorie des ensembles, @@@@Chap. ‡T, ‡U (Ô@Û–ç) 07|050
N. BourbakiFAlgèbre. Chap. ‡YC‡Z @ (Šâ–x’·Œc) 07|178
N. BourbakiFTopologie générale (X@‹B) 13|176
N. BourbakiFGroupes et algèbres de Lie, @Chapitre Algèbre de Lie (Šâ–x’·Œc) 13|180
N. BourbakiFVariétés différentielles et
analytiques, ‡T (ˆê¼@M) 21|316
N. BourbakiFVariétés différentielles et
analytiquesC‡U (ˆê¼@M) 26|086
O. Bratteli, D. W. RobinsonFOperator algebras and quantum
statistical mechanics ‡T (ŠÝ–{»F)················································· 33|285
David M. BressoudFFactrization and Primality Testing (˜a“cG’j) 45|181
H. BreuerFDictionary for computer
languages @
(ˆê¼@M) 20|115
H. BrézisFOpérateurs maximaux
monotones et semigroupes de
contractions dans les espaces de Hilbert (¬¼–F—Y)················································· 26|278
D. S. BridgesFConstructive functional
analysis @@(‹ß“¡ŠîŒá) 32|374
F. E. Browder•ÒFMathematical developments
arising from Hilbert problems
(ˆê¼@M)················································· 32|373
I. Bucur and A. DeleanuFIntroduction to the theory of
categories and functors (•ž•”@º)················································· 22|231
A. BuiumFDifferential Algebraic Groups
of Finite Dimension (”~‘º@_) 46|085
R. B. BurckelFCharacterizations of 
among its subalgebras (‰×Œ©Žç•) 26|285
G. Burde, H. ZieschangFKnots (‘ºã@Ä) 39|378
M. BurrowFRepresentation theory of
finite groups (‘哇@Ÿ) 19|056
H. Busemann•ÒFAdvances in mathematicsC1 @@(ˆê¼@M) 18|127
P. BuserFGeometry and Specrta of
Compact Riemann Surfaces (’†¼•q_) 50|317
P. CaramanFHomeomorfism cvasiconfome 
–dimensionale (ˆê¼@M) 23|065
C. CarathéodoryFFunktionentheorie
@@(‹T’JrŽi) 03|244
C. CarathéodoryFCalculus of variations and
partial differential equations of the first order (¬¼—Eì)················································· 21|153
L. Carleson, T. W. GamelinFCOMPLEX DYNAMICS@@(–ØⳎj) 50|432
R. W. CarrollFAbstract methods in partial
differential equations (“c•ÓLé) 25|189
H. CartanFThéorie élémentaire des
fonctions analytiques d'une ou plusieurs variables complexes (ˆê¼@M)················································· 14|063
Séminaire H. Cartan 1960/61FFamilles d'espaces complexes
et fondements de la géométrie analytique (Šâ‹´—º•ã)················································· 16|251
H. Cartan-S. EilenbergFHomological algebra @ @(D. Zelinsky) 08|185
M. L. CartwrightFIntegral functions
(Îì@C) 11|119
T. E. CecilFLie Sphere Geometry (‹{‰ª—çŽq) 46|087
N. N. ČencovFStatistical decision rules
and optimal inference (ŠÃ—˜rˆê) 36|187
K. ChandrasekharanFIntroduction to analytic
number theory (—³‘òŽü—Y) 22|233
F. ChatelinFSpectral approximation of
linear operators (ÎŒ´˜a•v) 38|085
A. W. Chatters & C. R. HajarnavisF Rings
with chain conditions (Šâ‰i‹±—Y) 34|283
Isaac ChavelFRiemannian Geometry: A
Modern Introduction (•“¡G•v) 49|437
G. Chavent, J. JaffreFMathematical models and finite elements for reservoir simulation (—FŽ}Œª“ñ)················································· 40|282
J. CheegerCD. G. EbinFComparison theorems @in Riemannian geometry (’†ì‹v—Y) 29|180
B.–Y. ChenFGeometry of
submanifolds @ @(™™ŽŸ‰q) 28|283
S. S. ChernFComplex manifolds without @potential theory (ˆê¼@M) 21|300
C. ChevalleyFTheory of Lie groups I @@(Œã“¡Žç–M) 02|079
C. ChevalleyFThéorie des groupe de Lie
II @@(Šâ–x’·Œc) 05|115
C. ChevalleyFAlgebraic theory of
spinors
@@(‹Ê‰ÍP•v) 06|048
C. ChevalleyFIntroduction to the theory
of algebraic functions of one variable (’†ŽR@³)················································· 06|050
C. ChevalleyFThe construction and study
of certain important algebras (Šâ–x’·Œc) 09|255
Séminair ChevalleyFClassification des groupes
de Lie algébriques (ˆ¢•”‰pˆê) 15|238
W. G. Chinn and N. E. SteenrodFFirst concepts of topology (ˆê¼@M) 20|062
G. ChoquetFTopology (’|”V“à@ãù)···· 21|305
K. L. ChungFMarkov chains with
stationary transition probabilities (“n•ÓŽõ•v) 14|052
R. F. Churchhouse-J. C. Herz•ÒFComputers in mathematical
research (ˆê¼@M) 21|301
P. G. CiarletFThe finite element method
for elliptic problems (‹e’n•¶—Y) 35|186
P. G. Ciarlet and J. L. LionsFeditorsF Handbook of Numerical Analysis, Vol. ‡U Finite Element Methods
(Part 1) (“y‰®‘ì–ç)··································· 46|073
P. G. CiarletFIntroduction to Numerical
Linear Algebra and Optimisation (ŽOˆä•k—F) 48|076
A. H. Clifford-G. B. PrestonFThe algebraic @theory of semigroups (“c‘ºFs) 15|181
A. H. CliffordCG. B. PrestonFThe algebraic @theory of semigroups (“c‘ºFs) 21|314
P. J. CohenFSets theory and the
continuum hypeothesis (“ï”gŠ®Ž¢) 21|150
L. CollatzFDifferentialgleichungen für @@Ingenieure (ŒÃ‰®@–Î) 14|125
L. CollatzFFunktionalanalysis und
numerische Mathematik (“¡“c@G) 17|117
L. Collatz & W. WetterlingFOptimierungsaufgaben (™ŽR¹•½) 21|235
P. Conner and E. FloydFDifferentiable periodic maps (“à“c•šˆê) 24|339
A. ConnesFNoncommutative Geometry @@(‰Í“Œ‘×”V) 49|217
C. Constantinescu-A. CorneaFIdeale Ränder Riemannscher
Flächen (’†ˆäŽO—¯) 16|245
Constantinescu-CorneaFPotential theory of harmonic
spaces (’rã‹P’j) 29|084
J. H. ConwayFOn numbers and games @@(ŽRè—m•½) 31|377
J. H. Conway, R. T. Curtis, S. T. Norton,
R. A. Parker, R. A. WilsonFAtlas of finite groups @@(‹g“c’ms)················································· 39|185
L. Corwin, F. P. GreenleafFRepresentations of nilpotent
Lie groups and their applications, Part ‡T (ˆä㇎q)················································· 49|107
R. CourantFDirichlet's principle,
conformal mapping, and minimal surfaces
(¬¼—Eì)················································· 04|109
H. CramérFMathematical methods of
statistics @@(‰Í“cŒh‹`) 03|060
H. Cramér-M. R. LeadbetterFStationary and related
stochastic processes (”ò“c•K) 20|250
Richard H. Crowell-Ralph H. FoxF Introduction to knot theory (ГΞ@L) 17|053
C. W. Curtis-I. ReinerFRepresentation theory of
finite groups and associative algebras @@(‘哇@Ÿ) ················································· 16|172
H. L. Cycon, R. G. Froese, W. Kirsch,
B. SimonFSchrödinger operators\With Applications to Quantum
Mechanics and Global Geometry (’†‘º@Žü)······· 43|375
I. DaubechiesFTen Lectures on
Wavelets @@(Žç–{@W) 47|085
M. DavisFComputability and
unsolvability @@(“c’†®•v) 20|253
M. de GuzmánFReal variable methods and
Fourier analysis (–î–ì–ÎŽ÷) 36|186
G. de RhamFVariétés différentiables @@(ˆê¼@M) 07|171
C. Dellacherie et P. A. MeyerFProbabilités et potentiel,
théorie des martingales
(•—Šª‹I•F)················································· 33|378
P. DembowskiFFinite geometries
(ˆê¼@M) 21|303
J. Dénes and A. D. KeedwellFLatin squares @and their applications (ŽR–{Kˆê) 28|380
U. Dierkes, S. Hildebrandt, A. Küster
and O. WohlrabFMinimal Surfaces ‡U, Boundary Regularity (Αº’¼”V)················································· 47|087
J. DieudonnéFSur les groupes
classiques @@(•ž•”@º) 04|112
J. DieudonnéFLa géométrie des groupes
classiques (¬–ì@F) 09|128
J. DieudonnéFFoundation of modern analysis (–î–ì–ÎŽ÷) 17|122
V. A. Ditkin-A. P. PrudnikovFOperational calculus in two
variables and its applications (ˆê¼@M)················································· 14|254
J. DixmierFLes algèbres d'opérateurs
dans l'espace Hilbertien (’|”V“à@ãù) 26|372
J. DixmierFLes 
–algèbres et leurs représentations (’|”V“à@ãù) 26|374
V. Dlab and P. GabrielF@@@@@@@@Representation theory (‘¾“ìOK‘¼) 34|375
L. DornhoffFGroup representation
theory @ @(Œõ@“¹—²) 27|278
F. R. DrakeFSet theory (‚‹´Œ³’j)···· 29|378
B. A. Dubrovin, A. T. Fomenko, S. P.
NovikovFModern geometry ‡T, ‡U (X–{–¾•F) 40|366
N. Dunford-J. T. Schwartz (with the assistance of W. Bade-R. G.
Bartle)F Linear operators, Part‡T (‹g“ckì)················································· 12|065
N. Dunford-J. T. SchwartzF
Linear operators, Part‡U (SIRS) 18|123
P. L. DurenFTheory of 
–spaces @@(’†‘º‹g—WE–öŒ´“ñ˜Y) 28|184
G. Duvaut, J. L. LionsFInequalities in mechanics and physics (¬¼–F—Y) 38|378
R. E. Edwards & G. I. GaudryFLittlewood-Paley and
multiplier theory (‹{’n»•F) 31|280
B. EfronFThe Jackknife, the Bootstrap
and Other Resampling Plans (“cŒI³ÍEŸŠ‹à–F)················································· 45|090
L. EhrenpreisFFourier analysis in several
complex variables (‰Í‡—²—T) 24|152
M. EichlerFQuadratische Formen und
orthogonale Gruppen (¬–ì@F) 09|249
S. Eilenberg-N. SteenrodFFoundations of algebraic
topology (’†‰ª@–«) 05|250
F. El ZeinFIntroduction à la théorie de
Hodge mixte (‰PˆäŽO•½) 48|202
C. J. ElieserF@@@@@@@@@ @@ Concise vector
analysis (•ÒW•”) 15|191
R. EngelkingFGeneral Topology (Revised
and completed edition) (‘å“ctŠO) 46|369
G. FaltingsFLectures on the Arithmetic
Riemann-Roch Theorem (¬—Ñ—ºˆê) 47|088
V. V. Fedorchuk, A. Ch. ChigogidzeFAbsolute Retracts and
infinite dimensional manifolds @@(Ž›“c•qŽiE’ÓcŒõˆê)················································· 48|432
R. P. Feinerman and D. J. NewmanF Polynomial approximation (—é–Ø‹`–ç) 30|084
W. FeitF@@@@@@@@@@@@@@@@@Character of finite groups (‰i”ö@”Ä) 21|156
A. A. Fel'dbaumFOptimum control systems @@(™ŽR¹•½) 19|121
J. M. G. Fell-R. S. DoranFRepresentations of 
–Algebras, Locally Compact Groups and Banach 
–Algebraic Bundles, ‡T,‡U @@
(ŽRã@Ž )··································· 41|274
W. FellerFAn introduction to
probability theory and its applications (ŠÛŽR‹VŽl˜Y) 05|053
W. FellerFAn introduction to
probability theory and its applications, ‡T,‡U (ŠÛŽR‹VŽl˜Y) 19|062
J. F. FenstadCP. G. Hinman•ÒFGeneralized recursion theory
(“c’†®•v) 28|273
T. S. FergusonFMathematical statisticsF A decision theoretic
approach (H“¡O‹g)················································· 27|285
S. E. Fienberg and D. V. Hinkley•ÒFR. A. Fisher: An
appreciation (’|“à@Œ[) 33|373
Herbert FleischerFEulerian Graphs and Related Topics, Part ‡T, Vol. 1 & 2 (“y‰®Žç³)················································· 44|365
K. W. Folley•ÒFSemigroups (“c‘ºFs) 23|311
A. P. Fordy, J. C. Wood (Eds)FHarmonic Maps and Integral
Systems (‰Yì@”£) 48|204
O. ForsterFLecture on Riemann
surfaces @@@(ŒI—Ñúܘa) 38|091
Forsythe, G. E. -W. R. WasowFFinite–difference methods
for partial differential equations
@@(ŽRŒû¹Æ)················································· 20|241
D. S. Freed & K. K. UhlenbeckFInstantons and four–manifolds (ˆÉ“¡ŒõO) 39|370
M. FreidlinFFunctional integration and partial differential
equations (¬“c´³) 40|365
Frekel-Lepowski-MourmanFVertex operator algebras and
the Monster (Œ´“ckˆê˜Y) 43|177
Peter FreydFAbelian catagories (•ž•”@º) 17|174
L. FuchsFAbelian groups (–{“c‹ÓÆ)·· 12|245
L. Fuchs‘¼•ÒFProceedings of the
colloquium on Abelian groups (–{“c‹ÓÆ) 18|053
H. FujimotoFValue Distribution Theory of
the Gauss Map of Minimal Surfaces in 
@ @(–ìŒûŽŸ˜Y)················································· 48|215
T. FujitaFClassification Theories of
Polarized Varieties (™]@“O) 44|088
M. FukushimaFDirichlet forms and Markov
processes (’·ˆä‰p¶) 36|082
W. FultonFIntersection theory (‹{¼³‹X) 39|186
W. FultonFIntroduction to Toric
Varieties @@ (Γc³“T) 48|091
A. FutakiFKaehler-Einstein Metrics and
Integral Invariants (¬ˆéŒ›Žj) 41|283
S. A. GaalFLinear analysis and
representation theory (˜a“c~‘ ) 27|283
F. D. Gakhov (I. N. Sneddon‰p–ó)F Boundary value problems (ŒFƒm‹½@€) 19|188
T. W. GamelinF Uniform
algebras (˜a“c~‘ ) 26|189
H. h. Garabedian•ÒF
Approximation of functions (ˆê¼@M) 18|060
L. GardingFEncounter with
mathematics @@(‹gì@“Ö) 31|178
S. B. GarnettFBounded analytic
functions @@(—Ñ@ŽÀŽ÷L) 35|089
A. Gelbart•ÒFSome recent advances in the basic sciences (ˆê¼@M) 21|301
B. R. Gelbaum-J. M. H. OlmsteadFCounterexamples in analysis
(ˆê¼@M) 17|061
I. M. Gel'fand-M. I. Graev-N. Ya.
VilenkinFGeneralized functions (•ÒW•”) 19|128
I. M. Gel'fand, M. I. Graev, I. I.
Pyatetskii-ShapiroF•\Œ»˜_‚Æ•ÛŒ^”Ÿ” (ÜŒ´–¾•v) 23|065
Ya. L. GeronimusFPolynomials orthogonal on a
circle and interval (ˆê¼@M) 14|253
J. K. Ghosh(ed.)FStatistical Information and
Likelihood : A Collection of Critical Essays @by Dr. D. Basu (‘ŠÔŽž•)················································· 42|184
V. Gillemin and S. SternbergF Deformation theory of pseudogroup
structures (¼“c“¹•F)················································· 23|235
A. GinzburgFAlgebraic theory of automata @@(Ž›“c•¶s) 23|077
Jean-Yves GirardFProofs and Types @ @(”ª™–ž—˜Žq) 43|181
J. Glimm and A. JaffeFQuantum physics @ @—–A functional integral
point of view—– @ @(r–Ø•s“ñ—m)················································· 35|091
R. Glowinski, J. L. Lions, R. TrémolèresF Analyse numérique des inéquations variationelles, Tome 1,
Tome 2 (‹“‡Æ•v)··································· 32|088
B. V. Gnedenko-A. N. KolmogorovFLimit distributions for sums
of independent random variables (‘‘ò´“T)················································· 08|187
C. GodbillonFFeuilletages, Études géométriques (¼X•q”V) 46|071
R. GodementFTopologie algébrique et théorie des
faisceaux (•ž•”»•v) 12|253
I. C. Gohberg and M. G. KreinFTheory and applications of
Volterra operators in Hilbert
space (¬’JáÁˆê)················································· 30|164
S. I. GoldbergFCurvature and homology @@(¬”©Žç¶) 16|170
S. W. GolombFPolyo!minoes (ˆê¼@M) 20|245
Golubisky-GulleminFStable mappings and their
singularities (•Ÿ“c‘ñ¶) 30|089
R. L. GoodsteinFFundamental concepts of
mathematics (Ô@Û–ç) 15|128
D. GorenstienFFinite groups (“s’}r˜Y) 22|317
M. Goresky, R. MacphersonF Stratified
Morse Theory (“¡–Ø@–¾) 48|073
M. Goto & F. D. GrosshansFSemisimple Lie algebra (]Œû³W) 37|183
W. H. Gottschalk-G. A. HedlundFTopological dynamics (²”Œ‘ì–ç) 10|054
S. H. GouldFA manual for translators of
mathematical russian (ˆê¼@M) 19|191
S. H. Gould-P. E. ObreanuFRomanian– English dictionary and
grammar for the mathematical sciences (ˆê¼@M)················································· 20|124
I. S. Gradshteyn-I. M. RyzhikF
Table of Integrals, Series and Products (ˆê¼@M)················································· 18|255
H. GrauertER. RemmertFAnalytishe Stellenalgebren
(–Ø‘ºˆè—Y)
28|284
P. Griffiths & J. MorganFRational homotopy theory and
differential forms (X“c–ΔV) 35|091
G. W. GrimmettFPercolation (”óŒû•Û¬) 46|079
M. GromovFStructures métriques pour
les variétés riemanniennes (Žðˆä@—²) 37|088
V. Guillemin, S. SternbergFSymplectic techniques in
physics (ŽO㌒‘¾˜Y) 37|284
P. C. GunningFLectures on Riemann surfaces
(ˆê¼@M) 19|118
R. C. Gunning-H. RossiFAnalytic functions of
several complex variables (ˆê¼@M) 17|120
R. K. GuyFUnsolved problems in number theory (“¡Œ´³•F) 36|183
Rudolf HaagFLocal Quantum Physics (Fields,
Particles, Algebras) (r–Ø•s“ñ—m) 45|285
S. J. HabermanFThe analysis of frequency data (ˆÉ“¡Fˆê) 29|189
H. Halberstam and H. E. RichertF Sieve
methods (–{‹´—mˆê) 31|179
M. Hall, Jr.F @
@The theory of groups (‰i”ö@”Ä) 14|185
P. Hall-C. C. HeydeFMartingale limit theory and
its applications (‹gŒ´Œ’ˆê) 34|379
Peter HallFThe Bootstrap and Edgeworth
Expansion (ŸŠ‹à–FE“cŒI³Í) 44|371
P. R. HalmosFMeasure theory (‹T’JrŽi) 03|245
P. R. HalmosFIntroduction to Hilbert
space and the theory of
spectral multiplicity
(ˆÉ“¡—²Ži)················································· 07|050
P. R. HalmosFLectures on ergodic
theory @@(ˆÉ“¡´ŽO) 12|254
F. HararyFGraph theory (ˆê¼@M)··· 23|069
G. H. HardyFDivergent series (¼ŽR@¸) 09|056
T. E. HarrisFTheory of branching
processes @@(–{”ö@ŽÀ) 17|053
W. A. HarrisCJr. and Y. Sibuya•ÒF Proceedings United States-Japan seminar on differential and
functional equations (ˆê¼@M)··································· 21|317
Z. HarrisFMathematical structures on
language @@(–ìèºO) 24|080
R. HartshorneFAlgebraic geometry
@
@(ŠÛŽR³Ž÷) 31|184
H. HasseFVorlesungen über
Zahlentheorie @ @(––jšˆê) 03|056
H. HasseFÜber die Klassenzahl
abelscher Zahlkörper (•“c¬Ÿ) 04|250
H. HasseFMathematik als Wissenschaft
Kunst und Macht (––jšˆê) 05|185
M. HasumiFHardy classes on infinitely
connected Riemann surfaces (—Ñ@ŽÀŽ÷L) 37|187
T. HawkinsFLebesgue's theory of
integration @@(‘º“c@‘S) 26|085
W. K. HaymanFSubharmonic Functions, Vol. 2 (‘ŠìO–¾) 43|283
G. Heckman, H. SchlichtkrullFHarmonic Analysis and
Special Functions on Symmetric Spaces (Ž¦–ìMˆê)················································· 49|332
G. Hecor, U. HirschFIntroduction to the geometry of foliations (ˆî—t®Žu) 39|376
M. HeinsFSelected topics in the
classical theory of functions of a complex variable
(ˆê¼@M)················································· 14|121
M. HeinsFComplex function theory @ @(‹T’JrŽi) 24|342
S. HelgasonFDifferential geometry and
symmetric spaces (™‰YŒõ•v) 15|252
S. HelgasonFGroups and geometric
analysis, integral geometry, invariant differential operators, and spherical
functions (‰Í“Y@Œ’)··································· 39|375
L. L. HelmsFIntroductions to potential
theory @@(“ñ‹{MK) 26|184
D. R. Henney•ÒFOpen questions in mathematics (ˆê¼@M) 33|090
Peter HenriciFDiscrete variable methods in
ordinary differential equations@@@@@@@(ˆê¼@M)················································· 17|114
Peter HenriciFError propagation for difference methods (ˆê¼@M) 17|114
Peter HenriciFElements of numerical
analysis@@(ˆê¼@M) 17|114
P. HenriciFApplied and computational complex analysis (ˆê¼@M) 30|168
H. HermesFEinführung in die mathematische Logik (‘OŒ´º“ñ) 17|249
M. HervéFSeveral complex variables, local theory (ˆê¼@M) 16|186
E. Hewitt-K. StrombergFReal and abstract analysis (ˆÉ“¡´ŽO) 19|125
T. HidaFBrownian motion (’|’†–Εv) 36|285
E. HilleFFunctional analysis and semigroups (‹g“ckì) 02|372
E. HilleFAnalytic function theory ‡T, ‡U @
@(ˆê¼@M) 14|123
P. J. HiltonFAn introduction to homotopy theory (‚‹´“T‘å) 08|056
P. J. Hilton-S. WylieFHomology theory, an
introduction to algebraic topology
(’†‰ª@–«)················································· 14|121
F. HirzebruchFGarben—–und Cohomologie—–theorie
(ˆê¼@M) 09|194
F. HirzebruchFNeue topologische Methoden
in der algebraischen Geometrie (’†–ì–Î’j) 10|193
G. HochschildF@@@@@@@@@@@@@@@The structure of Lie groups ({“¡^Ž÷) 18|249
G. HochschildFIntroductions to affine @@algebraic groups (“yˆäK—Y) 26|187
G. P. HochschildFBasic theory of algebraic
groups and Lie algebras
(ˆ¢•”‰pˆêC“yˆäK—YC’|“àŒõO)················································· 35|182
K. HoffmanFBanach spaces of analytic
functions @@(˜a“c~‘ ) 17|115
K. H. HofmannCP. S. MostertFElements of compact
semigroups (“c‘ºFs) 21|313
R. HonsbergerFMathematical gemsC‡TC‡U @
@(ˆê¼@M) 30|166
Lars HörmanderFAn introduction to complex
analysis in several variables (ŠŒ´šß“ñ) 19|060
L. HörmanderFThe analysis of linear
partial differential operators ‡T, ‡U (–k“c@‹Ï) 38|090
Wu Yi HsiangFCohomology theory of topological transformation groups (‹g“c•üD)················································· 30|372
S. T. HuFHomotopy theory (“‡“cM•v) 13|184
S. T. HuFHomology theory (”’ŠâŒªˆê) 20|122
L. K. HuaFAdditive
Primzahltheorie @@(—³‘òŽü—Y) 16|179
L. K. HuaFAbschätzungen von Exponentialsummen und ihre Anwendung in den Zahlentheorie (—³‘òŽü—Y)················································· 16|179
Hua Loo Keng (‰Ø—…M) & Wang Yuan (‰¤Œ³)FApplications of number
theory to numerical analysis (Ž–ì@Œ’)················································· 35|187
J. F. P. HudsonFPiecewise linear
topology @@(•Ÿ“cªŽq) 23|075
M. Hukuhara-T. Kimura-Mme T.
MatudaFÉquations
différentielles ordinaires du premier order dans le champ complexe (âV“¡—˜œ\)··································· 13|186
J. E. HumphreysFLinear algebraic groups @ @(ˆ¢•”‰pˆêC“yˆäK—YC’|“àŒõO) 35|182
W. Hurewicz-H. WallmanFDimension theory @@(X“c‹IˆêE“ü]º“ñ) 02|183
D. HusemollerFFibre bundles (—é–ØŽ¡•v) 21|067
D. HusemollerFFibre bundlesC2nd ed. @@(–k“c‘וF) 29|176
Roudolph C. Hwa-Vigdor L. TeplitzFHomology Feynman Integrals (r–Ø•s“ñ—m) 20|183
H. Komatsu (ed.)FHyperfunctions and pseudodifferential
equations (ŽO—Ö“N“ñ) 26|281
I. A. Ibragimov-Y. A. RozanovFGaussian @random processes (–ì–{‹v•v) 33|377
S. IitakaFAlgebraic geometry (ˆÀ“¡“NÆ) 40|272
N. Ikeda, S. WatanabeFStochastic differential
equations and diffusion processes @ @(–{”ö@ŽÀ)················································· 35|381
M. IriFNetworkCflowCtransportation and @scheduling (ˆê¼@M) 23|070
K. ItôFFoundations of stochastic
differential equations in infinite dimensional spaces @@(“n•ÓMŽO)················································· 39|182
K. Itô and H. P. McKeanCJr.FDiffusion processes and their sample paths (“n•ÓMŽO)················································· 23|068
N. JacobsonFThe theory of rings @ @(ó–ìŒ[ŽO) 03|058
N. JacobsonFStructure of rings (“s’}r˜Y) 09|253
N. JacobsonFPI–algebras (‘å–x³K)· 30|286
H. JacquetCR. P. LanglandsFAutomorphic forms on 
(쒆閾) 23|316
James P. JansFRings and homology
@@(‘¾“ìOK) 17|179
M. Jarnicki, P. PflugFInvariant Distances and
Metrics in Complex Analysis (“Œì˜a•v) 48|436
B. Jawerth & M. MilmanFExtrapolation theory with applications (‘]•zì‘ñ–ç) 46|366
T. J. JechFThe axiom of choice (’Ë“cM‚) 28|285
T. JechFSet theory (“ï”gŠ®Ž¢)·········· 33|188
T. JechFMultiple forcing (‰Á–ÎÕv)·· 40|277
A. Jeffrey and T. KawaharaFAsymptotic methods in
nonlinear wave theory (¼–{•q•F) 36|374
C. U. Jensen & H. LenzingFModel Theoretic Algebra (’؈䖾l) 43|186
K. K. Jensen, K. ThomsenFElements of 
-Theory (‰Ä–Ú—˜ˆê) 48|217
P. E. T. JorgensenFOperators and representation theory (ŠÝ–{»F) 41|278
R. V. Kadison-J. R. RingroseFFundamentals of the theory
of operator algebras Vol. I @@(’|賓¹)················································· 37|180
J.–P. KahaneFSome random series of functions (’–Žë@œ·) 24|156
J. P. KahneFSome random series of
functions @@(²“¡@’R) 40|276
G. KallianpurFStochastic filtering
theory @ @(”ò“c•K) 34|184
A. KanamoriFThe Higher Infinite
@@(Ÿº–ì@¹) 48|085
S. KaneyukiFHomogeneous bounded domains
and Siegel domains (Ž™‹ÊH—Y) 36|370
L. V. Kantorovich-V. I. KrylovFApproximate methods of
higher analysis (ˆäã³—Y) 16|176
I. KaplanskyFInfinite abelian groups
@@(ˆÉ“¡@¸) 08|124
I. KaplanskyFAn introduction to
differential algebra (¬–ì@F) 10|056
S. KarlinFA first course in stochastic
processes @@(”’”öP‹g) 21|157
T. KatoFPerturbation theory for
linear operators
(‘“c‹v–í) 21|148
T. KatoFA short introduction to
perturbation theory for linear operators (–]ŒŽ@´) 36|375
N. Katz, B. MazurFArithmetic Moduli of Elliptic curves (•S£•¶”V) 44|370
Y. KatznelsonFAn introduction to harmonic
analysis (’–Žë@œ·) 21|308
T. KawataFFourier analysis of
stochastic processes (‰Í–ìŒh—Y) 38|092
S. KechrisFClassical Descriptive Set
Theory,@With 34 Illustrations (“c’†®•v) 50|108
H. J. KeislerFModel theory for infinitary
logic @@(–{‹´M‹`) 26|191
J. L. KelleyFGeneral topology (’·“cˆê) 08|183
J. G. Kemeny•ÒFNew directions in
mathematics @@(ŽRŽº’ès) 16|171
J. G. KemenyCJ. L. SnellCA. W. KnappFDenumerable Markov chains@@@@@@@ (“n•ÓŽõ•v)················································· 21|076
G. R. KempfFComplex Abelian Varieties
and Theta Functions (˜I•ô–Ζ¾) 46|373
C. E. KenigFHarmonic Analysis Techniques
for Second Order Elliptic Boundary Value Problems (‹àŽq@½)················································· 48|105
B. KerékjártóFLes fondaments de la géométrie
@@(•ÒW•”) 19|056
A. N. Khovanskii (P. Wynn‰p–ó)F@@@@@@@The application of continued
fractions and their generalizations to problems in approximation theory (ˆê¼@M) 20|116
‹I@WŽqCJ. MyhillCR. Vesley•ÒFIntuitionism @and proof theory (”’ˆäŒÃŠó’j) 24|245
A. A. KirillovFElements of the theory of
representations (ŠŒ´@‹B) 38|283
W. KlingenbergFEine Vorlesung über
Differentialgeometrie (‰¬ãhˆê) 28|379
KlingenbergFLectures on closed
geodesics
(“c’†@ŽÀ) 32|089
Anthony W. KnappFRepresentation theory of
semisimple groups —–An overview based on
examples—– (¼ŽR@‹)················································· 44|183
A. W. KnappFLie Groups, Lie Algebras,
and Cohomology (“à“¡@‘) 44|280
D. E. KnuthFSurreal numbers (—L‘ò@½) 31|279
S. KobayashiFHyperbolic manifold and
holomorphic mappings (”óŒû’õˆê) 24|347
S. KobayashiFTransformation groups in
differential geometry (—Ž‡‘ìŽl˜Y) 27|188
S. KobayashiCK. NomizuFFoundations of differential
geometry (‰¬ãhˆê) 23|308
S. Kobayashi, H. Wu, C. HorstFComplex differential geometry
(–žŸºrŽ÷)
38|187
N. KoblitzF
–adic numbers, 
–adic analysis, and zeta–functions (X“cN•v) 37|378
P. KoosisFThe logarithmic integral ‡TE‡U @
@(’†˜H‹M•F) 48|207
C. KosniowskiFActions of finite abelian
groups @@(“à“c•šˆê) 30|375
J. L. KoszulFExposés sur les espaces @@homogénes symétriques (¼“‡—^ŽO) 14|124
Hans-Joachim KowalskyFTopological Spaces @@(’|”V“à@ãù) 17|182
I. KraFAutomorphic forms and
Kleinian groups @@(ŽR–{”Ž•v) 28|182
S. G. KreinFLinear differential
equations in Banach space (‘å“à@’‰) 23|315
H. Kumano–goFPseudo–differential
operators @@(ˆäì@–ž) 35|274
KunenFSet theory\An introduction to
independence proofs (‰Ô‘ò³ƒ) 37|283
K. Kunen, J. E. Vaughan (eds. )FHandbook of set–theoretic
topology (‹Ê–쌤ˆê) 40|185
H. KunitaFStochastic flows and
applications @@(“¡Œ´@Ži) 40|281
H. P. Künzi-A. Pfluger•ÒFFestband zum 70. Geburtstag
von Rolf Nevanlinna
(ˆê¼@M)················································· 20|189
C. KuratowskiFTopologie ‡U (‹ß“¡Šî‹g) 05|196
K. KuratowskiFTopology, ‡T (‹ß“¡Šî‹g) 20|123
S. Kuroda•ÒFThe collected papers of
Teiji Takagi @@(—³‘òŽü—Y) 27|379
Yu. A. KutoyantsFParameter estimation for
stochastic processes (ˆîŠ_é¶) 43|183
J. P. LaSalle-S. LefschetzFInternational symposium on
nonlinear differential equations and nonlinear mechanics @@@(è•”@ŽÀ)······································· 15|240
I. Lakatos•ÒFProblems in the philosophy
of mathematics (‘º“c@‘S) 21|229
C. LanczosFDiscourse on Fourier
series @@(ˆê¼@M) 18|185
S. LangFIntroduction to algebraic
geometry @@(Xì@Žõ) 14|191
S. LangFIntroduction to differentiable
manifolds @@(Žu‰ê_“ñ) 18|187
S. LangFAlgebra (•ž•”@º)··············· 18|251
S. LangFRapport sur la cohomologie
des groupes @@(•ž•”@º) 21|299
S. LangFCyclotomic fields (H“¡ˆ¤’m) 33|092
D. LaugwitzFDifferentialgeometrie @@(’·–ì@³) 14|125
D. LaugwitzFDifferentialgeometrie
@
@(¬”©Žç¶) 17|249
M. A. Lavrent'evFVariational methods for
boundary value problems for systems of elliptic equations (‹yìL‘¾˜Y)················································· 16|254
L. Le CamFAsymptotic Methods in
Statistical Decision Theory (ŽR“c쑾˜YE—é–Ø@•) 43|184
J. Leech•ÒFComputational problems in
abstract algebra (“c‘ºFs) 23|309
E. L. LehmannFTheory of Point
Estimation @ @(ŽO“c°‹`) 41|282
J. LehnerFDiscontinuous group and
automorphic functions (ª–{¸Ži) 18|120
G. M. LeibowitzFLectures on complex function
algebras (•xŽR@~) 28|173
C. G. LekkerkerkerFGeometry of numbers @ @(“àŽRŽO˜Y) 23|313
P. LévyFProcessus stochastiques et
mouvement Brownien (ˆÉ“¡@´) 05|114
André LichnerowiczFThéorie globale des
connexions et des groupes d'holonomie
@@(”öŠÖ‰pŽ÷)················································· 11|055
Séminaire Sophus Lie (1954/1955)FThéorie des algèbres de Lie,
Topologie des groupes de Lie @@(™‰YŒõ•v)················································· 11|053
D. V. LindleyFIntroduction to probability
and statistics (’|“à@Œ[) 17|254
Yu. V. Linnik (S. J. Taylor‰p–ó)FDecomposition of probability
distributions (‰Í“c—³•v) 21|069
J. L. LionsFEquations différentielles opérationnels
et problèmes aux limites @@(“c•ÓLé)················································· 15|243
J. L. LionsFContrôle optimal de systèmes
gouvernés par des équations aux dérivées partielles (÷㉪–M•v)················································· 22|154
J. L. Lions and E. MagenesFProblèmes aux limites non
homogènes et applications @@@‡TC‡U (“¡Œ´‘å•ã)················································· 23|158
J. E. LittlewoodFLecture on the theory of
function @@(Y. K. ) 02|368
C. L. LiuFIntroduction to
combinatorial mathematics (ˆê¼@M) 21|304
C. LivingstonFKnot Theory, The Carus
Mathematical Monographs Number 24 @@@(’†¼N„)················································· 50|219
G. G. LorentzFApproximation of functions @@@(—é–Ø‹`–ç) 23|157
Jan LukasiewiczFElements of mathematical
logic @@(’†‘ºKŽl˜Y) 17|248
Y. L. LukeFThe special functions and
their approximations (ˆê¼@M) 22|317
A. T. Lundell and S. WeingramFThe topology @@of CW complexes (‹{è@G) 24|343
G. LusztigFIntroduction to Quantum
Groups @@(’Jèr”V) 47|199
W. MaakFFastperiodische
Funktionen @ @(‰F‘òO•¶) 04|252
N. Madras, G. SladeFThe Self–Avoiding Walk @@(•ž•”“N–í) 47|311
W. Magnus-F. Oberhettinger-R. P. SoniFFormulas and theorems for
the special functions of mathematical physics@@@@@ (ˆê¼@M)··································· 20|061
B. MalgrangeFIdeals of differentiable
functions@@ (Šâ‹´—º•ã) 21|153
J. MalitzFIntroduction to mathematical
logic @@(–{‹´M‹`) 33|188
B. B. MandelbrotFFractalsFforms chanceCand dimension (ˆê¼@M) 30|169
Jerome H. ManheimFThe genesis of point set topology
(‰Í–ìˆÉŽO˜Y) 17|181
H. B. Mann•ÒFError correcting codes @ @(ˆê¼@M) 22|232
K. V. Mardia, J. T. Kent, J. M. BibbyFMultivariate analysis (‘ì@‹B) 34|280
A. W. Marshall-I. OlkinFInequalitiesFTheory of majorization and
its applications
(ˆÀ“¡@‹B)················································· 33|375
V. P. MaslovFThe complex WKB Method for
Nonlinear Equations ‡T. Linear Theory @@(“àŽRNˆê)················································· 50|100
M. MatsudaFFirst order algebraic
differential equations (¼‰ªŒ[“ñ) 37|086
J.–L. MauclaireFIntégration et théorie des
nombres (Š˜]“N˜N) 40|275
G. Maury et J. RaynaudFOrdres maximaux au sens de
K. Asano (ŠÛ—щpr) 34|090
D. McDuff, D. SalamonF
–holomorphic Curves and Quantum Cohomology (‚‘q@Ž÷) 50|104
M. Métivier, J. PellaumailFStochastic@integration @@(‰–“cˆÀM) 37|188
P.–A. MeyerFProbabilités et potentielG@Probability and potentials (–{”ö@ŽÀ) 21|156
Y. MeyerFOndelettes et Opérateurs ‡T, ‡U, ‡V @@(“àŽR–¾l) 45|183
S. G. MikhlinFVariational methods in
mathematical physics (ˆê¼@M) 17|253
S. G. MikhlinFMultidimentional singular
integrals and integral equations (ŒFƒm‹½€)················································· 19|123
J. MikusińskiFOperational calculus
@@(‹g“ckì) 12|190
J. MilnorFMorse theory (’Ë–{—z‘¾˜Y) 21|317
J. W. MilnorFLectures on the 
–cobordism theorem (‰Á“¡\‹g) 22|234
J. MilnorFSingular points of complex
hypersurfaces (z–K—§—Y) 22|314
C. MirandaFPartial differential
equations of elliptic type (‰º“cߘY) 24|253
Barry MitchellFTheory of categories @@(‰““¡Ã’j) 20|249
C. J. ModeFMultitype branching
processes @
@(“¡‹È“N˜Y) 26|079
J. D. Monk with R. Bonnet (ed.)FHandbook of Boolean Algebras
(Ÿº–ì@¹)
43|179
C. C. Moore, C. SchochetFGlobal Analysis On Foliated
Spaces (‰Ä–Ú—˜ˆê) 41|280
M. MoresFTopological methods in the
theory of functions of a complex variable
(¼–{•qŽO)················································· 04|115
F. MorganFGeometric Measure
Theory. A
Beginner's Guide (ՠ҈LΛ) 46|363
Dietrich MorgensternFEinführung in die Wahrscheinlichkeitsrechnung und
mathematische Statistik (’|“à@Œ[)················································· 17|126
C. B. MorreyFMultiple integrals in the
calculus of variations (‘º¼Žõ‰„) 24|159
Y. N. MoschovakisFElementary induction on
abstract structures (•ŸŽR@Ž) 29|187
Y. N. MoschovakisFDescriptive set theory @ @(ˆÀ“c@–L) 38|087
R. E. Mosher and M. C. TangoraFCohomology operations and
applications in homotopy theory (“‡“cM•v)················································· 24|154
P. S. MostertFProeedings of the conference
on transformation groups (‘åX‰pŽ÷) 21|315
A. Mostowski-M. StarkFIntroduction to higher
algebra (ˆê¼@M) 16|186
D. MumfordFGeometric invariant
theory @ @(ŽR“c@_) 19|185
D. MumfordFTata lectures on theta
I @@ (¬ò³“ñ) 36|369
D. MumfordFTata lectures on theta
II
@@(‰–“c—²”ä˜C) 40|090
S. B. Nadler, Jr.FContinuum Theory @ @(¬ŽR@W) 46|376
Jun–iti NagataFModern dimension theory @@(Ž™‹Ê”VG) 18|121
J. NagataFModern dimension theory
@@(’ÓcŒõˆê) 38|188
M. NagataFLocal rings (¬“c³—Y)····· 16|181
B. Sz. NagyFSpektraldarstellung linearer
transformationen des Hilbertschen Raumes @@(‹g“ckì)················································· 03|247
Y. Nakagami-M. TakesakiFDuality for crossed products
of von Neumann algebras
@ @(‰ŸìŒ³d)················································· 36|371
M. NambaFGeometry of projective
algebraic curves (¡‹g—mˆê) 39|371
M. Namik OgustöreliFTime–lag control systems @@(™ŽR¹•½) 19|119
R. NarasimhanFIntroduction to the theory
of analytic spaces (ˆê¼@M) 20|190
I. P. NatansonFTheorie der Funktionen einer
reellen Varänderlichen (ŠÛŽR‹VŽl˜Y) 07|176
E. NelsonFTensor anaysis (–î–쌒‘¾˜Y) 21|309
V. V. Nemytskii-V. V. StepanovFQualitative theory of
differential equations @@@@@@(‰Y@‘¾˜Y)················································· 14|057
R. NevanlinnaFUniformisierung (“c‘º“ñ˜Y) 06|246
R. Nevanlinna‘¼FAnalytic functions
@@(ˆê¼@M) 12|247
M. H. A. NewmanFElements of the topology of
plane sets of points (‹T’JrŽi) 05|188
J. C. C. NitscheFLectures on minimal
surfaces, vol. 1 (¬ˆé[K) 44|092
K. NomizuFLie groups and differential
geometry @@(Šâ–x’·Œc) 11|248
D. G. NorthcottFAn introduction to @homological algebra (“s’}r˜Y) 14|190
D. G. NorthcottFFinite free resolutions @@(‹k@’å—Y) 30|092
D. G. NorthcottFAffine sets and affine
groups @@(ˆ¢•”‰pˆêC“yˆäK—YC’|“àŒõO) 35|182
K. NoshiroFCluster sets (•“c@³)·· 13|188
T. OdaFPeriods of Hilbert modular
surfaces @ @(‘¾“c‰ëŒÈ) 38|088
T. OdaFLectures on torus embeddings
and applications (“y‹´GN) 36|373
T. OdaFConvex Bodies and Algebraic
Geometry @@(’†‘º@ˆè) 41|184
J. OgawaFStatistical theory of the
analysis of experimental designe (ΈäŒá˜Y) 29|377
K. OkaFSur les fonctions
analytiques de plusieurs variables (‰Í‡—Ljê˜Y) 15|235
Okonnk-Schneider-SpindlerFVector bundles on complex projective spaces (ŠÛŽR³Ž÷) 37|090
T. OkuboFDifferential geometry
@@(–î–쌒‘¾˜Y) 40|371
F. OortFCommutative group
schemes
@@(–{“c@•½E‹{¼³‹X) 20|252
O. OreFThe Four–color problem (ˆê¼@M) 20|244
P. Orlik & H. TeraoFArrangements of Hyperplanes
(“ú”äF”V) 46|368
M. Otto•ÒFMathematiker über die
Mathematik @@(ˆê¼@M) 28|378
PWN•ÒFRecent developments in
general relativity (’r“c•ô•v) 15|189
R. S. PalaisFFoundations of Global
nonlinear analysis (‘åX‰pŽ÷) 26|087
Carol ParikhFThe Unreal Life of Oscar Zariski@@@(¼‘º‰p”V) 44|368
K. R. ParthasarathyFProbability measures on
metric spaces (‰ª•”–õŒ›) 21|311
G. K. PedersenF
–algebras and their automorphism groups (‚ˆä”ŽŽi) 33|284
R. PéterFRekursive Funktionen (Ô@Û–ç) 08|058
V. V. PetrovFSums of independent random
variables (´…—Ljê) 30|088
A. PietschFNuclear locally convex
spaces @ @(‚‘º‘½‰êŽq) 28|180
J. D. Pincus•ÒFSummer institute on spectral
theory and statistical mechanics
(ˆê¼@M)················································· 19|191
V. A. PlissFNonlocal problems of the
theory of oscillations (âV“¡—˜œ\) 20|119
C. PommerenkeFUnivalent functions @@(ŒE“c‰À®) 29|178
L. S. Pontryagin-V. G. Boltyanskii-R.
V. Gamkrelidze-E. F. MishchenkoFThe mathematical theory of optimal
processes @@(¬—Ñ—³ˆê) ·································· 16|125
M. M. PostnikovFFoundations of Galois theory
@@(‰Í“cŒh‹`) 14|254
K. PracharFPrimzahlverteilung (—³‘òŽü—Y) 16|179
Proceedings of the United States -
Japan seminar in differential geometry (Žu‰ê_“ñ) 19|118
C. ProcesiFRings with polynomial
identities @ @(‘å–x³K) 30|286
P. H. RabinowitzFMinimax methods in critical
point theory with applications to differential equtions (“c’†˜a‰i)················································· 46|182
H. RademacherFTopics in analytic number
theory (ŽOˆäF”ü) 28|175
H. RadjaviCP. RosenthalFInvariant subspaces @@(–k–ìFˆê) 28|278
A. Ralston-H. S. Wilf•ÒFMathematical methods for
digital computers 2 (ˆê¼@M) 20|243
R. M. RangeFHolomorphic Functions and
Integral Representations in Several Complex Variables (ˆÀ’BŒªŽO)················································· 48|088
M. M. Rao, Z. D. RenFTheory of Orlicz Spaces @@(–k@L’j) 46|090
H. RasiowaFAn algebraic approach to non–classical
logic (¬–슰ð) 29|375
H. E. Rauch and H. M. FarkasFTheta functions with
applications to Riemann surfaces @ @(‰Á“¡’—Y)················································· 28|280
M. Reed-B. SimonFMethods of modern
mathematical physics, ‡T-‡W
(•“c¬r)················································· 37|181
R.–D. ReissFApproximate Distributions of
@@Order
Statistics \ With Applications to Nonparametric
Statistics @@@@@@@@@(¼“ê@‹K)··································· 50|216
A. RényiFWahrscheinlichkeitsrechnung
mit einem Anhang über Informationstheorie @@ (‘‘ò´“T)················································· 15|127
G.
RingelFMap
color theorem (ˆê¼@M) 28|174
J. RiordanFAn introduction to
combinatorial analysis (ŽR–{Kˆê) 12|186
B. D. RipleyFStatistical Inference for
Spatial Processes (ŠÔ£@–Î) 47|306
J. F. RittFDifferential algebra (‰œìŒõ‘¾˜Y) 03|117
A. P. Robertson and W. J. RobertsonFTopological vector spaces (ŠÖ”‰ðÍŒ¤‹†‰ï) 21|074
T. Robertson, F. T. Wright, R. L.
DykstraF Order Restricted Statistical Inference
(ùŸºËˆê)················································· 49|329
B. Rodin and L. SarioFPrincipal functions @@(‹g“c‹I—Y) 21|237
L. RodinoFLinear Partial Difrerential Operators in Gevrey Spaces (X–{–F‘¥) 48|102
H. RogersCJr. FTheory of recursive
functions @and effective computability (“c’†®•v) 22|155
L. C. G. Rogers-D. WilliamsFDiffusions, @Markov Processes, and
Martingales, @@vol.2: Itô Calculus (ŽR“cr—Y)················································· 41|375
C. P. Rourke and B. J. SandersonFIntroduction to piecewise–linear
topology (•ŸŒ´^“ñ) 26|286
G. G. RoussasFContiguity of probability
measures; Some application in statistics @@ (–öì@êŸ)················································· 26|280
H. L. RoydenFReal analysis (ˆê¼@M) 15|251
H. Rubin & J. RubinFEquivalents of @@axiom of choice, ‡U (“ï”gŠ®Ž¢) 39|285
Walter RudinFFourier analysis on
groups @ @(–î–ì–ÎŽ÷) 20|059
W. RudinFFunction theory in the unit
ball of 
@@(ŠŒ´šß“ñ) 34|186
D. RuelleFThermodynamic formalism @ @(‘å–ì‘׎¡˜Y) 32|376
T. L. Saaty•ÒFLectures on modern
mathematics @‡T, ‡U (ˆê¼@M) 17|052
T. L. Saaty•ÒFLectures on modern
mathematicsC‡V (ˆê¼@M) 21|159
G. E. SacksFSaturated model theory
@@(–{‹´M‹`) 27|284
S. SakaiF
–algebras and 
–algebras
@@(Œä‰€¶‘P®) 26|370
S. Saks-A. ZygmundFAnalytic functions @ @(¬Œ@@Œ›) 07|122
G. Samorodnitsky, M. S. TaqquFStable non–Gaussian Random
Processes \ Stochastic Models with Infinite
Variance @@@@@@@(’|’†–Εv)··································· 48|108
P. SamuelFAlgèbre locale (‰i“c‰ë‹X)· 07|049
P. SamuelFMéthodes d'algèbre abstraite
en géométrie algébrique (‰i“c‰ë‹X) 09|055
G. Sansone and R. ContiFNon–linear differential
equations (‹g‘ò‘¾˜Y) 17|186
L. Sario and K. OikawaFCapacity functions @@ (Žðˆä@—Ç) 26|081
L. Sario-M. NakaiFClassification theory of
Riemann surfaces (“¡‰Æ—´—Y) 26|181
SarnakFSome Applications of Modular
Forms @@(¬ŽRM–ç) 50|319
M. SchechterFPrinciples of functional
analysis @@(‹“‡Æ•v) 26|182
L. I. SchiffFQuantum mechanics @@@@@@@(¬—Ñ@–«) 03|120
M. Schiffer-D. C. SpencerFFunctionals of finite
Riemann surfaces (ˆê¼@M) 07|172
O. F. G. SchillingFThe theory of
valuations @@(ˆî—t‰hŽŸ) 05|119
W. SchmeidlerFLineare Operatoren im
Hilbertschen Raum (ŽO‘ºª—Y) 08|055
Th. SchneiderFEinführung in die
transzendenten Zahlen (‘å¬ß•v) 15|184
H. Scholz und G. HasenjaegerFGrundzüge der mathematischen Logik (Ô@Û–ç) 15|127
J. A. SchoutenFTensor analysis for
physicists @@(Šâ“c‹`ˆê) 05|253
J. A. SchoutenFRicci–Calculus. An
introduction to tensor analysis and its geometrical applications (–î–쌒‘¾˜Y)················································· 07|124
H. SchubertFTopologie, eine Einführung @ @(¬—Ñ’åˆê) 17|057
K. SchütteFProof theory (‚–쓹•v)·· 30|371
L. SchwartzFThéorie des
distributions @ @(’|”V“à@ãùE—Ñ@ˆê“¹) 03|113
L. SchwartzFThéorie der distributions ‡U @
@(—Ñ@ˆê“¹) 04|187
J. T. Schwartz•ÒFMathematical aspects of
computer science (“¡–츈ê) 21|302
Scientific American, 1964”N9ŒŽ† @@(Ô@Û–ç) 17|173
W. R. ScottFGroup theory (ˆîŠ_M•v) 17|177
B. SegreFProdromi di Geometria
Algebrica @ @(…–ìO•¶) 26|274
J.–P. SerreFGroupes algébriques et corps
de classes (—L”n@“N) 12|177
J.–P. SerreFCorps locaux (–{“c@•½)· 18|190
J.–P. SerreFLie algebras and Lie
groups @@(›–ìP—Y) 19|116
J.–P. SerreFAlgèbres de Lie semi–simples
complexes (›–ìP—Y) 20|118
J. P. SerreFAbelian 
–adic representation and elliptic curves (X“cN•v) 22|239
J.–P. SerreFRepreséntations linéares des
@groupes
finis (‹g“c’ms) 27|287
I. R. ShafarevichFBasic algebraic
geometry @ @(’–£”ŽŽi) 31|277
C. E. Shannon-J. McCarthyFAutomata studies @@(Ô@Û–ç) 10|049
C. E. Shannon-W. WeaverFThe mathematical theory of
communication (‘‘ò´“T) 04|189
J. H. ShapiroFComposition Operators and
Classical Function Theory (‚–ØŒ[s) 50|330
O. Shisha•ÒFInequalities (ˆê¼@M) 21|159
G. R. Shorack, J. A. WellnerFEmpirical @Processes with Applications
to Statistics
(ˆÀŒ|d—Y)················································· 46|364
M. A. ShubinFPseudo–differential
operators @and spectal theory (’·£“¹O) 40|278
C. L. SiegelFTranscendental numbers @ @(•“c¬Ÿ) 03|189
C. L. SiegelFVerlesungen über Himmelsmechanik
(–ØM‹Â) 11|057
C. L. SiegelFZur Reduktionstheorie
quadratischer Formen (•ÒW•”) 15|191
C. L. SiegelFLectures on advanced
analytic number theory (–{“c@•½) 16|174
C. L. SiegelFSymplectic geometry @@(ˆÉŒ´Mˆê˜Y) 17|180
W. SierpińskiFElementary theory of numbers
@@(Ž–ì@Œ’) 17|176
Joseph H. SilvermanFAdvanced Topics in the
Arithmetic of Elliptic Curves (’†‘º“N’j) 49|434
I. SingerFCea mai bună approximare în
spaţii vectoriale normate prin elemente din spaţii vectoriale (ˆê¼@M)················································· 21|073
Y.–T. SiuFLectures on
Hermitian-Einstein metrics for stable bundles and Kähler-Einstein metrics (–žŸºrŽ÷)················································· 40|370
L. A. SkornyakovFComplemented modular lattice
and regular rings (‰J‹{ˆê˜Y) 18|119
I. N. SneddonFMixed boundary value
problems in potential theory (¬¼—Eì) 21|152
C. D. SoggeFFourier Integrals in
Classical Analysis (™–{@[) 50|098
Edwin H. SpanierFAlgebraic topology @@(–쑺‘וq) 20|246
T. A. SpringerFLinear algebraic groups @ @(ˆ¢•”‰pˆêC“yˆäK—YC’|“àŒõO) 35|182
R. P. StanleyFEnumerative Combinatrics,
Volume ‡T (“ú”äF”V) 44|089
N. SteenrodFThe topology of fibre
bundles @@(ÊԗǎŸ) 03|248
N. E. SteenrodFCohomology operations @ @(‰¡“cˆê˜Y) 15|187
M. L. Stein-W. D. MunroFComputer programming (–ìèºO) 17|059
E. M. Stein and G. WeissFIntroduction to @@Fourier analysis on
Euclidean spaces @ (–î–ì–ÎŽ÷)················································· 28|183
E. M. SteinFHarmonic Analysis; Real–Variable
Methods, Orthogonality, and Oscillatory Integrals (‹{’n»•F)················································· 47|421
S. SternbergFLectures on differential
geometry @@(‰¬ãhˆê) 20|063
M. I. StokaFGeometrie Integrală (ŒI“c@–«) 21|155
E. L. StoutFThe theory of uniform
algebras @
@(åM“cŒöŽO) 28|178
H. StrasserFMathematical Theory of
Statistics @@(ŽR“c쑾˜YE—é–Ø@•) 43|184
S. Stratila and L. ZsidoFLectures on von Neumann
algebras (‰p–óFS. Teleman) @ (r–Ø•s“ñ—m)················································· 32|378
D. W. Stroock-S. R. S. VaradhanF Multidimensional
diffusion processes (‘“c@Š°)················································· 34|282
M. SugiuraFUnitary representations and
harmonic analysis (•½ˆä@•) 36|182
R. G. SwanFAlgebraic 
–theory
@(‘å—Ñ’‰•v) 23|072
M. E. SweedlerFHopf algebras (•ž•”@º) 24|078
R. M. SwitzerFAlgebraic topology–homotopy
and homology (¬—Ñ’åˆê) 30|370
M. TakesakiFTomita's theory of modular Hilbert algebras and its
applications
(’|”V“à@ãù)················································· 26|375
M. TakesakiFTheory of operator algebras ‡T @ @(Ä“¡˜a”V) 33|281
G. Takeuti and W. M. ZaringFAxiomatic set theory (ŽÂ“cŽõˆê) 26|283
G. TakeutiFTwo applications of logic to
mathematics (”ª™–ž—˜Žq) 36|283
G. TakeutiFProof theory, (second
edition) @@(‘q“c—ß“ñ˜N) 40|368
K. Takeuchi, H. Yanai, B. N. MukherjeeFThe foundations of
multivariate analysis @@@ (”’‘qôO)················································· 37|091
A. TarskiFUndecidable theories (Ô@Û–ç) 06|239
M. E. TaylorFPseudodifferential Operators
and Nonlinear PDE, Progress in Mathematics, vol. 100 (ŽRè¹’j)················································· 50|325
R. TemamFNavier-Stokes equations
@@(X–{_Žq) 32|378
S. ThangaveluFLectures on Hermite and
Laguerre Expansions (Š¨r—Tˆê) 50|105
J. A. ThorpeFElementary topics in
differential geometry (”öŠÖ‰pŽ÷) 33|087
A. F. TimanFTheory of approximation of
functions of a real variable @@@@@@@@iF”V“àŒ¹ˆê˜Yj················································· 17|051
E. C. TitchmarshFThe theory of the Riemann
zeta–function (—³‘òŽü—Y) 04|253
E. C. TitchmarshFEigenfunction expansions
associated with second–order differential @equations, Part ‡U (‰Á“¡•q•v)················································· 12|188
E. TorgersenFComparison of Statistical
Experiments (‘ŠÔŽž•) 44|363
L. F. TóthFRegular figures (ˆê¼@M) 17|060
F. G. TricomiFVorlesungen über
Orthogonalreihen (‰Í“c—³•v) 08|125
H. TriebelFInterpolation theory,
function spaces, differential operators (‘º¼Žõ‰„) 33|083
H. TriebelFFourier analysis and
function spaces@@(‘º¼Žõ‰„) 36|180
H. TriebelFSpaces of Besov]Hardy]Sobolev type (‘º¼Žõ‰„) 36|180
A. S. TroelstraFLectures on linear
logic
@@(¬–슰ð) 46|371
A. J. TrombaFTeichmüller Theory in
Riemannian Geometry (‰F“c콈ê) 46|374
C. TruesdellFAn essay toward a unified
theory of special functions, based upon the functional equation 
@ @ @(ŽÄŠ_˜aŽO˜Y) 05|051
M. TsujiFPotential theory in modern
function theory (‹yìL‘¾˜Y) 14|050
K. UenoFClassification theory of
algebraic varieties and compact complex spaces @ @ @(“¡–Ø@–¾)················································· 36|379
M. UrabeFNonlinear autonomous
oscillationsCanalytical theory (‰F–ì—˜—Y) 24|341
B. van der Pole-H. BremmerFOperational calculus based
on the two–sided Laplace integral (ˆÉ“¡@´)················································· 11|116
B. L. van der WaerdenFScience awakening @@(S. I.) 07|182
Varchenko, V. I. Arnold, Gusein-ZadeFSingularities of differentiable
maps, vol. ‡T @ @ @(•Ÿ“c‘ñ¶)················································· 38|377
J. von Neumann-O. MorgensternFTheory of games and economic
behavior@@@@@@@ (ŠÖ@P‹`)················································· 03|185
A. WaldFStatistical decision
functions @@(‹{‘òŒõˆê) 04|049
C. T. C. WallFSurgery on compact
manifold @@(¼Œ³d‘¥) 26|083
A. H. WallaceFAn introduction to algebraic
topology (¬¼†˜Y) 15|187
C. WarnerFHarmonic analysis on
semi-simple Lie groups, ‡TC‡U (‰ª–{´‹½) 27|189
WashingtonFIntroduction to cyclotomic
Fields @@(¬¼Œ[ˆê) 41|092
S. WatanabeFLectures on stochastic
differential equations and Malliavin calculus @ (dìˆê˜Y)················································· 38|375
W. C. WaterhouseFIntroduction to affine group
schemes (ˆ¢•”‰pˆêC“yˆäK—YC’|“àŒõO) 35|182
A. WeilFFoundations of algebraic
geometry @
@(¬ò³“ñ) 02|082
A. WeilFSur les courbes algébriques
et les variétés qui s'en déduisent (ˆä‘€ˆê) 03|061
A. WeilFVariétés abéliennes et
courbes algébriques (ˆä‘€ˆê) 03|061
A. WeilFTheorie der Kählerschen
Mannigfaltigkeiten (HŒŽN•v) 06|121
André WeilFIntroduction à l'étude des
variétés kählériennes (Xì@Žõ) 13|122
WeilFBasic number theory (‘«—§P—Y) 24|345
A. WeilFNumber theory (‘«—§P—Y)··· 38|374
André WeilFSouvenirs
d'apprentissage (The
apparenticeship of a Mathematician) @@(‘êŒö–M)················································· 44|367
H. WeylFDie Idee der Riemannschen Fläche
@@(²X–ØG•äE“c‘º“ñ˜YEˆê¼@M) 09|125
H. Weyl-F. J. WeylFMeromorphic functions and
analytic curves (¼–{•qŽO) 04|114
G. W. WhiteheadFElements of homotopy @theory (ù”ö–õ–ç) 32|377
D. T. WhitesideFThe mathematical works of @Isaac Newton 1 (’†‘ºKŽl˜Y) 18|116
G. T. WhyburnFTopological analysis
@@(ˆê¼@M) 11|123
WielandtFThe theory of permutation
groups @@(‰iˆä@Ž¡) 18|055
S. WigginsFNormally Hyperbolic
Invariant Manifolds in Dynamical Systems @ (š •{Š°Ži)················································· 50|434
T. J. WillmoreFAn introduction to
differential geometry (–î–쌒‘¾˜Y) 12|249
A. WintnerFThe analytical foundations
of @celestial
mechanics (‰Y@‘¾˜Y) 03|119
P. WolfFAlgebraische Theorie der
Galoisschen Algebren (‘“cŸ•F) 10|058
N. M. J. WoodhouseFGeometric @@Quantization (ŽO㌒‘¾˜Y) 47|315
M. WoodroofeFNonlinear renewal theory in
sequential analysis (‚‹´@ˆê) 37|084
K. YanoFGroups of transformations in
generalized spaces (²X–Ød•v) 02|188
K. YanoFThe theory of Lie
derivatives and its applications (‚‹´P˜Y) 09|129
Kentaro YanoFDifferential geometry on @complex and almost complex
spaces @@@@@@@@ (²X–Ød•v)················································· 19|117
K. Yano-S. BochnerFCurvature and Betti numbers (ˆê¼@M) 06|052
M. Yoshida (‹g“c³Í)FFuchsian Differential
Equations with Special Emphasis on the Gauss-Schwarz theory (Ž›“cr–¾)················································· 42|090
T. YoshinoFIntroduction to Operator
Theory @ @(ŒÃ“cF”V) 48|081
T. YoshizawaFStability theory by
Liapunov's@ second method (ŒIŒ´ŒõM) 24|340
K. YosidaFFunctional analysis (ŽR’†@Œ’) 21|234
A. C. ZaanenFIntegration (ˆÉ“¡´ŽO) 22|233
O. ZariskiFIntroduction to the problem
of minimal models in the theory of algebraic surfaces (‰i“c‰ë‹X)················································· 12|127
O. Zariski-P. SamuelFCommutative algebra, @@‡T, ‡U (‰i“c‰ë‹X) 13|182
O. ZariskiFAlgebraic surfaces (”Ñ‚@–Î) 26|088
A. ZygmundFTrigonometric series @@(–î–ì–ÎŽ÷) 14|187
„N. „`. „B„y„|„u„~„{„y„~F„R„„u„ˆ„y„p„|„Ž„~„„u „†„…„~„{„ˆ„y„y „y „„„u„€„‚„y„‘ „„‚„u„t„ƒ„„„p„r„|„u„~„y„z „s„‚„…„„ @@@@@@(™‰YŒõ•v)················································· 19|255
„I. „M. „C„u„|„Ž„†„p„~„t-„M. „I. „C„‚„p„u„r-„N. „`. „B„y„|„u„~„{„y„~F„I„~„„„u„s„‚„p„|„Ž„~„p„‘ „s„u„ƒ„}„u„„„‚„y„‘ „y „ƒ„r„‘„x„p„~„~„„u „ƒ „~„u„z „r„€„„‚„€„ƒ„ „„„u„€„‚„y„z „„‚„u„t„ƒ„„„p„r„|„u„~„y„z @ (’C”nL•F‘¼) 16|247
„I. „M. „C„u„|„Ž„†„p„~„t-„C. „E. „Y„y„|„€„rF„O„q„€„q„Š„u„~„~„„u „†„…„~„{„ˆ„y„y (I. M.
Gelfand-G. E. ŠilovF’´”Ÿ”˜_) (ŽR’†@Œ’EÜŒ´–¾•vE‚‘ºK’jE“’󑽉êŽqE—é–؈ê³E¼Œ´@–«)······ 12|179
„I. „M. „C„u„|„Ž„†„p„~„t-„N. „`. „B„y„|„u„~„{„y„~F„N„u„{„€„„„€„‚„„u „„‚„y„}„u„~„u„~„y„‘ „s„p„‚„}„€„~„y„‰„u„ƒ„{„€„s„€ „p„~„p„|„y„x„p. „O„ƒ„~„p„Š„v„~„~„„u
„C„y„|„Ž„q„u„‚„„„r„ „„‚„€„ƒ„„„‚„p„~„ƒ„„„r„p@@@(ÜŒ´–¾•v)······ 14|246
„C. „M. „C„€„|„…„x„y„~F„C„u„€„}„u„„„‚„y„‰„u„ƒ„{„p„‘ „„„u„€„‚„y„‘
„†„…„~„{„ˆ„y„z „{„€„}„„|„u„{„ƒ„~„€„s„€
„„u„‚„u„}„u„~„~„€„s„€ @ (‹v•Û’‰—Y)················································· 06|243
„E. „A. „D„„~„{„y„~F„O„ƒ„~„€„r„p„~„y„‘ „„„u„€„‚„y„y @@„M„p„‚„{„€„r„ƒ„{„y„‡ „„‚„€„ˆ„u„ƒ„ƒ„€„r (²“¡Œ’ˆê) 14|055
„E. „A. „D„„~„{„y„~F„M„p„‚„{„€„r„ƒ„{„y„u „„‚„€„ˆ„u„ƒ„ƒ„ @@(²“¡Œ’ˆê) 19|126
„@. „N. „K„€„|„}„€„s„€„‚„€„r-„R. „B. „U„€„}„y„~F„^„|„u„}„u„~„„„‚„ „„„u„€„‚„y„y „†„…„~„{„ˆ„y„z „y „†„…„~„{„ˆ„y„€„~„p„| „Ž „~„€„s„€ „p„~„p„|„y„x„p (”Ÿ”˜_‚Æ”Ÿ”‰ðÍ‚ÌŠî‘b) @ (ˆÉ“¡´ŽO)··································· 15|124
„@. „C. „K„…„‚„€„ŠF„L„u„{„ˆ„y„y „„€ „€„q„Š„u„z „p„|„s„u„q„‚„u @@(•ž•”@º) 18|057
„O. „@. „L„p„t„Ž„w„u„~„ƒ„{„p„‘-„N. „N. „T„‚„p„|„Ž„ˆ„u„r„pF@„L„y„~„u„z„~„„u „y „{„r„p„x„y„|„y„~„u„z„~„„u „…„‚„p„r„~„u„~„y„‘ „„|„|„y„„„„y„‰„u„ƒ„{„€„s„€ „„„y„„p (‘–ì@®)················································· 18|061
„Q. „Y. „L„y„„ˆ„u„‚, „@. „N. „Y„y„‚„‘„u„rF„S„u„€„‚„y„‘ „}„p„‚„„„y„~„s„p„|„€„r (ŸC“c”{”V) 41|277
„E. „R. „L„‘„„y„~F„P„€„|„…„s„‚„…„„„ (ˆäŠÖ´Žu) 14|060
„C. „I. „M„p„‚„‰„…„{F„M„u„„„€„t„ „r„„‰„y„ƒ„|„y„„„u„|„Ž„~„€„z „}„p„„„u„}„p„„„y„{„y (–ì–Ø’B•v) 30|085
„B. „P. „M„p„ƒ„|„x„rF„S„u„€„‚„y„‘ „r„€„x„}„…„Š„u„~„y „z „y„p„ƒ„y„}„„„„€„„„y„‰„u„ƒ„{„y„u „}„u„„„€„t„ @ (‹gì@“Ö)················································· 27|186
„M. „@. „N„p„z„}„p„‚„{F„N„€„‚„}„y„‚„€„r„p„~„~„„u „{„€„|„Ž„ˆ„p (M. A.
NeumarkFƒmƒ‹ƒ€ŠÂ) (ŽO‘ºª—Y) 11|060
„M. „@. „N„p„z„}„p„‚„{F„L„y„~„u„z„~„„u „„‚„u„t„ƒ„„„p„r„|„u„~„y„‘ „s„‚„…„„„ „L„€„‚„u„~„ˆ„p (™‰YŒõ•v) 18|189
„L. „R. „P„€„~„„„‚„‘„s„y„~F„O„q„„{„~„€„r„u„~„~„„u „t„y„†„†„u„‚„u„~„ˆ„y„p„|„Ž„~„„u „…„‚„p„r„~„u„~„y„‘ @ (•“c¬r)················································· 17|121
„A. „@. „R„u„r„p„ƒ„„„Ž„‘„~„€„rF„B„u„„„r„‘„Š„y„u„ƒ„‘ „„‚„€„ˆ„u„ƒ„ƒ„ @@(‰Í’Ã@´) 27|280
„@. „B. „R„{„€„‚„€„‡„€„tF„R„|„…„‰„p„z„~„„u „„‚„€„ˆ„u„ƒ„ƒ„ „ƒ „~„u„x„p„r„y„ƒ„y„}„„}„y „„‚„y„‚„p„Š„u„~„y„‘„}„y @ (ŽR—¢@^)················································· 41|091
„A. „@. „U„…„{„ƒF„S„u„€„‚„y„‘ „p„~„p„|„y„‰„u„ƒ„{„y„‡ „†„…„~„{„ˆ„y„z „}„~„€„s„y„‡ „{„€„}„„|„u„{„ƒ„~„„‡ „„u„‚„u„}„u„~„~„„‡ @@@(ˆê¼@M)················································· 08|246
„I. „Q. „Y„p„†„p„‚„u„r„y„‰‘¼F„@„|„s„u„„‚„p„y„‰„u„ƒ„{„u„„€ „r„u„‚„‡„~„€„ƒ„„„y (”Ñ‚@–Î) 19|057
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1 („@-„C)(ˆê¼@M) 30|374