Matsusaka T. — Theory of Q-varietties :: Электронная библиотека попечительского совета мехмата МГУ

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Matsusaka T. — Theory of Q-varietties

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Название: Theory of Q-varietties

Автор: Matsusaka T.

Язык:

Рубрика: Наука/

Статус предметного указателя: Готов указатель с номерами страниц

ed2k: ed2k stats

Год издания: 1964

Количество страниц: 158

Добавлена в каталог: 22.11.2009

Операции: Положить на полку | Скопировать ссылку для форума | Скопировать ID

Предметный указатель

-regular point      II § 19
-regular subvariety      II § 28; §4 77
(resp. ) is defined along      III § 59;
(resp. ) is regular along      III § 59.
is defined at      III § 52; § 82
is Regular at      III § 59; § 82
Abstract Q-manifold      III §4 68
Algebraic projection      V § 118
Automorphism      III § 84
Axiom ( $S_{1}$ )      III §5 87;
Axiom ( $S_{2}$ )      III §5 87;
Axiom ( $S_{3}$ )      III §5 87;
Axiom ( $S_{4}$ )      III §5 87
Axiom (A)      I §2 12
Axiom (B)      I § 12
Axiom (C)      I § 12
Axiom (D)      I § 12
Axiom (E)      I §2 12
Axiom for Q-submanifolds      III § 87
Axiom for Q-varieties      I § 12
Axiom(A)      I §2 12
Axiom(B)      I §2
Axiom(C)      I § 12
Axiom(D)      I § 12
Axiom(E)      I §2 12
Axiom(S2)      III §5 87
Axiom(S3)      III §5 87
Axiom(S4)      III §5 87
Axiom(Si)      III §5 87
Axiomfor Q-submanifolds      III § 87
Birational correspondence      III §3 59; §4 82
Birational map      III § 59; § 82
Biregular at (along)      III § 59;III § 84
Biregularly corresponding points      III § 60
Closed      II § 42; § 80
Coherent set of birational maps (correspondences)      III § 68
complete      III § 83
Complete over      III § III §
Component      II §6 42; §4
conjugate      II § 36; §
Counter image      IV § 98
Covering set      II § 31
CYCLE      V § 112
Equivalence pair      I § 11;
Field of rationality of a cycle      V §2 117
Field of rationality of a Q-submanifold      III § 87
Field of rationality of a Q-variety      II § 19

Field of rationality of a subvariety      II § 28; § 77
Field of rationality of an abstract Q-manifold      III § 68
Field of rationality of an equivalence pair      I § 12
Generic specialization      II § 23; § 74
Graph of a birational map      III § 60
Graph of a rational map      III §2 60
Intersection-multiplicity      IV §2 108; § 116
Isomorphism      III § 84
Locus over a field      II § 28
MAP      III § 59; § 83
Map is defined at      III § 59
Map is regular at      III §2 59
Morphism      III § 59; § 83
No excess      I § 3; § 136
Open set      II § 42; § 80
Order of inseparability      II § 48; § 81
p-regular point      II § 19
p-regular subvariety      II § 28; §4 77
Point      II §1 19; §4 68
Primitive chain (cycle)      I § 4
PRODUCT      II § 37; § 69
Projection      II §5 40; §4 80
Projection is defined at      III §2 52
Projection is regular at      III § 52
Proper component      III §1 50; § 82
Pseudo-point      II § 23
Q-manifold      II §1 19
Q-submanifold      III §5 88
Q-submanifold, attached to      III § 87
Q-variety      II § 19
Rational correspondence      III § 52; § 82
Regular point      II § 19
Regular subvariety      II § 28
Representative      III §4 68; § 79
Semi-primitive chain (cycle)      I § 4
Semi-proper component      III § 50
Specialization      II §2 22; § 74
Subvariety      III § 77
Subvariety determined by      II § 28; § 77
Support      V § 115; § 136
U (resp. g) is defined along      III § 59;
U (resp. g) is regular along      III § 59
U is defined at      III § 52; § 82
U is regular at      III § 59; § 82
Unmixed equivalence pair      I § 12
Without excess      I § 3; § 136
Zariski-topology      II § 45; § 81

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