Jategaonkar A.V. — Localization in Noetherian Rings :: Электронная библиотека попечительского совета мехмата МГУ

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Jategaonkar A.V. — Localization in Noetherian Rings

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Название: Localization in Noetherian Rings

Автор: Jategaonkar A.V.

Аннотация:

This monograph first published in 1986 is a reasonably self-contained account of a large part of the theory of non-commutative Noetherian rings.

Язык:

Рубрика: Математика/

Статус предметного указателя: Готов указатель с номерами страниц

ed2k: ed2k stats

Год издания: 1986

Количество страниц: 323

Добавлена в каталог: 20.11.2009

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

Предметный указатель

Prime ideals, equivalent      135
Prime ideals, incomparable      105 156
Prime radical      62 69
Prime radical of an ideal      69
Prime ring      xi
Prime rings, equivalent      124ff.
Prime spectrum      xi
Principal ideal ring      21 50
Property AR      8ff.
Pseudo — Dedekind ring      289 296
Quasi-local ring      72
Quotient module      8
Quotient ring      2 33
Quotient ring, Artinian      33 211ff.
Quotient ring, total      33
Quotient ring, universal property of      5
Quotient skew field      7
Radical, Artin      131
Radical, Jacobson      72
Radical, nil      62 212ff.
Radical, prime      62 69
Reflexive ideal      210
Regular element      3
Regular set      3
Reversible set      3 6
Right ideal, annihilator      6
Right ideal, bounded      29 3
Right ideal, fractional      2 76
Right ideal, semi-maximal      29 3
Ring      xi
Ring, AR      84 140ff. 225
Ring, AR separated      224
Ring, Artin quotient      33 211ff.
Ring, Artin radical of      131
Ring, centrally separated      225 263ff.
Ring, classical Krull dimension of      230 238
Ring, classical localization of      78 188
Ring, classical semi-local      78
Ring, classically fully semi-primary      244
Ring, Dedekind      2 89
Ring, density condition for      176 183
Ring, extension of      16
Ring, FBN      162 171 199 2 36ff. 268ff.
Ring, finite dimensional      36 37

Ring, finite extension of      16
Ring, fully classical      205 245
Ring, fully semi-primary      241ff. 247
Ring, generalized matrix      17 61 122 212 249
Ring, Goldie      37
Ring, graph of      136
Ring, heart of      133
Ring, hereditary      144
Ring, HNP      2 75ff.
Ring, intersection condition for      190 191 194 200
Ring, irreducible      242
Ring, Jacobson radical of      72
Ring, Krull dimension of      234ff. 269ff.
Ring, local      72
Ring, locally finite      171
Ring, normally separated      225
Ring, partially localizable      217 229
Ring, torsion      10 39 59 67
S-primary module      105
sparse      160 198
Stable      136 144ff. 190—193
Strong second layer condition for      220 226 251
Symbolic powers      216
Tame module      115 151 251ff.
Torsion (sub)module      10 39 59 67
Torsion class      9ff.
Torsion class defined by      11 39 67
Torsionfree module      10 39 59 6 7
Torsionfree top      165
Total quotient ring      33
Totally unfaithful module      223
Totally unfaithful module, bounded      167 199
Totally unfaithful module, uniform dimension      42 96
Trivial extension      19
Trivial link      135 141 2 06 2 4 4
Uniform module      42 104
Uniserial module      2 82
Universal property of quotient, ring      5
Unmixed semi-prime ideal      207
Unpleasant injective      2 84 2 87
Weakly essential subdirect sum      102 105
Weakly sparse      197ff.
Weakly sparse of bounded uniform dimension      167 199
Wild module      115 151 251ff.

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