St. Petersburg Mathematical Journal, 13. cilt,1-507. sayfalarAmerican Mathematical Society, 2002 |
Kitabın içinden
48 sonuçtan 1-3 arası sonuçlar
Sayfa 168
... exact and preserves direct sums . Proof . First , we prove the exactness of T ' . Obviously , the functor T ' = ( - ) sT , where ( - ) s is the corresponding localizing functor , is left exact , so that it suffices to check that T ...
... exact and preserves direct sums . Proof . First , we prove the exactness of T ' . Obviously , the functor T ' = ( - ) sT , where ( - ) s is the corresponding localizing functor , is left exact , so that it suffices to check that T ...
Sayfa 176
... exact sequence ( 5.1 ) 0 ABC → 0 → in C / S is also exact in C. Suppose P € C is projective ; then we have the commutative diagram ( P , 3 ) 0 c ( P , A ) c ( P , B ) c ( P , C ) 1 0 - c / s ( Ps , A ) c / s ( Ps , B ) c / s ( Ps , C ) ...
... exact sequence ( 5.1 ) 0 ABC → 0 → in C / S is also exact in C. Suppose P € C is projective ; then we have the commutative diagram ( P , 3 ) 0 c ( P , A ) c ( P , B ) c ( P , C ) 1 0 - c / s ( Ps , A ) c / s ( Ps , B ) c / s ( Ps , C ) ...
Sayfa 186
... exact sequence 0 - L " M → N 0 in a locally finitely presented Grothendieck category C is said to be pure - exact if the sequence 0 - c ( X , L ) - - c ( X , M ) c ( X , N ) → 0 · is exact for all X Є fpC . In this case , μ is called ...
... exact sequence 0 - L " M → N 0 in a locally finitely presented Grothendieck category C is said to be pure - exact if the sequence 0 - c ( X , L ) - - c ( X , M ) c ( X , N ) → 0 · is exact for all X Є fpC . In this case , μ is called ...
İçindekiler
Башкиров Е Л Группа Sping и некоторые подгруппы унитарной | 43 |
Васюнин В Купин С Критерии подобия диссипативного инте | 65 |
Вебер К Пажитнов А Рудолф Л Число МорсаНовикова для | 105 |
Telif Hakkı | |
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a₁ Abelian algebra analytic arbitrary assume basis boundary bounded codes coefficients coherent condition consider Corollary corresponding defined definition denote direct limit domain elements English transl epimorphism equation equivalent estimate exact sequence finitely presented formula FP-injective free Lie function functor graph G Grothendieck category homomorphism implies inequality integral isomorphism K₁ K₁v Km F Lemma Lie superalgebra linear localizing subcategory Lyapunov dimension Math Mathematics Subject Classification Matn,s Fq metric module monomorphism morphism Morse function Newton diagram norm obtain operator orthogonal P₁ polynomial polytope problem proof of Theorem properties Proposition proved quotient category rectangles relation respect result right A-module ring S-ring S₁ satisfies selfadjoint Serre subcategory singular point solution space statement subgroup Subsection subspaces Suppose Theorem 1.1 theory topology v₁ vector field vertex vertices