简介:InthisworkcommutativeArchimedeanfinitelygeneratedsemigroupsarecharacterizedintermsofidealextensions.
简介:让R是一枚任意的有限可交换的本地戒指。在这份报纸,我们在是多项式功能的R上为功能获得一个必要、足够的条件。在这份报纸前,为是一个多项式的功能的必要、足够的条件在一些特殊有限可交换的本地戒指上工作被获得。关键词多项式功能-有限可交换的本地戒指-概括Witt多项式先生(2000)题目分类12E10这个工作被NSFC(号码10128103)支持
简介:SomeresultsonRaRbtransformationofcompoundfiniteautomataoverfinitefieldaregeneralizedtothecaseofcommutativerings.PropertiesofRaRbtransformationarediscussedandappliedtotheinversionproblemforcompoundfiniteautomata.
简介:让G是混合p的Warfield可换群和F字符F=p的一块地别等于0。如果为任何组H组代数学FH和FG是F同形的,它被证明那,那么他的对G同形。这个演讲扩大G是p本地的WarfieldAbelian并且在Proc出版的说服的W.5月的结果。Amer。数学。Soc。(1988)。
简介:Letfandgbedistributionsandletg_n=(g*δ_n)(x),whereδ_n(x)isacertainsequenceconvergingtotheDiracdeltafunction.Thenon-commutativeneutrixproductfogoffandgisdefinedtobethelimitofthesequence{fg_n},provideditslimithexistsinthesensethat
简介:Non-commutativePoissonalgebrasarethealgebrashavingbothanassociativealgebrastructureandaLiealgebrastructuretogetherwiththeLeibnizlaw.Inthispaper,thenon-commutativepoissonalgebrastructuresontheLiealgebrassln(Cq)aredetermined.
FINITELY GENERATED COMMUTATIVE ARCHIMEDEAN SEMIGROUPS
On Polynomial Functions over Finite Commutative Rings
RaRb Transformation of Compound Finite Automata over Commutative Rings
Isomorphic Commutative Group Algebras of p-Mixed Warfield Groups
On the Non-Commutative Neutrix Product of the Distributions x+^λ and x^+μ
NON-COMMUTATIVE POISSON ALGEBRA STRUCTURES ON LIE ALGEBRA sln(Cq^-) WITH NULLITY M