Let be a subring of the rationals. We want to investigate self splitting -modules (that is . Following Schultz, we call such modules splitters. Free modules and torsion-free cotorsion modules are classical examples of splitters. Are there others? Answering an open problem posed by Schultz, we will show that there are more splitters, in fact we are able to prescribe their endomorphism -algebras with a free -module structure. As a by-product we are able to solve a problem of Salce, showing that all rational cotorsion theories have enough injectives and enough projectives. This is also basic for answering the flat-cover-conjecture.
We show that, if is a representation-finite iterated tilted algebra of euclidean type , then there exist a sequence of algebras , and a sequence of modules , where , such that each is an APR-tilting -module, or an APR-cotilting -module, and is tilted representation-finite.
Let , be finite-dimensional Lie algebras over a field of characteristic zero. Regard and , the dual Lie coalgebra of , as Lie bialgebras with zero cobracket and zero bracket, respectively. Suppose that a matched pair of Lie bialgebras is given, which has structure maps . Then it induces a matched pair of Hopf algebras, where is the universal envelope of and is the Hopf dual of . We show that the group of cleft Hopf algebra extensions associated with is naturally isomorphic to the group of Lie bialgebra extensions associated with . An exact sequence involving either of these groups is obtained, which is a variation of the exact sequence due to G.I. Kac. If , there follows a bijection between the set of all cleft Hopf algebra extensions of by and the set of all Lie bialgebra extensions of by .
Let be a connected finite dimensional -algebra, and let be a nonzero decomposable -module such that the one-point extension is quasitilted. We show here that every nonzero indecomposable direct summand of is directing and is a tilted algebra.
In this paper, we investigate the structure of Ariki–Koikealgebras and their Specht modules using Gröbner–Shirshovbasis theory and combinatorics of Young tableaux. For a multipartition, we find a presentation of the Specht module S given by generatorsand relations, and determine its Gröbner–Shirshovpair. As a consequence, we obtain a linear basis of S consistingof standard monomials with respect to the Gröbner–Shirshovpair. We show that this monomial basis can be canonically identifiedwith the set of cozy tableaux of shape . 2000 Mathematics SubjectClassification 16Gxx, 05Exx. 相似文献
We classify all the quasifinite highest-weight modules over the central extension of the Lie algebra of matrix quantum pseudo-differential operators, and obtain them in terms of representation theory of the Lie algebra
(, Rm) of infinite matrices with only finitely many nonzero diagonals over the algebra Rm =
[t]/(tm+1). We also classify the unitary ones. 相似文献
We show that over polynomial extensions of normal affine domains of dimension two over perfect fields (char. 2) of cohomological dimension 1, all finitely generated projective modules are cancellative, thus answering a question of Weibel affirmatively in the case of polynomial extensions. 相似文献
