arXiv:0801.2723 Abstract | arXiv Analytics

arXiv:0801.2723 [math.RT]Abstract References Reviews Resources

On the Tensor Products of Modules for Dihedral 2-Groups

Published 2008-01-17Version 1

Recall that an algebraic module is a KG-module that satisfies a polynomial with integer coefficients, with addition and multiplication given by direct sum and tensor product. In this article we prove that if L is a component of the (stable) Auslander-Reiten quiver for a dihedral 2-group consisting of non-periodic modules, then there is at most one algebraic module on L.

Comments: 11 pages

Categories: math.RT

Subjects: 20C20

Keywords: tensor product, algebraic module, non-periodic modules, direct sum, auslander-reiten quiver

Related articles: Most relevant | Search more

arXiv:0801.2720 [math.RT] (Published 2008-01-17)

Algebraic Modules and the Auslander--Reiten Quiver

David A. Craven

arXiv:math/9810087 [math.RT] (Published 1998-10-14)

Remarks on critical points of phase functions and norms of Bethe vectors

Evgeny Mukhin, Alexander Varchenko

arXiv:1111.5811 [math.RT] (Published 2011-11-24, updated 2014-09-24)

Decomposition of Tensor Products of Modular Irreducible Representations for $SL_3$: the $p \geq 5$ case

C. Bowman, S. R. Doty, S. Martin

arXiv Analytics

arXiv:0801.2723 [math.RT]Abstract References Reviews Resources

On the Tensor Products of Modules for Dihedral 2-Groups

Links

Toolbox

arXiv:0801.2723 [math.RT]AbstractReferencesReviewsResources

On the Tensor Products of Modules for Dihedral 2-Groups

Links

Toolbox

arXiv:0801.2723 [math.RT]Abstract References Reviews Resources