English

An in-Depth Look at Quotient Modules

Quantum Algebra 2017-10-11 v5 Representation Theory

Abstract

The coset GG-space of a finite group and a subgroup is a fundamental module of study of Schur and others around 1930; for example, its endomorphism algebra is a Hecke algebra of double cosets. We study and review its generalization QQ to Hopf subalgebras, especially the tensor powers and similarity as modules over a Hopf algebra, or what's the same, Morita equivalence of the endomorphism algebras. We prove that QQ has a nonzero integral if and only if the modular function restricts to the modular function of the Hopf subalgebra. We also study and organize knowledge of QQ and its tensor powers in terms of annihilator ideals, sigma categories, trace ideals, Burnside ring formulas, and when considering semisimple Hopf algebras, the depth of QQ in terms of the McKay quiver and the Green ring.

Keywords

Cite

@article{arxiv.1705.06613,
  title  = {An in-Depth Look at Quotient Modules},
  author = {Lars Kadison},
  journal= {arXiv preprint arXiv:1705.06613},
  year   = {2017}
}

Comments

26 pages, two pages of new remarks on finite type algebra extensions in Section 2, induced algebras and separable equivalence in Section 4, with additional references

R2 v1 2026-06-22T19:51:24.298Z