The Hopf algebra $Rep U_q \hat{gl}_\infty$
摘要
We define the Hopf algebra structure on the Grothendieck group of finite-dimensional polynomial representations of in the limit . The resulting Hopf algebra is a tensor product of its Hopf subalgebras , . When is generic (resp., is a primitive root of unity of order ), we construct an isomorphism between the Hopf algebra and the algebra of regular functions on the prounipotent proalgebraic group (resp., ). When is a root of unity, this isomorphism identifies the Hopf subalgebra of spanned by the modules obtained by pullback with respect to the Frobenius homomorphism with the algebra generated by the coefficients of the determinant of an element of . This gives us an explicit formula for the Frobenius pullbacks of the fundamental representations. In addition, we construct a natural action of the Hall algebra associated to the infinite linear quiver (resp., the cyclic quiver with vertices) on and describe the span of the tensor products of the evaluation representations taken at fixed points as a module over this Hall algebra.
引用
@article{arxiv.math/0103126,
title = {The Hopf algebra $Rep U_q \hat{gl}_\infty$},
author = {Edward Frenkel and Evgeny Mukhin},
journal= {arXiv preprint arXiv:math/0103126},
year = {2007}
}
备注
Latex, 85 pages. Substantial changes made; all results are now formulated over the ring of integers. Final version to appear in Selecta Mathematica