English

The Hopf algebra $Rep U_q \hat{gl}_\infty$

Quantum Algebra 2007-05-23 v4

Abstract

We define the Hopf algebra structure on the Grothendieck group of finite-dimensional polynomial representations of Uqgl^NU_q \hat{gl}_N in the limit NN \to \infty. The resulting Hopf algebra RepUqgl^Rep U_q \hat{gl}_\infty is a tensor product of its Hopf subalgebras RepaUqgl^Rep_a U_q \hat{gl}_\infty, a\C×/q2Za\in\C^\times/q^{2\Z}. When qq is generic (resp., q2q^2 is a primitive root of unity of order ll), we construct an isomorphism between the Hopf algebra RepaUqgl^Rep_a U_q \hat{gl}_\infty and the algebra of regular functions on the prounipotent proalgebraic group SLSL_\infty^- (resp., GL~l\tilde{GL}_l^-). When qq is a root of unity, this isomorphism identifies the Hopf subalgebra of RepaUqgl^Rep_a U_q \hat{gl}_\infty 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 GL~l\tilde{GL}_l^-. 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 ll vertices) on RepaUqgl^inftyRep_a U_q \hat{gl}_infty and describe the span of the tensor products of the evaluation representations taken at fixed points as a module over this Hall algebra.

Keywords

Cite

@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}
}

Comments

Latex, 85 pages. Substantial changes made; all results are now formulated over the ring of integers. Final version to appear in Selecta Mathematica