Quantum current algebra U(gln[t]): canonical bases, rigidity, and relation with Yangians

Abstract

We introduce a quantum deformation U(gln[t]) of the universal enveloping algebra of the current algebra gln[t], realized as a parabolic subalgebra of quantum affine gln. Unlike the Yangian -- the standard quantization of the current algebra -- our algebra admits a canonical basis. We give a BLM-type realization of U(gln[t]) via certain subalgebras of affine quantum Schur algebras, and then construct canonical bases for the modified quantum current algebra U(gln[t]) and for its finite dimensional irreducible graded modules. Moreover, we prove a rigidity theorem: every finite dimensional polynomial irreducible module for quantum affine gln remains irreducible when restricted to U v(gln[t]) (the specialization of U(gln[t]) at a non-root-of-unity complex number v); conversely, every finite dimensional polynomial irreducible U v(gln[t])-module extends uniquely to a polynomial irreducible module for quantum affine gln. Consequently, the finite dimensional polynomial irreducible modules of U v(gln[t]) are in bijection with those of the Yangian Y(gln). This provides the first example of a quantum current algebra with a well-developed canonical basis theory, providing new combinatorial approaches to the representation theory of current algebras.