On canonical bases of Letzter algebra U(sl2)

Abstract

Let U U (sl2) be Letzter's coideal subalgebra of quantum sl2 corresponding to the symmetric pair (sl2( C), C). As a subalgebra of quantum sl2, U is generated by the sum E + v K F+ K of standard generators, and hence can be identified with the polynomial ring Q(v)[t]. In [BW13] and [LW18], two distinguished bases, called bases, are constructed inside the modified form of U via algebraic and geometric approaches respectively. The modified form of U can be identified with a direct sum of two copies of U Q(v)[t] itself. An explicit and elegant formula, as a polynomial in t, of algebraic basis elements is conjectured in [BW13] and proved in [BeW18]. The purpose of this short paper is to show that the geometric basis in [LW18] admits the same description and, consequently, that the two bases coincide.