Lattice W algebras and quantum groups
Abstract
We represent Feigin's construction [22] of lattice W algebras and give some simple results: lattice Virasoro and W3 algebras. For simplest case g=sl(2) we introduce whole Uq(sl(2)) quantum group on this lattice. We find simplest two-dimensional module as well as exchange relations and define lattice Virasoro algebra as algebra of invariants of Uq(sl(2)). Another generalization is connected with lattice integrals of motion as the invariants of quantum affine group Uq(n+). We show that Volkov's scheme leads to the system of difference equations for the function from non-commutative variables.
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