Algebra endomorphisms and Derivations of Some Localized Down-Up Algebras

Abstract

We study algebra endomorphisms and derivations of some localized down-up algebras . First, we determine all the algebra endomorphisms of under some conditions on r and s. We show that each algebra endomorphism of is an algebra automorphism if rmsn=1 implies m=n=0. When r=s-1=q is not a root of unity, we give a criterion for an algebra endomorphism of to be an algebra automorphism. In either case, we are able to determine the algebra automorphism group for . We also show that each surjective algebra endomorphism of the down-up algebra A(r+s, -rs) is an algebra automorphism in either case. Second, we determine all the derivations of and calculate its first degree Hochschild cohomology group.