Modules of polynomial Rota-Baxter Algebras and matrix equations

Abstract

The all Rota-Baxter algebra structures on the polynomial algebra R= k[x] are well known. We study the finite dimensional modules of polynomial Rota-Baxter algebras ([x],P) or (x k [x],P) of weight nonzero since some cases of weight zero have been studied. The main result shows that every module over the polynomial Rota-Baxter algebra ([x],P) or (x k [x],P) is equivalent to the modules over a plane k x,y / I where I is some ideal of free algebra k x,y . Furthermore, we provide the classification of modules of polynomial Rota-Baxter algebras of weight nonzero through solution to some matrix equation.