A Gr\"obner--Shirshov Basis for Nilpotent Rota--Baxter Algebras of Weight Zero

Abstract

We construct an explicit Gr\"obner--Shirshov basis for free associative Rota--Baxter algebras of weight zero with nilpotent operator Rn=0, where n 2. First, we define a monomial order on the standard linear basis RS(X) of the free algebra RAs X and establish fundamental identities for Rota--Baxter operators. For the case n=2, the basis consists of the Rota--Baxter relation R(u)R(v) R(uR(v))+R(R(u)v) and the nilpotency relation R(R(w)) 0. For general n 3, we prove that the Gr\"obner--Shirshov basis is finite and consists of six families of relations (R1)--(R6) derived from resolving all composition ambiguities. Using the Composition-Diamond Lemma, we describe the corresponding irreducible basis Irr(S), which provides normal forms for elements in the quotient algebra. This result gives a complete solution to the word problem for nilpotent Rota--Baxter algebras and establishes their operadic Gr\"obner--Shirshov basis.