Identidades polinomiais para o produto tensorial de PI-álgebras.

Abstract

In this dissertation we study polynomial identities for the tensor product of two algebras. Based on the growth of the PI-algebra’s codimensions sequence, originally studied by Regev in 1972, we present a proof that the tensor product of two PI-algebras is still a PI-algebra. After this, using the Kronecker product of characters and the classic Amitsur and Regev Hook Theorem, we obtained relations between the codimensions and cocharacters of two PI-algebras and the codimensions and cocharacters of their tensor product. With the study of codimensions and cocharacters, we also exhibit polynomial identities for the tensor product.