SOUSA, F. L.; http://lattes.cnpq.br/0940431391196000; SOUSA, Franciélia Limeira de.
Abstract:
Let K be a field of characterist 0. In this work we describe a basis for the graded
identities of the Lie algebra slp(K) with the Pauli grading, where p is prime number.
Moreover, we compute their graded codimensions and show that the variety
varZp×Zp(slp(K)) is minimal and satisfies the Specht property. We also describe a
basis for the graded identities for the Lie algebra slm(K) with the Cartan grading
by the group ℤm−1 and exibit a basis of the corresponding relatively free graded
Lie algebra as vector space. As a corollary, we compute the graded codimensions
for m=2 and provide a basis for the graded identities of certain Lie subalgebras
of Mm(K)(−) with the Cartan grading.