On the Z2-graded codimensions of the Grassmann algebra over a finite field
Abstract
Let E be the infinite dimensional Grassmann algebra over a finite field F of characteristic not 2. In this paper we deal with the homogeneous Z2-gradings of E. In particular, we compute an exact value for the Z2-graded homogeneous codimensions of E, and a lower and an upper bound for the Z2-graded (non-homogeneous) codimensions of E for each of its Z2-homogeneous grading.
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