On the dimension of H*(( Z2)× t, Z2) as a module over Steenrod ring

Abstract

We write P for the polynomial algebra in one variable over the finite field Z2 and P t = Z2[x1, …, xt] for its t-fold tensor product with itself. We grade P t by assigning degree 1 to each generator. We are interested in determining a minimal set of generators for the ring of invariants ( P t)Gt as a module over Steenrod ring, A2. Here Gt is a subgroup of the general linear group GL(t, Z2). An equivalent problem is to find a monomial basis of the space of "unhit" elements, Z2 A2 ( P t)Gt in each t and degree n≥ 0. The structure of this tensor product is proved surprisingly difficult and has been not yet known for t≥ 5, even for the trivial subgroup Gt = \e\. In the present paper, we consider the subgroup Gt = \e\ for t ∈ \5, 6\, and obtain some new results on A2-generators of ( P t)Gt in some degrees. At the same time, some of their applications have been proposed. We also provide an algorithm in MAGMA for verifying the results. This study can be understood as a continuation of our recent works in [23, 25].

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