A note on the hit problem for the polynomial algebra in the case of odd primes and its application

Abstract

Let Ph = Fp[t1,…,th] be the polynomial algebra over Fp (p prime). We consider the hit problem: finding a minimal generating set for Ph as a module over the mod p Steenrod algebra Ap, or equivalently, determining a basis for Fp Ap Ph. This problem is related to the Ap-module structure of H*(V; Fp) (V) Ph, where V is an elementary abelian p-group of rank h. Information about the hit problem aids in studying the Singer algebraic transfer TrhAp, a homomorphism from GL(h, Fp)-coinvariants related to H*(V; Fp) to ExtAph,h+*(Fp, Fp), which helps analyze Ext groups. This work studies Ap-generators for Ph when p is an odd prime. As an application, we investigate the third algebraic transfer (h=3) in certain generic degrees. Our main result shows that this transfer is an isomorphism in these degrees.

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