On the Hurewicz homomorphism on the extensions of ideals in π*s and spherical classes in H*Q0S0

Abstract

This is about Curtis conjecture on the image of the Hurewicz map h:2π*Q0S0 H*(Q0S0;/2). First, we show that if f∈2π*s is of Adams filtration at least 3 with h(f)≠ 0 then f is not a decomposable element in 2π*s. Moreover, it is shown if k is the least positive integer that f is represented by a cycle in Extk,k+nA(/2,/2), then (i) if e*h(f)≠ 0 then n≥slant 2k-1; (ii) if e*h(f)=0 then n≥slant 2k-2t for some t>1. Second, for S⊂eq2π*>0s we show that: (i) if the conjecture holds on S, then it holds on S; (ii) if h(S)=0 then h acts trivially on any extension of S obtained by applying homotopy operations arising from 2π*DrSn with n>0. We also provide partial results on the extensions of S by taking (possible) Toda brackets of its elements. We also discuss how the EHP-sequence information maybe applied to eliminate classes from being spherical.