Title: Hurewicz images in BP and related homology theories
Author: Victor Snaith
AMS MOS classification: 55Q45
address: Faculty of Mathemtical Studies, University of Southampton,
Southampton SO17 1BJ, England
e-address: vps@maths.soton.ac.uk
In this paper $BP$-theory is used to give a proof that there
exists a stable homotopy element in
$\pi_{2^{n+1} - 2}^{S}( {\bf R}P^{\infty})$ with non-zero
Hurewicz image in $ju$-theory if and only if there exists
an element of $\pi_{2^{n+1} - 2}^{S}( S^{0})$ which is
represented by a framed manifold of Arf invariant one.