A note on the Greek letter elements of the homotopy of the Ln-local spheres

Abstract

Let BP denote the Brown-Peterson spectrum at a prime p, whose homotopy groups are isomorphic to the polynomial algebra generated by elements vi's for i 1. We consider the homotopy groups of the vn-1BP-localized sphere spectrum LnS0 with n2 2p-1, and show that the groups contain the n-th Greek letter family. For the proof of this, we further show the existence of the vn-1BP-localized Smith-Toda spectrum Wn for the case n2 2p-1. If the Smith-Toda spectrum V(n-1) exists, then LnV(n-1) is an example of Wn. Previously, Wn is shown to exist if n2+n 2p-1. We also consider the case where (p,n)=(7,4), and show the existence of the delta family in π*(L4S0).