On the homotopy groups of E(n)-local spectra with unusual invariant ideals

Abstract

Let E(n) and T(m) for nonnegative integers n and m denote the Johnson-Wilson and the Ravenel spectra, respectively. Given a spectrum whose E(n)*-homology is E(n)*(T(m))/(v1,...,vn-1), then each homotopy group of it estimates the order of each homotopy group of LnT(m). We here study the E(n)-based Adams E2-term of it and present that the determination of the E2-term is unexpectedly complex for odd prime case. At the prime two, we determine the Einfty-term for pi*(L2T(1)/(v1)), whose computation is easier than that of pi*(L2T(1)) as we expect.