On the Picard group graded homotopy groups of a finite type two \(K(2)\)-local spectrum at the prime three (Q2670960)

Let \(E(2)\) be the \(3\)-local Johnson-Wilson spectrum with \(E(2)_* = \mathbb Z_{(3)}[v_1,v_2,v_2^{-1}]\) and let \(\mathrm{Pic}(\mathcal L_2)\) be the Picard group of the category of \(E(2)\)-local spectra. \textit{P. Goerss} et al. [J. Topol. 8, No. 1, 267--294 (2015; Zbl 1314.55006)] showed that this Picard group is isomorphic to \(\mathbb Z \oplus \mathbb Z/3 \oplus \mathbb Z/3\). The authors use the latter identification to view homotopy groups of \(E(2)\)-local spectra as being graded over this group. The main results are computations of such \(\mathrm{Pic}(\mathcal L_2)\)-graded homotopy groups of the \(E(2)\)-localization of the Smith--Toda spectrum \(V(1)\) and the cofiber \(V_2\) of the self-map \(\alpha^2\) of the mod-\(3\) Moore spectrum. As explained in Remark 2.7 of the present paper, one consequence of these computations is a correction of earlier results by the authors [JP J. Geom. Topol. 3, No. 3, 257--268 (2003; Zbl 1050.55005)].