On the extension problems for three 33-stem homotopy groups

Abstract

This paper tackles the extension problems for three far-unsatble homotopy groups π39(S6), π40(S7), and π41(S8) localized at 2, the puzzles having remained unsolved for forty-five years. By a Toda bracket indexed by 1 included in π39(S6(2)), which makes better use of the deuspension property of homotopy classes, we address the problems. As a corollary, through Thomeier's 8-step backward theorem of the metastable homotopy theory, together with the results of Oda, Mukai and Miyauchi, we show a table of the 33-stem homotopy groups π33+n(Sn(2)), (2≤ n≤ 9, n≥27).