The Adams differentials on the e-family

Abstract

The New Doomsday Conjecture (Minami, Amer. J. Math., 1995) states that, for any nonzero Sq0-family, only finitely many terms in this family survive to the E∞-page. On the Adams 1 and 2-line, the conjecture, which corresponds to the Hopf invariant problem and the Kervaire invariant problem, were solved by Adams (Ann. of Math., 1960) and Hill-Hopkins-Ravenel (arXiv:0908.3724), respectively. On the Adams 3-line, Burklund and Xu (arXiv:2302.11869) established a family of nontrivial differentials on the hj3 family, and in particular developed the Burklund-Xu Spectral Sequence, to study the non-triviality of its target on the Adams E2-page. In this paper, we use the Burklund-Xu Spectral Sequence to establish the non-triviality of a product on the Adams 6-line. Combining this with Bruner's formula by Bruner et al. (LNM 1176, 1986), we prove the New Doomsday Conjecture for the e-family on the Adams 4-line.