The Adams differentials on the classes hj3

Abstract

In filtration 1 of the Adams spectral sequence, using secondary cohomology operations, Adams computed the differentials on the classes hj, resolving the Hopf invariant one problem. In Adams filtration 2, using equivariant and chromatic homotopy theory, Hill--Hopkins--Ravenel proved that the classes hj2 support non-trivial differentials for j ≥ 7, resolving the celebrated Kervaire invariant one problem. The precise differentials on the classes hj2 for j ≥ 7 and the fate of h62 remains unknown. In this paper, in Adams filtration 3, we prove an infinite family of non-trivial d4-differentials on the classes hj3 for j ≥ 6, confirming a conjecture of Mahowald. Our proof uses two different deformations of stable homotopy theory -- C-motivic stable homotopy theory and F2-synthetic homotopy theory -- both in an essential way. Along the way, we also show that hj2 survives to the Adams E5-page and that h62 survives to the Adams E9-page.