# The Adams differentials on the classes $h_j^3$

**Authors:** Robert Burklund, Zhouli Xu

arXiv: 2302.11869 · 2024-11-12

## TL;DR

This paper establishes new non-trivial differentials on classes in the Adams spectral sequence at filtration 3, using advanced deformations of stable homotopy theory, and confirms a conjecture of Mahowald.

## Contribution

It proves an infinite family of non-trivial $d_4$-differentials on classes $h_j^3$ for $j 
geq 6$, advancing understanding of the Adams spectral sequence.

## Key findings

- Proves non-trivial $d_4$-differentials on $h_j^3$ for $j 
geq 6$
- Shows $h_j^2$ survives to the Adams $E_5$-page
- Shows $h_6^2$ survives to the Adams $E_9$-page

## Abstract

In filtration 1 of the Adams spectral sequence, using secondary cohomology operations, Adams computed the differentials on the classes $h_j$, resolving the Hopf invariant one problem. In Adams filtration 2, using equivariant and chromatic homotopy theory, Hill--Hopkins--Ravenel proved that the classes $h_j^2$ support non-trivial differentials for $j \geq 7$, resolving the celebrated Kervaire invariant one problem. The precise differentials on the classes $h_j^2$ for $j \geq 7$ and the fate of $h_6^2$ remains unknown.   In this paper, in Adams filtration 3, we prove an infinite family of non-trivial $d_4$-differentials on the classes $h_j^3$ for $j \geq 6$, confirming a conjecture of Mahowald. Our proof uses two different deformations of stable homotopy theory -- $\mathbb{C}$-motivic stable homotopy theory and $\mathbb{F}_2$-synthetic homotopy theory -- both in an essential way. Along the way, we also show that $h_j^2$ survives to the Adams $E_5$-page and that $h_6^2$ survives to the Adams $E_9$-page.

## Full text

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## Figures

17 figures with captions in the complete paper: https://tomesphere.com/paper/2302.11869/full.md

## References

40 references — full list in the complete paper: https://tomesphere.com/paper/2302.11869/full.md

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Source: https://tomesphere.com/paper/2302.11869