On Nontriviality of a Product in the Classical Adams Spectral Sequence

Linan Zhong; Hao Zhao

doi:10.37256/cm.4420232994

On Nontriviality of a Product in the Classical Adams Spectral Sequence

Authors

Linan Zhong Department of Mathematics, Yanbian University, Yanji, 133002, China
Hao Zhao School of Mathematical Sciences, South China Normal University, Guangzhou, 510631, China

DOI:

https://doi.org/10.37256/cm.4420232994

Keywords:

stable homotopy groups of sphere, Adams spectral sequences, May spectral sequences

Abstract

Let p ≥ 11 be an odd prime and q = 2(p − 1). Suppose that n ≥ 1 with n ≠ 5. Let 0 ≤ s < p − 4 and t = s + 2 + t = s + 2 + (s + 2)p + (s + 3)p² + (s +4)p³ + pⁿ . This paper shows that the product element δ_s+4h₀b_n−1 ∈ Ext_A^s+7,tq+s (Z/p,Z/p) is a nontrivial permanent cycle in the classical Adams spectral sequence, where δ_s₊₄ denotes the 4th Greek letter element.

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Published

2023-11-17

How to Cite

Zhong L, Zhao H. On Nontriviality of a Product in the Classical Adams Spectral Sequence. Contemp. Math. [Internet]. 2023 Nov. 17 [cited 2024 May 11];4(4):995-1013. Available from: https://ojs.wiserpub.com/index.php/CM/article/view/2994

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Issue

Contemporary Mathematics, Volume 4 Issue 4 (2023), 620-1346

Section

Research Article

License

This work is licensed under a Creative Commons Attribution 4.0 International License.