The composition of R. Cohen's elements and the third periodic elements in stable homotopy groups of spheres (Q2046773)

In this paper, the cohomology of the Morava stabilizer algebra \(S(3)\) is re-computeed. Let \(\gamma_s\) be the third periodic homotopy elements, \(\zeta_n\), created by [\textit{R. L. Cohen}, Odd primary infinite families in stable homotopy theory. Providence, RI: American Mathematical Society (AMS) (1981; Zbl 0452.55009)]. As an application of the algebra structure of \(H^*(S(3))\), the elements \(\zeta_n\gamma_s\) are proved to be a nontrivial product in the stable homotopy group of spheres \(\pi_*(S)\), under the assumption \(s\neq 0, \neq \pm 1 \mod p\), and \(n\neq 1\mod 3\), \(n > 1\).