Gottlieb Groups of Spheres

This chapter published in [20] takes up the systematic study of the Gottlieb groups G n + k ( 𝕊 n ) $$G_{n+k}(\mathbb{S}^{n})$$ of spheres for k ≤ 13 by means of the classical homotopy theory methods. We fully determine the groups G n + k ( 𝕊 n ) $$G_{n+k}(\mathbb{S}^{n})$$ for k ≤ 13 except for the two-primary components in the cases: k = 9 , n = 53 ; k = 11 , n = 115 $$k = 9,n = 53;k = 11,n = 115$$ . Especially, we show that [ ι n , η n 2 σ n + 2 ] = 0 $$[\iota _{n},\eta _{n}^{2}\sigma _{n+2}] = 0$$ if n = 2 i − 7 $$n = 2^{i} - 7$$ for i ≥ 4.