Stack Exchange network consists of 183 Q&A communities including Stack Overflow, the largest, most trusted online community for developers to learn, share their knowledge, and build their careers.
$[\nu_4,\iota_4]=?$, where $\nu_4$ is the Hopf map in $\pi_7(S^4)$ and $\iota_4$ is the generator of $\pi_4(S^4)$ which representrepresents the identity map, $[-,-]$ is whiteheadthe Whitehead product.
$[\nu_4,\iota_4]=?$, where $\nu_4$ is the Hopf map in $\pi_7(S^4)$ and $\iota_4$ is the generator of $\pi_4(S^4)$ which represent the identity map, $[-,-]$ is whitehead product.
$[\nu_4,\iota_4]=?$, where $\nu_4$ is the Hopf map in $\pi_7(S^4)$ and $\iota_4$ is the generator of $\pi_4(S^4)$ which represents the identity map, $[-,-]$ is the Whitehead product.
[v_4 $[\nu_4,l_4]=\iota_4]=?$, v_4$\nu_4$ is the Hopf map in \pi_7$\pi_7(S^4)$ and l_4$\iota_4$ is the generator of \pi_4$\pi_4(S^4)$
$[v_4,l_4]=$?$[\nu_4,\iota_4]=?$, where $v_4$$\nu_4$ is the Hopf map in $\pi_7(S^4)$ and $l_4$$\iota_4$ is the generator of $\pi_4(S^4)$ which represent the identity map, $[,]$$[-,-]$ is whitehead product.
[v_4,l_4]=?, v_4 is the Hopf map in \pi_7(S^4) and l_4 is the generator of \pi_4(S^4)
$[v_4,l_4]=$?, where $v_4$ is the Hopf map in $\pi_7(S^4)$ and $l_4$ is the generator of $\pi_4(S^4)$ which represent the identity map, $[,]$ is whitehead product.
$[\nu_4,\iota_4]=?$, $\nu_4$ is the Hopf map in $\pi_7(S^4)$ and $\iota_4$ is the generator of $\pi_4(S^4)$
$[\nu_4,\iota_4]=?$, where $\nu_4$ is the Hopf map in $\pi_7(S^4)$ and $\iota_4$ is the generator of $\pi_4(S^4)$ which represent the identity map, $[-,-]$ is whitehead product.
[v_4,l_4]=$[v_4,l_4]=$?, where v_4$v_4$ is the Hopf map in \pi_7(S^4)$\pi_7(S^4)$ and l_4$l_4$ is the generator of \pi_4(S^4)$\pi_4(S^4)$ which represent the identity map, [,]$[,]$ is whitehead product.
[v_4,l_4]=?, where v_4 is the Hopf map in \pi_7(S^4) and l_4 is the generator of \pi_4(S^4) which represent the identity map, [,] is whitehead product.
$[v_4,l_4]=$?, where $v_4$ is the Hopf map in $\pi_7(S^4)$ and $l_4$ is the generator of $\pi_4(S^4)$ which represent the identity map,$[,]$ is whitehead product.
