I got this homework problem: $X,Y$ finite CW-complexes with $\dim X=m$ and $Y$ is $n$-connected.
Prove that $\pi_k(map(X,Y))=0$ for all $k \le n-m$.
Thanks for the help!
I got this homework problem: $X,Y$ finite CW-complexes with $\dim X=m$ and $Y$ is $n$-connected.
Prove that $\pi_k(map(X,Y))=0$ for all $k \le n-m$.
Thanks for the help!