Let $G$ be a group. Let $\Bbbk$ be a field of char. $0$. We denote with $C^{n}(G, \Bbbk)$ the set of maps $f\: : \: G^{n}\to \Bbbk$ and with $\partial_{G}\: : \: C^{n-1}(G, \Bbbk)\to C^{n}(G, \Bbbk)$ the differential $$\partial_{G}f(g_{1},\ldots,g_n)=f(g_{2},\ldots,g_n)+\sum_{1\leq j\leq n-1}(-1)^{j-1}f(g_1,\ldots,{g_j}{g_{j+1}},\ldots,g_n)+(-1)^{n}f(g_{1},\ldots,g_{n-1})$$ We denote the cohomology of such a complex with $H(G, \Bbbk)$. It is the cohomology of $G$ with coefficients in $\Bbbk$. Let $F_{2}$ be the free group on two generators $a_{1}$, $a_{2}$. It is well know that $$H^{n}(F_{2}, \Bbbk)=\begin{cases} \Bbbk, & n=0,\\ \Bbbk^{2}, & n=1\\ 0, & n>1 \end{cases}$$ In particular $H^{1}$ is generated by two group homomorphism $f_{i}\: : \: G\to \Bbbk$ for $i=1,2$ defined by $$ f_{i}(a_{j}):=\delta_{ij}. $$ Consider the maps $F\: : \: F_{2}^{2}\to \Bbbk$ defined by $F(a,b):=f_{1}(a)f_{2}(b)$. In the language of simplicial set, this is the Alexander-Whitney product of $f_{1},f_{2}$. Here my questions:
1) $F$ is closed, hence it is exakt, do you know an explicit coboundary?
2)I am interested to the following: Let $F_{n}$ be the free group on $n$ generators. Analogously we have $H^{n}(F_{n}, \Bbbk)=0$ for $n>1$. Let $F\: : \: F_{n}^{2}\to \Bbbk$ be a closed element. Is there some general formula for a $f\in C^{1}(F_{n}, \Bbbk)$ such that $\partial_{G}f=F$?
