Explicit solutions of certain orientable quadratic equations in free groups

Abstract

For g≥1 denote by F2g= x1, y1,…,xg,yg the free group on 2g generators and by Bg=[x1,y1]…[xg,yg]. For l,c≥ 1 and elements w1,…,wl∈ F2g we study orientable quadratic equations of the form [u1,v1]…[uh,vh]=(Bgw1)c(Bgw2)c…(Bgwl)c with unknowns u1,v1,…,uh,vh and provide explicit solutions for them for the minimal possible number h. In the particular case when g=1, wi=y1i-1 for i=1,…,l and h the minimal number which satisfies h ≥ l(c-1)/2+1 we provide two types of solutions depending on the image of the subgroup H= u1,v1,…,uh,vh generated by the solution under the natural homomorphism p:F2 F2/[F2,F2]: the first solution, which is called a primitive solution, satisfies p(H)=F2/[F2,F2], the second solution satisfies p(H) = p(x1),p(y1l). We also provide an explicit solution of the equation [u1,v1]…[uk, vk] = (B1)k+l (B1y)k-l for k>l≥0 in F2, and prove that if l≠0, then every solution of this equation is primitive. As a geometrical consequence, for every solution we obtain a map f:Sh T from the orientable surface Sh of genus h to the torus T=S1 which has the minimal number of roots among all maps from the homotopy class of f. Depending on the number |p(F2):p(H)| such maps have fundamentally different geometric properties: in some cases they satisfy the Wecken property and in other cases not.