Let $G$ be a finitely generated abelian group (written additively), let $\langle \cdot,\cdot\rangle\colon G\times G\to \mathbb Z$ be a bilinear form and let $\sigma\colon G\rightarrow G$ be an automorphism satisfying $\langle g,h\rangle=-\langle h,\sigma(g)\rangle$ for all $g, h \in G$. I unfortunately was unable to prove the following:
If $\varphi\colon G\rightarrow \operatorname{Hom}_{\mathbb{Z}}(G,\mathbb{Z})\colon g \mapsto \langle g,\cdot\rangle$ is an isomorphism, then $G$ has no torsion.
I would be thankful for any ideas.