Constructing metrics on a $2$-torus with a partially prescribed stable norm (1010.1265v1)

Abstract: A result of Bangert states that the stable norm associated to any Riemannian metric on the $2$-torus $T^2$ is strictly convex. We demonstrate that the space of stable norms associated to metrics on $T^2$ forms a proper dense subset of the space of strictly convex norms on $\R^2$. In particular, given a strictly convex norm $\Norm_\infty$ on $\R^2$ we construct a sequence $<\Norm_j >{j=1}^{\infty}$ of stable norms that converge to $\Norm\infty$ in the topology of compact convergence and have the property that for each $r > 0$ there is an $N \equiv N(r)$ such that $\Norm_j$ agrees with $\Norm_\infty$ on $\Z^2 \cap {(a,b) : a^2 + b^2 \leq r }$ for all $j \geq N$. Using this result, we are able to derive results on multiplicities which arise in the minimum length spectrum of $2$-tori and in the simple length spectrum of hyperbolic tori.