Short homology bases for hyperelliptic hyperbolic surfaces

Abstract

Given a hyperelliptic hyperbolic surface S of genus g ≥ 2, we find bounds on the lengths of homologically independent loops on S. As a consequence, we show that for any λ ∈ (0,1) there exists a constant N(λ) such that every such surface has at least λ · 23 g homologically independent loops of length at most N(λ), extending the result in [Mu] and [BPS]. This allows us to extend the constant upper bound obtained in [Mu] on the minimal length of non-zero period lattice vectors of hyperelliptic Riemann surfaces to almost 23 g linearly independent vectors.