Parabolicity of zero-twist tight flute surfaces and uniformization of the Loch Ness monster

Abstract

We study the zero-twist flute surface and we associate to each one of them a sequence of positive real numbers x=(xn)n∈N0, with a torsion-free Fuchsian group x such that the convex core of H2/x is isometric to a zero-twist tight flute surface Sx. Moreover, we prove that the Fuchsian group x is of the first kind if and only if the series Σ xn diverges. As consequence of the recent work of Basmajian, Hakobian and Sari\'c, we obtain that the zero-twist flute surface Sx is of parabolic type if and only Σ xn diverges. In addition, we present an uncountable family of hyperbolic surfaces homeomorphic to the Loch Ness Monster. More precisely, we associate to each sequence y=(yn)n∈Z, where yn=(an,bn,cn,dn,en)∈ R5 and an≤ bn ≤ cn ≤ dn ≤ en ≤ an+1, a Fuchsian group Gy such that H2/Gy is homeomorphic to the Loch Ness Monster.