Quadratic differentials and function theory on Riemann surfaces
Abstract
A finite-area holomorphic quadratic differentials on an arbitrary Riemann surface is uniquely determined by its horizontal measured foliation. By extending our prior result for of the first kind to arbitrary Fuchsian group , we obtain that a measured foliation is realized by the horizontal foliation of a finite-area holomorphic quadratic differential on if and only if has finite Dirichlet integral. We determine the image of this correspondence when the infinite Riemann surface has bounded geometry -- an extension of the realization result of Hubbard and Masur for compact surfaces. A corollary is that a planar surface with bounded pants decomposition and with (at most) countably many ends is parabolic, i.e., does not support Green's function, in notation where is Green's function. The class of harmonic functions with finite Dirichlet integral is denoted by . We give a geometric proof that the class of the Riemann surfaces (that do not support non-constant -functions) is invariant under quasiconformal maps. Lyons proved that the class (surfaces that do not support non-constant bounded harmonic functions) is not invariant under quasiconformal maps, and it is well-known that the class is invariant. Therefore, the noninvariant class is between two invariant classes: .
Keywords
Cite
@article{arxiv.2407.16333,
title = {Quadratic differentials and function theory on Riemann surfaces},
author = {Dragomir Saric},
journal= {arXiv preprint arXiv:2407.16333},
year = {2024}
}
Comments
51 pages, 18 figures