Top terms of polynomial traces in Kra's plumbing construction

TL;DR

This paper derives a formula linking the top term coefficients of polynomial traces in Kra's plumbing construction to Dehn-Thurston coordinates, aiding the understanding of pleating rays in the Maskit embedding.

Contribution

It generalizes previous results to surfaces with arbitrary negative Euler characteristic, providing a simple linear relation between polynomial coefficients and Dehn-Thurston coordinates.

Findings

Established a formula for top term coefficients in polynomial traces

Linked polynomial coefficients to Dehn-Thurston coordinates

Applied results to asymptotic analysis of pleating rays

Abstract

Let $\Sigma$ be a surface of negative Euler characteristic together with a pants decomposition $\P$. Kra's plumbing construction endows $\Sigma$ with a projective structure as follows. Replace each pair of pants by a triply punctured sphere and glue, or `plumb', adjacent pants by gluing punctured disk neighbourhoods of the punctures. The gluing across the $i^{th}$ pants curve is defined by a complex parameter $\tau_i \in \C$. The associated holonomy representation $\rho: \pi_1(\Sigma) \to PSL(2,\C)$ gives a projective structure on $\Sigma$ which depends holomorphically on the $\tau_i$. In particular, the traces of all elements $\rho(\gamma), \gamma \in \pi_1(\Sigma)$, are polynomials in the $\tau_i$. Generalising results proved in previous papers for the once and twice punctured torus respectively, we prove a formula giving a simple linear relationship between the coefficients of the top terms of $\rho(\gamma)$, as polynomials in the $\tau_i$, and the Dehn-Thurston coordinates of $\gamma$ relative to $\P$. This will be applied elsewhere to give a formula for the asymptotic directions of pleating rays in the Maskit embedding of $\Sigma$ as the bending measure tends to zero.