Thurston construction mapping classes with minimal dilatation

Abstract

Given a pair of filling curves α, β on a surface of genus g with n punctures, we explicitly compute the mapping classes realizing the minimal dilatation over all the pseudo-Anosov maps given by the Thurston construction on α,β. We do so by solving for the minimal spectral radius in a congruence subgroup of PSL2(Z). We apply this result to realized lower bounds on intersection number between α and β to give the minimal dilatation over any Thurston construction pA map on g,n given by a filling pair α β.

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