Cofinal elements and fractional Dehn twist coefficients
Abstract
We show that for a surface S with positive genus and one boundary component, the mapping class of a Dehn twist along a curve parallel to the boundary is cofinal in every left ordering of the mapping class group Mod(S). We apply this result to show that one of the usual definitions of the fractional Dehn twist coefficient -- via translation numbers of a particular action of Mod(S) on R -- is in fact independent of the underlying action when S has genus larger than one. As an algebraic counterpart to this, we provide a formula that recovers the fractional Dehn twist coefficient of a homeomorphism of S from an arbitrary left ordering of Mod(S).
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