Central Strips of Sibling Leaves in Laminations of the Unit Disk

Abstract

Quadratic laminations of the unit disk were introduced by Thurston as a vehicle for understanding the (connected) Julia sets of quadratic polynomials and the parameter space of quadratic polynomials. The "Central Strip Lemma" plays a key role in Thurston's classification of gaps in quadratic laminations, and in describing the corresponding parameter space. We generalize the notion of Central Strip to laminations of all degrees d2 and prove a Central Strip Lemma for degree d2. We conclude with applications of the Central Strip Lemma to identity return polygons that show it may play a role similar to Thurston's lemma for higher degree laminations.