Multifractals in polynomial circle maps

The Andreev-Koebe-Thurston circle packing theorem is generalized and improved in two ways. First, we obtain simultaneous circle packings of the map and its dual map so that, in the corresponding straight-line representations of the map and the dual, any two edges dual to each other are perpendicular

Let { n } n 0 be a sequence of monic orthogonal polynomials on the unit circle (OPUC) with respect to a symmetric and finite positive Borel measure d on [0, 2 ] and let -1, 0 , 1 , 2 , . . . be the associated sequence of Verblunsky coefficients. In this paper we study the sequence { n } n 0 of monic

We study the spatially synchronised and temporally periodic orbits of a 1-d lattice of coupled sine circle maps. A numerical study of the synchronised solutions reveals synchronisation over large regions of parameter space. The entire devil's staircase of periodic orbits as seen for the single circl