Minimal skew-product homeomorphisms and coalescence

We also set out some arguments to conjecture the transition values and for such b, we present some candidates to be minimal partitions, which are obtained from eigenfunctions of

We use this description to give a new factorization algorithm for skew polynomials, and to give other algorithms related to factorizations of skew polynomials, like counting the

In this paper we obtain skew-product representations of the multidimensional Dunkl processes which generalize the skew-product decomposition in dimension 1 obtained in L..

It follows from our results that a skew product over an Anosov diffeomorphism of an infranilmanifold is stably ergodic (among all volume preserving diffeomorphisms) if and only if it

One can verify that the polynomials g 1 and g 2 have no further irreducible right or left monic factor, showing that those two polynomials are not lclm of irreducible right factors

One-dimensional theory also describes the dynamics on the invariant fiber, which is given by the action of the one-dimensional polynomial f (c,z) := f c (z), and hence the

If λ is Brjuno and all critical points of the polynomial g 0 lie in basins of attracting or parabolic cycles, then all Fatou components of g 0 bulge, and there is a neighborhood of

Indeed, if we try to deform this latest partition by splitting each singular point of order four into a pair of singular points of order three, while keeping each domain close