![]() of them contain results about topological entropy of those billiards. Host proved that for substitution shifts, the measure-theoretical and topological rotational factors coincide, and so, in Theorem 1.7 by a factor, we mean either of them. find the limit of our estimates as the length of the billiard table goes to. It is proven that up to an isomorphism and a change of variables, these spaces are contained in WeilNagy’s class. Whereas subshifts of nite type are described by nitely many constraints, we allow a slowly growingnumber of constraints of a given length, slow growth meaning with a rate strictly less than the topological entropy. ![]() A Fourier approximation of functions in the Müntz spaces M,p of Lp functions is studied, where 1
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