The Full Periodicity Kernel for σ Maps

Results are given that establish, for the first time, necessary and sufficient conditions for the existence of impulse responses and kernel representations for linear not-necessarily-time-invariant systems described by input-output operator equations. These results concern systems whose inputs and

This paper deals with the periods of the crazy maps which are a class of continuous maps from Ý = S 1 , where Ý is the product space of the bi-infinite sequences on N symbols and S 1 is the unite circle, into itself. More precisely, we find necessary and sufficient conditions for the existence of t

The semiclassical limit for an iteration of the baker's map is constructed by quantizing the corresponding iteration of the classical map. The resulting propagator can be expressed in terms of the classical generating function, leading to explicit expressions for the actions of all the periodic orbi

The crazy maps are a class of continuous maps from ⌺ = ‫ޓ‬ 1 , where ⌺ is the product space of the bi-infinite sequences on N symbols and ‫ޓ‬ 1 is the unit circle, into itself. Moreover, each of these maps has N orientation-preserving circle homeomorphisms associated with it. In this paper we study