Spectral invariants and conductance in iterated maps

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Grazer Mathematishe Berichte

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We present a study about the invariants which can distinguish topologically different dynamics concerned to iterated maps on the interval. We’ve considered a special family of maps through their symbolic trajectories and we’ve studied the spectral invariants topological entropy and mixing rate as well as the quantities conductance and first nonzero eigenvalue of the discrete Laplacian.

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Fernandes, Sara; Sousa Ramos, José; Spectral invariants and conductance in iterated maps. Iteration theory (ECIT '04), 69–81, Grazer Math. Ber., 350, Karl-Franzens-Univ. Graz, Graz, 2006.

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