The first eigenvalue of the Laplacian and the Conductance of a Compact surface
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Nonlinear Dynamics
Abstract
We present some results with the central theme of is the phenomenon of the first eigenvalue of the Laplacian and
conductance of the dynamical system. Our main tool is a method for studying how the hyperbolic metric on a Riemann surface
behaves under deformation of the surface. With this model, we show variation of the first eigenvalue of the laplacian and the
conductance of the dynamical system, with the Fenchel–Nielsen coordinates, that characterize the surface.
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Clara Grácio e J. Sousa Ramos, “The first eigenvalue of the Laplacian and the Conductance of a Compact surface”, Nonlinear Dynamics, 44, 4, pgs.243-250, 2006.