Natural boundaries for area-preserving twist maps |
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| Authors: | A. Berretti A. Celletti L. Chierchia C. Falcolini |
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| Affiliation: | (1) Dipartimento di Matematica, II Università degli Studi di Roma (Tor Vergata), 00133 Rome, Italy;(2) Dipartimento di Matematica Pura e Applicata, Università di L'Aquila, 67100 Coppito-L'Aquila, Italy |
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| Abstract: | We consider KAM invariant curves for generalizations of the standard map of the form (x , y)=(x+y, y+ f(x)), wheref(x) is an odd trigonometric polynomial. We study numerically their analytic properties by a Padé approximant method applied to the function which conjugates the dynamics to a rotation   + . In the complex plane, natural boundaries of different shapes are found. In the complex plane the analyticity region appears to be a strip bounded by a natural boundary, whose width tends linearly to 0 as tends to the critical value. |
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| Keywords: | Conservative dynamical systems KAM theory natural boundaries Padé approximants |
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