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arxiv: 1510.00214 · v2 · pith:H7SMG2E7new · submitted 2015-10-01 · 🧮 math.DS · cs.NA· math-ph· math.AP· math.MP· math.NA· math.OC

Convergence of discrete Aubry-Mather model in the continuous limit

classification 🧮 math.DS cs.NAmath-phmath.APmath.MPmath.NAmath.OC
keywords discretecellequationoperatorcontinuousdevelopdiscountedhamiltonian
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We develop two approximation schemes for solving the cell equation and the discounted cell equation using Aubry-Mather-Fathi theory. The Hamiltonian is supposed to be Tonelli, time-independent , and periodic in space. By Legendre transform it is equivalent to find a fixed point of some nonlinear operator, called Lax-Oleinik operator, which may be discounted or not. By discretizing in time, we are led to solve an additive eigenvalue problem involving a discrete Lax-Oleinik operator. We show how to approximate the effective Hamiltonian and some weak KAM solutions by letting the time step in the discrete model tend to zero. We also obtain a selected discrete weak KAM solution as in [Davini et al 2014] and show it converges to a particular solution of the cell equation. In order to unify the two settings, continuous and discrete , we develop a more general formalism of short-range interactions.

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