Abstract
It will be shown that solve an equation two-dimensional Volterra nonlinear can be solved numerically applying the techniques of inverse generalized moments problem in two steps writing the Volterra's equation as a Klein-Gordon equation of the form wtt – wxx = H(x, t), which H(x, t) it is unknown. In a first step, H(x, t) is numerically approximate, and in a second step we numerically approximate the solution of Klein-Gordon equation using the H(x, t) previously approximated. The method is illustrated with examples.
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