Using the critical set to induce bifurcations
Abstract
For a function F: X Y between real Banach spaces, we show how continuation methods to solve F(u) = g may improve from basic understanding of the critical set C of F. The algorithm aims at special points with a large number of preimages, which in turn may be used as initial conditions for standard continuation methods applied to the solution of the desired equation. A geometric model based on the sets C and F-1(F(C)) substantiate our choice of curves c ∈ X with abundant intersections with C. We consider three classes of examples. First we handle functions F: R2 R2, for which the reasoning behind the techniques is visualizable. The second set of examples, between spaces of dimension 15, is obtained by discretizing a nonlinear Sturm-Liouville problem for which special points admit a high number of solutions. Finally, we handle a semilinear elliptic operator, by computing the six solutions of an equation of the form - - f(u) = g studied by Solimini.
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