Countable families of solutions of a limit stationary semilinear fourth-order Cahn--Hilliard equation I. Mountain pass and Lusternik--Schnirel'man patterns in R^N
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solutionscountablecahn--hilliarddeltaequationfamiliesl--sleast
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Solutions of the stationary semilinear Cahn--Hilliard equation -\Delta^2 u - u -\Delta(|u|^{p-1}u)=0 in R^N, with p>1, which are exponentially decaying at infinity, are studied. Using the Mounting Pass Lemma allows us the determination of two different solutions. On the other hand, the application of Lusternik--Schnirel'man (L--S) Category Theory shows the existence of, at least, a countable family of solutions. However, through numerical methods it is shown that the whole set of solutions, even in 1D, is much wider. This suggests that, actually, there exists, at least, a countable set of countable families of solutions, in which only the first one can be obtained by the L--S min-max approach.
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