Piero Montecchiari scite author profile

We consider a class of semilinear elliptic equations of the form −ε 2 ∆u(x, y) + a(x)W (u(x, y)) = 0, (x, y) ∈ R 2 (0.1) where ε > 0, a : R → R is a periodic, positive function and W : R → R is modeled on the classical two well Ginzburg-Landau potential W (s) = (s 2 − 1) 2. We look for solutions to (0.1) which verify the asymptotic conditions u(x, y) → ±1 as x → ±∞ uniformly with respect to y ∈ R. We show via variational methods that if ε is sufficiently small and a is not constant, then (0.1) admits infinitely many of such solutions, distinct up to translations, which do not exhibit one dimensional symmetries.

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Saddle solutions for bistable symmetric semilinear elliptic equations

Alessio

Montecchiari

2012

Nonlinear Differ. Equ. Appl.

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Abstract. This paper concerns the existence and asymptotic characterization of saddle solutions in R 3 for semilinear elliptic equations of the formDenoted with θ2 the saddle planar solution of (0.1), we show the existence of a unique solution θ3 ∈ C 2 (R 3 ) which is odd with respect to each variable, symmetric with respect to the diagonal planes, verifies 0 < θ3(x, y, z) < 1 for x, y, z > 0 and θ3 (x, y, z) →z→+∞ θ2(x, y) uniformly with respect to (x, y) ∈ R 2 .Mathematics Subject Classification (2010). 35J60, 35B05, 35B40, 35J20, 34C37.

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A double well potential system

2016

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Brake orbits type solutions to some class of semilinear elliptic equations

Alessio

Montecchiari

2007

Calc. Var.

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We consider a class of semilinear elliptic equations of the formwhere a : R → R is a periodic, positive function and W : R → R is modeled on the classical two well Ginzburg-Landau potential W(s) = (s 2 − 1) 2 . We show, via variational methods, that if the set of solutions to the one dimensional heteroclinic problemhas a discrete structure, then (0.1) has infinitely many solutions periodic in the variable y and verifying the asymptotic conditions u(x, y) → ±1 as x → ±∞ uniformly with respect to y ∈ R.

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