José C. Sabina de Lis scite author profile

We deal with positive solutions of ∆u = a(x)u p in a bounded smooth domain Ω ⊂ R N subject to the boundary condition ∂u/∂ν = λu, λ a parameter, p > 1. We prove that this problem has a unique positive solution if and only if 0 < λ < σ1 where, roughly speaking, σ1 is finite if and only if |∂Ω ∩ {a = 0}| > 0 and coincides with the first eigenvalue of an associated eigenvalue problem. Moreover, we find the limit profile of the solution as λ → σ1.

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Pointwise Growth and Uniqueness of Positive Solutions for a Class of Sublinear Elliptic Problems where Bifurcation from Infinity Occurs

García-Melián

Gómez-Reñasco

López-Gómez

et al. 1998

Archive for Rational Mechanics and Analysis

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In this paper we analyze the uniqueness and the pointwise growth of the positive solutions of a nonlinear elliptic boundary-value problem of general sublinear type with a weight function multiplying the nonlinearity. When this function vanishes on some subdomain, the problem exhibits a bifurcation from infinity. In this case almost nothing is known about the pointwise growth of the positive solutions as the parameter approaches the critical value where the bifurcation from infinity occurs. In this work we show that the positive solutions grow to infinity in the region where the weight function vanishes and that on its support they stabilize to the minimal positive solution of the original equation subject to infinite Dirichlet boundary conditions. This behavior provides us with the uniqueness of the positive solution near the value of the parameter where the bifurcation from infinity occurs. Also, we solve the problem using spectral collocation methods coupled with path-following techniques to show how the main uniqueness result is optimal. Throughout the paper the mathematical analysis aids the numerical study, and the numerical study confirms and illuminates the analysis.

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A Local Bifurcation Theorem for Degenerate Elliptic Equations With Radial Symmetry

García-Melián¹,

Lis²

2002

Journal of Differential Equations

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In this work we provide local bifurcation results for equations involving the p-Laplacian in balls. We analyze the continua C n of radial solutions emanating from (l n, p , 0), {l n, p } being the radial eigenvalues of − D p . First, we show that the only nontrivial solutions close to (l n, p , 0) lie on a continuous curve, thus extending the Crandall-Rabinowitz theorem. Second, it is proved that C n 0 {(l n, p , 0)} splits into two unbounded connected pieces, characterized by their nodal properties thus sharpening previous results. © 2002 Elsevier Science

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Coexistence States and Global Attractivity for Some Convective Diffusive Competing Species Models

López-Gómez¹,

Lis²

1995

Transactions of the American Mathematical Society

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