Quantitative and exact concavity principles for parabolic and elliptic equations

Abstract

Goal of this paper is to study classes of Cauchy-Dirichlet problems which include parabolic equations of the type ut - u= a(x,t)f(u)in ×(0,T) with ⊂RN bounded, convex domain and T∈(0,+∞]. Under suitable assumptions on a and f, we show logarithmic or power concavity (in space, or in space-time) of the solution u; under some relaxed assumptions on a, we show moreover that u enjoys concavity properties up to a controlled error. The results include relevant examples like the torsion f(u)=1, the Lane-Emden equation f(u)=uq, q∈(0,1), the eigenfunction f(u)=u, the logarithmic equation f(u)=u(u2), and the saturable nonlinearity f(u)=u21+u. The logistic equation f(x,u)=a(x)u-u2 can be treated as well. Some exact results give a different approach, as well as generalizations, to [Ishige-Salani2013, Ishige-Salani2016]. Moreover, some quantitative results are valid also in the elliptic framework - u=a(x)f(u) and refine [Bucur-Squassina2019, Gallo-Squassina2024].

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