English

Parabolic equations with concave non-linearity

Analysis of PDEs 2024-12-31 v1

Abstract

In this paper we prove the existence and uniqueness of positive mild solutions for the semilinear parabolic equations of the form ut+Lu=f+hG(u)u_t+\mathcal{L}u=f+h\cdot G(u), where hh is a positive function and GG a positive concave function (for example, G(u)=uαG(u)=u^\alpha for 0<α<10<\alpha<1). In contrast with the case of convex GG, where the Fujita exponent appears, and only existence of a positive solution for special data is achieved, in this concave case we obtain the existence and uniqueness for any positive data. The method relies on proving the existence and uniqueness of solutions for a certain class of Hammerstein-Volterra-type integral equations with a concave non-linear term, in the very general setting of arbitrary measure spaces. As a consequence, we obtain results for the existence and uniqueness of mild solutions to semilinear parabolic equations with concave nonlinearities under rather general assumptions on f,hf, h and GG, in a variety of settings: e.g. for L\mathcal{L} being the Laplacian on complete Riemannian manifolds (e.g., symmetric spaces of any rank) or H\"ormander sum of squares on general Lie groups. We also study the corresponding equations in the presence of a damping term, in which case assumptions can be relaxed even further.

Keywords

Cite

@article{arxiv.2412.20278,
  title  = {Parabolic equations with concave non-linearity},
  author = {Zhirayr Avetisyan and Khachatur Khachatryan and Michael Ruzhansky},
  journal= {arXiv preprint arXiv:2412.20278},
  year   = {2024}
}
R2 v1 2026-06-28T20:50:50.778Z