<p>We consider a power-type mild singular perturbation of a Dirichlet semilinear critical problem settled in an open and bounded set in a Carnot group. Here, the term critical has to be understood in the sense of the Sobolev embedding. We aim to prove the existence of two positive weak solutions: the first one is obtained by means of the variational Perron’s method, while for the second one we adapt a classical argument relying on proper estimates of a family of functions which mimic the role of the classical Aubin-Talenti functions in the Euclidean setting. Our results fall in the framework of semilinear PDEs in Carnot groups but, as far as we know, are the first ones dealing with singular perturbations of power-type.</p>

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Critical Singular Problems in Carnot Groups

  • Stefano Biagi,
  • Mattia Galeotti,
  • Eugenio Vecchi

摘要

We consider a power-type mild singular perturbation of a Dirichlet semilinear critical problem settled in an open and bounded set in a Carnot group. Here, the term critical has to be understood in the sense of the Sobolev embedding. We aim to prove the existence of two positive weak solutions: the first one is obtained by means of the variational Perron’s method, while for the second one we adapt a classical argument relying on proper estimates of a family of functions which mimic the role of the classical Aubin-Talenti functions in the Euclidean setting. Our results fall in the framework of semilinear PDEs in Carnot groups but, as far as we know, are the first ones dealing with singular perturbations of power-type.