We prove the existence of entire, radial and signed bounded solutions for a quasilinear elliptic equation in R^N driven by a Leray-Lions operator of (p, q)−type. For this, we need an extension of related results by Boccardo-Murat-Puel and a variational approach in intersections of Banach spaces introduced by Candela-Palmieri.
Entire radial bounded solutions for Leray-Lions equations of (p, q)−type
Federica Mennuni;Addolorata Salvatore
In corso di stampa
Abstract
We prove the existence of entire, radial and signed bounded solutions for a quasilinear elliptic equation in R^N driven by a Leray-Lions operator of (p, q)−type. For this, we need an extension of related results by Boccardo-Murat-Puel and a variational approach in intersections of Banach spaces introduced by Candela-Palmieri.File in questo prodotto:
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