EXPONENTIAL-TYPE INEQUALITIES IN R^N AND APPLICATIONS TO ELLIPTIC AND BIHARMONIC EQUATIONS
Tesi di Dottorato
Data di Pubblicazione:
2012
Citazione:
EXPONENTIAL-TYPE INEQUALITIES IN R^N AND APPLICATIONS TO ELLIPTIC AND BIHARMONIC EQUATIONS / F. Sani ; supervisore: B. Ruf ; coordinatore: M. Peloso. Universita' degli Studi di Milano, 2012 Feb 20. 24. ciclo, Anno Accademico 2011. [10.13130/sani-federica_phd2012-02-20].
Abstract:
Adams' inequality in its original form is nothing but the Trudinger-Moser inequality for Sobolev spaces involving higher order derivatives. In this Thesis we present Adams-type inequalities for unbounded domains in R^n and some applications to existence and multiplicity results for elliptic and biharmonic problems involving nonlinearities with exponential growth.
Tipologia IRIS:
Tesi di dottorato
Keywords:
limiting Sobolev embeddings ; Trudinger-Moser inequalities ; inequality of D.R. Adams ; best constants ; elliptic equations ; ground state solutions ; biharmonic equations ; exponential growth ; variational methods
Elenco autori:
F. Sani
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