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Bounded weak solutions to elliptic PDE with data in Orlicz spaces

Prelegent(ci)
David Cruz-Uribe
Afiliacja
University of Alabama
Termin
23 listopada 2020 15:00
Informacje na temat wydarzenia
Zoom
Seminarium
Poniedziałkowe Niestandardowe Seminarium łączone z Seminarium Zakładu Równań Różniczkowych

It is a classical result due to Trudinger that if Q is a uniformly ellipticmatrix, and fLq(Ω), q >n2, then weak solutionsuof the Dirichlet problem {Div (Qu) =f for xu= 0 for x are bounded functions and satisfy uL(Ω)CfLq(Ω). This result is sharp in the sense that if q=n2, then there exist fLn2(Ω) such thatthis inequality fails even for the Laplacian (Q=I). In this talk we will show that the endpoint result can be improved by considering functions f in the Orlicz space Ln2(logL)q(Ω). More precisely, we show that we can take fLA(Ω), where LA is the Orlicz space induced by the Young function A(t) =tn2log(e+t)q, where q >n2. Moreover, we can sharpen the estimate on the Lnorm to get uL(Ω)CfLn2(Ω)(1 + log(1 +fLA(Ω)fLn2(Ω))). We can give examples to show that this result is (almost) sharp. Our main theorem is a generalization of this result that applies to a large class ofdegenerate matrices Q that satisfy an appropriate weighted Sobolev inequality with gain. We will discuss the main ideas of our proof, which uses a version of DeGeorgi iteration. If there is time we will discuss further generalizations to operators withlower order terms. Results in this talk are joint work with Scott Rodney, Cape Breton University.