In this note we consider local weak solutions of elliptic equations in variational form with data in L^p. We refine the classical approach due to Campanato and Stampacchia and we prove the L^p-regularity for the solutions assuming the coefficients merely continuous. This result shows that it is possible to prove the same sharp L^p -regularity results that can be proved using classical singular kernel approach also with the variational regularity approach introduced by De Giorgi. This method works for general operators: parabolic, in nonvariational form, of order 2m.
A Note on Campanato’s L^p-regularity with continuous coefficients / C. Bernardini, V. Vespri, M. Zaccaron. - In: EURASIAN MATHEMATICAL JOURNAL. - ISSN 2077-9879. - STAMPA. - 13:(2022), pp. 44-53. [10.32523/2077-9879-2022-13-4-44-53]
A Note on Campanato’s L^p-regularity with continuous coefficients
V. Vespri;
2022
Abstract
In this note we consider local weak solutions of elliptic equations in variational form with data in L^p. We refine the classical approach due to Campanato and Stampacchia and we prove the L^p-regularity for the solutions assuming the coefficients merely continuous. This result shows that it is possible to prove the same sharp L^p -regularity results that can be proved using classical singular kernel approach also with the variational regularity approach introduced by De Giorgi. This method works for general operators: parabolic, in nonvariational form, of order 2m.
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