Sobolev regularity of the symmetric gradient of solutions to a class of φ-Laplacian systems
Abstract
The paper deals with the second order regularity properties of the weak solutions u∈ W1,φ(, n) of systems of the form equation*equareg - A(x, u)=f, equation* in a bounded domain ⊂n, n>2, where the operator A(x,P) is Lipschitz continuous with respect to the x-variable and satisfies growth conditions with respect to the second variable expressed through a Young function . We prove the Sobolev regularity of a function of the symmetric gradient u that takes into account the nonlinear growth of the operator A(x,P), assuming that the force term f belongs to a suitable Orlicz-Sobolev space. The main result is achieved through some uniform higher differentiability estimates for solutions to a class of approximating problems, constructed adding singular higher order perturbations to the system.
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