Raffaella Giova scite author profile

We study nonlinear elliptic equations in divergence form(Formula presented.) When (Formula presented.) has linear growth in Du, and assuming that (Formula presented.) enjoys (Formula presented.) smoothness, local well-posedness is found in (Formula presented.) for certain values of (Formula presented.) and (Formula presented.). In the particular case (Formula presented.), G = 0 and (Formula presented.), (Formula presented.), we obtain (Formula presented.) for each (Formula presented.). Our main tool in the proof is a more general result, that holds also if (Formula presented.) has growth s−1 in Du, 2 ≤ s ≤ n, and asserts local well-posedness in Lq for each q > s, provided that (Formula presented.) satisfies a locally uniform VMO condition

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Grand Lebesgue spaces with respect to measurable functions

Capone

Formica

Giova

2013

Nonlinear Analysis: Theory, Methods & Applications

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Besov regularity for solutions of p-harmonic equations

Clop

Giova

Napoli

2017

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We establish the higher fractional differentiability of the solutions to nonlinear elliptic equations in divergence form, i.e., {\operatorname{div}\mathcal{A}(x,Du)=\operatorname{div}F,} when {\mathcal{A}} is a p-harmonic type operator, and under the assumption that {x\mapsto\mathcal{A}(x,\xi\/)} belongs to the critical Besov–Lipschitz space {B^{\alpha}_{{n/\alpha},q}} . We prove that some fractional differentiability assumptions on F transfer to Du with no losses in the natural exponent of integrability. When {\operatorname{div}F=0} , we show that an analogous extra differentiability property for Du holds true under a Triebel–Lizorkin assumption on the partial map {x\mapsto\mathcal{A}(x,\xi\/)} .

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Regularity results for a priori bounded minimizers of non-autonomous functionals with discontinuous coefficients

Giova

Napoli

2017

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We prove the higher differentiability and the higher integrability of the a priori bounded local minimizers of integral functionals of the form\ud \ud \ud F(v,Ω)=∫ Ω f(x,Dv(x))dx, \ud \ud \ud with convex integrand satisfying p-growth conditions with respect to the gradient variable, assuming that the function that measures the oscillation of the integrand with respect to the x-variable belongs to a suitable Sobolev space. The a priori boundedness of the minimizers allows us to obtain the higher differentiability under a Sobolev assumption which is independent on the dimension n and that, in the case p≤n−2 , improves previous known results. We also deal with solutions of elliptic systems with discontinuous coefficients under the so-called Uhlenbeck structure. In this case, it is well known that the solutions are locally bounded and therefore we obtain analogous regularity results without the a priori boundedness assumptio

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Higher differentiability for n-harmonic systems with Sobolev coefficients

Giova

2015

Journal of Differential Equations

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Raffaella Giova

Fractional Differentiability for Solutions of Nonlinear Elliptic Equations

Grand Lebesgue spaces with respect to measurable functions

Besov regularity for solutions of p-harmonic equations

Regularity results for a priori bounded minimizers of non-autonomous functionals with discontinuous coefficients

Higher differentiability for n-harmonic systems with Sobolev coefficients

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