On the existence of weak solutions for degenerate systems of variational inequalities  with critical growth

Martin Fuchs

Displaying similar documents to “On the existence of weak solutions for degenerate systems of variational inequalities with critical growth”

On the regularity of local minimizers of decomposable variational integrals on domains in $ℝ^{2}$

Michael Bildhauer, Martin Fuchs (2007)

Commentationes Mathematicae Universitatis Carolinae

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We consider local minimizers $u : ℝ^{2} \supset Ω \to ℝ^{N}$ of variational integrals like $\int_{Ω} [(1 + | \partial_{1} {u |}^{2})^{p / 2} + (1 + | \partial_{2} {u |}^{2})^{q / 2}] d x$ or its degenerate variant $\int_{Ω} [| \partial_{1} {u |}^{p} + | \partial_{2} u |^{q}] d x$ with exponents $2 \leq p < q < \infty$ which do not fall completely in the category studied in Bildhauer M., Fuchs M., Calc. Var. (2003), 177–186. We prove interior $C^{1, α}$ - respectively $C^{1}$ -regularity of $u$ under the condition that $q < 2 p$ . For decomposable variational integrals of arbitrary order a similar result is established by the way extending the work Bildhauer M., Fuchs M., Ann. Acad. Sci. Fenn. Math. (2006), 349–362. ...

Higher order variational problems on two-dimensional domains.

Bildhauer, Michael, Fuchs, Martin (2006)

Annales Academiae Scientiarum Fennicae. Mathematica

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Existence of multiple solutions for quasilinear diagonal elliptic systems.

Squassina, Marco (1999)

Electronic Journal of Differential Equations (EJDE) [electronic only]

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Smoothness properties of solutions to the nonlinear Stokes problem with nonautonomous potentials

Dominic Breit (2013)

Commentationes Mathematicae Universitatis Carolinae

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We discuss regularity results concerning local minimizers $u : ℝ^{n} \supset Ω \to ℝ^{n}$ of variational integrals like $\begin{matrix} \int_{Ω} {F (\cdot, ε (w)) - f \cdot w} d x \end{matrix}$ defined on energy classes of solenoidal fields. For the potential $F$ we assume a $(p, q)$ -elliptic growth condition. In the situation without $x$ -dependence it is known that minimizers are of class $C^{1, α}$ on an open subset $Ω_{0}$ of $Ω$ with full measure if $q < p \frac{n + 2}{n}$ (for $n = 2$ we have $Ω_{0} = Ω$ ). In this article we extend this to the case of nonautonomous integrands. Of course our result extends to weak solutions of the corresponding...

Existence of solution for a singular elliptic equation with critical Sobolev-Hardy exponents.

Li, Juan (2005)

International Journal of Mathematics and Mathematical Sciences

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Optimal partial regularity of minimizers of quasiconvex variational integrals

Christoph Hamburger (2007)

ESAIM: Control, Optimisation and Calculus of Variations

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We prove partial regularity with optimal Hölder exponent of vector-valued minimizers of the quasiconvex variational integral $\int F (x, u, D u) d x$ under polynomial growth. We employ the indirect method of the bilinear form.

Uniform decay for a hyperbolic system with differential inclusion and nonlinear memory source term on the boundary

Jong Yeoul Park, Sun Hye Park (2009)

Czechoslovak Mathematical Journal

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We prove the existence and uniform decay rates of global solutions for a hyperbolic system with a discontinuous and nonlinear multi-valued term and a nonlinear memory source term on the boundary.

Displaying similar documents to “On the existence of weak solutions for degenerate systems of variational inequalities with critical growth”

On the regularity of local minimizers of decomposable variational integrals on domains in ℝ 2

Higher order variational problems on two-dimensional domains.

Existence of multiple solutions for quasilinear diagonal elliptic systems.

Smoothness properties of solutions to the nonlinear Stokes problem with nonautonomous potentials

Existence of solution for a singular elliptic equation with critical Sobolev-Hardy exponents.

Optimal partial regularity of minimizers of quasiconvex variational integrals

Uniform decay for a hyperbolic system with differential inclusion and nonlinear memory source term on the boundary

On the regularity of local minimizers of decomposable variational integrals on domains in $ℝ^{2}$