Search results for "Strong solutions"

showing 4 items of 4 documents

On strong solutions of the differential equations modeling the steady flow of certain incompressible generalized Newtonian fluids

2007

In this paper we discuss a system of partial differential equations describing the steady flow of an incompressible fluid and prove the existence of a strong solution under suitable assumptions on the data. In the 2D-case this solution turns out to be of class C^{1,\alpha}.

Algebra and Number TheoryPartial differential equationDifferential equationApplied MathematicsMathematical analysis510Physics::Fluid DynamicsStrong solutionsGeneralized Newtonian fluidFlow (mathematics)CompressibilityNewtonian fluidAnalysisMathematicsSt. Petersburg Mathematical Journal
researchProduct

Sobolev estimates for optimal transport maps on Gaussian spaces

2012

We will study variations in Sobolev spaces of optimal transport maps with the standard Gaussian measure as the reference measure. Some dimension free inequalities will be obtained. As application, we construct solutions to Monge-Ampere equations in finite dimension, as well as on the Wiener space.

Mathematics::Complex VariablesGaussianProbability (math.PR)Mathematics::Analysis of PDEsGaussian measureSobolev spaceStrong solutionssymbols.namesakeFOS: MathematicssymbolsApplied mathematicsEntropy (information theory)Fisher informationMathematics - ProbabilityAnalysisMathematicsJournal of Functional Analysis
researchProduct

Strong solutions to a parabolic equation with linear growth with respect to the gradient variable

2018

Abstract In this paper we prove existence and uniqueness of strong solutions to the homogeneous Neumann problem associated to a parabolic equation with linear growth with respect to the gradient variable. This equation is a generalization of the time-dependent minimal surface equation. Existence and regularity in time of the solution is proved by means of a suitable pseudoparabolic relaxed approximation of the equation and a passage to the limit.

Minimal surfaceGeneralizationApplied Mathematics010102 general mathematicsMathematical analysis01 natural sciences010101 applied mathematicsStrong solutionsNeumann boundary conditionLimit (mathematics)Uniqueness0101 mathematicsLinear growthAnalysisVariable (mathematics)MathematicsJournal of Differential Equations
researchProduct

THE MINIMIZING TOTAL VARIATION FLOW WITH MEASURE INITIAL CONDITIONS

2004

In this paper we obtain existence and uniqueness of solutions for the Cauchy problem for the minimizing total variation flow when the initial condition is a Radon measure in ℝN. We study limit solutions obtained by weakly approximating the initial measure μ by functions in L1(ℝN). We are able to characterize limit solutions when the initial condition μ=h+μs, where h∈L1(ℝN)∩L∞(ℝN), and μs=αℋk⌊ S,α≥0,k is an integer and S is a k-dimensional manifold with bounded curvatures. In case k<N-1 we prove that the singular part of the solution does not move, it remains equal to μs for all t≥0. In particular, u(t)=δ0 when u(0)=δ0. In case k=N-1 we prove that the singular part of the limit solution …

Strong solutionsNonlinear parabolic equationsApplied MathematicsGeneral MathematicsBounded functionRadon measureMathematical analysisInitial value problemEntropy (information theory)UniquenessAbsolute continuityMathematicsCommunications in Contemporary Mathematics
researchProduct