Search results for "Lorentz space"

showing 5 items of 5 documents

Sharp generalized Trudinger inequalities via truncation

2006

Abstract We prove that the generalized Trudinger inequalities into exponential and double exponential Orlicz spaces improve to inequalities on Orlicz–Lorentz spaces provided they are stable under truncation.

Mathematics::Functional AnalysisLorentz spaceTruncationApplied MathematicsMathematical analysisDouble exponential functionMathematics::Classical Analysis and ODEsSobolev inequalitiesOrlicz spacesAnalysisExponential functionSobolev inequalityMathematicsJournal of Mathematical Analysis and Applications

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On functions with derivatives in a Lorentz space

1999

We establish a sharp integrability condition on the partial derivatives of a Sobolev mapping to guarantee that sets of measure zero get mapped to sets of measure zero. This condition is sharp also for continuity and differentiability almost everywhere.

Null setSobolev spaceNumber theoryLorentz spaceGeneral MathematicsMathematical analysisPartial derivativeAlmost everywhereAlgebraic geometryDifferentiable functionMathematicsmanuscripta mathematica

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Bochner-Riesz means of functions in weak-L p

1993

The Bochner-Riesz means of order delta greater-than-or-equal-to 0 for suitable test functions on R(N) are defined via the Fourier transform by (S(R)(delta)f)(xi) = (1 - \xi\2/R2)+(delta)f(xi). We show that the means of the critical index delta = N/P - N + 1/2, 1 + infinity, to f(x) in norm and for almost every x in R(N). We also observe that the means of the function absolute value of x-N/p, which belongs to L(p,infinity) (R(N)) but not to the closure of test functions, converge for no x

General MathematicsMathematical analysisFourier-Hankel expansionweak-$L\sp p$test functionBochner-Riesz meanradial functionCombinatoricssymbols.namesakeFourier transformLorentz spacesNorm (mathematics)Fourier transformsymbolsCritical indexFourier-Bessel expansionMAT/05 - ANALISI MATEMATICAMathematicsMonatshefte f�r Mathematik

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Regularity of the inverse of a Sobolev homeomorphism in space

2006

Let Ω ⊂ Rn be open. Given a homeomorphism of finite distortion with |Df| in the Lorentz space Ln−1, 1 (Ω), we show that and f−1 has finite distortion. A class of counterexamples demonstrating sharpness of the results is constructed.

Sobolev spaceDistortion (mathematics)Lorentz spaceGeneral MathematicsMathematical analysisComputingMethodologies_DOCUMENTANDTEXTPROCESSINGBesov spaceInterpolation spaceSpace (mathematics)HomeomorphismMathematicsSobolev inequalityProceedings of the Royal Society of Edinburgh: Section A Mathematics

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Normal Coulomb Frames in $${\mathbb{R}}^{4}$$

2012

Now we consider two-dimensional surfaces immersed in Euclidean spaces ${\mathbb{R}}^{n+2}$ of arbitrary dimension. The construction of normal Coulomb frames turns out to be more intricate and requires a profound analysis of nonlinear elliptic systems in two variables. The Euler–Lagrange equations of the functional of total torsion are identified as non-linear elliptic systems with quadratic growth in the gradient, and, more exactly, the nonlinearity in the gradient is of so-called curl-type, while the Euler–Lagrange equations appear in a div-curl-form. We discuss the interplay between curvatures of the normal bundles and torsion properties of normal Coulomb frames. It turns out that such …

Nonlinear systemConservation lawLorentz spaceNormal bundleMathematical analysisTorsion (algebra)CoulombHarmonic mapMathematical physicsMathematicsScalar curvature

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