Your search keyword '"Hart F"' showing total 35 results

1. Uniform Resolvent Estimates on Manifolds of Bounded Curvature

Author

Hart F. Smith

Subjects

Parametrix, 010102 general mathematics, Mathematical analysis, 01 natural sciences, Manifold, Differential geometry, 0103 physical sciences, Uniform boundedness, Mathematics::Differential Geometry, 010307 mathematical physics, Geometry and Topology, Sectional curvature, 0101 mathematics, Laplace operator, Operator norm, Resolvent, Mathematics

Abstract

We establish $$L^{q*}\rightarrow L^q$$ bounds for the resolvent of the Laplacian on compact Riemannian manifolds assuming only that the sectional curvatures of the manifold are uniformly bounded. When the resolvent parameter lies outside a parabolic neighborhood of $$[0,\infty )$$ , the operator norm of the resolvent is shown to depend only on upper bounds for the sectional curvature and diameter and lower bounds for the volume. The resolvent bounds are derived from square-function estimates for the wave equation, an approach that admits the use of paradifferential approximations in the parametrix construction.

Published

2020

2. Dispersive estimates for the wave equation on Riemannian manifolds of bounded curvature

Author

Hart F. Smith and Yuanlong Chen

Subjects

Riemann curvature tensor, Ocean Engineering, Lebesgue integration, 01 natural sciences, symbols.namesake, Mathematics - Analysis of PDEs, 0103 physical sciences, FOS: Mathematics, dispersive estimates, Tensor, 0101 mathematics, Mathematics, 58J45 (Primary) 35L15 (Secondary), 010102 general mathematics, Mathematical analysis, Wave equation, 58J45, Sobolev space, Range (mathematics), 35L15, Bounded function, symbols, wave equation, 010307 mathematical physics, Mathematics::Differential Geometry, Metric tensor (general relativity), Analysis of PDEs (math.AP)

Abstract

We establish space-time dispersive estimates for solutions to the wave equation on compact Riemannian manifolds with bounded sectional curvature, with the same exponents as for $C^\infty$ metrics. The estimates are for bounded time intervals, so by finite propagation velocity the results apply also on non-compact manifolds under appropriate uniform conditions. We assume a priori that in local coordinates the metric tensor components satisfy ${\rm g}_{ij}\in W^{1,p}$ for some $p>d$, which ensures that the curvature tensor is well defined in the weak sense, but this can be relaxed to any assumption that suffices for the local harmonic coordinate calculations in the paper.

Published

2019

3. Regularity and multi-scale discretization of the solution construction of hyperbolic evolution equations with limited smoothness

Author

Gunther Uhlmann, Sean Holman, Maarten V. de Hoop, and Hart F. Smith

Subjects

Smoothness, Hyperbolic evolution equations, Discretization, Numerical analysis, Applied Mathematics, 010102 general mathematics, Mathematical analysis, 010103 numerical & computational mathematics, 16. Peace & justice, System of linear equations, Lipschitz continuity, 01 natural sciences, Quadrature (mathematics), Volterra equations, Operator (computer programming), Curvelets, Curvelet, Numerical methods, 0101 mathematics, Multi-scale, Mathematics

Abstract

We present a multi-scale solution scheme for hyperbolic evolution equations with curvelets. We assume, essentially, that the second-order derivatives of the symbol of the evolution operator are uniformly Lipschitz. The scheme is based on a solution construction introduced by Smith (1998) [1] and is composed of generating an approximate solution following a paradifferential decomposition of the mentioned symbol, here, with a second-order correction reminiscent of geometrical asymptotics involving a Hamilton–Jacobi system of equations and, subsequently, solving a particular Volterra equation. We analyze the regularity of the associated Volterra kernel, and then determine the optimal quadrature in the evolution parameter. Moreover, we provide an estimate for the spreading of (finite) sets of curvelets, enabling the multi-scale numerical computation with controlled error.

Published

2012

4. Strichartz estimates and the nonlinear Schrödinger equation on manifolds with boundary

Author

Christopher D. Sogge, Matthew D. Blair, and Hart F. Smith

Subjects

symbols.namesake, Simple (abstract algebra), Euclidean space, General Mathematics, Mathematical analysis, symbols, Boundary (topology), Scale invariance, Lebesgue integration, Nonlinear Schrödinger equation, Energy (signal processing), Schrödinger equation, Mathematics

Abstract

We establish Strichartz estimates for the Schrodinger equation on Riemannian manifolds (Ω, g) with boundary, for both the compact case and the case that Ω is the exterior of a smooth, non-trapping obstacle in Euclidean space. The estimates for exterior domains are scale invariant; the range of Lebesgue exponents (p, q) for which we obtain these estimates is smaller than the range known for Euclidean space, but includes the key $${L^{4}_{t}L^{\infty}_x}$$ estimate, which we use to give a simple proof of well-posedness results for the energy critical Schrodinger equation in 3 dimensions. Our estimates on compact manifolds involve a loss of derivatives with respect to the scale invariant index. We use these to establish well-posedness for finite energy data of certain semilinear Schrodinger equations on general compact manifolds with boundary.

Published

2011

5. Decoupling of Modes for the Elastic Wave Equation in Media of Limited Smoothness

Author

Hart F. Smith, Maarten V. de Hoop, Valeriy Brytik, and Gunther Uhlmann

Subjects

Smoothness (probability theory), Applied Mathematics, Modulo, Operator (physics), Mathematical analysis, Structure (category theory), Order (group theory), Decoupling (cosmology), Wave equation, Lamé parameters, Analysis, Mathematics

Abstract

We establish a decoupling result for the P and S waves of linear, isotropic elasticity, in the setting of twice-differentiable Lame parameters. Precisely, we show that the P↔S components of the wave propagation operator are regularizing of order one on L 2 data, by establishing the diagonalization of the elastic system modulo a L 2-bounded operator. Effecting the diagonalization in the setting of twice-differentiable coefficients depends upon the symbol of the conjugation operator having a particular structure.

Published

2011

6. A Multi-Scale Approach to Hyperbolic Evolution Equations with Limited Smoothness

Author

Maarten V. de Hoop, Gunther Uhlmann, Fredrik Andersson, and Hart F. Smith

Subjects

Class (set theory), Smoothness (probability theory), Scale (ratio), Applied Mathematics, Phase space, Multiresolution analysis, Mathematical analysis, Curvelet, Computer Science::Databases, Analysis, Mathematics

Abstract

We discuss how techniques from multiresolution analysis and phase space transforms can be exploited in solving a general class of evolution equations with limited smoothness. We have wave propagati...

Published

2008

7. Subcritical $L^p$ bounds on spectral clusters for Lipschitz metrics

Author

Herbert Koch, Daniel Tataru, and Hart F. Smith

Subjects

Pure mathematics, Range (mathematics), symbols.namesake, Lipschitz domain, Bounding overwatch, General Mathematics, Mathematical analysis, symbols, Lipschitz continuity, Hyperbolic partial differential equation, Energy (signal processing), Dirichlet distribution, Mathematics

Abstract

We establish asymptotic bounds on the $L^p$ norms of spectrally localized functions in the case of two-dimensional Dirichlet forms with coefficients of Lipschitz regularity. These bounds are new for the range $6

Published

2008

8. On Strichartz estimates for Schrödinger operators in compact manifolds with boundary

Author

Christopher D. Sogge, Hart F. Smith, and Matthew D. Blair

Subjects

Applied Mathematics, General Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Boundary (topology), Lipschitz continuity, Compact operator, Mathematics::Geometric Topology, symbols.namesake, Metric (mathematics), symbols, Mathematics::Differential Geometry, Mathematics::Symplectic Geometry, Schrödinger's cat, Mathematics

Abstract

We prove local Strichartz estimates with a loss of derivatives over compact manifolds with boundary. Our results also apply more generally to compact manifolds with Lipschitz metrics.

Published

2007

9. Spectral cluster estimates for C 1,1 metrics

Author

Hart F. Smith

Subjects

Discrete mathematics, General Mathematics, Metric (mathematics), Mathematical analysis, Cluster (physics), Mathematics

Abstract

In this paper, we establish L p norm bounds for spectral clusters on compact manifolds, under the assumption that the metric is C 1,1 . Precisely, we show that the L p estimates proven by Sogge in the case of smooth metrics hold under this limited regularity assumption. It is known by examples of Smith-Sogge that such estimates fail for C 1,α metrics if α < 1.

Published

2006

10. Sharp local well-posedness results for the nonlinear wave equation

Author

Daniel Tataru and Hart F. Smith

Subjects

Well-posed problem, Cauchy problem, Mathematics (miscellaneous), Partial differential equation, Dimension (vector space), Mathematical analysis, Mathematics::Analysis of PDEs, Initial value problem, Statistics, Probability and Uncertainty, Wave equation, Stability (probability), Hyperbolic partial differential equation, Mathematics

Abstract

This article is concerned with local well-posedness of the Cauchy problem for second order quasilinear hyperbolic equations with rough initial data. The new results obtained here are sharp in low dimension.

Published

2005

11. Almost global existence for quasilinear wave equations in three space dimensions

Author

Christopher D. Sogge, Hart F. Smith, and Markus Keel

Subjects

Quadratic growth, Applied Mathematics, General Mathematics, Space time, Operator (physics), Mathematical analysis, Lorentz covariance, 35L70, Space (mathematics), Wave equation, 42B99, Mathematics - Analysis of PDEs, Minkowski space, Homogeneous space, FOS: Mathematics, Analysis of PDEs (math.AP), Mathematics

Abstract

We prove almost global existence for multiple speed quasilinear wave equations with quadratic nonlinearities in three spatial dimensions. We prove new results both for Minkowski space and also for nonlinear Dirichlet-wave equations outside of star shaped obstacles. The results for Minkowski space generalize a classical theorem of John and Klainerman. Our techniques only uses the classical invariance of the wave operator under translations, spatial rotations, and scaling. We exploit the $O(|x|^{-1})$ decay of solutions of the wave equation as opposed to the more difficult $O(|t|^{-1})$ decay. Accordingly, a key step in our approach is to prove a pointwise estimate of solutions of the wave equations that gives $O(1/t)$ decay of solutions of the inhomomogeneous linear wave equation based in terms of $O(1/|x|)$ estimates for the forcing term., This revised version of our paper will appear in the Journal of the American Mathematical Society

Published

2003

12. Heat traces and existence of scattering resonances for bounded potentials

Author

Hart F. Smith and Maciej Zworski

Subjects

Algebra and Number Theory, Trace (linear algebra), Scattering, 010102 general mathematics, Mathematical analysis, Inverse, Resonance, 35P25 (Primary), 35K08 (Secondary), 01 natural sciences, Mathematics - Analysis of PDEs, Bounded function, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Asymptotic expansion, Heat kernel, Analysis of PDEs (math.AP), Mathematics

Abstract

We show that, in odd dimensions, any real valued, bounded potential of compact support has at least one scattering resonance. In dimensions 3 and greater this was previously known only for sufficiently smooth potentials. The proof is based on an inverse result, which shows that the regularized trace of the associated heat kernel admits a full asymptotic expansion if and only if the potential is smooth.

Published

2014

13. Propagation of singularities for rough metrics

Author

Hart F. Smith

Subjects

35A21, Numerical Analysis, Applied Mathematics, Mathematical analysis, Null (mathematics), Scalar (mathematics), wavefront set, propagation of singularities, Wave equation, Sobolev space, Homogeneous differential equation, Norm (mathematics), 35L10, Gravitational singularity, wave equation, Hyperbolic partial differential equation, Analysis, Mathematics

Abstract

We use a wave packet transform and weighted norm estimates in phase space to establish propagation of singularities for solutions to time-dependent scalar hyperbolic equations that have coefficients of limited regularity. It is assumed that the second order derivatives of the principal coefficients belong to [math] , and that [math] is a solution to the homogeneous equation of global Sobolev regularity [math] or 1. It is then proven that the [math] wavefront set of [math] is a union of maximally extended null bicharacteristic curves.

Published

2014

14. Global existence for a quasilinear wave equation outside of star-shaped domains

Author

Hart F. Smith

Subjects

Mathematical analysis, General Medicine, Star (graph theory), Wave equation, Mathematics

Published

2001

15. Null form estimates for ( 1/2,1/2 ) symbols and local existence for a quasilinear Dirichlet-wave equation

Author

Hart F. Smith and Christopher D. Sogge

Subjects

Dirichlet problem, Cauchy problem, Nonlinear system, Eikonal equation, General Mathematics, Obstacle problem, Null (mathematics), Mathematical analysis, Mathematics::Analysis of PDEs, Existence theorem, Wave equation, Mathematics

Abstract

We establish certain null form estimates of Klainerman–Machedon for parametrices of variable coefficient wave equations for the convex obstacle problem, and for wave equations with metrics of bounded curvature. These are then used to prove a local existence theorem for nonlinear Dirichlet-wave equations outside of convex obstacles.

Published

2000

16. Global strichartz estimates for nonthapping perturbations of the laplacian

Author

Hart F. Smith and Christopher D. Sogge

Subjects

Partial differential equation, Applied Mathematics, Mathematical analysis, Laplace operator, Analysis, Mathematics

Abstract

(2000). Global strichartz estimates for nonthapping perturbations of the laplacian. Communications in Partial Differential Equations: Vol. 25, No. 11-12, pp. 2171-2183.

Published

2000

17. On global existence for nonlinear wave equations outside of convex obstacles

Author

Hart F. Smith, Christopher D. Sogge, and Markus Keel

Subjects

Nonlinear wave equation, General Mathematics, Minkowski space, Mathematical analysis, Mathematics::Analysis of PDEs, Regular polygon, Wave equation, Energy (signal processing), Mathematics

Abstract

The authors prove global existence of small solutions to a semilinear wave equation outside of convex obstacles. This extends results of Christodoulou and Klainerman who handled the Minkowski space version. The proof is a compromise of the methods of Christodoulou and Klainerman. It relies on local estimates proved earlier by Smith and Sogge together with classical energy decay estimates for the wave equation of Morawetz, Lax and Phillips.

Published

2000

18. A Hardy space for Fourier integral operators

Author

Hart F. Smith

Subjects

Pure mathematics, Mathematics::Complex Variables, Function space, Mathematical analysis, Pseudometric space, Hardy space, Quotient space (linear algebra), Linear subspace, Operator space, Fourier integral operator, symbols.namesake, Square-integrable function, symbols, Geometry and Topology, Mathematics

Abstract

We introduce a new function space, denoted by H FIO 1 (ℝn), which is preserved by the algebra of Fourier integral operators of order 0 associated to canonical transformations. A subspace of L1 (ℝn), this space in many aspects resembles the real Hardy space of Fefferman-Stein. In particular, we obtain an atomic characterization of H FIO 1 (ℝn). In contrast to the standard Hardy space, these atoms are localized in frequency space as well as in real space.

Published

1998

19. A parametrix construction for wave equations with $C^{1,1}$ coefficients

Author

Hart F. Smith

Subjects

Algebra and Number Theory, Parametrix, Mathematical analysis, Geometry and Topology, Wave equation, Mathematics

Published

1998

20. On the critical semilinear wave equation outside convex obstacles

Author

Hart F. Smith and Christopher D. Sogge

Subjects

Applied Mathematics, General Mathematics, Mathematical analysis, Regular polygon, Wave equation, Mathematics

Published

1995

21. Pointwise bounds on quasimodes of semiclassical Schrodinger operators in dimension two

Author

Hart F. Smith and Maciej Zworski

Subjects

Pointwise, General Mathematics, 010102 general mathematics, Mathematical analysis, Semiclassical physics, Mathematics::Spectral Theory, 01 natural sciences, symbols.namesake, Mathematics - Analysis of PDEs, Dimension (vector space), 0103 physical sciences, symbols, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Scaling, Schrödinger's cat, Mathematics, Analysis of PDEs (math.AP)

Abstract

We prove optimal pointwise bounds on quasimodes of semiclassical Schrodinger operators with arbitrary smooth real potentials in dimension two. This end-point estimate was left open in the general study of semiclassical L bounds conducted by Koch-TataruZworski [2]. However, we show that the results of [2] imply the two dimensional end-point estimate by scaling and localization.

Published

2012

22. A Calculus for Three-Dimensional CR Manifolds of Finite Type

Author

Hart F. Smith

Subjects

Pure mathematics, Mathematical analysis, medicine, Type (model theory), medicine.disease, Calculus (medicine), Analysis, Mathematics

Published

1994

23. On Strichartz and eigenfunction estimates for low regularity metrics

Author

Christopher D. Sogge and Hart F. Smith

Subjects

Combinatorics, General Mathematics, Mathematical analysis, Order (group theory), Eigenfunction, Mathematics

Abstract

Weproduce,fordimensions n ≥ 3,examplesofwaveoperatorsforwhichtheStrichartzestimatesfail.TheexamplesincludebothLipschitzand C 1 ,α metrics,foreach0

Published

1994

24. Global well-posedness and scattering for defocusing energy-critical NLS in the exterior of balls with radial data

Author

Dong Li, Xiaoyi Zhang, and Hart F. Smith

Subjects

Unit sphere, Scattering, General Mathematics, 010102 general mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Mathematics::Spectral Theory, 01 natural sciences, Sobolev space, symbols.namesake, Mathematics - Analysis of PDEs, Dirichlet boundary condition, 0103 physical sciences, FOS: Mathematics, symbols, Initial value problem, Point (geometry), 010307 mathematical physics, 0101 mathematics, Nonlinear Sciences::Pattern Formation and Solitons, Well posedness, Energy (signal processing), Analysis of PDEs (math.AP), Mathematics

Abstract

We consider the defocusing energy-critical NLS in the exterior of the unit ball in three dimensions. For the initial value problem with Dirichlet boundary condition we prove global well-posedness and scattering with large radial initial data in the Sobolev space $\dot H_0^1$. We also point out that the same strategy can be used to treat the energy-supercritical NLS in the exterior of balls with Dirichlet boundary condition and radial $\dot H_0^1$ initial data., 19 pages

Published

2011

25. Strichartz estimates for the wave equation on manifolds with boundary

Author

Hart F. Smith, Christopher D. Sogge, and Matthew D. Blair

Subjects

Mathematics::Analysis of PDEs, Boundary (topology), 35L70, 01 natural sciences, Dirichlet distribution, symbols.namesake, Mathematics - Analysis of PDEs, Neumann boundary condition, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Boundary value problem, 0101 mathematics, Mathematical Physics, Mathematics, Small data, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Wave equation, Manifold, 010101 applied mathematics, Mathematics - Classical Analysis and ODEs, Dirichlet boundary condition, symbols, Analysis, Analysis of PDEs (math.AP)

Abstract

We prove certain mixed-norm Strichartz estimates on manifolds with boundary. Using them we are able to prove new results for the critical and subcritical wave equation in 4-dimensions with Dirichlet or Neumann boundary conditions. We obtain global existence in the subcricital case, as well as global existence for the critical equation with small data. We also can use our Strichartz estimates to prove scattering results for the critical wave equation with Dirichlet boundary conditions in 3-dimensions., 16 pages. Couple of typos corrected, to appear in Annales de l'Institut Henri Poincare

Published

2008

26. On Abstract Strichartz Estimates and the Strauss Conjecture for Nontrapping Obstacles

Author

Christopher D. Sogge, Hart F. Smith, Jason Metcalfe, Yi Zhou, and Kunio Hidano

Subjects

Conjecture, Applied Mathematics, General Mathematics, Mathematical analysis, Boundary (topology), Space (mathematics), 35L70, Dirichlet distribution, symbols.namesake, Mathematics - Analysis of PDEs, Nonlinear wave equation, Mathematics - Classical Analysis and ODEs, Obstacle, symbols, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Linear wave equation, Mathematics, Analysis of PDEs (math.AP)

Abstract

The purpose of this paper is to show how local energy decay estimates for certain linear wave equations involving compact perturbations of the standard Laplacian lead to optimal global existence theorems for the corresponding small amplitude nonlinear wave equations with power nonlinearities. To achieve this goal, at least for spatial dimensions $n=3$ and 4, we shall show how the aforementioned linear decay estimates can be combined with "abstract Strichartz" estimates for the free wave equation to prove corresponding estimates for the perturbed wave equation when $n\ge3$. As we shall see, we are only partially successful in the latter endeavor when the dimension is equal to two, and therefore, at present, our applications to nonlinear wave equations in this case are limited., 21 pages, simplified existence proof and corrected typos

Published

2008

27. The subelliptic oblique derivative problem

Author

Hart F. Smith

Subjects

chemistry.chemical_compound, chemistry, Applied Mathematics, Mathematical analysis, Oblique case, Analysis, Derivative (chemistry), Mathematics

Published

1990

28. On the L p norm of spectral clusters for compact manifolds with boundary

Author

Hart F. Smith and Christopher D. Sogge

Subjects

General Mathematics, Bounded function, Norm (mathematics), TheoryofComputation_ANALYSISOFALGORITHMSANDPROBLEMCOMPLEXITY, Mathematical analysis, Mathematics

Abstract

We use microlocal and paradifferential techniques to obtain L8 norm bounds for spectral clusters associated with elliptic second-order operators on two-dimensional manifolds with boundary. The result leads to optimal Lq bounds, in the range 2⩽q⩽∞, for L2 - normalized spectral clusters on bounded domains in the plane and, more generally, for two-dimensional compact manifolds with boundary. We also establish new sharp Lq estimates in higher dimensions for a range of exponents q̅n⩽q⩽∞.

Published

2007

29. Almost global existence for some semilinear wave equations

Author

Hart F. Smith, Christopher D. Sogge, and Markus Keel

Subjects

Partial differential equation, Functional analysis, General Mathematics, Mathematical analysis, Mathematics::Analysis of PDEs, Wave equation, 35L70, Mathematics - Analysis of PDEs, Euclidean geometry, FOS: Mathematics, Vector field, Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

We prove almost global existence for semilinear wave equations outside of nontrapping obstacles. We use the vector field method, but only use the generators of translations and Euclidean rotations. Our method exploits 1/r decay of wave equations, as opposed to the much harder to prove 1/t decay., To appear in Journal d'Analyse. A paper on the quasilinear case will follow

Published

2001

30. $L^p$ regularity for the wave equation with strictly convex obstacles

Author

Hart F. Smith and Christopher D. Sogge

Subjects

35L05, 35B65, General Mathematics, Wave packet, Mathematical analysis, 35L85, Convex function, Wave equation, 35A27, Mathematics

Published

1994

31. Seismic imaging with the generalized Radon transform: a curvelet transform perspective

Author

Hart F. Smith, M. V. de Hoop, R. D. van der Hilst, and Gunther Uhlmann

Subjects

Radon transform, Applied Mathematics, Matrix representation, Mathematical analysis, Seismic migration, Inverse problem, Computer Science Applications, Theoretical Computer Science, Convolution, Matrix (mathematics), Linearization, Signal Processing, Curvelet, Mathematical Physics, Mathematics

Abstract

A key challenge in the seismic imaging of reflectors using surface reflection data is the subsurface illumination produced by a given data set and for a given complexity of the background model (of wave speeds). The imaging is described here by the generalized Radon transform. To address the illumination challenge and enable (accurate) local parameter estimation, we develop a method for partial reconstruction. We make use of the curvelet transform, the structure of the associated matrix representation of the generalized Radon transform, which needs to be extended in the presence of caustics and phase linearization. We pair an image target with partial waveform reflection data, and develop a way to solve the matrix normal equations that connect their curvelet coefficients via diagonal approximation. Moreover, we develop an approximation, reminiscent of Gaussian beams, for the computation of the generalized Radon transform matrix elements only making use of multiplications and convolutions, given the underlying ray geometry; this leads to computational efficiency. Throughout, we exploit the (wave number) multi-scale features of the dyadic parabolic decomposition underlying the curvelet transform and establish approximations that are accurate for sufficiently fine scales. The analysis we develop here has its roots in and represents a unified framework for (double) beamforming and beam-stack imaging, parsimonious pre-stack Kirchhoff migration, pre-stack plane-wave (Kirchhoff) migration and delayed-shot pre-stack migration.

Published

2009

32. Parametrix construction for a class of subelliptic differential operators

Author

Hart F. Smith

Subjects

Algebra, Class (set theory), Parametrix, 35H05, General Mathematics, Mathematical analysis, Microlocal analysis, 35S05, Operator theory, Differential operator, Fourier integral operator, Mathematics

Published

1991

33. STRICHARTZ ESTIMATES FOR DIRICHLET-WAVE EQUATIONS IN TWO DIMENSIONS WITH APPLICATIONS.

Author

Smith, Hart F., Sogge, Christopher D., and Wang, Chengbo

Subjects

*DIRICHLET problem, *WAVE equation, *DIMENSION theory (Algebra), *LOGICAL prediction, *INTERPOLATION, *MATHEMATICAL analysis

Abstract

We establish the Strauss conjecture for nontrapping obstacles when the spatial dimension n is two. As pointed out by Hidano, Metcalfe, Smith, Sogge, and Zhou (2010) this case is more subtle than n = 3 or 4 due to the fact that the arguments in the papers of the first two authors (2000), Burq (2000) and Metcalfe (2004), showing that local Strichartz estimates for obstacles imply global ones, require that the Sobolev index, γ, equals 1/2 when n = 2. We overcome this difficulty by interpolating between energy estimates (γ = 0) and ones for γ = 1/2 that are generalizations of Minkowski space estimates of Fang and the third author (2006), (2011), the second author (2008) and Sterbenz (2005). [ABSTRACT FROM AUTHOR]

Published

2012

34. On abstract Strichartz estimates and the Strauss conjecture for nontrapping obstacles.

Author

Kunio Hidano, Jason Metcalfe, Hart F. Smith, Christopher D. Sogge, and Yi Zhou

Subjects

ESTIMATION theory, NONLINEAR wave equations, SET theory, DIMENSIONAL analysis, MATHEMATICAL proofs, MATHEMATICAL analysis

Abstract

We establish the Strauss conjecture concerning small-data global existence for nonlinear wave equations, in the setting of exterior domains to compact obstacles, for space dimensions $n=3$ and $4$. The obstacle is assumed to be nontrapping, and the solution is assumed to satisfy either Dirichlet or Neumann conditions along the boundary of the obstacle. The key step in the proof is establishing certain ``abstract Strichartz estimates'' for the linear wave equation on exterior domains. [ABSTRACT FROM AUTHOR]

Published

2009

35. Global Existence for a Quasilinear Wave Equation Outside of Star-Shaped Domains

Author

Hart F. Smith, Christopher D. Sogge, and Markus Keel

Subjects

Mathematical analysis, Mathematics::Analysis of PDEs, Diamond, Conformal map, engineering.material, Star (graph theory), Wave equation, 35L70, Image (mathematics), symbols.namesake, Mathematics - Analysis of PDEs, Obstacle, Minkowski space, FOS: Mathematics, symbols, engineering, Einstein, Analysis, Analysis of PDEs (math.AP), Mathematics

Abstract

We prove global existence of small-amplitude solutions of quasilinear Dirichlet-wave equations outside of star-shaped obstacles in (3+1)-dimensions. We use a variation of the conformal method of Christodoulou. Since the image of the space-time obstacle is not static in the Einstein diamond, our results do not follows directly from local existence theory as did Christodoulou's for the nonobstacle case. Instead, we develop weighted estimates that are adapted to the geometry. Using them and the energy-integral method we obtain solutions in the Einstein diamond minus the dime-dependent obstacle, which pull back to solutions in Minkowski space minus and obstacle.