Simon N. Chandler-Wilde

What is he best known for?

The fields of study he is best known for:

• Mathematical analysis
• Geometry
• Hilbert space

Simon N. Chandler-Wilde mainly focuses on Mathematical analysis, Helmholtz equation, Integral equation, Boundary value problem and Bounded function. His Mathematical analysis research integrates issues from Plane and Scattering. His research in Scattering intersects with topics in Acoustic wave and Wavenumber.

The concepts of his Helmholtz equation study are interwoven with issues in Fredholm alternative and Plane wave. His studies in Boundary value problem integrate themes in fields like Boundary element method and Galerkin method. His Mixed boundary condition research includes themes of Free boundary problem and Dirichlet boundary condition.

His most cited work include:

• Numerical-asymptotic boundary integral methods in high-frequency acoustic scattering ∗ (159 citations)
• Efficiency of single noise barriers (123 citations)
• EXISTENCE, UNIQUENESS, AND VARIATIONAL METHODS FOR SCATTERING BY UNBOUNDED ROUGH SURFACES ∗ (89 citations)

What are the main themes of his work throughout his whole career to date?

Simon N. Chandler-Wilde mostly deals with Mathematical analysis, Integral equation, Scattering, Boundary value problem and Boundary element method. His study connects Plane wave and Mathematical analysis. He has researched Integral equation in several fields, including Fractal, Uniform boundedness and Real line.

As a part of the same scientific study, Simon N. Chandler-Wilde usually deals with the Scattering, concentrating on Polarization and frequently concerns with Electromagnetic radiation. The various areas that Simon N. Chandler-Wilde examines in his Boundary element method study include Basis function, Galerkin method and Insertion loss. His Helmholtz equation study combines topics in areas such as Partial differential equation, Acoustic wave, Uniqueness, Well-posed problem and Plane.

He most often published in these fields:

• Mathematical analysis (75.00%)
• Integral equation (34.68%)
• Scattering (24.19%)

What were the highlights of his more recent work (between 2012-2021)?

• Mathematical analysis (75.00%)
• Scattering (24.19%)
• Boundary element method (20.97%)

In recent papers he was focusing on the following fields of study:

Mathematical analysis, Scattering, Boundary element method, Sobolev space and Bounded function are his primary areas of study. Integral equation, Fractal, Numerical analysis, Boundary value problem and Helmholtz equation are subfields of Mathematical analysis in which his conducts study. His research in Integral equation focuses on subjects like Open set, which are connected to Bessel potential.

Simon N. Chandler-Wilde has included themes like Dirichlet boundary condition and Resolvent in his Helmholtz equation study. His Scattering research focuses on Dirichlet distribution and how it connects with Wavenumber, Well-posed problem and Contrast. His Boundary element method study integrates concerns from other disciplines, such as Space, Class, Polynomial and Optics.

Between 2012 and 2021, his most popular works were:

• Interpolation of Hilbert and Sobolev Spaces: Quantitative Estimates and Counterexamples (51 citations)
• A high frequency boundary element method for scattering by a class of nonconvex obstacles (39 citations)
• A frequency-independent boundary element method for scattering by two-dimensional screens and apertures (33 citations)

In his most recent research, the most cited papers focused on:

• Mathematical analysis
• Geometry
• Hilbert space

Simon N. Chandler-Wilde spends much of his time researching Mathematical analysis, Numerical analysis, Sobolev space, Scattering and Pure mathematics. Simon N. Chandler-Wilde interconnects Boundary element method, Logarithm and Basis function in the investigation of issues within Numerical analysis. His Sobolev space study incorporates themes from Norm and Lipschitz continuity.

His study in Scattering is interdisciplinary in nature, drawing from both Fractal, Integral equation and Dirichlet distribution. His Dirichlet distribution research integrates issues from Helmholtz equation, Wavenumber, Bounded function, Contrast and Plane. In the field of Pure mathematics, his study on Self-adjoint operator overlaps with subjects such as Singular value, Random matrix and Tridiagonal matrix.

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