This paper presents a numerical method for “time upscaling ” wave equations, i.e., performing time steps not limited by the Courant-Friedrichs-Lewy (CFL) condition. The proposed method leverages recent work on fast algorithms for pseudodifferential and Fourier integral operators (FIO). This algorithmic approach is not asymptotic: it is shown how to construct an exact FIO propagator by 1) solving Hamilton-Jacobi equa-tions for the phases, and 2) sampling rows and columns of low-rank matrices at random for the amplitudes. The setting of interest is that of scalar waves in two-dimensional smooth periodic media (of class C ∞ over the torus), where the bandlimit N of the waves goes to infinity. In this setting, it is demonstrated that the algori...
In this paper, Fourier analysis is used to investigate various approximation methods for the one- an...
This paper proposes a frequency/time hybrid integral-equation method for the time-dependent wave equ...
On the basis of integral representations we propose fast numerical methods to solve the Cauchy probl...
Abstract. This paper presents a numerical method for “time upscaling ” wave equations, i.e., perform...
The Discrete Fourier Transform (DFT) has plethora of applications in mathematics, physics, computer ...
The paper investigates a variant of semi-implicit spectral deferred corrections (SISDC) in which the...
In this paper, we present a new way of discretizing integral equations coming from high fre-quency w...
Throughout many fields of science and engineering, the need for describing waveequations is crucial....
Fourier series of smooth, non-periodic functions on [1, 1] are known to ex-hibit the Gibbs phenomeno...
We present a new geometric strategy for the numerical solution of hyperbolic wave equations in smoot...
We have developed a von Neumann stability and dispersion analysis of two time-integration techniques...
We propose an efficient algorithm for density fitting of Bloch waves for Hamiltonian operators with ...
International audienceThis contribution overviews a spectral methodology for the numerical solution ...
AbstractAn algorithm is presented for the Fourier pseudospectral solution of the regularised long wa...
This paper presents a method for computing the solution to the time-dependent wave equation from the...
In this paper, Fourier analysis is used to investigate various approximation methods for the one- an...
This paper proposes a frequency/time hybrid integral-equation method for the time-dependent wave equ...
On the basis of integral representations we propose fast numerical methods to solve the Cauchy probl...
Abstract. This paper presents a numerical method for “time upscaling ” wave equations, i.e., perform...
The Discrete Fourier Transform (DFT) has plethora of applications in mathematics, physics, computer ...
The paper investigates a variant of semi-implicit spectral deferred corrections (SISDC) in which the...
In this paper, we present a new way of discretizing integral equations coming from high fre-quency w...
Throughout many fields of science and engineering, the need for describing waveequations is crucial....
Fourier series of smooth, non-periodic functions on [1, 1] are known to ex-hibit the Gibbs phenomeno...
We present a new geometric strategy for the numerical solution of hyperbolic wave equations in smoot...
We have developed a von Neumann stability and dispersion analysis of two time-integration techniques...
We propose an efficient algorithm for density fitting of Bloch waves for Hamiltonian operators with ...
International audienceThis contribution overviews a spectral methodology for the numerical solution ...
AbstractAn algorithm is presented for the Fourier pseudospectral solution of the regularised long wa...
This paper presents a method for computing the solution to the time-dependent wave equation from the...
In this paper, Fourier analysis is used to investigate various approximation methods for the one- an...
This paper proposes a frequency/time hybrid integral-equation method for the time-dependent wave equ...
On the basis of integral representations we propose fast numerical methods to solve the Cauchy probl...