We present a new algorithm for the numerical solution of problems of acoustic scatter-ing by surfaces in three-dimensional space. This algorithm evaluates scattered fields through fast, high-order, accurate solution of the corresponding boundary integral equation. The high-order accuracy of our solver is achieved through use of partitions of unity together with analytical resolution of kernel singularities. The acceleration, in turn, results from use of high-order equivalent source approximations, which allow for fast evaluation of non-adjacent interactions by means of the three-dimensional fast Fourier transform (FFT). Our acceleration scheme has dramatically lower memory requirements and yields much higher accuracy than existing FFT-accel...
We describe a fully discrete high-order algorithm for simulating low to medium frequency electromagn...
We introduce a new fast, high-order method for scattering by inhomogeneous media in three dimensions...
We present a new set of algorithms and methodologies for the numerical solution of problems of scatt...
We present a new algorithm for the numerical solution of problems of acoustic scattering by surfaces...
We present a new algorithm for the numerical solution of problems of acoustic scattering by surfaces...
We present a new algorithm for the numerical solution of problems of acoustic scattering by surfaces...
We review a set of algorithms and methodologies developed recently for the numerical solution of pro...
Abstract. We describe an accelerated direct solver for the integral equations which model acoustic s...
This paper presents a high-order accelerated algorithm for the solution of the integral-equation for...
We review a new set of algorithms and methodologies for the numerical solution of problems of scatte...
In this paper, we introduce a new fast, higher-order solver for scattering by inhomogeneous media in...
We present an accurate method of O(1)-complexity with respect to frequency (i.e., a method that, to ...
We consider the approximation of some highly oscillatory weakly singular surface integrals, arising ...
We present an accelerated and hardware parallelized integral-equation solver for the problem of acou...
We describe a fully discrete high-order algorithm for simulating low to medium frequency electromagn...
We introduce a new fast, high-order method for scattering by inhomogeneous media in three dimensions...
We present a new set of algorithms and methodologies for the numerical solution of problems of scatt...
We present a new algorithm for the numerical solution of problems of acoustic scattering by surfaces...
We present a new algorithm for the numerical solution of problems of acoustic scattering by surfaces...
We present a new algorithm for the numerical solution of problems of acoustic scattering by surfaces...
We review a set of algorithms and methodologies developed recently for the numerical solution of pro...
Abstract. We describe an accelerated direct solver for the integral equations which model acoustic s...
This paper presents a high-order accelerated algorithm for the solution of the integral-equation for...
We review a new set of algorithms and methodologies for the numerical solution of problems of scatte...
In this paper, we introduce a new fast, higher-order solver for scattering by inhomogeneous media in...
We present an accurate method of O(1)-complexity with respect to frequency (i.e., a method that, to ...
We consider the approximation of some highly oscillatory weakly singular surface integrals, arising ...
We present an accelerated and hardware parallelized integral-equation solver for the problem of acou...
We describe a fully discrete high-order algorithm for simulating low to medium frequency electromagn...
We introduce a new fast, high-order method for scattering by inhomogeneous media in three dimensions...
We present a new set of algorithms and methodologies for the numerical solution of problems of scatt...