Advancement in multiphysics simulation has motivated interest in availability of analytic and semi-analytic benchmark solutions. These solutions are sought because they can be used to assess the accuracy of complicated numerical schemes necessary to simulate coupled physics systems. While there exist analytic solutions for fixed-source problems, benchmark-quality eigenvalue solutions are of interest because eigenvalue problems more closely align with analyses undertaken with coupled solvers. This paper extends a fixed-source benchmark, the Doppler Slab benchmark, to the eigenvalue case. A novel solution for this benchmark is derived. Numerical implementation of the benchmark is demonstrated through verification of numerical computation of t...
Abstract — This paper focus on Eigenvalue analysis of IEEE First Benchmark Model. The eigenanalysis ...
Eigenvalue problems, that depend on a parameter, are frequently encountered in structural engineerin...
<p>(A1, B1) The eigenvalue spectrum of the numerically simulated (upper) and the eigenvalue spectru...
A number of published numerical solutions to analytic eigenvalue (k{sub eff}) and eigenfunction equa...
When computing the dynamic response of a structure, eigenvalue computations play a central role. For...
Eigenvalues of a power system give a good picture of the stability in the current operating point. I...
This is a description of the eigenvector processor SAP.4 which is implemented in the frequency domai...
This paper discusses the numerical solution of the generalized non-Hermitian eigenvalue problem. It ...
We study the accuracy and numerical stability of three eigenvector sets for modelling the coupled po...
For optimization problems based on dynamic criteria the system eigenvalues must be re-computed for e...
In this paper a possible application is presented of a general rank-1 matrix formula to the eigenval...
A new computational method for the linear eigensolution of structural dynamics is proposed. The eige...
We review methods for computing the eigenvalues of a matrix pair near the imaginary axis. An applica...
Conventionally, the eigenanalysis of a nonclassically damped dynamic system is performed in a space ...
This book focuses on the constructive and practical aspects of spectral methods. It rigorously exami...
Abstract — This paper focus on Eigenvalue analysis of IEEE First Benchmark Model. The eigenanalysis ...
Eigenvalue problems, that depend on a parameter, are frequently encountered in structural engineerin...
<p>(A1, B1) The eigenvalue spectrum of the numerically simulated (upper) and the eigenvalue spectru...
A number of published numerical solutions to analytic eigenvalue (k{sub eff}) and eigenfunction equa...
When computing the dynamic response of a structure, eigenvalue computations play a central role. For...
Eigenvalues of a power system give a good picture of the stability in the current operating point. I...
This is a description of the eigenvector processor SAP.4 which is implemented in the frequency domai...
This paper discusses the numerical solution of the generalized non-Hermitian eigenvalue problem. It ...
We study the accuracy and numerical stability of three eigenvector sets for modelling the coupled po...
For optimization problems based on dynamic criteria the system eigenvalues must be re-computed for e...
In this paper a possible application is presented of a general rank-1 matrix formula to the eigenval...
A new computational method for the linear eigensolution of structural dynamics is proposed. The eige...
We review methods for computing the eigenvalues of a matrix pair near the imaginary axis. An applica...
Conventionally, the eigenanalysis of a nonclassically damped dynamic system is performed in a space ...
This book focuses on the constructive and practical aspects of spectral methods. It rigorously exami...
Abstract — This paper focus on Eigenvalue analysis of IEEE First Benchmark Model. The eigenanalysis ...
Eigenvalue problems, that depend on a parameter, are frequently encountered in structural engineerin...
<p>(A1, B1) The eigenvalue spectrum of the numerically simulated (upper) and the eigenvalue spectru...