A recent class of sequential matrix diagonalisation (SMD) algorithms have been demonstrated to provide a fast converging solution to iteratively approximating the polynomial eigenvalue decomposition of a parahermitian matrix. However, the calculation of an EVD, and the application of a full unitary matrix to every time lag of the parahermitian matrix in the SMD algorithm results in a high numerical cost. In this paper, we replace the EVD with a limited number of Givens rotations forming a cyclic-by-row Jacobi sweep. Simulations indicate that a considerable reduction in computational complexity compared to SMD can be achieved with a negligible sacrifice in diagonalisation performance, such that the benefits in applying the SMD are maintained
This paper introduces a causality constrained sequential matrix diagonalisation (SMD) algorithm, wh...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
This paper extends the analysis of the recently introduced row-shift corrected truncation method for...
A recent class of sequential matrix diagonalisation (SMD) algorithms have been demonstrated to provi...
In recent years, several algorithms for the iterative calculation of a polynomial matrix eigenvalue ...
A polynomial eigenvalue decomposition of paraher-mitian matrices can be calculated approximately usi...
A number of algorithms are capable of iteratively calculating a polynomial matrix eigenvalue decompo...
Sequential matrix diagonalisation (SMD) refers to a family of algorithms to iteratively approximate ...
For parahermitian polynomial matrices, which can be used, for example, to characterise space-time co...
A number of algorithms capable of iteratively calculating a polynomial matrix eigenvalue decompositi...
A number of algorithms capable of iteratively calculating a polynomial matrix eigenvalue decompositi...
Recently a selection of sequential matrix diagonalisation (SMD) algorithms have been introduced whic...
For parahermitian polynomial matrices, which can be used, for example, to characterise space-time co...
A number of algorithms for the iterative calculation of a polynomial matrix eigenvalue decomposition...
In this paper, we present an improved version of the second order sequential best rotation algorithm...
This paper introduces a causality constrained sequential matrix diagonalisation (SMD) algorithm, wh...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
This paper extends the analysis of the recently introduced row-shift corrected truncation method for...
A recent class of sequential matrix diagonalisation (SMD) algorithms have been demonstrated to provi...
In recent years, several algorithms for the iterative calculation of a polynomial matrix eigenvalue ...
A polynomial eigenvalue decomposition of paraher-mitian matrices can be calculated approximately usi...
A number of algorithms are capable of iteratively calculating a polynomial matrix eigenvalue decompo...
Sequential matrix diagonalisation (SMD) refers to a family of algorithms to iteratively approximate ...
For parahermitian polynomial matrices, which can be used, for example, to characterise space-time co...
A number of algorithms capable of iteratively calculating a polynomial matrix eigenvalue decompositi...
A number of algorithms capable of iteratively calculating a polynomial matrix eigenvalue decompositi...
Recently a selection of sequential matrix diagonalisation (SMD) algorithms have been introduced whic...
For parahermitian polynomial matrices, which can be used, for example, to characterise space-time co...
A number of algorithms for the iterative calculation of a polynomial matrix eigenvalue decomposition...
In this paper, we present an improved version of the second order sequential best rotation algorithm...
This paper introduces a causality constrained sequential matrix diagonalisation (SMD) algorithm, wh...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
This paper extends the analysis of the recently introduced row-shift corrected truncation method for...