A number of algorithms for the iterative calculation of a polynomial matrix eigenvalue decomposition (PEVD) have been introduced. The PEVD is a generalisation of the ordinary EVD and will diagonalise a parahermitian matrix via paraunitary operations. This paper addresses savings — both computationally and in terms of memory use — that exploit the parahermitian structure of the matrix being decomposed, and also suggests an implicit trimming approach to efficiently curb the polynomial order growth usually observed during iterations of the PEVD algorithms. We demonstrate that with the proposed techniques, both storage and computations can be significantly reduced, impacting on a number of broadband multichannel problems
A polynomial eigenvalue decomposition of paraher-mitian matrices can be calculated approximately usi...
In broadband array processing applications, an extension of the eigenvalue decomposition (EVD) to pa...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
A number of algorithms for the iterative calculation of a polynomial matrix eigenvalue decomposition...
In recent years, several algorithms for the iterative calculation of a polynomial matrix eigenvalue ...
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...
A number of algorithms are capable of iteratively calculating a polynomial matrix eigenvalue decompo...
Polynomial parahermitian matrices can accurately and elegantly capture the space-time covariance in ...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
In this paper, we show that the paraunitary (PU) matrices that arise from the polynomial eigenvalue ...
This paper extends the analysis of the recently introduced row-shift corrected truncation method for...
In this paper, we show that the paraunitary (PU) matrices that arise from the polynomial eigenvalue ...
A recent class of sequential matrix diagonalisation (SMD) algorithms have been demonstrated to provi...
For parahermitian polynomial matrices, which can be used, for example, to characterise space-time co...
A polynomial eigenvalue decomposition of paraher-mitian matrices can be calculated approximately usi...
In broadband array processing applications, an extension of the eigenvalue decomposition (EVD) to pa...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
A number of algorithms for the iterative calculation of a polynomial matrix eigenvalue decomposition...
In recent years, several algorithms for the iterative calculation of a polynomial matrix eigenvalue ...
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...
A number of algorithms are capable of iteratively calculating a polynomial matrix eigenvalue decompo...
Polynomial parahermitian matrices can accurately and elegantly capture the space-time covariance in ...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...
In this paper, we show that the paraunitary (PU) matrices that arise from the polynomial eigenvalue ...
This paper extends the analysis of the recently introduced row-shift corrected truncation method for...
In this paper, we show that the paraunitary (PU) matrices that arise from the polynomial eigenvalue ...
A recent class of sequential matrix diagonalisation (SMD) algorithms have been demonstrated to provi...
For parahermitian polynomial matrices, which can be used, for example, to characterise space-time co...
A polynomial eigenvalue decomposition of paraher-mitian matrices can be calculated approximately usi...
In broadband array processing applications, an extension of the eigenvalue decomposition (EVD) to pa...
A variety of algorithms have been developed to compute an approximate polynomial matrix eigenvalue d...