AbstractIn this paper the problem of complexity of multiplication of a matrix with a vector is studied for Toeplitz, Hankel, Vandermonde, and Cauchy matrices and for matrices connected with them (i.e., for transpose, inverse, and transpose to inverse matrices). The proposed algorithms have complexities of at most O(n log2n) flops and in a number of cases they improve the known estimates. In these algorithms, in a separate preprocessing phase, are singled out all the actions on the preparation of a given matrix which aimed at the reduction of the complexity of the second stage of computations directly connected with multiplication by an arbitrary vector. Effective algorithms for computing the Vandermonde determinant and the determination of ...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
AbstractFast algorithms for computing the product with a vector are presented for a number of classe...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
Structured linear algebra techniques are a versatile set of tools; they enable one to deal at once w...
AbstractRepresentations of real Toeplitz and Toeplitz-plus-Hankel matrices are presented that involv...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
AbstractThe known fast algorithms for computations with general Toeplitz, Hankel, Toeplitz-like, and...
Abstract. The papers [MRT05], [CGS07], [XXG12], and [XXCBa] have combined the advanced FMM technique...
By combining Kaltofen's 1992 baby steps/giant steps technique for Wiedemann's 1986 determinant algor...
The papers [MRT05], [CGS07], [XXG12], and [XXCB14] combine the techniques of the Fast Multipole Meth...
We show that any n × n matrix A over any finite semiring can be preprocessed in O(n 2+ε) time, such ...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
AbstractFast algorithms for computing the product with a vector are presented for a number of classe...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
Structured linear algebra techniques are a versatile set of tools; they enable one to deal at once w...
AbstractRepresentations of real Toeplitz and Toeplitz-plus-Hankel matrices are presented that involv...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
AbstractThe known fast algorithms for computations with general Toeplitz, Hankel, Toeplitz-like, and...
Abstract. The papers [MRT05], [CGS07], [XXG12], and [XXCBa] have combined the advanced FMM technique...
By combining Kaltofen's 1992 baby steps/giant steps technique for Wiedemann's 1986 determinant algor...
The papers [MRT05], [CGS07], [XXG12], and [XXCB14] combine the techniques of the Fast Multipole Meth...
We show that any n × n matrix A over any finite semiring can be preprocessed in O(n 2+ε) time, such ...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...