DOIAbstract
AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, without computations of determinants or matrices, most of the algebra of Hankel determinants and explains their links with other classical fields
AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, without computations of determinants or matrices, most of the algebra of Hankel determinants and explains their links with other classical fields
32 pages, LaTex, IOP macrosWe investigate the simplest class of hyperdeterminants defined by Cayley ...
We investigate the simplest class of hyperdeterminants de ned by Cayley in the case of Hankel hyperm...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, witho...
AbstractIn this note we explicitly evaluate the determinants and inverses of certain matrices that g...
AbstractThe paper continues the investigation into the links between algebraic system theory, more s...
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
In this thesis, existing methods for symbolic computation of Hankel deteriminants and matrix general...
The paper continues the investigation into the links between algebraic system theory, more specifica...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...
AbstractRecently, a definition of Hankel determinants Hkn whose entries belong to a real finite dime...
AbstractA characterization of Bézout matrices is presented as matrices the entries of which satisfy ...
Hankel determinants (persymmetric, Turan determinants) have been studying for a long time. Until now...
Abstract. Many Hankel determinants computations arising in combinatorial analysis, can be done by re...
32 pages, LaTex, IOP macrosWe investigate the simplest class of hyperdeterminants defined by Cayley ...
32 pages, LaTex, IOP macrosWe investigate the simplest class of hyperdeterminants defined by Cayley ...
We investigate the simplest class of hyperdeterminants de ned by Cayley in the case of Hankel hyperm...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
AbstractHankel determinants can be viewed as special Schur symmetric functions. This provides, witho...
AbstractIn this note we explicitly evaluate the determinants and inverses of certain matrices that g...
AbstractThe paper continues the investigation into the links between algebraic system theory, more s...
AbstractWe introduce a representation of symmetric functions as determinants of Gram matrices on the...
In this thesis, existing methods for symbolic computation of Hankel deteriminants and matrix general...
The paper continues the investigation into the links between algebraic system theory, more specifica...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...
AbstractRecently, a definition of Hankel determinants Hkn whose entries belong to a real finite dime...
AbstractA characterization of Bézout matrices is presented as matrices the entries of which satisfy ...
Hankel determinants (persymmetric, Turan determinants) have been studying for a long time. Until now...
Abstract. Many Hankel determinants computations arising in combinatorial analysis, can be done by re...
32 pages, LaTex, IOP macrosWe investigate the simplest class of hyperdeterminants defined by Cayley ...
32 pages, LaTex, IOP macrosWe investigate the simplest class of hyperdeterminants defined by Cayley ...
We investigate the simplest class of hyperdeterminants de ned by Cayley in the case of Hankel hyperm...
AbstractA new class of symmetric functions called factorial Schur symmetric functions has recently b...
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