AbstractA pair of general reciprocal formulas is established which is the multifold analog of Gould-Hsu inversion. Its special cases are used to give a new derivation for two kinds of convolution identities of Carlitz. The application to the multivariate interpolation process is also presented
AbstractWe compute the inverse of a specific infinite r-dimensional matrix, extending a matrix inver...
By using Gould\u27s annihilation coefficients, we obtain an explicit fundamental polynomials of Mult...
By using Gould\u27s annihilation coefficients, we obtain an explicit fundamental polynomials of Mult...
AbstractA pair of general reciprocal formulas is established which is the multifold analog of Gould-...
By means of a difference operation, a pair of reciprocal formulas is established which can be regard...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
AbstractBy means of the Hagen–Rothe formula, we establish two new matrix inversions with four parame...
As an extension of a useful inverse pair due to Gould–Hsu (1973), a gene-ral pair of reciprocal rela...
A pair of simple bivariate inverse series relations are used by embedding machinery to produce seve...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
AbstractWe compute the inverse of a specific infinite r-dimensional matrix, extending a matrix inver...
AbstractTwo types of q-extensions of Abhyankar's inversion formula for formal power series in a sing...
An expression is obtained for an I-function of r variables, transform of the Multiple Mellin convolu...
AbstractWe give a natural definition of multivariate divided differences and we construct the multiv...
AbstractWe compute the inverse of a specific infinite r-dimensional matrix, extending a matrix inver...
By using Gould\u27s annihilation coefficients, we obtain an explicit fundamental polynomials of Mult...
By using Gould\u27s annihilation coefficients, we obtain an explicit fundamental polynomials of Mult...
AbstractA pair of general reciprocal formulas is established which is the multifold analog of Gould-...
By means of a difference operation, a pair of reciprocal formulas is established which can be regard...
AbstractPart I contains a combinatorial proof of a multivariable Lagrange inversion formula. Part II...
AbstractBy means of the Hagen–Rothe formula, we establish two new matrix inversions with four parame...
As an extension of a useful inverse pair due to Gould–Hsu (1973), a gene-ral pair of reciprocal rela...
A pair of simple bivariate inverse series relations are used by embedding machinery to produce seve...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
AbstractWe compute the inverse of a specific infinite r-dimensional matrix, extending a matrix inver...
AbstractTwo types of q-extensions of Abhyankar's inversion formula for formal power series in a sing...
An expression is obtained for an I-function of r variables, transform of the Multiple Mellin convolu...
AbstractWe give a natural definition of multivariate divided differences and we construct the multiv...
AbstractWe compute the inverse of a specific infinite r-dimensional matrix, extending a matrix inver...
By using Gould\u27s annihilation coefficients, we obtain an explicit fundamental polynomials of Mult...
By using Gould\u27s annihilation coefficients, we obtain an explicit fundamental polynomials of Mult...
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