AbstractDeterminants of higher derivatives of composite functions are evaluated as limits of the corresponding ones concerning finite differences. As examples, several interesting identities of Wronskian and Hankel determinants are consequently derived
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
AbstractThe goal of this research is to characterize the λ(n)-convex functions in terms of determina...
AbstractThe main result of this paper is the following: if both A=(aij) and B=(bij) are M-matrices o...
AbstractDeterminants of higher derivatives of composite functions are evaluated as limits of the cor...
AbstractThe first derivative of the determinant function is given by the well-known Jacobi’s formula...
The first derivative of the determinant function is given by the well-known Jacobi's formula. We obt...
AbstractA q-analogue of Mehta–Wang's determinant is introduced and evaluated. In the case when q=1, ...
AbstractWe explore the extent to which a variant of a celebrated formula due to Jost and Pais, which...
AbstractFinite difference equations may be thought of as discrete analogues of delay equations. Taki...
Abstract. The main aim of this paper to establish the relations between forward, backward and centra...
Hankel matrices are related to a wide range of disparate determinant computations and algorithms and...
AbstractUsing old results on the explicit calculation of determinants, formulae are given for the co...
AbstractIn this paper, we study closed form evaluation for some special Hankel determinants arising ...
AbstractFor a fixed positive integer ℓ, let f(n,ℓ) denote the number of lattice paths that use the s...
AbstractIn this paper we provide a new and concise evaluation of det(????????????)0≦i,j≦n−1. This de...
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
AbstractThe goal of this research is to characterize the λ(n)-convex functions in terms of determina...
AbstractThe main result of this paper is the following: if both A=(aij) and B=(bij) are M-matrices o...
AbstractDeterminants of higher derivatives of composite functions are evaluated as limits of the cor...
AbstractThe first derivative of the determinant function is given by the well-known Jacobi’s formula...
The first derivative of the determinant function is given by the well-known Jacobi's formula. We obt...
AbstractA q-analogue of Mehta–Wang's determinant is introduced and evaluated. In the case when q=1, ...
AbstractWe explore the extent to which a variant of a celebrated formula due to Jost and Pais, which...
AbstractFinite difference equations may be thought of as discrete analogues of delay equations. Taki...
Abstract. The main aim of this paper to establish the relations between forward, backward and centra...
Hankel matrices are related to a wide range of disparate determinant computations and algorithms and...
AbstractUsing old results on the explicit calculation of determinants, formulae are given for the co...
AbstractIn this paper, we study closed form evaluation for some special Hankel determinants arising ...
AbstractFor a fixed positive integer ℓ, let f(n,ℓ) denote the number of lattice paths that use the s...
AbstractIn this paper we provide a new and concise evaluation of det(????????????)0≦i,j≦n−1. This de...
AbstractThe Jacobi–Trudi identity expresses a skew Schur function as a determinant of complete symme...
AbstractThe goal of this research is to characterize the λ(n)-convex functions in terms of determina...
AbstractThe main result of this paper is the following: if both A=(aij) and B=(bij) are M-matrices o...
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