The aim of this paper is to answer the question in Remark 8.2 of Takahiro Hayata, Harutaka Koseki, and Takayuki Oda, Matrix coefficients of the middle discrete series of SU(2; 2), J. Funct. Anal. 185 (2001), 297{341, by giving an elementary proof of certain identities on binomials
This paper presents a theorem on the binomial coefficients of combinatorial geometric series and its...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
This paper focuses on the successive partition applied to binomial identity on the coefficients of c...
The aim of this paper is to answer the question in Remark 8.2 of Takahiro Hayata, Harutaka Koseki, a...
The aim of this paper is to answer the question in Remark 8.2 of Takahiro Hayata, Harutaka Koseki, a...
In this paper, the authors establish some identities involving inverses of binomial coefficients and...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
This paper presents a new combinatorial identity on the binomial coefficients of combinatorial geome...
AbstractAn explicit formula for the radial part of matrix coefficients of the discrete series of Gel...
AbstractAn explicit formula for the radial part of matrix coefficients of the discrete series of Gel...
The coefficient of each term in combinatorial geometric series refers to a binomial coefficient. Thi...
AbstractIn this paper, we present a method for obtaining a wide class of combinatorial identities. W...
This paper presents a binomial and factorial theorem on the binomial coefficients for combinatorial ...
This paper presents a theorem on the binomial coefficients of combinatorial geometric series and its...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
This paper focuses on the successive partition applied to binomial identity on the coefficients of c...
The aim of this paper is to answer the question in Remark 8.2 of Takahiro Hayata, Harutaka Koseki, a...
The aim of this paper is to answer the question in Remark 8.2 of Takahiro Hayata, Harutaka Koseki, a...
In this paper, the authors establish some identities involving inverses of binomial coefficients and...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
This paper presents a new combinatorial identity on the binomial coefficients of combinatorial geome...
AbstractAn explicit formula for the radial part of matrix coefficients of the discrete series of Gel...
AbstractAn explicit formula for the radial part of matrix coefficients of the discrete series of Gel...
The coefficient of each term in combinatorial geometric series refers to a binomial coefficient. Thi...
AbstractIn this paper, we present a method for obtaining a wide class of combinatorial identities. W...
This paper presents a binomial and factorial theorem on the binomial coefficients for combinatorial ...
This paper presents a theorem on the binomial coefficients of combinatorial geometric series and its...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
This paper focuses on the successive partition applied to binomial identity on the coefficients of c...
DOI
Add to ORKG