AbstractAs a generalization of Calkin's identity and its alternating form, we compute a kind of binomial identity involving some real number sequences and a partial sum of the binomial coefficients, from which many interesting identities follow
AbstractUsing the exponential generating function and the Bell polynomials, we obtain several new id...
This paper deals with the classical quest for 'closed\ud form' expressions of series. Identities are...
Let m be a nonnegative integer. For integers 0 6 k 6 m and n> 0 we show the following curious ide...
AbstractIn this article we shall obtain an identity for the alternating sum of the cubes of the part...
AbstractWe give a fairly direct proof of an identity involving powers of sums of binomial coefficien...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
1991 Mathematics Subject Classification. 05A10.In this note we shall prove the following curious ide...
AbstractIn this paper, we present a method for obtaining a wide class of combinatorial identities. W...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
In this note a procedure to obtain identities involving rational sums of real numbers is presented....
In this paper, the authors establish some identities involving inverses of binomial coefficients and...
AbstractAlong two different proofs of a double-sum identity involving binomial coefficients this pap...
AbstractThe purpose of this article is to discuss the following sum: Rp=Apl+…+(−1)nApN and obtain it...
This paper presents a new combinatorial identity on the binomial coefficients of combinatorial geome...
AbstractThe problem of proving a particular binomial identity is taken as an opportunity to discuss ...
AbstractUsing the exponential generating function and the Bell polynomials, we obtain several new id...
This paper deals with the classical quest for 'closed\ud form' expressions of series. Identities are...
Let m be a nonnegative integer. For integers 0 6 k 6 m and n> 0 we show the following curious ide...
AbstractIn this article we shall obtain an identity for the alternating sum of the cubes of the part...
AbstractWe give a fairly direct proof of an identity involving powers of sums of binomial coefficien...
AbstractIn this communication we shall prove a curious identity of sums of powers of the partial sum...
1991 Mathematics Subject Classification. 05A10.In this note we shall prove the following curious ide...
AbstractIn this paper, we present a method for obtaining a wide class of combinatorial identities. W...
This paper presents binomial theorems on combinatorial identities that are derived from the binomial...
In this note a procedure to obtain identities involving rational sums of real numbers is presented....
In this paper, the authors establish some identities involving inverses of binomial coefficients and...
AbstractAlong two different proofs of a double-sum identity involving binomial coefficients this pap...
AbstractThe purpose of this article is to discuss the following sum: Rp=Apl+…+(−1)nApN and obtain it...
This paper presents a new combinatorial identity on the binomial coefficients of combinatorial geome...
AbstractThe problem of proving a particular binomial identity is taken as an opportunity to discuss ...
AbstractUsing the exponential generating function and the Bell polynomials, we obtain several new id...
This paper deals with the classical quest for 'closed\ud form' expressions of series. Identities are...
Let m be a nonnegative integer. For integers 0 6 k 6 m and n> 0 we show the following curious ide...
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