Some identities involving rational sums

Abstract: In this note a procedure to deduce new identities involving elementary rational sums is presented and applying this technique some sums including binomial coefficients and harmonic numbers are obtained.

“…Remark 5 Theorem 1 of Díaz-Barrero et al [2] would follow from the assertion (27) of Corollary 1 when we set λ = −n − 1 (n ∈ N) and apply the combinatorial identity (29). Alternatively, by merely putting μ = 0 in the assertion (31) of Corollary 2, we arrive at the combinatorial series identity (5) Remark 6 With a view to deducing the combinatorial series identity (6) asserted by Theorem 2, we simply set λ = −n − 1 (n ∈ N) in the assertion (28) of Corollary 1 and make use the combinatorial identity (29) or (alternatively) μ = 0 in the assertion (32) of Corollary 2.…”

“…Díaz-Barrero et al [2] presented a procedure to derive generalizations and extensions of the identity (4) given by Theorems 1 and 2.…”

“…At least two subsequent works [6,10] have been motivated by the aforementioned investigation by Díaz-Barrero et al [2]. While Sofo [10] used the method of integral representations in order to recapture Theorems 1 and 2 and to highlight closed-form evaluations of other combinatorial sums, the work of Prodinger [6] provided an alternative approach to such series identities as those given by Theorems 1 and 2, which is based upon the principles of inverse pairs and partial-fraction decomposition (see also the references cited in each of the earlier works [6,10]).…”

Some combinatorial series identities and rational sums

“…Remark 5 Theorem 1 of Díaz-Barrero et al [2] would follow from the assertion (27) of Corollary 1 when we set λ = −n − 1 (n ∈ N) and apply the combinatorial identity (29). Alternatively, by merely putting μ = 0 in the assertion (31) of Corollary 2, we arrive at the combinatorial series identity (5) Remark 6 With a view to deducing the combinatorial series identity (6) asserted by Theorem 2, we simply set λ = −n − 1 (n ∈ N) in the assertion (28) of Corollary 1 and make use the combinatorial identity (29) or (alternatively) μ = 0 in the assertion (32) of Corollary 2.…”

“…Díaz-Barrero et al [2] presented a procedure to derive generalizations and extensions of the identity (4) given by Theorems 1 and 2.…”

“…At least two subsequent works [6,10] have been motivated by the aforementioned investigation by Díaz-Barrero et al [2]. While Sofo [10] used the method of integral representations in order to recapture Theorems 1 and 2 and to highlight closed-form evaluations of other combinatorial sums, the work of Prodinger [6] provided an alternative approach to such series identities as those given by Theorems 1 and 2, which is based upon the principles of inverse pairs and partial-fraction decomposition (see also the references cited in each of the earlier works [6,10]).…”

Some combinatorial series identities and rational sums

“…In addition, Eq. (4.5) contains many known identities such as the identity of Barrero-Báguena-Popescu [6], the identity of Guo and Zhang [14], the identities of Prodinger [21,22], the identity of Mansour-Shattuck-Song [17], and the identity of Chu and Yan [3,4]. It also contains several identities involving harmonic numbers and q-harmonic numbers [16,25,26].…”

Combinatorial identities from contour integrals of rational functions

“…See Theorem 2.2 in [13]. In the paper [5], Díaz-Barrero et al obtained two identities involving rational sums:…”

On a General $q$-Identity