Add to ORKGAbstract. We establish relations between reciprocal and alternating sums involv-ing generalized Lucas numbers. 1
This paper introduces a generalization of the alternating harmonic series, expresses the sum in two ...
We prove some finite sum identities involving reciprocals of the binomial and central binomial coeff...
In this paper, we compute various binomial-double-sums involving the Fibonacci numbers as well as th...
We compute certain sums including generalized Fibonacci and Lucas numbers as well as their alternati...
In this note, the finite alternating sums of reciprocals of balancing and Lucas-balancing numbers ar...
Here we are proposing generalized sums for Fibonacci and Lucas numbers. In the case of the Fibonacc...
A brief survey of identities about reciprocal sums of products of elements in a binary recurrence se...
We present some general formulas related to sum of powers, also with alternating sign, involving Luc...
We give a combinatorial proof of an elementary property of generalized Lucas polynomials, inspired b...
In this paper we obtain some formulae for several sums of generalized Fibonacci numbers U-n and gene...
The purpose of this report is to analyze the properties of Fibonacci numbers modulo a Lucas numbers....
Motivated by a problem proposed by Seiffert a quarter of century ago, we explicitly evaluate binomia...
Recently Nathaniel Shar presented a finite sum, involving the Fibonacci numbers, that generalizes a ...
We first provide a short survey of reciprocal sums. We discuss some of the history of their computat...
Some formulas relating the classical sums of reciprocal powers are derived in a compact way by using...
This paper introduces a generalization of the alternating harmonic series, expresses the sum in two ...
We prove some finite sum identities involving reciprocals of the binomial and central binomial coeff...
In this paper, we compute various binomial-double-sums involving the Fibonacci numbers as well as th...
We compute certain sums including generalized Fibonacci and Lucas numbers as well as their alternati...
In this note, the finite alternating sums of reciprocals of balancing and Lucas-balancing numbers ar...
Here we are proposing generalized sums for Fibonacci and Lucas numbers. In the case of the Fibonacc...
A brief survey of identities about reciprocal sums of products of elements in a binary recurrence se...
We present some general formulas related to sum of powers, also with alternating sign, involving Luc...
We give a combinatorial proof of an elementary property of generalized Lucas polynomials, inspired b...
In this paper we obtain some formulae for several sums of generalized Fibonacci numbers U-n and gene...
The purpose of this report is to analyze the properties of Fibonacci numbers modulo a Lucas numbers....
Motivated by a problem proposed by Seiffert a quarter of century ago, we explicitly evaluate binomia...
Recently Nathaniel Shar presented a finite sum, involving the Fibonacci numbers, that generalizes a ...
We first provide a short survey of reciprocal sums. We discuss some of the history of their computat...
Some formulas relating the classical sums of reciprocal powers are derived in a compact way by using...
This paper introduces a generalization of the alternating harmonic series, expresses the sum in two ...
We prove some finite sum identities involving reciprocals of the binomial and central binomial coeff...
In this paper, we compute various binomial-double-sums involving the Fibonacci numbers as well as th...