Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can be expressed in terms of r-Stirling numbers, leading to combinatorial interpretations of many interesting identities
This book is a unique work which provides an in-depth exploration into the mathematical expertise, p...
AbstractIn this paper, we propose another yet generalization of Stirling numbers of the first kind f...
To construct a class of identities for number sequences generated by linear recurrence relations. An...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
We seek to discover combinatorial explanations of known identities involving harmonic numbers. Harmo...
AbstractA sequence of rational numbers is defined and used to derive a simple relation between Stirl...
WOS: 000383001400001In this paper, by means of q-difference operator we derive q-analogue for severa...
In this paper, polynomials whose coefficients involve $r$-Lah numbers are used to evaluate several s...
In this paper, we study the properties of the generalized harmonic numbersHn,k,r(α, β). In particula...
Abstract. In this paper, we propose the another yet generalization of Stirling numbers of the rst ki...
The master’s thesis discusses harmonic numbers These prove to be very useful in the field of number t...
In this paper, by means of the summation property to the Riordan array, we derive some identities in...
In this paper, we propose another yet generalization of Stirling numbers of the first kind for nonin...
This book is a unique work which provides an in-depth exploration into the mathematical expertise, p...
AbstractIn this paper, we propose another yet generalization of Stirling numbers of the first kind f...
To construct a class of identities for number sequences generated by linear recurrence relations. An...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can b...
We seek to discover combinatorial explanations of known identities involving harmonic numbers. Harmo...
AbstractA sequence of rational numbers is defined and used to derive a simple relation between Stirl...
WOS: 000383001400001In this paper, by means of q-difference operator we derive q-analogue for severa...
In this paper, polynomials whose coefficients involve $r$-Lah numbers are used to evaluate several s...
In this paper, we study the properties of the generalized harmonic numbersHn,k,r(α, β). In particula...
Abstract. In this paper, we propose the another yet generalization of Stirling numbers of the rst ki...
The master’s thesis discusses harmonic numbers These prove to be very useful in the field of number t...
In this paper, by means of the summation property to the Riordan array, we derive some identities in...
In this paper, we propose another yet generalization of Stirling numbers of the first kind for nonin...
This book is a unique work which provides an in-depth exploration into the mathematical expertise, p...
AbstractIn this paper, we propose another yet generalization of Stirling numbers of the first kind f...
To construct a class of identities for number sequences generated by linear recurrence relations. An...
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