İİSBF, İktisat Bölümü, Makale Koleksiyonu
Güncel Gönderiler

Summation formulas for the products of the Frobenius–Euler polynomials
(Springer, 201607)We present here a further investigation for the classical Frobenius–Euler polynomials. By making use of the generating function methods and summation transform techniques, we establish some summation formulas for the ... 
A new generalization of Apostol type Hermite–Genocchi polynomials and its applications
(Springer, 201612)By using the modified MilneThomson’s polynomial given in Araci et al. (Appl Math Inf Sci 8(6):2803–2808, 2014), we introduce a new concept of the Apostol Hermite–Genocchi polynomials. We also perform a further investigation ... 
Some new identities on the ApostolBernoulli polynomials of higher order derived from Bernoulli basis
(International Scientific Research Publications, 2016)In the present paper, we introduce a method in order to obtain some new interesting relations and identities of the ApostolBernoulli polynomials of higher order, which are derived from Bernoulli polynomial basis. Finally, ... 
Türkiye ekonomisinde 20032014 döneminde ekonomik büyüme işsizlik ve enflasyon ilişkisi
(Hasan Kalyoncu Üniversitesi, 201604)Önemli makro ekonomik değişkenlerden olan ekonomik büyüme, işsizlik ve enflasyon ülkenin genel ekonomik seyrinin değerlendirilmesinde esas alınacak önemli değişkenlerdir. İktisat literatüründe belirtilen değişkenler ... 
On (p; q)Bernoulli, (p; q)Euler and (p; q)Genocchi polynomials
(Yazar Sürümü, 2016)In the present paper, we introduce a new kind of Bernoulli, Euler and Genocchi polynomials based on the (p; q)calculus and investigate their some properties involving addition theorems, di¤erence equations, derivative ... 
New symmetric identities involving qzeta type functions
(Natural Sciences Publishing Co., 2014)The main object of this paper is to obtain several symmetric properties of the qzeta type functions. As applications of these properties, we give some new interesting identities for the modified qGenocchi polynomials. ... 
Novel identities involving Genocchi numbers and polynomials arising from applications of umbral calculus
(Elsevier, 201403)The aim of this paper is to deal with applications of umbral calculus on fermionic padic integral onZp. From those applications, we derive some new identities on Genocchi numbers and polynomials. Moreover, a systemic study ... 
Symmetric identities involving weighted qGenocchi polynomials under s4
(Jangjeon Research Institute for Mathematical Sciences and Physics, 2015)In the paper, wo obtain some new symmetric identities of weighted gGenocchi polynomials using the fermionic padic qintegral on Zp. 
Identities involving some new special polynomials arising from the applications of fractional calculus
(Natural Sciences Publishing Co., 2015)Inspired by a number of recent investigations, we introduce the new analogues of the ApostolBernoulli polynomials and the ApostolEuler polynomials, the ApostolGenocchi polynomials based on MittagLeffler function. Making ... 
Existence and uniqueness for a solution of pseudohyperbolic equation with nonlocal boundary condition
(Natural Sciences Publishing Co., 2015)Motivated by a number of recent investigations, we define and investigate the various properties of a class of pseudohyperbolic equation defined on purely integral (nonlocal) conditions. We derive useful results involving ... 
On the von StaudtClausen's theorem associated with qGenocchi numbers
(Elsevier, 201411)Recently, the von StaudtClausen's theorem for qEuler numbers was introduced by Kim (2013) and qGenocchi numbers were constructed by Araci et al. (2013). In this paper, we give the corresponding von StaudtClausen's ... 
Recent Trends in Special Numbers and Special Functions and Polynomials
(Hindawi Publishing Corporation, 2015)[No abstract available] 
On a qanalog of some numbers and polynomials
(Springer, 2015)In this paper, we introduce new qanalogs of the Changhee numbers and polynomials of the first kind and of the second kind. We also derive some new interesting identities related to the Stirling numbers of the first kind ... 
Existence and uniqueness of positive and nondecreasing solutions for a class of fractional boundary value problems involving the pLaplacian operator
(Springer, 2015)In this article, we investigate the existence of a solution arising from the following fractional qdifference boundary value problem by using the pLaplacian operator: (Formula presented.). We make use of such a fractional ... 
Analogues of Newton–Girard powersum formulas for entire and meromorphic functions with applications to the Riemann zeta function
(Elsevier, 201502)The Newton powersum formulas relate to sums of powers of roots of a polynomial with the coefficients of the polynomial. In this paper we obtain formulas that relate to sums of reciprocal powers of zeros and poles of entire ... 
Extended qDedekindtype DaeheeChanghee sums associated with extended qEuler polynomials
(Springer, 201512)In the present paper, we aim to specify a padic continuous function for an odd prime inside a padic qanalog of the extended Dedekindtype sums of higher order according to extended qEuler polynomials (or weighted qEuler ... 
Some new identities for the ApostolBernoulli polynomials and the ApostolGenocchi polynomials
(Elsevier, 201507)In this paper, we present a further investigation for the ApostolBernoulli polynomials and the ApostolGenocchi polynomials. By making use of the generating function methods and summation transform techniques, we establish ... 
On the von Staudt–Clausen's theorem related to qFrobenius–Euler numbers
(201602)In this paper, we introduce qFrobenius–Euler numbers and derive some new properties. From those properties, we show that this number is a padic integer, and can be expressed by von Staudt–Clausen's theorem. We also get ... 
A note on the values of weighted qBernstein polynomials and weighted qGenocchi numbers
(2015)The rapid development of qcalculus has led to the discovery of new generalizations of Bernstein polynomials and Genocchi polynomials involving qintegers. The present paper deals with weighted qBernstein polynomials ...