Dinç, Yavuz

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https://hdl.handle.net/20.500.12514/8024
Name Variants
Dinc, Yavuz
DİNÇ, Yavuz
Job Title
Dr. Öğr. Üyesi
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Main Affiliation
Department of Management / İşletme Bölümü
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Current Staff
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Scholarly Output

7

Articles

7

Views / Downloads

23/792

Supervised MSc Theses

0

Supervised PhD Theses

0

WoS Citation Count

10

Scopus Citation Count

13

WoS h-index

1

Scopus h-index

2

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0

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0

WoS Citations per Publication

1.43

Scopus Citations per Publication

1.86

Open Access Source

6

Supervised Theses

0

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JournalCount
Communications Faculty Of Science University of Ankara Series A1Mathematics and Statistics1
Facta Universitatis-Series Mathematics and Informatics1
JOURNAL OF TAIBAH UNIVERSITY FOR SCIENCE1
Mathematical Methods in the Applied Sciences1
Palestine Journal of Mathematics1
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Now showing 1 - 7 of 7
  • Thumbnail Image
    Article
    Buluş Yöntemi İle Öğretimin Üslü Sayılar Konusunu Öğrenme Düzeyine Ve Erişiye Etkileri
    (Abant İzzet Baysal Üniversitesi Eğitim Fakültesi Dergisi, 2003) DİNÇ, Yavuz; BİLGİN, Tunay
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    Article
    Qualitative Analysis of Solutions for a Timoshenko Type Equation With Logarithmic Source Term
    (Univ Nis, 2025) Dinc, Yavuz; Irkil, Nazli; Piskan, Erhan; Tunc, Cemil
    This paper deals with a Timoshenko type equation with strong damping and logarithmic source terms. The global existence and the decay estimate of the solutions have been obtained. We reproduce the finite time blow up results of weak solutions by the combining of the concavity method, perturbation energy method and differential-integral inequality technique. These results extend and improve some recent results in logarithmic nonlinearity.
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    Article
    Citation - Scopus: 2
    Lower and upper bounds for the blow up time for generalized heat equations with variable exponents
    (Palestine Journal of Mathematics, 2021) Pişkin, Erhan; Dinç, Yavuz; Tunç, Cemil
    This paper deals with the initial-boundary value problem for generalized heat equations with variable exponent in a bounded domain. Under suitable conditions, we discuss the lower and upper bounds for the blow up time of solutions.
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    Article
    Citation - WoS: 10
    Citation - Scopus: 11
    Qualitative properties of certain non-linear differential systems of second order
    (TAYLOR & FRANCIS LTD, 2017) Tunc, Cemil; Dinc, Yavuz
    In this paper, we study the boundedness and square integrability of solutions in certain non-linear systems of differential equations of second order. We establish two new theorems, which include suitable sufficient conditions guaranteeing the boundedness and square integrability of solutions to the considered systems. The presented proofs simplify previous works since the Gronwall inequality is avoided which is the usual case. The technique of proof involves the integral test, and two examples are included to illustrate the results. (C) 2016 The Authors. Production and hosting by Elsevier B.V. on behalf of Taibah University.
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    Article
    Qualitative properties of certain non-linear differential systems ofsecond order
    (Elsevier, 2017) TUNÇ, CEMİL; DİNÇ, Yavuz
    In this paper, we study the boundedness and square integrability of solutions in certain non-linear systems of differential equations of second order. We establish two new theorems, which include suitable sufficient conditions guaranteeing the boundedness and square integrability of solutions to the considered systems. The presented proofs simplify previous works since the Gronwall inequality is avoided which is the usual case. The technique of proof involves the integral test, and two examples are included to illustrate the results.
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    Article
    On Innovative Conditions for Weighted Hardy-Type Inequalities on Time Scales
    (Wiley, 2025) Akin, Lutfi; Dinc, Yavuz
    This article presents necessary and sufficient conditions for novel characterizations of weighted Hardy-type inequalities applying the chain rule, Minkowski's inequality, and H & ouml;lder's inequality with nabla calculus on time scales. Properties of time scales and Okpoti inequality are exploited to derive our results. These results differ from classical weighted Hardy-type inequalities because they are examined on time scales that combine discrete and continuous cases.
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    Article
    Upper Bounds for the Blow Up Time for the Kirchhoff-Type Equation
    (Ankara Univ, Fac Sci, 2023) Dinc, Yavuz; Piskin, Erhan; Tunc, Cemil
    . In this research, we take into account the Kirchhoff type equation with variable exponent. The Kirchhoff type equation is known as a kind of evolution equations,namely, PDEs, where t is an independent variable. This type problem can be extensively used in many mathematical models of various applied sciences such as flows of electrorheological fluids, thin liquid films, and so on. This research, we investigate the upper bound for blow up time under suitable conditions.