ÖZGEÇMİŞ
ÜNVANI, ADI-SOYADI: Prof. Dr. M. Emin ÖZDEMİR
İLEİŞİM BİLGİLERİ : eminozdemir@uludag.edu.tr- 42179
EĞİTİM DURUMU
LİSANS |
Atatürk Üniversitesi- Fen Edebiyat Fakültesi-1985-1989 |
YÜKSEK LİSANS |
Atatürk Üniversitesi- Fen Bilimleri Enstitüsü 1990-1992 |
DOKTORA |
Atatürk Üniversitesi- Fen Bilimleri Enstitüsü 1990-1995 |
DR.ÖĞRT. ÜYESİ |
Atatürk Üniversitesi- Kazım Karabekir Eğitim Fakültesi 1995-196 |
DOÇENT |
Atatürk Üniversitesi- Kazım Karabekir Eğitim Fakültesi 2003-2008 |
PROFESÖR |
Atatürk Üniversitesi- Kazım Karabekir Eğitim Fakültesi 2008-2015 Bursa Uludağ Üniversitesi –Eğitim Fakültesi 2015--------- |
A
ESERLER
Kitaplar
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Makaleler
ESERLER LİSTESİ THE PAPERS IN 2019 124. Erhan Set, M. Emin ÖZDEMİR and Necla KORKUT, Certain New Hewrmite Hadamard Type Inequalities for Convex Functions Via Fractional Integrals, Commun.Fac.Sci. Univ. Ank.ser. A1 Mat.Stat. Volume 68, Number 1, pages 61-69 (2019). DOI: 10.1501/Commua1_0000000891 THE PAPERS IN 2018 123. M. Emin Özdemir , Inequalities On Geometrically Convex Functions, Math Sci. Lett.7, No.3, pp. 145-149 (2018). 122. Ahmet Ocak Akdemir, M. Emin Özdemir and Erhan Set, New Hadamard- Type Inequalities for -Convex and -Convex Functions, Math Sci. Lett.7, No.3, 1-6 (2018). 121. Çetin Yıldız and M. Emin ÖZDEMİR, A New Generalization for n-time Differentiable Mappings which are Convex, Turkish J. Ineq., 2 (1) (2018), Pages 42-53. 120. Hüseyin budak, Fuat Usta, Mehmet Zeki Sarıkaya, M. Emin ÖZDEMİR., On Generalization of midpoint type inequalities with generalized fractional integral operators, RACSAM, https://doi.org/10.1007/s13398-018-0514-z, Orijinal Paper, Published Online: 01 March 2018.(SCI-EXPANDED ) 119. Merve Avci Ardiç, Ahmet Ocak Akdemir, M. Emin Özdemir., Several inequalities For log-convex functions, Transactions of A. Razmadze Mathematical Institute 172 (2018) 140-145. https://doi.org/10.1016/j.trmi.2018.03.004 THE PAPERS IN 2017 118. Erhan Set, İlker Mumcu, M. Emin ÖZDEMİR, On the More General h-Hermite-Hadamard type inequalities for convex functions via conformable fractional integrals, Topolo. Algebra Appl. (2017); 5:67-73. 117. SET ERHAN,AKDEMİR AHMET OCAK,ÖZDEMİR MUHAMET EMİN (2017). Simpson Type Integral Inequalities for Convex Functions Via Riemann Liouville Integrals. Filomath 31:14 (2017), 4415-4420, https://doi.org/10.2298/FIL1714415S.(SCI) 116. Ahmet Ocak Akdemir, Merve Avcı Ardıç, M. Emin Özdemir, Inequalities Via -Convexity and Log-Convexity, Topol. Algebra Appl. 2017; 5: 74-85, 115. Çetin Yıldız, M. Emin ÖZDEMİR, On Generalized Inequalities of Hermite Hadamard Type for Convex Functions, International Journal of Analysis and Applications , ISSN 2291-8639, Volume 14 , Number 1 (2017) , 52-63 114. Ahmet Ocak Akdemir, and M. Emin Özdemir, (h, m)–convex functions on Δ = [a, b] × [c, d] and Hadamard-type integral inequality, AIP Conference Proceedings 1833, 020028 (2017); http://doi.org/10.1063/1.49816761 113. Ahmet Ocak Akdemir, and M. Emin Özdemir, Integral inequalities for co-ordinated s–convex functions, AIP Conference Proceedings 1833, 020027 (2017); http://doi.org/10.1063/1.4981675. 112. Erhan Set, M. Emin Özdemir, and E. Aykan Alan, On new fractional Hermite-Hadamard type inequalities for n-time differentiable quasi-convex functions and P–functions, AIP Conference Proceedings 1833, 020031 (2017); http://doi.org/10.1063/1.4981679 111. Alper Ekinci, Ahmet Ocak Akdemir, and M. Emin Özdemir, On Hadamard-type inequalities for co-ordinated r−convex functions, AIP Conference Proceedings 1833, 020118 (2017); http://doi.org/10.1063/1.4981766 110. Merve Avcı-Ardıç and M. Emin ÖZDEMİR, Inequalities for log-convex functions via three times differentiability, Celal Bayar Universitesi Fen Bilimleri Enstitüsü Dergisi, Cilt 13, Sayı 2, sayfa 353-358. (2017) 109. Ahmet Ocak Akdemir, M. Emin Ozdemir, Merve Avcı Ardıc, Abdüllatif Yalçın, Some New generalizations for GA- Convex Functions, Filomat 31:4 (2017), 1009-1016, DOI 10.2298/FIL1704009A ( SCI ). 108. M. Emin Ozdemir, Ahmet Ocak Akdemir, Integral Inequalities for Some Convex Functions, Eastern Anatolian Journal of Science, Volume II , Issue I , 1-6. 107. Erhan Set, M. Emin Ozdemir, M. Zeki Sarıkaya and Filiz Karakoç, Hermite-Hadamard Type Inequalities for (alfa,m)- Convex Functions via Fractional Integrals, Moroccan Journal of Pure and Applied Analysis, DOI 10.1515/mjpaa-2017-0002, Volume 3(1), 2017, pages 15-21, ISSN: 2351-8227. 106. Çetin Yıldız, M. Emin Özdemir, Havva Kavurmacı Önalan, Fractional integral Inequalities via s-Convex Functions, Turkish Journal of Analysis and Number Theory, Vol. 5. No. 1, 18-22, DOI: 10.12691/tjant/5/1/4. THE PAPERS IN 2016 105. Çetin Yildiz, E. M. Özdemir, M. Gürbüz, On Some New Fejer Type ınequalities, Caspian Journal of Applied Mathematics, Ecolojy and Economics, V.4 , No 2 , 2016 , December, ISNN 1560-4055. 104. Cetin Yildiz, M. Emin Ozdemir and M. Zeki Sarikaya, "New generalizations of Ostrowski-like type inequalities for fractional integral", Kyungpook Mathematical Journal, 56(2), 2016, 161-172. 103. M.E.Özdemir, Merve Avcı Ardıç and Havva Kavurmacı Önalan, Hermite-Hadamard Type Inequalities for s- conveks and s-concave functions via fractional integrals., Turkish Journal of Science Volume I, Issue I, 28-40, 2016. 102. A.O.Akdemir and M.E.Özdemir, New integral inequalities for co-ordinated m–convex functions, AIP Conf. Proc. 1726, 020075-1–020075-5; doi: 10.1063/1.4945901. 101. A.O.Akdemir and M.E.Özdemir, Some Hermite-Hadamard Type Inequalities for (alpha,m)- Convex Functions on the Co-ordinates, AIP Conf. Proc. 1726, 020083-1–020083-5; doi: 10.1063/1.4945909. 100. M.E.Özdemir, M. Avcı-Ardıç and A.O.Akdemir, SimpsonType Inequalities via ϕ−Convexity, AIP Conf. Proc. 1726, 020057-1–020057-6; doi: 10.1063/1.4945883. 99. M.E.Ozdemir, M. A. Latif and A.O.Akdemir, On Some Hadamard-Type Inequalities for Product of Two Convex Functions On the Co-ordinates, Turkish Journal of Science, Volume I, Issue I, 41-58, 2016. 98. M. Emin ÖZDEMİR, Merve Avcı-Ardıç and H. Kavurmacı-Önalan, Hermite-Hadamard type inequalities for s-convex and s-concave functions via fractional integrals, Turkish Journal of Science, Vol 1, Issue 1, pages 28-40. 97. Erhan Set, M. Emin ÖZDEMİR, Ahmet Ocak Akdemir, On the Generalization of Simpson Type ınequalities for Quasi-convex Functions, Turkish Journal of Analysis and Number Theory, 2016, Vol. 4, No 1, 1-9, DOI. 10.12 96. M. Emin ÖZDEMİR, Ahmet Ocak Akdemir, Erhan Set, On (h-m) Convexity and Hadamard-Type Inequalities, TJMM, 8 (2016), No. 51-58. 95. M. Emin ÖZDEMİR, Ahmet Ocak Akdemir, Merve Avcı, ARDIÇ, New Hadamard- Type Inequalities for M-Convex Functions, Academic Journal of Sciences, CD-ROM. ISSN: 2165-6282 :: 06(01) : 53-60 (2016 ) 94. M. Emin ÖZDEMİR and Alper EKINCI, Generalized Integral Inequalities for Convex Functions, Mathematical Inequalities and Applications ( MIA), Volume 19, Number 4 (2016), 1429-1439 (SCI)
THE PAPERS IN 2015 93 . . Özdemir, M.E. and Akdemir, A.O., On the Hadamard Type Inequalities Involving Product of Two Convex Functions on the Co-ordinates, Tamkang Journal of Mathematics, Volume 46 , Number 2 , 129-142, June 2015, doi: 10.5556/j.tkjm.46.2015.1647. 92. M.Emin Ozdemir, Erhan Set, A. Ocak Akdemir and M. Zeki Sarikaya, Some New Cebyšev Type Inequalities for Functions Whose Derivatives Belongs to L_{p} Spaces, Afr. Mat. (2015) 26:1609–1619.
91. Çetin Yıldız, M. Emin Özdemir, M. Zeki Sarıkaya, New Generalizations of Ostrowski-Like Type Inequalities for Fractional Integrals, Kyungpook Math. J. 56(2016), 161-172, http://dx.doi.org/10.5666/KMJ.2016.56.1.161 pISSN 1225-6951 eISSN 0454-8124 °c Kyungpook Mathematical Journal.
90. Çetin Yıldız, M. Emin Özdemir, On New Fejer Type Inequalities for m-Convex and Quasi Functions, Tbilisi Mathematical Journal 8 (2) (2015), pp 325-333. 89. Erhan Set, İmdat işcan, M. Zeki Sarıkaya, M. Emin ÖZDEMİR, On new inequalities of Hermite-Hadamard-Fejer Type for convex functions via fractional integrals, Applied Mathematics and Computation 259 (2015) 875-881. (SCI) 88. Erhan Set, M. Emin ÖZDEMİR, M. Zeki Sarıkaya, Filiz Karakoç, Hermite-Hadmard Type Inequalities for Mappings Whose Derivatives are s-Convex in the Second sense via Fractional Integrals., Khayyam J. Math. 1(2015), no .1,62-70
87. M. E. OZDEMIR, Some inequalities for the s-Godunova–Levin type functions, Math Sci DOI 10.1007/s40096-015-0144-y, 17 March 2015. Abstracted/Indexed in: Zentralblatt Math, Google Scholar, DOAJ, Mathematical Reviews, OCLC, Summon by ProQuest. 86. Çetin Yildiz, M. E. OZDEMIR, Havva Kavurmacı Onelan, Fractional integral inequalities for different functions, New Trends in Mathematics Sciences( NTMSCI), NTMSCI 3, No.2, 110-117 (2015). 85. M. E. OZDEMIR, Merve Avci, Ardic, Some Companions of Ostrowski type inequality for functions whose second derivatives are convex and concave with applications, Arab Journal of Mathematical Sciences, Arb J Math Sci 21(1), 53-56. 2015. 84. M. E. OZDEMIR, Havva Kavurmacı ÖNALAN, Merve Avcı, ARDIÇ, Hermite Hadamard type Inequalities for - Convex Functions, J. Concrete and Appliciable Mathematics, Vol.13, No.’S 1-2, 96-107, 2015, Copyright 2015 Eudoxus Press LLC.
83. M. Emin Özdemir, Erhan Set and Ahmet Ocak Akdemir, On The (r,s) –Convexity and Some Hadamard-Type Inequalities, J. Applied Functional Analysis, Vol,No’ S 1-22, 95-100, 2015, Copyright 2015 Eudoxus Press, LLC. THE PAPERS IN 2014 82. Erhan Set, M. Zeki Sarikaya, M.Emin Ozdemir and Huseyin Yildirim, The Hermite-Hadamard's inequality for some convex functions via fractional integrals and related results, Journal of Applied Mathematics, Statistics and Informatics (JAMSI), Volume 10, Number 2, December 2014. 81. Özdemir, M.E., Set, E. and Akdemir, A.O., (2014). On some Hadamard type inequalities for (r,m)-convex functions, Applications and Applied Mathematics: An International Journal (AAM), Vol. 9, Issue 1 (June 2014 ), pp. 388-401.
80. M. Emin Ozdemir, Çetin Yıldız, An Ostrowski type inequality for derivatives of q-th power of s-convex functions via fractional integrals, Georgian Mathematical Journal, 2014, 21(4), 491-498 (SCI) 79. M. Emin Ozdemir, On Iyengar- Type Inequalities via Quasi-Convexity and Quasi-Concavity( SCI.) Miskolc Mathematical Notes, vol.15 (2014), No.1, pp. 171-181. 78. İmdat işcan, Erhan Set, M. Emin ÖZDEMİR, Some new general integral inequalities for P-Functions, Malaya Journal of Matematik, 2 (4) (2014) 510-516, ISSN:2319-3786.hygt 77. İmdat İşcan, Erhan Set, M. Emin Ozdemir, On The General Integral for s-Convex Functions, ( SCI.) Applied Mathematics Computation, 246 (2014) 306-315. 76. M. Emin Ozdemir, Akdemir, Ahmet Ocak, Havva kavurmacı, On the Simpson’s Inequalitiy for Convex Functions on The Co-Ordinates, Turkish J. of Analysis and Number Theory, 2014, Vol.2, No.5, 165-169, Doi: 12691/tjant-2-5-2. 75. M. Emin Ozdemir , Çetin Yıldız , Mustafa Gürbüz, A note on geometrically convex functions, Journal of Ineq. And Appl., ( SCI.) 2014, 2014:180. 74. M. Emin Ozdemir , Mustafa Gürbüz, Çetin Yıldız, Inequalities for mappings whose second derivatives are quasi-convex or h-convex functions, Miskolc Mathematics Notes( SCI.) ( 2014), vol 15, 2014 NO:2 pp. 635-649. 73. Ozdemir, M. Emin; Yildiz, Cetin; Akdemir, Ahmet Ocak, On the Co-Ordinated Convex Functions , Applied Mathematics & Information Sciences Volume: 8 Issue: 3 Pages: 1085-1091 Published: MAY 2014.(SCI) 72. 77. Mehmet Zeki Sarikaya, . Erhan Set, M. Emin Ozdemir, On Some Inequalities for twice differentiable mappings, Stud.Univ.Babeş-Bolyai Math.59(2014),No.1, 11-24. (SCI). 71. Erhan Set, Mehmet Zeki Sarikaya, M. Emin Ozdemir, Some Ostrowsk’s Type Inequalities for Functions whose Second Derivatives are s-Convex in the Second Sense, DEMONSTRATIO MATHEMATICA, Vol. XLVII No 1 2014. 70. Muhammad Amer Latif, Muhamet Emin Özdemir and Ahmet Ocak Akdemir, New Inequalities of Hermite- Hadamard Type for Functions whose Derivatives in Absolute value are Quasi-Convex with Applications, Ananele Universitatii oradea, Fasc. Matematica, Tom XXI (2014), Issue No. 1, 13-27. THE PAPERS IN 2013 69. M. Zeki Sarıkaya, Erhan Set and M. Emin Özdemir,On new Inequalities of Simpson’s type for Functions whose Second Derivatives Absolute Values are Convex., Journal of Applied mathematics, Statistics and Informatics ( JAMSI ) , 9, (2013) , No.1 (SCI) 68. M. Emin Özdemir, Havva Kavurmacı and Merve Avcı, Some Integral Inequalities For Convex Functions, Tamkang Journal Of Mathematics, Accepted.Vol. : 44, Number 3.,253-259, Autumn 2013, doi. 10.5556/j.tkjm.44.2013.1016
67. Özdemir, M.E., Tunç, M. and Akdemir, A.O., On Some New Hadamard Like Inequalities for Coordinated s-convex Functions, Facta Universitatis Series Mathematics and Informatics, Vol 28 No 3 (2013). 66. M. Emin ÖZDEMİR, Çetin YILDIZ, Ahmet Ocak Akdemir and Erhan Set, On Some Inequalities for s- Convex Functions and Applications, Journal of Inequalities and Applications , 2013, 2013:333.(SCI) 65. M. Emin ÖZDEMİR, Çetin YILDIZ, New Ostrowski Type Inequalities for Geometrically Convex Functions, International Journal of Modern Mathematical Sciences, ISSN: 2166-286X, 8(1). 27-35, Florida, USA,2013. 64. M. Emin ÖZDEMİR, S.S. Dragomir and Çetin YILDIZ, The Hadamard Inequality for Convex Function via Fractional Integrals, Acta Mathematica Scientia .(SCI)2013, 33B(5). 1293-1299 61. M. Emin ÖZDEMİR , Çetin YILDIZ, New Inequalities for Hermite- Hadamard and Simpson Type with Applications, Tamkang Journal of Mathematics, 44 (2), Page: 209-216, 2013.
59. M. Emin ÖZDEMİR , Mustafa GÜRBÜZ and Havva Kavurmacı, Hermite- Hadamard Type Inequalities for (g, fi-h)- Convex Dominated Functions, Journal of Inequalities and Applications , 2013, 2013:84(SCI) 58. M. Emin ÖZDEMİR, Mevlüt Tunç, Ahmet Ocak AKDEMİR, On (h-s) –Convex Functions and Hadamard- Type Inequalities, Int. Journal . Open Compt., Vol. 6, No. 2, June 2013 THE PAPERS IN 2012 57. Erhan Set, Mehmet Zeki Sarıkaya, M. Emin ÖZDEMİR, Some Ostrowski’s Type Inequalities for Functions whose second Derivatives are S-Convex in the Second Sense,(Demonstratio Math)( Kabul Edildi 2014 de basılacak= in press) 56. Erhan Set, M. Emin ÖZDEMİR, Mehmet Zeki Sarıkaya, New Inequalities of Ostrowski’s type for S- Convex Functions in the Second Sense with Applications, Facta Universitatis ( NIS), Ser. Math. Inform. Vol. 27, No 1 (2012), 67-82. 55. Erhan Set, M. Serdari, M.,Emin Özdemir, J. Rooin, A Generalization of the Hadamard Inequality for - Convex Functions, KYUNGPOOK Math . J. 52(2012) ,307-317.
54. M.,Emin Özdemir, Alper Ekinci and Ahmet Ocak AKDEMİR, Generalization of Integral Inequalities for Functions whose Second Derivatives are Convex and m-Convex, Miskolc Mathematical Notes, vol.13(2012),No.2,pp.441-457(SCI). 53. M.,E. Özdemir, A. O. AKDEMİR, Ç. Yıldız, On Coordinated Quasi-Convex Functions, Czechoslovak Mathematical Journal, 62(137) (2012), (2012),889-900 (SCI). 52. Erhan Set, M. Emin ÖZDEMİR, Mehmet Zeki SARIKAYA, On New Inequalities of Simpson’s Type for Qusi-Convex Functions With Applications. Tamkang Journal of Mathematics, Volume 43, Number 3, 357-364, Autumn 2012. 51. M. Zeki Sarıkaya, Erhan Set, M.,E Özdemir, Sever S. Dragomir, New Some Hadamard’s Type Inequalities for Co- ordinated Convex Functions, Tamsui Oxford Journal of Mathematical Sciences 28(2) (2012) 137-152.
50. M. Emin ÖZDEMIR, Havva Kavurmacı, Ahmet Ocak Akdemir, Merve Avcı, Inequalities for Convex and Convex Functions on Δ = [a, b] × [c, d] , Journal of Inequalities and Applications , 2012, 2012:20, doi:10.1186/1029-242X-2012-20, Published: 1 February 2012. (SCI) 49. M. Emin ÖZDEMIR, M. A. Latif, Ahmet Ocak Akdemir, On some Hadamard- type Inequalities for Product of two s-Convex Functions on the Co- Ordinated Convex Functions, Journal of Inequalities and Applications, 2012, (1) 21, doi:10.1186/1029-242X-2012-21, Published: 5 February 2012. 2012/1/21 (SCI) 48. Ahmet Ocak AKDEMİR, M.,Emin Özdemir, Sanja Varosanec, On Some Inequalities for h- Concave Functions, Mathematical and Computer Modelling, Vol. 55, Issue 3-4, 746-753, 2012. (SCI) 47. M. W., Alomari, M. E. Ozdemir, H. Kavurmaci, On Companion of Ostrowski Inequality for Mappings Whose First Derivatives Absolute Value are Convex with Applications, Miskolc Mathematical Notes, vol.13(2012), no.2,pp.233-248 (SCI). 46. Erhan Set,M. Emin Özdemir, Mehmet Zeki Sarıkaya, On New Inequalities of Simson’s Type for Quasi-Convex Functions with Applications, Tamkang Journal of Mathematics,Volume 43, Number 3, 357-364, Autumn 2012, 45. M. Emin Ozdemir, Ahmet Ocak Akdemir and Erhan Set On the Ostrowski-Grüuss type inequality for twice differentiable functions, Hacettepe Journal of Mathematics and Statistics, 41(5) (2012), 651-655. (SCI) 44. M. Emin Ozdemir , Çetin Yıldız, Ahmet Ocak Akdemir, On Some New Hadamard-Type Inequalities For Co-Ordınated Quasi-Convex Functions, Hacettepe Journal of Mathematics and Statistics, 41(5) (2012), 697-707. (SCI 43. A.O.Akdemir, E.Set, M.E.Ozdemir, Ç.Yıldız, "On some new inequalities of Hadamard type for h-convex functions", American Institu of Phsyics (AIP) Conference Proceedings , "1470", 35-38 pp., Ekim-2012, DOI: http://dx.doi.org/10.1063/1.4747632. 42. M.E.Ozdemir, Ç.Yıldız, A.O.Akdemir, E.Set, "New inequalities of Hadamard type for quasi-convex functions", American Institu of Phsyics (AIP) Conference Proceedings , "1470", 99-101 pp., Ekim-2012, DOI: http://dx.doi.org/10.1063/1.4747649. THE PAPERS IN 2011 41. M.,Emin Özdemir, Ahmet Ocak Akdemir, A New Ostrowski- Type Inequality for Double Integrals, Journal of Inequalities and Special Functions, Volume 2 Issue 1 ( 2011) Page 27-34. 40. M.,Emin Özdemir and Ahmet Ocak Akdemir , On some Hadamard-type inequalities for convex functions on a rectanguler box. Journal of Non Linear Analysis and Application, Volume 2011, Article ID jnaa-00101, 10 pages 2011. 39. Havva Kavurmacı, M.,Emin Özdemir, Merve Avcı, New Ostrowski Type Inequalities for Convex Functions and Applications, Hacettepe Journal of Mathematics and Statistics, vol 40 (2) (2011) 135-145,(SCI) 38. M.,Emin Özdemir , MERVE AVCI};F, AND HAVVA KAVURMACI} , Hermite- Hadamard Type Inequalities via - Convexity , Computers and Mathematics with Applications 61 ( 2011) 2614-2620). .,(SCI)
37. M.,Emin Özdemir, E. Set, M. Alomari, Integral inequalities via several kind of convexity Creative Math. Inf. 20( 2011), No.1, 62-73.
36. Merve Avcı , Havva Kavurmacı, M.,Emin Özdemir New Inequalities of Hermite-Hadamard Type via s-Convex functions in the second sense with Applications, Applied Math and Comp. 217(2011), 5171-5176.,(SCI)
35. Özdemir, M.,E , Set Erhan, Sarıkaya M. Zeki, Some New Hadamard Type Inequalities for Co- Ordinated - Convex and - Convex Functions, Hacettepe Journal of Mathematics and Statistics vol 40 (2) (2011) 219-229 .,(SCI) 34. Ahmet Ocak AKDEMİR, M.,Emin Özdemir, Sanja Varosanec, On Some Inequalities for h- Concave Functions, Mathematical and Computer Modelling 55 (2012) 746-753 .,(SCI)
33. Havva Kavurmacı, Merve Avcı, M. Emin Ozdemir, New Inequalities of Hermite-Hadamard Type for Convex Functions with Applications. Journal of Inequalities and Applications 2011, 2011:86, doi: 10.1186/1029-2011-86. (SCI )
THE PAPERS IN 2010 32. Özdemir, M.,E , Kavurmacı Havva, Set Erhan "Ostrowski’s Type Inequalities for (alfa, m) – Convex Functions" KYUNGPOOK Math . J. 50(2010) , 371-378.
31. Sarıkaya M. Zeki, Set Erhan, Özdemir, M.,E , On Some New Inequalities of Hadamard Type Involving h-Convex Functions, Acta Math. Univ. Comenianae, Vol. LXXIX, 2(2010), pp. 265-272.
30. A. Ocak Akdemir, M. Emin ÖZDEMİR, Some Hadamard Type Inequalities for Coordinated P Functiopns and Godunova – Levin Functions, AIP Conf. Proc. -- November 11, 2010 -- Volume 1309, pp. 7-15 29. M.,E.Özdemir, Merve Avcı,Erhan Set On Some Inequalities of Hermite- Hadamard Type Via m- Convexity, Applied Mathhematics Letters 23 ( 2010) 1065-1070. .,(SCI) 28. Erhan Set, M.,E.Özdemir , Sever S. Dragomir, On The Hermite- Hadamard Inequality and Other Integral Inequalities Involving Two Functions, Journal of Inequalities and Applications, Volume 2010, Article ID 148102, 9 pages doi: 1155/2010/148102. .,(SCI) 27. Erhan Set, ,M. Emin.Özdemir , Sever S. Dragomir, On Hadamard- Type Inequalities Involving Several Kinds of Convexity, Journal of Inequalities and Applications, Volume 2010, Article ID 286845, 12 pages doi: 10.1155/2010/286845. .,(SCI) 26. M. Zeki Sarıkaya, Erhan Set, M.,Emin Özdemir On New Inequalities of Simpson`s Type For Convex Functions, Computers and Mathematics with Applications 60 (2010) 2191-2199. .,(SCI) 25. Erhan Set, M. Emin Ozdemir ve M. Zeki Sarıkaya, "Inequalities of Hermite-Hadamard type for functions whose derivatives absolute values are m-convex", AIP Conference Proceedings 1309, 861 (2010) (SCI)
THE PAPERS in 2003-2009 24. Özdemir, M.Emin; Kirmaci, Ugur; Ocak, Rahim; Dönmez, Ali, On automorphic and modular forms in the space of the homogeneous polynomials with degree 2l and applications to the special matrix. (English) (SCI), Appl. Math. Comput. 152, No.3, 897-904 (2004).
23. Kirmaci, U.S.; Özdemir, M.E., Some inequalities for mappings whose derivatives are bounded and applications to special means of real numbers. (English) .,(SCI)Appl. Math. Lett. 17, No.6, 641-645 (2004).
22. Kirmaci, U.S.; Özdemir, M.E., On some inequalities for differentiable mappings and applications to special means of real numbers and to midpoint formula. (English) .,(SCI) Appl. Math. Comput. 153, No.2, 361-368 (2004).
21. Özdemir, M.Emin, A theorem on mappings with bounded derivatives with applications to quadrature rules and means. (English) .,(SCI), Appl. Math. Comput. 138, No.2-3, 425-434 (2003).
20. Özdemir, M.Emin; Kirmaci, Ugur, Two new theorems on mappings uniformly continuous and convex with applications to quadrature rules and means. (English) .,(SCI), Appl. Math. Comput. 143, No.2-3, 269-274 (2003).
19. Özdemir, M.Emin, A theorem on the first and second local modulus of continuity and applications to quadrature rules and means. (English) .,(SCI), Appl. Math. Comput. .,(SCI) 141, No.2-3, 579-588 (2003).
18. Kirmaci, U.S.; Özdemir, M.E., On the modular integrals and their Mellin transforms. (English) Commun. Fac. Sci. Univ. Ank., Sér. A1, Math. Stat. 52, No.1, 7-11 (2003).
17. Özdemir, M.E. Two theorems on continuous differentiability of the finite-dimensional representations of the groups $\Bbb C_0^1$, $\Bbb R^n$. (English) . Commun. Fac. Sci. Univ. Ank., Sér. A1, Math. Stat. 51, No.2, 11-17 (2002).
16. Kirmaci, Ugur S.; Özdemir, M.Emin, On the modular functions. (English) Int. J. Appl. Math. 2, No.12, 1385-1397 (2000). MSC 2000: *11F11 11F27, Reviewer: Marvin I.Knopp
15. Özdemir, M.Emin; Ocak, Rahim; Kirmaci, Ugur S. The Undetachable Representations of the groups SL(2,C), K2 , R, G, Int. J. Appl. Math. 3, No.2, 171-179 (2000).
14. Kirmaci, Ugur S.; Özdemir, M.Emin Notes on the modular forms. (English) Bull. Pure Appl. Sci., Sect. E, Math. Stat. 17, No.2, 337-340 (1998).
13. Kirmaci, Ugur S.; Özdemir, M.Emin, On The Expression of in terms of. , Bulletin of Pure and Applied Sci., (English) Bull. Pure Appl. Sci., Sect. E, Math. Stat. 17, No.2, 257-261 (1998).
12. U.S. Kırmaci, M. Klaricic Bakula, M. Emin Özdemir, Josip Pecaric, Hadamard-type inequalities for Convex Functions, App.Math.Comp.,(SCI) 193, (2007) 26-35.
11. M. Klaricic Bakula, M. Emin Ozdemir, J. Pecaric , Hadamard-Type inequalities for m-convex -and alfa-m convex functions, Journal of Inequalities in Pure and Applied Mathematics, vol 9 , Issue 4, pp.12, Art.96,2008.
10. U.S. Kırmaci, M. Klaricic Bakula, M. Emin Özdemir, Josip Pecaric, On Some Inequalities For P-Norms, JIPAM(Journal of Inequalities Pure and Apply Mathematics, vol 9 (2008) Issue 1.
9. Özdemir, M.,E., Kırmacı, U.,S., Generalization of Pachpatte Inequality for Log-Convex and Monotone Functions., Journal of World Mathematical Rewiev (ACCEPTED)
8. Levent Akgün, M.E.Özdemir., Students’s Understanding of the variable as general number and Unknown : A case Stıudy ., The Teaching of Mathematics , 2006, Vol.IX,1, 45-51
7. M.E Özdemir,, Kırmacı, U.,S., levent Akgün, Herhangi sayıdaki kümelerin Arakesitinin Bulunmasında Algılama Eksiklikleri, Niğde Üniv. Eğitim Fakültesi, Dergisi,No.2,2003,S. 116.
6. Özdemir M.E., Adem Duru, levent Akgün, İki ve Üç Boyutlu Düşünme, Kastamonu Eğitim Dergisi, Cilt 13 No.2,2005, 527-540.
5. Adem Duru, levent Akgün, M.,Emin Özdemir., İlköğretim Öğretmen adaylarının Matamatiğe yönelik Tutumlarının incelenmesi, K.K.Eğitim Fak. Dergisi, ,sayı.11,2005, S.521-536.
4 .Kırmacı, U.,S., Özdemir, M.,E., On The Modular Integrals, Mathematica,Tome 46(69) No. 1, 2004 75-8
3. Özdemir M.E., Ocak R., About Application to the Critical Points of a polynomial of with Rouche Theorem related to the Conjecture of Sendow, Erciyes Univ., Fen Bilimleri Dergisi,Vol,Sayı 1-2, 1995,10-14.
2. Set Erhan, Özdemir, M.,E., Further Inequalities involving Beta-Gamma Function and Means , Euroasian Mathematical Journal ,2008, vol.3.
1. Erhan Set, M.,Emin Özdemir , Some Inequalities for Differentiable Convex Functions, EÜFBED- Fen Bilimleri Enstitüsü Dergisi Cilt-Sayı: 2-1 yıl: 2009
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International Symposiums and Course ( 32 times)
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Lisans: Analiz-I, AnalizII, Analişz-III ve AnalizIV, İstatistik ve Olasılık Teorisi, İstatistik Matematiğin Temelleri, Matematik Öğretimi, Öğretim Teknolojileri ve Materyal Gelişimi, Eğitim Bilimine Giriş, Özel Öğretim Yöntemleri, Diferensiyel Denklemler Lisans Üstü : Akademik Yazma ve Literatür tarama I-II, Okul Deneyimi- Klinik Çalışma I-II, Klasik fonksiyonlara Giriş-I-II
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YIL |
SCI, SCI-EXP Atıf Sayısı (Web of Science temelli) |
Diğer Atıf (Scopus Temelli) |
2003 |
1 |
3 |
2004 |
1 |
2 |
2005 |
1 |
1 |
2006 |
0 |
2 |
2007 |
2 |
3 |
2008 |
2 |
1 |
2009 |
1 |
0 |
2010 |
16 |
14 |
2011 |
10 |
40 |
2012 |
38 |
55 |
2013 |
61 |
49 |
2014 |
95 |
63 |
2015 |
50 |
44 |
2016 |
113 |
33 |
2017 |
117 |
7 |
2018 |
46 |
15 |
TOPLAM |
554 |
322 |
GENEL TOPLAM 876 |