163736 | ![ÖMÜR UĞUR](../authorimages/photo_m.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRORTA DOĞU TEKNİK ÜNİVERSİTESİ/UYGULAMALI MATEMATİK ENSTİTÜSÜ/BİLİMSEL HESAPLAMA ANABİLİM DALI / Fen Bilimleri ve Matematik Temel Alanı Matematik Uygulamalı Matematik ; Matematiksel Analiz | ougur[at]metu.edu.tr | F90D2953B28F4D5C |
120901 | ![HALİS BİLGİL](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRKAYSERİ ÜNİVERSİTESİ/MÜHENDİSLİK, MİMARLIK VE TASARIM FAKÜLTESİ/MÜHENDİSLİK TEMEL BİLİMLERİ BÖLÜMÜ/MÜHENDİSLİK TEMEL BİLİMLERİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Uygulamalı Matematik ; Matematiksel Analiz | halisbilgil[at]kayseri.edu.tr | 6D36D38F4999B0C6 |
35450 | ![MUAMMER KULA](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRERCİYES ÜNİVERSİTESİ/FEN FAKÜLTESİ/MATEMATİK BÖLÜMÜ/TOPOLOJİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Topoloji ; Matematiksel Analiz ; Geometri | | E95F2A669E207943 |
7919 | ![HİKMET ÖZARSLAN](../authorimages/photo_w.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRERCİYES ÜNİVERSİTESİ/FEN FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | seyhan[at]erciyes.edu.tr | 41B2208EDBD7C494 |
36117 | ![HÜSEYİN YILDIRIM](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRKAHRAMANMARAŞ SÜTÇÜ İMAM ÜNİVERSİTESİ/FEN FAKÜLTESİ/MATEMATİK BÖLÜMÜ/UYGULAMALI MATEMATİK ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Uygulamalı Matematik ; Matematiksel Analiz ; Matematiğin Temelleri ve Matematiksel Mantık | hyildir[at]ksu.edu.tr | 8B98B5FBAD0A52BB |
126411 | ![NESİP AKTAN](data:image/jpg;base64,/9j/4AAQSkZJRgABAgAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACnAIcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwDgCABSUUV7h84FM6HPen0fjQA0E5p1HpRVol6hS8ikpwYDrSbsCG5GeRzS5xTXkVckkCovtURbGeTWUqsU9TWFOUloifOaSmiRW706qjJS2FKLW4uaUAU2lFMlMdR+n0ooz6U7CbAmigHJ4op2C4yiiipGFFFFNCbDilAJoA9aXgDJ6DrVCGsQg3N0qlLcsTiMkLRcz+awCj5B61Byx4615tbENu0dj08PhElzTWoh3Mckk/U0ZBqVbW4kOEidj7LSvZXMA3SQOuP7wrlvfVneotbIiJx7fSpI5nU53Ej0NRkbutKFOOAaalZ3RMoKWjRfinWUeh9DUq/eIrKq/azeZlD1HSu6jiG3yyPNxGG5FzR2LAJ5yKOlGKK7TgbAD0opyg0UE3IqKKKg1ClBxQBmjGOtNAxT92q905WPAPXg1YP3aq3n+rX61FbSm2XQSdSN+5WiieaVYo1LOxwAO9drpHgwOFluck5+6DVDwjYJNKbl0DMh+XNelWaAIBjA9q+fqVHeyPqKVKyuyKw0K1hUYt41A9FFT3Gh2lypD28Z47gVpwKAuDmraIhGeKm5djzy78BWrt+7Up7A1QfwDsQkSMP8/SvUvKU9QDUE1uhPAAJ60XaCy7Hhmr+G77SvnePfEScMnOPrWVC5SQN+de46hZo0RVowykEEHoRXjuuacum6hJCnCE7kz6HpW1Oq76nPXoq3kTEAjcDwRmm021OYEyc8etThCf4T+Ve/CXNFM+Xqx5ZNCdqKUAmiqMyvRRRUGw4dKQc8ZpKKaBjvYmq94B5SkdjVgLx1qG6X/R2596itrBlUP4i9TqvCmY7Ndi8H1rt47mKJVLOq59TXHeHUePRoXAJLDr+NadzdWFvEI7wtJK6khScAD3xzXy7+Nn2EPhR11peW1x8sdxCx9A4NaCowOB0ryyzt9175+myNtQjK7ZF69OCBXf6PeXEilXOTjk5NUpNaNCsnrFmx5Z2k5xiq8kqdQ4IHXBrnddu9ReF4YN2CMMUbB6+tcnpmqG0kfzLu4fHZCxUD15AB6jketPmfRDUV1Z3t6+5QFNeY+MQgvYyyjKqRz6V3cVy9xGr8MjDIZehrhfHEW29tz3ZD/OqpXciK6Sg7mRbkCBNqLyKmyzD5icU1E2ovsoGKceRX09KNoI+NrScptiLnPIopaKsyKucUUgyetLWR0AemKKKOgNNCew4HPFa+naat5Y3RZVYhSMMAe3HuOfSsdetbmg3giZ4HOBKfTqf8iufGKTpNROrAOKrx5tjpfDMUT6VbpjgCtmfw5DczJcKqPIFKESA4KkYI49iaz9MWNb+WKAARB8KAO2K623IRMdq+ei76n08tNEYthocOlW0sKKHMpVnZmLHjpyasWQCzyBeM+hq5eSBImbpxxVbTIw7s3U+g7USd2OEVFaE4gWQfdG4NuGfUf/qrHtfCMVtNcuI43W4QowkdmVVOMhR2HA65rcSQRS7G4Occ1e/hzVpuxDS6mIun29jbCKNMKvYdK5DXNPGp6xbrgERRs+D3ORgfz/Ku41FtkZOK5SSaJUluGKgo3LHsACePzpXadkW0nH3jibmMRzsuPQ8dORmoqfNIZZnc/wARz9KZX1FKLjBJnxdeSlUk47XFAyM8UULgdaK0MblNjgUo6U1jxwM0grE69x/y556/WiiimiZADipopWjdWU8qcioaUAnvTsmtSLtO6O20S/El0JARliMj0OK7eCbOOa8q0S5MU4QkctXoNtcbo9q8nFfNV4ezqyifXYap7WjGRo3siOu0E+lZ9nYXcMrSR3s2D/e5H5dKjv7t7ZF2W8k0jdFRSaltL/UyuG03K56BlBH5tWPXVHVFNrQuR2jpMZZbmWXd/C2AB9AAK2IpFZAPQd65yTUdWR8SaUSgxja6n+taSTttVthQkcg9qqLXRETi1uV9Xm2xtg9jXnerXp8v7NG4IZiz4rsdZvNsblmAAGSa84nk8x2f+82a7sBSVSo5PoeZmld06Kgnqxp5b8KSkDUua98+XCijtRQDRV/CjFB64orE7QoooGcjjFNMiSFHWnAUgABoZggJZgAKHIlRbLVmsklyoi5dVZvwAya6/RtTyFRiB2weOaz/AIeWtvqV/qBnGR5SxKM4OGyD/IVe1rQLjR59w3Oj42SheH+uOhH68V4WOfPPmR9Dl37uHJJ6nSj9+M/lT1tpJh5byuFHZXI/ka5fTNbeIiOb7mfvDmuittWhb5g69fWuNeZ6XM+heit2jAG4sB6nJpl3crDCWZhnvVG41+CMNiROnrXM3WqXN8+IwcZ64pN22J1ZV13UJZwVT7ufmI5rniSetdrZaM11a3kCIzTyWkrRgf3gAV/8exXEBgwDLypHWvayuUVTa6nz+bxn7VPoLS8mmg5Panf5616nMjyLCqc/SikH3aKVwsQHg0CmE5OWGKja4RARnJ/OuaU0t2dsYSlsiYjnINIZFQZYgfj/AEqk93IcquFHtULZJB7+tYSxVvhOiGDcvi0Lkl4gHyoT7mqss7zEbjx6VGcgc0gyeRXNKrOW7OyFCnDVI6rwJq503xPaxOQIbpvKYnsf4efqa94e1h1C1kt50DwyDDKeM18vozK4YHBByD6GvofwR4g/4SLQI7qQqLlGMcyr6jofxH8jWVi3dSujD1jwNcWMxuNPDXFuRl04Lp9B1P4VRj0SG6iyjEn1FetIcoQT1rP1Kxsl82+mkWB9o3yHp6DI7n6cmsJ01ujrp1XazPNk8LQxAl9571Zi0yKA7ghVQO5rrxYtLGJAgZSONpxn8D0q5a6HAgSS5Xc2Q6ofuj0PvUKnfQ1dRLUx9G017e3mvJ4/LaRSsang7Ou4/UgcdgK+ei7QyHyyRX0zrV6bKxnutocQxvIR2O0FsH64x+NfMzklic/jXXBcisjhqP2snzLQspft0kQH3HBqzHJHJ91x9OlZdPPIArohiZx31OSpgqcttDXU0VmRXMkR4OR6GiupYuLWqOSWAqJ6EbszEknr2FR045A4pK85u56ySWiGkZp1FN3UgBulN3UHmkoAenGa734Xa22n+Iv7PJHkXxCknswB2/zI/GuBU47VYs7mSzvILmM4eKRZF+oIP9KAtdH1R5ixRs8jBUUZYnsK48a8NeeVkQtaZ2xxhMFjnHPcE9f0AY5rf066j1zRoZ4v9TPGCf8AD881HPoduLd4o0CFlIDfr3z6fT1yOKzmro1pT5WmzDdQ/mbGWVJcZ2niVR3GOw54XPuBVrSfEMMV7HpU0qmJ1/0eXjk54XgnqDxnB4xiqab2ZvNTMyOZcGPLFvUKSdx45zu+qZxVe20C31eS6lZitwkyusocsGyM5yeSPxPoDXNTT5zsrNOFze8SLnw5qXOM28i/mpH9a+byTnFfQ/ieWRPCl2so2yBNrehyMZr55Jya7TzFuxMgH3pw5poAz3p/uOoplB0JopoAzRSGBOV4ptHeimIWmOKfSMMkfSkAmBxS4HpQOBQOucigAx7UHp0B+tLgmigZ7f8ACTVTc+HZLIlc2khUdsqcsD7clq9BkKrGS+MDp7V4P8LtYbT/ABTHaHiO8+QnPcAlf14/GvZdcu41sza7l8y6zGik9c4BP4bgazk7alU1eXKchdasdQ1d5baMfZyiqrFTukIHQf7WcYBwTnAwcZ3PD1xD9quo+A84WUkY2t1+ZcdQc4yecq2cYxXO/uGu4xDtaAKxXcmSwxlhjoQFKgr3CH0rZ0FyNbaPc3+pIbjOWBHLN/ExGOe42n+KuaM7yTZ6Uqa9i0XfGqMPDV2w2lBCwbI/h2kn+VfOTDHHevpDxkwHhfUFJ4NrL/6Aa+cCATXceSlqNHUU7ODikwAeBilzg9BzQMMd+n0ooHWigBGXBzSDnvRRQAUnJ60UUAB5FMxg4zRRSAkycc8ikFFFMC1p942n6hBdRDEkMiyD6g171qOpR3+7y4leKKEOxYYYB0dsL9VVh7EqfWiisaz0OjDfxEYeyY6jcmYBZMgMIW2jO0sMZHBz8wP8LHnvWlbGSz1WylGwrJL5HBIwCN+1RjhPmBxnjhe2aKK5F8SPSn8DHfEiZ7bw7MVwVljeIj6rXg/Q4oor0DxerExzmjBNFFMBaKKKAP/Z) | ![ORCID](../images/orcidFav.png) PROFESÖRNECMETTİN ERBAKAN ÜNİVERSİTESİ/FEN FAKÜLTESİ/MATEMATİK VE BİLGİSAYAR BİLİMLERİ BÖLÜMÜ/GEOMETRİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Geometri ; Matematiksel Analiz | nesipaktan[at]gmail.com | 609842D8FB6F44E6 |
19082 | ![MURAT ÇAĞLAR](../authorimages/photo_m.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRERZURUM TEKNİK ÜNİVERSİTESİ/FEN FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | murat.caglar[at]erzurum.edu.tr | 85EBC235CCF3B8C2 |
27307 | ![DANYAL SOYBAŞ](../authorimages/photo_m.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRERCİYES ÜNİVERSİTESİ/EĞİTİM FAKÜLTESİ/MATEMATİK VE FEN BİLİMLERİ EĞİTİMİ BÖLÜMÜ/MATEMATİK EĞİTİMİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | danyal[at]erciyes.edu.tr | E407636AC90F63CA |
46363 | ![ALİ ARAL](../authorimages/photo_m.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRKIRIKKALE ÜNİVERSİTESİ/MÜHENDİSLİK VE DOĞA BİLİMLERİ FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | aliaral73[at]yahoo.com | E30D26269DE1B554 |
17850 | ![İSHAK ALTUN](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRKIRIKKALE ÜNİVERSİTESİ/MÜHENDİSLİK VE DOĞA BİLİMLERİ FAKÜLTESİ/MATEMATİK BÖLÜMÜ/TOPOLOJİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Topoloji ; Matematiksel Analiz | ishakaltun[at]yahoo.com | 51D1814392CEF391 |
123024 | ![FATİH KOYUNCU](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRANKARA YILDIRIM BEYAZIT ÜNİVERSİTESİ/MÜHENDİSLİK VE DOĞA BİLİMLERİ FAKÜLTESİ/MATEMATİK BÖLÜMÜ/MATEMATİK-BİLGİSAYAR BİLİMLERİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Cebir ve Sayılar Teorisi ; Geometri ; Matematiksel Analiz | fatih[at]ybu.edu.tr | C6B176FDE18EAF72 |
29522 | ![GÜLNİHAL MERAL](../authorimages/photo_w.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRANKARA YILDIRIM BEYAZIT ÜNİVERSİTESİ/MÜHENDİSLİK VE DOĞA BİLİMLERİ FAKÜLTESİ/MATEMATİK BÖLÜMÜ/MATEMATİK-BİLGİSAYAR BİLİMLERİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Uygulamalı Matematik ; Matematiksel Analiz | gulnihal.meral[at]gmail.com | D11E8C4090388C4F |
21228 | ![SERKAN DEMİRİZ](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRTOKAT GAZİOSMANPAŞA ÜNİVERSİTESİ/FEN-EDEBİYAT FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz ; Uygulamalı Matematik | serkan.demiriz[at]gop.edu.tr | 3698C06AEAB8389A |
51576 | ![ALİ YAKAR](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRTOKAT GAZİOSMANPAŞA ÜNİVERSİTESİ/FEN-EDEBİYAT FAKÜLTESİ/MATEMATİK BÖLÜMÜ/UYGULAMALI MATEMATİK ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Uygulamalı Matematik ; Matematiksel Analiz | ali.yakar[at]gop.edu.tr | 6F4E57DB171A9BD4 |
11215 | ![YILMAZ YILMAZ](../authorimages/photo_m.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRİNÖNÜ ÜNİVERSİTESİ/FEN-EDEBİYAT FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | yilmaz.yilmaz[at]inonu.edu.tr | 2830A47B125BF5EA |
2467 | ![İSMAİL EKİNCİOĞLU](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRİSTANBUL MEDENİYET ÜNİVERSİTESİ/MÜHENDİSLİK VE DOĞA BİLİMLERİ FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | ismail.ekincioglu[at]medeniyet.edu.tr | 7FA7AF62F9B01815 |
19485 | ![FUNDA RAZİYE MERT](../authorimages/photo_w.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRADANA ALPARSLAN TÜRKEŞ BİLİM VE TEKNOLOJİ ÜNİVERSİTESİ/BİLGİSAYAR VE BİLİŞİM FAKÜLTESİ/YAZILIM MÜHENDİSLİĞİ BÖLÜMÜ/YAZILIM MÜHENDİSLİĞİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Uygulamalı Matematik ; Matematiksel Analiz | rmert[at]atu.edu.tr | 2BCBBF4494C0F2B6 |
101392 | ![MAHMUT IŞIK](../authorimages/photo_m.jpg) | ![ORCID](../images/orcidFav.png) PROFESÖRHARRAN ÜNİVERSİTESİ/EĞİTİM FAKÜLTESİ/MATEMATİK VE FEN BİLİMLERİ EĞİTİMİ BÖLÜMÜ/MATEMATİK EĞİTİMİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | mahmutisik[at]harran.edu.tr | D38EE278216C4090 |
105013 | ![SEVİLAY KIRCI SERENBAY](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRHARRAN ÜNİVERSİTESİ/FEN-EDEBİYAT FAKÜLTESİ/MATEMATİK BÖLÜMÜ/TOPOLOJİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz ; Topoloji | sevilaykirci[at]gmail.com | 8E8655D7FCB6F13C |
22435 | ![AYDIN İZGİ](data:image/jpg;base64,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) | ![ORCID](../images/orcidFav.png) PROFESÖRHARRAN ÜNİVERSİTESİ/FEN-EDEBİYAT FAKÜLTESİ/MATEMATİK BÖLÜMÜ/ANALİZ VE FONKSİYONLAR TEORİSİ ANABİLİM DALI/ Fen Bilimleri ve Matematik Temel Alanı Matematik Matematiksel Analiz | a_izgi[at]harran.edu.tr | 49781AC66639B006 |