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    Abstract book
    (Maltepe Üniversitesi, 2019) Çakallı, Hüseyin; Savaş, Ekrem; Sakallı, İzzet; Horgan, Jane; Daly, Charlie; Power, James; Kocinac, Ljubi^sa; Cavalanti, M. Marcelo; Corrˆea, Wellington J.; Özsarı, Türker; Sep´ulveda, Mauricio; Asem, Rodrigo V´ejar; Harte, Robin; Açıkgöz, Ahu; Esenbel, Ferhat; Jabor, Ali Ameer; Omran, Ahmed abd-Ali; Varol, Banu Pazar; Kanetov, Bekbolot; Baidzhuranova, Anara; Saktanov, Ulukbek; Kanetova, Dinara; Zhanakunova, Meerim; Liu, Chuan; Yıldırım, Esra Dalan; Şahin, Hakan; Altun, Ishak; Türkoğlu, Duran; Akız, Hürmet Fulya; Mucuk, Osman; Motallebi, Mohammad Reza; Demir, Serap; Şahan, Tunçar; Kelaiaia, Smail; Yaying, Taja; Noiri, Takashi; Vergili, Tane; Çetkin, Vildan; Misajleski, Zoran; Shekutkovski, Nikita; Durmishi, Emin; Berkane, Ali; Belhout, Mohamed; Es-Salih, Aries Mohammed; Sönmez, Ayşe; Messirdi, Bachir; Derhab, Mohammed; Khedim, Tewfik; Karim, Belhadj; Affane, Doria; Yarou, Mustapha Fateh; Yılmaz, Fatih; Sertbaş, Meltem; Bouchelaghem, Faycal; Ardjouni, Abdelouaheb; Djoudi, Ahcene; Çiçek, Gülseren; Mahmudov, Elimhan; El-Metwally, Hamdy A.; AL-kaff, M.; Mustafayev, Heybetkulu; Duru, Hülya; Biroud, Kheireddine
    On behalf of the Organizing Committee, we are very pleased to welcome you to the 3nd International Confer- ence of Mathematical Sciences (ICMS 2019) to be held between 4-8 September 2019 at Maltepe University in Istanbul. We hope that, ICMS 2019 will be one of the most beneficial scientific events, bringing together mathematicians from all over the world, and demonstrating the vital role that mathematics play in any field of science.
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    On a uniform analogue of paracompact spaces
    (Maltepe Üniversitesi, 2019) Kanetov, Bekbolot; Baidzhuranova, Anara
    In this work we introduce and study uniformly paracompact spaces. In particular, the characterizations of uniformly paracompact spaces by using Hausdorff compact extensions and mappings are obtained. Definition 1. A uniform space (X, U) is called uniformly paracompact if every finitely additive open cover of X has a ?-locally finite uniform refinement. Theorem 1. If (X, U) is a uniform paracompact space, then the topological space (X, ?U ) is paracompact. Conversely, if (X, ? ) is paracompact, then the uniform space (X, UX), where UX is the universal uniformity, is uniformly paracompact.
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    On some properties of completeness of uniform spaces
    (Maltepe Üniversitesi, 2019) Kanetov, Bekbolot; Kanetova, Dinara; Zhanakunova, Meerim
    One of the important concepts of uniform topology is the concept of completeness of uniform spaces. In this work we study some properties of µ-completeness of uniform spaces. In particular, it is proved that the µ-completeness of uniform spaces is preserved under twice uniformly continuous P-uniformly perfect mappings in both directions
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    Some properties of remainders of uniform spaces and uniformly continuous mappings
    (Maltepe Üniversitesi, 2019) Kanetov, Bekbolot; Saktanov, Ulukbek; Kanetova, Dinara
    In the theory of uniform spaces and uniformly continuous mappings one of the interesting questions is the study of remainders of uniform spaces and uniformly continuous mappings. In this work we study some properties of remainders of uniform spaces and uniformly continuous mappings. In particular, it is established the completeness, ? -boundedness and compactness of remainders of uniform spaces, as well as the uniform perfectness of remainders of uniformly continuous mappings.