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      저자 : Atlihan, Sevgi (검색결과 2 건)
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      • KCI등재

        Recent developments in cancer therapy and diagnosis

        Atlihan-Gundogdu Evren,Ilem-Ozdemir Derya,Ekinci Meliha,Ozgenc Emre,Demir Emine Selin,Sánchez-Dengra Bárbara,González-Alvárez Isabel 한국약제학회 2020 Journal of Pharmaceutical Investigation Vol.50 No.4

        Background The cancer is serious health problem and leading cause of death in the world. Area covered There have intensively studied for diagnosis and therapy of this disease and these studies provided important insights into their mechanism of action and therapeutic/diagnostic effects. The accurence rates of cancer has dramatic increase, particularly in the developed countries. Although there are many different strategies about diagnosis and treatment for cancer, more effective new approaches are needed. Expert opinion In this review, we summarize recent developments on cancer diagnosis, radiopharmaceuticals in cancer diagnosis, nanoparticulate systems in cancer diagnosis, T cells in cancer diagnosis, cancer therapy and pharmacokinetic of anticancer drugs. We thought that while there are some current limitations such as clinical studies, ranging from diagnosis to theraphy, future improvements in cancer diagnosis and treatment will meet the most relevant issues required for the eventual approval of nano-drugs, radiopharmaceuticals, T cells in clinical practice.

      • SCOPUSKCI등재

        SOME RESULTS ON THE LOCALLY EQUIVALENCE ON A NON-REGULAR SEMIGROUP

        Atlihan, Sevgi Korean Mathematical Society 2013 대한수학회논문집 Vol.28 No.1

        On any semigroup S, there is an equivalence relation ${\phi}^S$, called the locally equivalence relation, given by a ${\phi}^Sb{\Leftrightarrow}aSa=bSb$ for all $a$, $b{\in}S$. In Theorem 4 [4], Tiefenbach has shown that if ${\phi}^S$ is a band congruence, then $G_a$ := $[a]_{{\phi}^S}{\cap}(aSa)$ is a group. We show in this study that $G_a$ := $[a]_{{\phi}^S}{\cap}(aSa)$ is also a group whenever a is any idempotent element of S. Another main result of this study is to investigate the relationships between $[a]_{{\phi}^S}$ and $aSa$ in terms of semigroup theory, where ${\phi}^S$ may not be a band congruence.

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