書誌情報 | ファイル |
表紙・目次 (2014-04) 数理解析研究所講究録, 1878
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RADIUS PROBLEMS FOR INVERSE FUNCTIONS CONCERNING WITH BI-UNIVALENT FUNCTIONS (Some inequalities concerned with the geometric function theory) DUMAN, EMEL YAVUZ; OWA, SHIGEYOSHI (2014-04) 数理解析研究所講究録, 1878: 1-6
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Extensions for certain subordination relations (Some inequalities concerned with the geometric function theory) Kuroki, Kazuo (2014-04) 数理解析研究所講究録, 1878: 7-16
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On N-Fractional Calculus of the Function $((z-b)^2-c)^{frac{1}{3}}$ (Some inequalities concerned with the geometric function theory) Miyakoda, Tsuyako (2014-04) 数理解析研究所講究録, 1878: 17-29
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The Solutions to The Homogeneous Bessel Equations by Means of The N-Fractional Calculus : The Calculus in The 21th Century : Again (Some inequalities concerned with the geometric function theory) Nishimoto, Katsuyuki (2014-04) 数理解析研究所講究録, 1878: 30-48
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N-Fractional Calculus of the Function $f(z)=log((z-b)^3-c)$ and Identities (Some inequalities concerned with the geometric function theory) Nishimoto, Katsuyuki; Lin, Shy-Der; Wang, Pin-Yu (2014-04) 数理解析研究所講究録, 1878: 49-66
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Notes on a certain class of analytic functions (Some inequalities concerned with the geometric function theory) Nishiwaki, Junichi; Owa, Shigeyoshi (2014-04) 数理解析研究所講究録, 1878: 67-73
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ON SOME DIFFERENTIAL SUBORDINATIONS (Some inequalities concerned with the geometric function theory) NUNOKAWA, MAMORU; SOKOL, JANUSZ (2014-04) 数理解析研究所講究録, 1878: 74-80
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ON FUNCTIONS STARLIKE IN ONE DIRECTION (Some inequalities concerned with the geometric function theory) NUNOKAWA, MAMORU; SOKOL, JANUSZ (2014-04) 数理解析研究所講究録, 1878: 81-84
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Univalence and starlikeness of a function defined by convolution of analytic function and hypergeometric function $_3F_2$ (Some inequalities concerned with the geometric function theory) Shimoda, Yutaka; Nakamura, Yayoi; Owa, Shigeyoshi (2014-04) 数理解析研究所講究録, 1878: 85-93
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Embedding $alpha$-convex functions in the class $mathcal{U}$ (Some inequalities concerned with the geometric function theory) Tuneski, Nikola (2014-04) 数理解析研究所講究録, 1878: 94-99
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THE SHARP GROWTH ESTIMATE FOR $mathcal{U}(lambda)$ (Some inequalities concerned with the geometric function theory) Yanagihara, Hiroshi (2014-04) 数理解析研究所講究録, 1878: 100-111
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