{"title":"含一般分数阶导数算子的广义Ruscheweyh导数在一类负系数解析函数中的应用[j]","authors":"W. Atshan, S. R. Kulkarni","doi":"10.2478/gm-2020-0007","DOIUrl":null,"url":null,"abstract":"Abstract In this paper, we study a class of univalent functions f as defined by making use of the generalized Ruscheweyh derivatives involving a general fractional derivative operator, satisfying Re{ z(J1λ,μf(z))'(1-γ)J1λ,μf(z)+γz2(J1λ,μf(z))'' }>β. {\\mathop{\\rm Re}\\nolimits} \\left\\{{{{z\\left({{\\bf{J}}_1^{\\lambda,\\mu}f\\left(z \\right)} \\right)'} \\over {\\left({1 - \\gamma} \\right){\\bf{J}}_1^{\\lambda,\\mu}f\\left(z \\right) + \\gamma {z^2}\\left({{\\bf{J}}_1^{\\lambda,\\mu}f\\left(z \\right)} \\right)''}}} \\right\\} > \\beta. A necessary and sufficient condition for a function to be in the class Aγλ,μ,ν(n,β) A_\\gamma ^{\\lambda,\\mu,\\nu}\\left({n,\\beta} \\right) is obtained. Also, our paper includes linear combination, integral operators and we introduce the subclass Aγ,cmλ,μ,ν(1,β) A_{\\gamma,{c_m}}^{\\lambda,\\mu,\\nu}\\left({1,\\beta} \\right) consisting of functions with negative and fixed finitely many coefficients. We study some interesting properties of Aγ,cmλ,μ,ν(1,β) A_{\\gamma,{c_m}}^{\\lambda,\\mu,\\nu}\\left({1,\\beta} \\right) .","PeriodicalId":32454,"journal":{"name":"General Letters in Mathematics","volume":"23 1","pages":"103 - 85"},"PeriodicalIF":0.0000,"publicationDate":"2020-06-01","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"3","resultStr":"{\"title\":\"Some applications of generalized Ruscheweyh derivatives involving a general fractional derivative operator to a class of analytic functions with negative coefficients II\",\"authors\":\"W. Atshan, S. R. Kulkarni\",\"doi\":\"10.2478/gm-2020-0007\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"Abstract In this paper, we study a class of univalent functions f as defined by making use of the generalized Ruscheweyh derivatives involving a general fractional derivative operator, satisfying Re{ z(J1λ,μf(z))'(1-γ)J1λ,μf(z)+γz2(J1λ,μf(z))'' }>β. {\\\\mathop{\\\\rm Re}\\\\nolimits} \\\\left\\\\{{{{z\\\\left({{\\\\bf{J}}_1^{\\\\lambda,\\\\mu}f\\\\left(z \\\\right)} \\\\right)'} \\\\over {\\\\left({1 - \\\\gamma} \\\\right){\\\\bf{J}}_1^{\\\\lambda,\\\\mu}f\\\\left(z \\\\right) + \\\\gamma {z^2}\\\\left({{\\\\bf{J}}_1^{\\\\lambda,\\\\mu}f\\\\left(z \\\\right)} \\\\right)''}}} \\\\right\\\\} > \\\\beta. A necessary and sufficient condition for a function to be in the class Aγλ,μ,ν(n,β) A_\\\\gamma ^{\\\\lambda,\\\\mu,\\\\nu}\\\\left({n,\\\\beta} \\\\right) is obtained. Also, our paper includes linear combination, integral operators and we introduce the subclass Aγ,cmλ,μ,ν(1,β) A_{\\\\gamma,{c_m}}^{\\\\lambda,\\\\mu,\\\\nu}\\\\left({1,\\\\beta} \\\\right) consisting of functions with negative and fixed finitely many coefficients. We study some interesting properties of Aγ,cmλ,μ,ν(1,β) A_{\\\\gamma,{c_m}}^{\\\\lambda,\\\\mu,\\\\nu}\\\\left({1,\\\\beta} \\\\right) .\",\"PeriodicalId\":32454,\"journal\":{\"name\":\"General Letters in Mathematics\",\"volume\":\"23 1\",\"pages\":\"103 - 85\"},\"PeriodicalIF\":0.0000,\"publicationDate\":\"2020-06-01\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"3\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"General Letters in Mathematics\",\"FirstCategoryId\":\"1085\",\"ListUrlMain\":\"https://doi.org/10.2478/gm-2020-0007\",\"RegionNum\":0,\"RegionCategory\":null,\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"\",\"JCRName\":\"\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"General Letters in Mathematics","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.2478/gm-2020-0007","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 3
摘要
摘要利用广义Ruscheweyh导数定义了一类一元函数f,它包含一个一般分数阶导数算子,满足Re {z(J1λ,μf(z))′(1-γ)J1λ,μf(z)+γz2(J1λ,μf(z))}′>β。{\mathop{\rm Re}\nolimits}\left {{{{z\left ({{\bf{J}}_1^{\lambda, \mu} f \left (z \right) }\right) }\over{\left ({1 -\gamma}\right){\bf{J}}_1^{\lambda, \mu} f \left (z \right) + \gamma z^2{}\left ({{\bf{J}}_1^{\lambda, \mu} f \left (z \right) }\right) " }}}\right} > \beta。给出了函数属于A类的一个充要条件——γλ,μ,ν(n,β) A_ \gamma ^ {\lambda, \mu, \nu}\left ({n, \beta}\right)。此外,本文还引入了线性组合、积分算子,并引入了由负有限多系数和固定有限多系数函数组成的子类Aγ,c λ,μ,ν(1,β) A_ {\gamma,{c_m}}^ {\lambda, \mu, \nu}\left (1{, \beta}\right)。我们研究了γ,cmλ,μ,ν(1,β) A_ {\gamma,{c_m}}^ {\lambda, \mu, \nu}\left ({1, \beta}\right)的一些有趣性质。
Some applications of generalized Ruscheweyh derivatives involving a general fractional derivative operator to a class of analytic functions with negative coefficients II
Abstract In this paper, we study a class of univalent functions f as defined by making use of the generalized Ruscheweyh derivatives involving a general fractional derivative operator, satisfying Re{ z(J1λ,μf(z))'(1-γ)J1λ,μf(z)+γz2(J1λ,μf(z))'' }>β. {\mathop{\rm Re}\nolimits} \left\{{{{z\left({{\bf{J}}_1^{\lambda,\mu}f\left(z \right)} \right)'} \over {\left({1 - \gamma} \right){\bf{J}}_1^{\lambda,\mu}f\left(z \right) + \gamma {z^2}\left({{\bf{J}}_1^{\lambda,\mu}f\left(z \right)} \right)''}}} \right\} > \beta. A necessary and sufficient condition for a function to be in the class Aγλ,μ,ν(n,β) A_\gamma ^{\lambda,\mu,\nu}\left({n,\beta} \right) is obtained. Also, our paper includes linear combination, integral operators and we introduce the subclass Aγ,cmλ,μ,ν(1,β) A_{\gamma,{c_m}}^{\lambda,\mu,\nu}\left({1,\beta} \right) consisting of functions with negative and fixed finitely many coefficients. We study some interesting properties of Aγ,cmλ,μ,ν(1,β) A_{\gamma,{c_m}}^{\lambda,\mu,\nu}\left({1,\beta} \right) .
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