연구동향 분석

Uniformly Close-to-Convex Functions with Respect to Conju gate Poins

Syed Zakar Hussain Bukhari Taimoor Salahuddin Imtiaz Ahmad Muhammad Ishaq Shah Muhammad 2022년

논문상세정보
인용/피인용
' Uniformly Close-to-Convex Functions with Respect to Conju gate Poins' 의 주제별 논문영향력
논문영향력 선정 방법
논문영향력 요약
주제
  • Characterizations
  • coefficients estimates
  • distortion bounds
  • extremepoints
  • radii problem
동일주제 총논문수 논문피인용 총횟수 주제별 논문영향력의 평균
19 0

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' Uniformly Close-to-Convex Functions with Respect to Conju gate Poins' 의 참고문헌

  • Univalent functions with negative coefficients
  • Subordination and superordi-nation results for analytic functions with respect to symmetrical points
  • Subclasses of k−uniformly convex and k−starlike functions defined by Salagean operator
  • Starlike and convex functions with respect to conjugate points
  • Some subclasses of close-to-convex functions
  • Some generalizations of the class of analytic functions with respect to k-symmetric points
  • Some generalizations of analytic func-tions with respect to 2k-symmetric conjugate points
  • Some extremal problems for certain families of analytic functions
    W. Janowski [1973]
  • Some class of analytic functions related to conic domains
    S. Kanas [2014]
  • On starlike and close-to-convex functions with respect to n-symmetric points
  • On inequalities in the theory of functions
  • On a certain univalent mapping
  • New classes of k-uniformly convex and starlike functions with respect to other points
    C. Selvaraj [2009]
  • New classes of k-uniformly convex and starlike functions
    E. Aqlan [2004]
  • Integral means for univalent functions with negative coefficients
  • Fekete-Szegö prob-lem for subclasses of starlike functions with respect to symmetric points
  • Differential subordinations: theory and applica-tions
  • Certain Subclasses of k−uniformly starlike functions associated with symmetric q−derivative operator
    N. Magesh [2018]
  • A survey with open problems on univalent functions whose coef-ficients are negative
  • A subclass of alpha -convex function with respect to (2j, k)-symmetric conjugate points
  • A new subclass of quasi-convex functions with respect to k-symmetric points
    Z. -G. Wang [2005]