Starlike functions associated with an epicycloid
Shweta Gandhi, Prachi Gupta, Sumit Nagpal, V. Ravichandran
Abstract
For a natural number $n\geq 2$, the function $\phi_{n\mathcal{L}}(z)=1+nz/(n+1)+z^n/(n+1)$ maps the open unit disk onto a domain bounded by an epicycloid with $(n-1)$ cusps. A class of starlike functions associated with $\phi_{n\mathcal{L}}$ is defined in the unit disk and its sharp bounds on initial coefficients, various inclusion relations and radii problems related to the other subclasses of starlike functions are investigated. As an application, the corresponding results are determined in the limiting case for the class of normalized analytic functions $f$ satisfying $|zf'(z)/f(z)-1|<1$ in the unit disk.
Topics & Concepts
Unit diskMathematicsBounded functionLimitingAnalytic functionUnit (ring theory)Domain (mathematical analysis)Class (philosophy)CombinatoricsFunction (biology)Mathematical analysisEvolutionary biologyMechanical engineeringMathematics educationEngineeringComputer scienceArtificial intelligenceBiologyAnalytic and geometric function theoryPolymer Synthesis and Characterization