C. Ramachandran scite author profile

Prabhu

Sivasubramanian³

2018

Enough attentions to domains related to conical sections has not been done so far although it deserves more. Making use of the conical domain the authors have defined a new class of starlike and Convex Functions with respect to symmetric points involving the conical domain. Growth and distortion estimates are studied with convolution using domains bounded by conic regions. Certain coefficient estimates are obtained for domains bounded by conical region. Finally interesting application of the results are also highlighted for the function Ωk,βdefined by Noor.

Certain results on q-starlike and q-convex error functions

Vanitha²,

Kanas

2018

The error function occurs widely in multiple areas of mathematics, mathematical physics and natural sciences. There has been no work in this area for the past four decades. In this article, we estimate the coefficient bounds with q-difference operator for certain classes of the spirallike starlike and convex error function associated with convolution product using subordination as well as quasi-subordination. Though this concept is an untrodden path in the field of complex function theory, it will prove to be an encouraging future study for researchers on error function.

Certain Bound forq-Starlike andq-Convex Functions with respect to Symmetric Points

International Journal of Mathematics and Mathematical Sciences

Kavitha²,

Soupramanien³

2015

Braz. arch. biol. technol.

Certain Aspects of Univalent Function with Negative Coefficients Defined by Bessel Function

Ramachandran

Dhanalakshmi

Vanitha

2016

Key words: In recent years, applications of Bessel functions have been effectively used in the modelling of chemical engineering processes and theory of univalent functions.In this paper, we study a new class of analytic and univalent functions with negative coefficients in the open unit disk defined by Modified Hadamard product withBessel function. We obtain coefficient bounds and exterior points for this new class.

A unified class of k-uniformly convex functions defined by the Dziok–Srivastava linear operator

Applied Mathematics and Computation

Shanmugam

Srivástava

et al. 2007