On certain subclasses of analytic functions associated with Poisson distribution series

Abstract

Abstract In this paper, we find the necessary and sufficient conditions, inclusion relations for Poisson distribution series 𝒦 ( m , z ) = z + ∑ n = 2 ∞ m n - 1 ( n - 1 ) ! e - m z n $\mathcal{K}\left( {{\rm{m, z}}} \right) = {\rm{z + }}\sum\limits_{{\rm{n}} = 2}^\infty {{{{{\rm{m}}^{{\rm{n}} - 1}}} \over {\left( {n - 1} \right)!}}{{\rm{e}}^{ - {\rm{m}}}}{{\rm{z}}^{\rm{n}}}} $ to be in the subclasses 𝒮(k, λ) and 𝒞(k, λ) of analytic functions with negative coefficients. Further, we obtain necessary and sufficient conditions for the integral operator 𝒢 ( m , z ) = ∫ 0 z ℱ ( m , t ) t dt ${\rm{\mathcal{G}}}\left( {{\rm{m}},{\rm{z}}} \right) = \int_0^{\rm{z}} {{{{\rm{\mathcal{F}}}\left( {{\rm{m}},{\rm{t}}} \right)} \over {\rm{t}}}} {\rm{dt}}$ to be in the above classes.