Some Inclusion Properties for Meromorphic Functions Defined by New Generalization of Mittag-Leffler Function
Abstract
In this paper, we introduce $\mathbb{I}_{\alpha ,\beta ,\eta }^{\gamma
,k,m},\ $which is a new operator by using generalized Mittag-Leffler
function. Also, we defined meromorphic subclasses associated\ $\mathbb{I}%
_{\alpha ,\beta ,\eta }^{\gamma ,k,m}$. Finally, we calculated inclusion
relations by using $\mathbb{I}_{\alpha ,\beta ,\eta }^{\gamma ,k,m}$ and
integral operator $\ F_{\mu }.$
,k,m},\ $which is a new operator by using generalized Mittag-Leffler
function. Also, we defined meromorphic subclasses associated\ $\mathbb{I}%
_{\alpha ,\beta ,\eta }^{\gamma ,k,m}$. Finally, we calculated inclusion
relations by using $\mathbb{I}_{\alpha ,\beta ,\eta }^{\gamma ,k,m}$ and
integral operator $\ F_{\mu }.$
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