New subclass of meromorphic harmonic functions defined by symmetric q-calculus and domain of Janowski functions.

In this article, by applying the convolution principle and symmetric -calculus, we develop a new generalized symmetric -difference operator of convolution type, which is applicable in the domain . Utilizing this operator, we construct, analyze, and evaluate two new sets of meromorphically harmonic functions in the Janowski domain. Furthermore, we investigate the convolution properties and necessary conditions for a function to belong to the class , examining the sufficiency conditions for to satisfy these properties. Moreover, we examine key geometric properties of the function in the class , including the distortion bound, convex combinations, the extreme point theorem, and weighted mean estimates.