In this paper, we study key characteristics of (λ, µ)-statistical convergence within the neutrosophic 2- norm framework. To deepen the understanding of these concepts, we extend our discussion to V, λ, µ-summability under neutrosophic 2-norm structures, leading to the formulation of some important results. Additionally, we explore the notion of (λ, µ)-statistical Cauchy sequences, revealing their intricate relationship with (λ, µ)- statistical convergence in the context of neutrosophic 2-normed spaces. Moreover, we examine the inclusion relationships between the classes of all statistically convergent and (λ, µ)-statistically convergent double sequences, shedding light on their structural interconnections within this mathematical framework in relation to the neutrosophic 2- norm framework.
Hossain et al. (Tue,) studied this question.