Some new type of approaches to deferred Riesz statistical convergence in non-Archimedean neutrosophic sequenceV. A. Khan, M. Arshad, M. Et, S. ParveenThis study explores the advanced concept of deferred Riesz statistical convergence within non-Archimedean neutrosophic normed spaces. By integrating neutrosophic operators with regular triangular matrices, we extend classical convergence theories and Cauchy sequences into this sophisticated context. Our research unveils new insights into the properties and interrelations of deferred Riesz convergence, offering a comprehensive analysis of its connections with various convergence theories in neutrosophic spaces. We establish significant relationships between deferred Riesz statistical convergence and other prominent convergence theories, underscoring the theoretical advancements and practical implications of these developments.Advanced Studies: Euro-Tbilisi Mathematical Journal, Vol. 19(2) (2026), pp. 213-233 |