The Triple Difference Operator of Binomial Poisson Matrix of Fractional

Year 2026, Volume: 8 Issue: 1 , 18 - 29 , 28.04.2026

C. Priya , Nagarajan Subramanian , Ayhan Esi , Mustafa Kemal Özdemir

https://doi.org/10.47087/mjm.1741148

https://izlik.org/JA34GP83HM

Abstract

In this article we introduce binomial Poisson matrix difference sequence spaces of fractional order $\alpha$, $b_{\Gamma^{3}}^{rs}$ and $b_{\Lambda ^{3}}^{rs}$ by employing fractional difference operator $\Delta^{\alpha}$ defined by \[ \Delta^{\alpha} x_{mnk} = \sum_{u=0}^{\infty} \sum_{v=0}^{\infty} \sum_{w=0}^{\infty} (-1)^{u+v+w} \frac{ \Gamma(\alpha+1)\Gamma(\beta+1)\Gamma(\gamma+1) }{ u!\,v!\,w!\, \Gamma(\alpha-u+1) \Gamma(\beta-v+1) \Gamma(\gamma-w+1) } x_{m-u,n-v,k-w}. \] We give some topological properties, obtain the Schauder basis, and discuss various duals. Finally, we present a graphical interpretation of the operator $B^{rs}(\Delta^{\alpha})$.

Keywords

Binomial poisson , difference sequence space , difference operator $\Delta^{\alpha}$ , Schauder basis

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