On the Generalized Difference Matrix Domain on Strongly Almost Convergent Double Sequence Spaces

Abstract

Most recently, some new double sequence spaces B(Mu), B(C) where =\b,bp,r,f,f0\ and B(Lq) for 0<q<∞ have been introduced as four-dimensional generalized difference matrix B(r,s,t,u) domain on the double sequence spaces Mu, C where =\b,bp,r,f,f0\ and Lq for 0<q<∞, and some topological properties, dual spaces, some new four-dimensional matrix classes and matrix transformations related to these spaces have also been studied by Tug and Basar and Tug (see OT,OT2,Orhan,Orhan 2). In this present paper, we introduce new strongly almost null and strongly almost convergent double sequence spaces B[Cf] and B[Cf0] as domain of four-dimensional generalized difference matrix B(r,s,t,u) in the spaces [Cf] and [Cf0], respectively. Firstly, we prove that the new double sequence spaces B[Cf] and B[Cf0] are Banach spaces with its norm. Then, we give some inclusion relations including newly defined strongly almost convergent double sequence spaces. Moreover, we calculate the α-dual, β(bp)-dual and γ-dual of the space B[Cf]. Finally, we characterize new four-dimensional matrix classes ([Cf];Cf), ([Cf];Mu), (B[Cf];Cf), (B[Cf];Mu) and we complete this work with some significant results.