On Interval Valued Generalized Difference Classes Defined by Orlicz Function

The work of interval arithmetic was originally introduced by Dwyer [3] in 1951. The development of interval arithmetic as a formal system and evidence of its value as a computational device was provided by Moore [15] and Moore and Yang [16]. Furthermore, Moore and others [3]; [4]; [10] and [17] have developed applications to differential equations. Chiao in [2] introduced sequence of interval numbers and defined usual convergence of sequences of interval numbers. Şengönül and Eryilmaz in [20] introduced and studied bounded and convergent sequence spaces of interval numbers. Recently Esi studied strongly λ-and strongly almost λ-convergent sequences spaces of the interval numbers in [5], respectively. Also, Esi studied some new type sequence space of the interval numbers in [6,7] and lacunary sequence spaces for interval numbers in [8]. In Hazarika [11] introduced the notion of λ-ideal convergent interval valued di¤erence classes defined by Musielak-Orlicz function. Kizmaz [12] introduced the notion of di¤erence sequence spaces as follows: