Abstract
In this paper we are concerned with ∫Γ3λ I statistical convergence of pre-cauchy triple sequences. ∫Γ3λ I statistical convergence implies ∫Γ3λ I statistical pre-Cauchy condition and examine some properties of these concepts. We examine some properties of these concepts, if the triple entire sequence spaces is statistically convergent then statistically pre-Cauchy and also triple sequence of ideal (I3)- is statistically pre-Cauchy
Highlights
We introduce ∫Γ3λI sequence space and discuss ∫Γ3λI is statistically convergent is pre-Cauchy and the ideal space is preCauchy
In the case of a triple sequence it will be in the form of a box in three dimensional case
The vector space of all triple analytic sequences are usually denoted by Λ3
Summary
We introduce ∫Γ3λI sequence space and discuss ∫Γ3λI is statistically convergent is pre-Cauchy and the ideal space is preCauchy. The vector space of all triple analytic sequences are usually denoted by Λ3.
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