Abstract
The notion of statistical convergence is more general than the classical convergence. Tauberian theorems via different ordinary summability means have been established by many researchers. In the present paper, we have established two new Tauberian theorems via statistical Cesaro summability mean of continuous function of two variables by using oscillating behavior and De la vallee Poussin means of double integral over a locally convex space. Finally, some concluding remarks and corollaries are provided here to support our theorems and demonstrated that our results are the non trivial extension of some existing results.
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