MMN-1158
Some iterated convergence and fixed point theorems in real linear $n$-normed spaces
Abstract
In this paper, we prove some iterated convergence theorems to fixed points of self mappings satisfying Z-type conditions and Z-operators by considering the base space as a real linear n(>1)-normed space. We also establish some common fixed point theorems for quadruple of self mappings satisfying certain weak conditions and - contraction. The paper also demonstrates a way to construct convergence and fixed point theorems in real linear n-normed spaces as base space.
Vol. 15 (2014), No. 2, pp. 423-437