Fixed point theory on Banach spheres
DOI:
https://doi.org/10.12775/TMNA.2024.018Keywords
Banach sphere, fixed point theorem, shrinking projection methodAbstract
In this paper, we consider and study the concept of the Banach sphere. The usual spherical distance of the unit sphere of a Hilbert space is defined by its inner product and the inverse of the cosine function. Therefore, we cannot apply this notion to Banach spheres in general. We first introduce a two-variable function like a spherical distance and a notion of convex combination on a Banach sphere. After that, we define a projection onto a subset of a Banach sphere, and prove a fixed point theorem and fixed point approximation for a mapping having a kind of nonspreadingness. Our work is a challenge to construct optimisation theory on spherical planes without geodesics.References
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