A fixed-point theorem in a category of compact metric spaces

AbstractVarious results appear in the literature for deriving existence and uniqueness of fixed points for endofunctors on categories of complete metric spaces. All these results are proved for contracting functors which satisfy some further requirements, depending on the category in question.Following a new kind of approach, based on the notion of η-isometry, we show that the sole hypothesis of contractivity is enough for proving existence and uniqueness of fixed points for endofunctors on the category of compact metric spaces and embedding-projection pairs

Category of Probabilistic Metric Spaces and a Fixed Point Theorem

Abstract In this paper, the probabilistic nonexpansive (PNE) mappings between probabilistic metric spaces were introduced and studied. The category of probabilistic metric spaces (CP M ≈ ) is introduced and a fixed point theorem in CP M ≈ is proved. Mathematics Subject Classification: 18A99, 54E70, 47H1

A Fixed Point Theorem in a Category of Compact Metric Spaces

Various results appear in the literature for deriving existence and uniqueness of fixed points for endofunctors on categories of complete metric spaces. All these results are proved for contracting functors which satisfy some further requirements, depending on the category in question. Following a new kind of approach, based on the notion of η-isometry, we show that the sole hypothesis of contractivity is enough for proving existence and uniqueness of fixed points for endofunctors on the category of compact metric spaces and embedding-projection pairs