Banach halos and short isometries
Abstract
The aim of this article is twofold. First, we develop the notion of a Banach halo, similar to that of a Banach ring, except that the usual triangular inequality is replaced by the inequality |a + b| ≤ (|a| , |b|)p involving the p-norm for some p ∈]0, +∞], or by the inequality |a+b|≤ C(|a|,|b|). This allows us to have a flow of powers on Banach halos and to work, e.g., with the square of the usual absolute value on Z. Then we define and study the group of short isometries of normed involutive coalgebras over a base commutative Banach halo. An aim of this theory is to define a representable group Kn⊂ GLn whose points with values in R give On(R) and whose points with values in Qp give GLn(Zp), giving to the analogy between these two groups a kind of geometric explanation.
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