Helly space: Difference between revisions

In mathematics, and particularly functional analysis, the Helly space, named after Eduard Helly, consists of all monotonically increasing functions Template:Nowrap, where [0,1] denotes the closed interval given by the set of all x such that Template:Nowrap^[1] In other words, for all Template:Nowrap we have Template:Nowrap and also if Template:Nowrap then Template:Nowrap

Let the closed interval [0,1] be denoted simply by I. We can form the space I^I by taking the uncountable Cartesian product of closed intervals:^[2]

${\displaystyle I^I=\prod _{i\in I}{I}_i}$

The space I^I is exactly the space of functions Template:Nowrap. For each point x in [0,1] we assign the point ƒ(x) in Template:Nowrap^[3]

The Helly space is a subset of I^I. The space I^I has its own topology, namely the product topology.^[2] The Helly space has a topology; namely the induced topology as a subset of I^I.^[1] It is normal Haudsdorff, compact, separable, and first-countable but not second-countable.

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Gelfand–Shilov space