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[:es]TitleUniform continuity of the product of real functions defined on a metric space
Speaker: Gerald Beer (California State University Los Angeles)
Date: 03/11/2017, 13:00h
Location: Sala de Seminarios (Edificio Torretamarit)
Abstract:
As is well-known, the pointwise product of two bounded real-valued uniformly continuous functions f  and g  defined on a metric space is uniformly continuous, but this condition is hardly necessary:  let      f(x) = g(x) = \sqrt (x) for x ≥ 0.  In joint work with Som Naimpally (deceased) that appeared in Real Analysis Exchange in 2012, we produce necessary and sufficient conditions on a pair of uniformly continuous real-valued functions (f,g) defined on an arbitrary  metric space so that their pointwise product is uniformly continuous.  Our conditions are sufficient for any pair of real-valued functions, and are necessary for a class of pairs properly containing the uniformly continuous pairs.  We precisely identify this class and describe it in various ways.
A different but equally interesting question is this:  what are necessary and sufficient conditions on the internal structure of a metric space so that the product of each pair of uniformly continuous real-valued functions remains uniformly continuous?   In joint work with Maribel Garrido and Ana Meroño appearing in Set-Valued and Variational Analysis and dedicated to Jon Borwein that in part revisits a recent result of Javier Cabello Sánchez appearing in Filomat, we show that this occurs exactly when the familiar bornology of Bourbaki bounded subsets coincides with a new larger bornology.[:]

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