On Monotonous Separately Continuous Functions
Abstract
Let T=( T,≤) and T1=( T1,≤1) be linearly ordered sets and X be a topological space. The main result of the paper is the following: If function f(t,x): T×X T1 is continuous in each variable ("t"and "x") separately and function fx(t)=f(t,x) is monotonous on T for every x∈X, then f is continuous mapping from T×X to T1, where T and T1 are considered as topological spaces under the order topology and T×X is considered as topological space under the Tychonoff topology on the Cartesian product of topological spaces T and X.
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