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I am interested in the topological homogeneity of function spaces.

Question. Let $X$ be a Tychonoff space, let $USC(X)$ be a space of upper semicontinuous functions on $X$ and let $USC(X)^+$ be a space of non-negative upper semicontinuous functions on $X$.

  1. Is the space $USC(X)$ topological homogeneitytopologically homogeneous ?
  2. Is the space $USC(X)^+$ topological homogeneitytopologically homogeneous ?
  3. What about $USC(X,[0,1])$ ?

I am interested in the topological homogeneity of function spaces.

Question. Let $X$ be a Tychonoff space, $USC(X)$ be a space of upper semicontinuous functions on $X$ and $USC(X)^+$ be a space of non-negative upper semicontinuous functions on $X$.

  1. Is the space $USC(X)$ topological homogeneity ?
  2. Is the space $USC(X)^+$ topological homogeneity ?
  3. $USC(X,[0,1])$ ?

I am interested in the topological homogeneity of function spaces.

Question. Let $X$ be a Tychonoff space, let $USC(X)$ be a space of upper semicontinuous functions on $X$ and let $USC(X)^+$ be a space of non-negative upper semicontinuous functions on $X$.

  1. Is the space $USC(X)$ topologically homogeneous ?
  2. Is the space $USC(X)^+$ topologically homogeneous ?
  3. What about $USC(X,[0,1])$ ?
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Homogeneity of the space of semicontinuous functions

I am interested in the topological homogeneity of function spaces.

Question. Let $X$ be a Tychonoff space, $USC(X)$ be a space of upper semicontinuous functions on $X$ and $USC(X)^+$ be a space of non-negative upper semicontinuous functions on $X$.

  1. Is the space $USC(X)$ topological homogeneity ?
  2. Is the space $USC(X)^+$ topological homogeneity ?
  3. $USC(X,[0,1])$ ?