Abstract:
In this paper we prove that
1) the spaces $C_p(S)$ and $C_p(T)$ of all continuous functions in the topology of pointwise convergence are not linearly homeomorphic if $S,T$ are not locally compact metrizable while the derivation set $T^{(1)}$ is compact and the derivation set $S^{(1)}$ is not;
2) the spaces $C_K(X)$ and $C_K(Y)$ of all continuous functions in the compact-open topology are not homeomorphic if $X$ and $Y$ are completely regular spaces while $X$ is locally compact and $\sigma$-compact and there is a point $y_0\in Y$ of countable character such that every neighborhood of
it is not a pseudocompact.
Keywords:spaces of all continuous functions, linear homeomorphism, homeomorphism, metrizable space, locally compact space, topology of pointwise convergence, compact-open topology.
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