Abstract
It is shown that each real cliquish function \(f\) defined on a pseudometrizable space is the sum of two quasicontinuous functions. If moreover \(f\) is bounded (in the Baire class \(\alpha\)), then we can take the summands with this property.
Citation
Ján Borsík. "Sums of quasicontinuous functions defined on psuedometrizable spaces." Real Anal. Exchange 22 (1) 328 - 337, 1996/1997.
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