Abstract
Assuming that the union of fewer than continuumly many meager sets does not cover the real line, we construct an example of an additive almost continuous Sierpi{\'n}ski-Zygmund function which has a perfect road at each point but which does not have the Cantor intermediate value property.
Citation
Tomasz Natkaniec. Harvey Rosen. "An example of an additive almost continuous Sierpiński-Zygmund Function." Real Anal. Exchange 30 (1) 261 - 266, 2004-2005.
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