Sierpinski-Zygmund functions that are Darboux, almost continuous, or have a perfect road
نویسندگان
چکیده
In this paper we show that if the real line R is not a union of less than continuum many of its meager subsets then there exists an almost continuous Sierpiński–Zygmund function having a perfect road at each point. We also prove that it is consistent with ZFC that every Darboux function f :R→ R is continuous on some set of cardinality continuum. In particular, both these results imply that the existence of a Sierpiński–Zygmund function which is either Darboux or almost continuous is independent of ZFC axioms. This gives a complete solution of a problem of Darji [4]. The paper contains also a construction (in ZFC) of an additive Sierpiński–Zygmund function with a perfect road at each point.
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عنوان ژورنال:
- Arch. Math. Log.
دوره 37 شماره
صفحات -
تاریخ انتشار 1997