Functions on a convex set which are both ω -semiconvex and ω -semiconcave II

Abstract

In a recent article (2022) we proved with L. Zaj\'icek that if G⊂n is an unbounded open convex set that does not contain a translation of a convex cone with non-empty interior, then there exist f:G and a concave modulus ω such that t∞ω(t)=∞ , f is both semiconvex and semiconcave with modulus ω and f C1,ω(G) . Here we improve the previous result as follows: If G is as above and ω(t)=tα for some α∈(0,1) , then there exists f:G that is both semiconvex and semiconcave with modulus ω and f C1,α(G) . This result has immediate consequences concerning a first-order quantitative converse Taylor theorem and the problem whether f∈ C1,α(G) whenever f is smooth in a corresponding sense on all lines.