Bruckner--Garg-type results with respect to Haar null sets in C[0,1]

Abstract

A set A⊂ C[0,1] is shy or Haar null (in the sense of Christensen) if there exists a Borel set B⊂ C[0,1] and a Borel probability measure μ on C[0,1] such that A⊂ B and μ(B+f) = 0 for all f ∈ C[0,1]. The complement of a shy set is called a prevalent set. We say that a set is Haar ambivalent if it is neither shy nor prevalent. The main goal of the paper is to answer the following question: What can we say about the topological properties of the level sets of the prevalent/non-shy many f∈ C[0,1]? The classical Bruckner--Garg Theorem characterizes the level sets of the generic (in the sense of Baire category) f∈ C[0,1] from the topological point of view. We prove that the functions f∈ C[0,1] for which the same characterization holds form a Haar ambivalent set. In an earlier paper we proved that the functions f∈ C[0,1] for which positively many level sets with respect to the Lebesgue measure λ are singletons form a non-shy set in C[0,1]. The above result yields that this set is actually Haar ambivalent. Now we prove that the functions f∈ C[0,1] for which positively many level sets with respect to the occupation measure λ f-1 are not perfect form a Haar ambivalent set in C[0,1]. We show that for the prevalent f∈ C[0,1] for the generic y∈ f([0,1]) the level set f-1(y) is perfect. Finally, we answer a question of Darji and White by showing that the set of functions f ∈ C[0,1] for which there exists a perfect Pf⊂ [0,1] such that f'(x) = ∞ for all x ∈ Pf is Haar ambivalent.