Prevalent and shy sets

Definitions

Prevalence and shyness

Local prevalence and shyness

Theorems involving prevalence and shyness

• If S is shy, then so is every subset of S and every translate of S.
• Every shy Borel set S admits a transverse measure that is finite and has compact support. Furthermore, this measure can be chosen so that its support has arbitrarily small diameter.
• Any finite or countable union of shy sets is also shy.
• Any shy set is also locally shy. If V is a separable space, then every locally shy subset of V is also shy.
• A subset S of n-dimensional Euclidean space Rⁿ is shy if and only if it has Lebesgue measure zero.
• Any prevalent subset S of V is dense in V.
• If V is infinite-dimensional, then every compact subset of V is shy.

• Almost every continuous function from the interval into the real line R is nowhere differentiable; here the space V is C with the topology induced by the supremum norm.
• Almost every function f in the L^p space L¹ has the property that
• For 1 < p ≤ +∞, almost every sequence a = _n∈N in ℓ^p has the property that the series
• Prevalence version of the Whitney embedding theorem: Let M be a compact manifold of class C¹ and dimension d contained in Rⁿ. For 1 ≤ k ≤ +∞, almost every C^k function f : Rⁿ → R^2d+1 is an embedding of M.
• If A is a compact subset of Rⁿ with Hausdorff dimension d, m ≥ d, and 1 ≤ k ≤ +∞, then, for almost every C^k function f : Rⁿ → R^m, f also has Hausdorff dimension d.
• For 1 ≤ k ≤ +∞, almost every C^k function f : Rⁿ → Rⁿ has the property that all of its periodic points are hyperbolic. In particular, the same is true for all the period p points, for any integer p.