Bi-H"older invariants in o-minimal structures
Abstract
We prove that for any two definable germs in a polynomially bounded o-minimal structure, there exists a critical threshold α0 ∈ (0,1) such that if these germs are bi-α-H"older equivalent for some α α0, then they satisfy the following: itemize[label=] The Lipschitz normal embedding (LNE) property is preserved; that is, if one germ is LNE then so is the other; Their tangent cones have the same dimension; The links of their tangent cones have isomorphic homotopy groups. itemize As an application, we give an simple proof that a complex analytic germ which is bi-α-H"older homeomorphic to the germ of a Euclidean space for some α sufficiently close to 1 must be smooth. This provides a slightly stronger version of Sampaio's smoothness theorem, in which the germs are assumed to be bi-α-H"older homeomorphic for every α ∈ (0,1).
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