Hölder curves with exotic tangent spaces

Abstract: An important implication of Rademacher's Differentiation Theorem is that every Lipschitz curve $\Gamma$ infinitesimally looks like a line at almost all of its points in the sense that at $\mathcal{H}^1$-almost every point of $\Gamma$, the only tangent to $\Gamma$ is a straight line through the origin. In this article, we show that, in contrast, the infinitesimal structure of H\"older curves can be much more extreme. First we show that for every $s>1$ there exists a $(1/s)$-H\"older curve $\Gamma_s$ in a Euclidean space with $\mathcal{H}^s(\Gamma_s)>0$ such that $\mathcal{H}^s$-almost every point of $\Gamma_s$ admits infinitely many topologically distinct tangents. Second, we study the tangents of self-similar connected sets (which are canonical examples of H\"older curves) and prove that the curves $\Gamma_s$ have the additional property that $\mathcal{H}^s$-almost every point of $\Gamma_s$ admits infinitely many homeomorphically distinct tangents to $\Gamma_s$ which are not admitted as (not even bi-Lipschitz to) tangents to any self-similar set at typical points.