Pesin theory
Appearance
Pesin theory, developed by Yakov Pesin in the 1970s, extends the geometric machinery of hyperbolicity to systems that are not uniformly hyperbolic but have non-zero Lyapunov exponents almost everywhere. The fundamental theorem — the Pesin stable manifold theorem — proves that even without uniform estimates, almost every point with non-zero exponents possesses local stable and unstable manifolds, and these manifolds vary measurably across phase space. This transforms the rigid global foliations of Anosov systems into a flexible, measure-theoretic framework that applies to Hénon maps, billiards, and geodesic flows. Pesin theory is the bridge between the cathedral of uniform hyperbolicity and the wilderness of real-world chaos.