Hairer’s reconstruction theorem without regularity structures
Francesco Caravenna, Lorenzo Zambotti
Abstract
This survey is devoted to Martin Hairer’s Reconstruction Theorem, which is one of the cornerstones of his theory of Regularity Structures [6]. Our aim is to give a new self-contained and elementary proof of this theorem, together with some applications, including a characterization, based on a single arbitrary test function, of negative Hölder spaces. We present the Reconstruction Theorem as a general result in the theory of distributions that can be understood without any knowledge of Regularity Structures themselves, which we do not even need to define.
Topics & Concepts
Characterization (materials science)MathematicsPure mathematicsFunction (biology)Calculus (dental)Algebra over a fieldDiscrete mathematicsPhysicsBiologyOpticsMedicineDentistryEvolutionary biologyMathematical and Theoretical AnalysisStochastic processes and financial applications