Sharp solvability for singular SDEs
Damir Kinzebulatov, Yuliy A. Semënov
Abstract
The attracting inverse-square drift provides a prototypical counterexample to solvability of singular SDEs: if the coefficient of the drift is larger than a certain critical value, then no weak solution exists. We prove a positive result on solvability of singular SDEs where this critical value is attained from below (up to strict inequality) for the entire class of form-bounded drifts. This class contains e.g. the inverse-square drift, the critical Ladyzhenskaya-Prodi-Serrin class. The proof is based on a Lp variant of De Giorgi’s method.
Topics & Concepts
MathematicsCounterexampleBounded functionInverseClass (philosophy)Square (algebra)Singular valuePure mathematicsInequalityValue (mathematics)Mathematical analysisApplied mathematicsDiscrete mathematicsStatisticsEigenvalues and eigenvectorsGeometryArtificial intelligencePhysicsComputer scienceQuantum mechanicsAdvanced Mathematical Modeling in EngineeringStochastic processes and financial applicationsNavier-Stokes equation solutions