Large field problem in coercive singular PDEs

Abstract

We derive a priori estimates for singular differential equations of the form \[ L φ = P(φ,∇φ) + f(φ,∇φ) \] where P is a polynomial, f is a sufficiently well-behaved function, and is an irregular distribution such that the equation is subcritical. The differential operator L is either a derivative in time, in which case we interpret the equation using rough path theory, or a heat operator, in which case we interpret the equation using regularity structures. Our only assumption on P is that solutions with =0 exhibit coercivity. Our estimates are local in space and time, and independent of boundary conditions. One of our main results is an abstract estimate that allows one to pass from a local coercivity property to a global one using scaling, for a large class of equations. This allows us to reduce the problem of deriving a priori estimates to the case when is small.

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