Existence, uniqueness and L2t (Hx 2) L∞t (H1x) H1t (L2x) regularity of the gradient flow of the Ambrosio-Tortorelli functional

Abstract

We consider the gradient flow of the Ambrosio-Tortorelli functional at fixed ε>0, proving existence, uniqueness and L2 t (Hx 2) L∞ t (H1 x) H1 t (L2 x) regularity in dimension 2. In particular we improve a previous result where such regularity was known only up to a finite number of space time points, which diverged as ε 0. By employing a different technique for the crucial L2 t (H2 x) estimates we can see how in fact the desired regularity holds everywhere.