Continuity of weak solutions of a singular parabolic equation (Q2501189)

The singular parabolic equation \(\beta (u)_t = Lu\) is considered, where \(Lu\) is a second-order, uniformly elliptic operator in divergence form with standard structure conditions and \(\beta ( \cdot )\) is a maximal monotone graph in \(\mathbb R\times \mathbb R\) exhibiting a finite number of jumps. The bounded weak solutions of class \(W^{1,1}_2\) are poved to be continuous; modulus of continuity can be determined a priori only in terms of the data and the distance to the parabolic boundary.