A note on spatial uniformation for Fisher-KPP type equations with a concentration dependent diffusion (Q1758810)

The authors prove a pointwise gradient estimate for the solution of the Cauchy problem associated to the quasilinear Fisher-KPP type equation with a diffusion coefficient \(\varphi(u)\) satisfying that \(\varphi(0) = 0\), \(\varphi(1) = 1\) and a source term \(\psi(u)\) which is vanishing only for levels \(u = 0\) and \(u = 1\). As consequence they prove that the bounded weak solution becomes instantaneously a continuous function even if the initial datum is merely a bounded function.