Global existence for reaction-diffusion systems with mass control and critical growth with respect to the gradient (Q5927583)

It is studied the global weak solvability for systems of the form NEWLINE\[NEWLINE \left\{ \begin{aligned} u_t-d_1 \Delta u=f(x,t,u,v,\nabla u,\nabla v)\;&\;\text{ in} \;Q_T,\\ v_t-d_2 \Delta v=f(x,t,u,v,\nabla u,\nabla v)\;&\;\text{ in} \;Q_T,\\ u(x,0)=u_0,\;v(x,0)=v_0\;&\;\text{ in} \Omega,\\ u=v=0\;&\;\text{ on} \Sigma_T,\end{aligned} \right. NEWLINE\]NEWLINE supposing positivity of the solutions. The total mass of the components is controlled with time which is ensured by NEWLINE\[NEWLINE f+g\leq L_1(u+v+1)\;\forall\;u,v \geq 0,\;r,s\in {\mathbb R}^N,\;\text{ a.e.} \;(x,t)\in Q_T,\;L_1>0. NEWLINE\]NEWLINE The nonlinearities have critical growth with respect to the gradient.