Regularity results for a nonlinear elliptic-parabolic system with oscillating coefficients

Abstract

In this paper we study the initial boundary value problem for the system div(σ(u)∇)=0,\ \ ut- u=σ(u)|∇|2. This problem is known as the thermistor problem which models the electrical heating of conductors. Our assumptions on σ(u) leave open the possibility that u→∞σ(u)=0, while u→∞σ(u) is large. This means that σ(u) can oscillate wildly between 0 and a large positive number as u→ ∞. Thus our degeneracy is fundamentally different from the one that is present in porous medium type of equations. We obtain a weak solution (u, ) with |∇ |, |∇ u|∈ L∞ by first establishing a uniform upper bound for e u for some small . This leads to an inequality in ∇, from whence follows the regularity result. This approach enables us to avoid first proving the H\"older continuity of in the space variables, which would have required that the elliptic coefficient σ(u) be an A2 weight. As it is known, the latter implies that σ(u) is "nearly bounded".