Homogenization and enhancement of the \(G\)-equation in random environments (Q2852541)

The homogenization limit when the perturbation parameter tends to zero can be thought of as a small parameter perturbation technique. Here one applies this method to a \(G\)-equation submitted to a general stationary ergodic environment. The framework of the study is the so-called viscosity solution. The averaging properties of this \(G\)-equation cannot be studied by using subadditive theorem which is the standard approach to the homogenization of Hamilton-Jacobi equation in random media. The main contribution of the paper is to propose a new approach to circumvent these problems, which reduces to a controllability estimate and the construction of a random sequence which defines a long-time asymptotic limit.