Perturbation and Solvability of Initial LP Dirichlet Problems for Parabolic Equations over Non-cylindrical Domains

For parabolic linear operators L of second order in divergence form, we prove that the solvability of initial LP Dirichlet problems for the whole range 1 < p < infinity is preserved under appropriate small perturbations of the coefficients of the operators involved. We also prove that if the coefficients of L satisfy a suitable controlled oscillation in the form of Carleson measure conditions, then for certain values of p > 1, the initial LP Dirichlet problem associated with Lu = 0 over non-cylindrical domains is solvable. The results are adequate adaptations of the corresponding results for elliptic equations.