On doubling properties for non-negative weak solutions of elliptic and parabolic PDE

Various classes of non-uniformly elliptic (and parabolic) equations of second order of the form for all solutions u ( x ) of which m a n Iuzl can be estimated by maxn [uI and m a a R JuxJ, were discussed in [I] (see also [2]).l The method used was introduced in [3]. In the same paper a method was s

## Abstract This paper deals with the initial and boundary value problem for a singular nonlinear parabolic equation. The existence of solutions is established by parabolic regularization. Some properties of solutions, for instance localization and large time behaviour are also discussed. Copyright

A new resolution of parabolic and elliptic partial differential equations (PDEs) based on the mixed finite element approximation on triangles has been recently developed [24,25]. This new approach reduces the number of unknowns from fluxes or Lagrange multiplier defined on edges to a single unknown