Dirichlet duality and the nonlinear Dirichlet problem

## Abstract In the present paper, we consider the nonlinear Dirichlet problem ‐ Δ__u__(__x__) __u__^β^(__x__) = 0 equation image is the unit ball and q is a continuous radially symmetric function on __B__ which may be singular on ∂B. We state some mild conditions for the function __q__ so that th

In this paper we study the uniqueness problem for the classical Dirichlet form on a weighted real L 2 -space when the underlying space is finite dimensional. The associated operator H, called the Dirichlet operator, when restricted to the domain of smooth functions, takes the form &2&; } { where ; i

We study the Dirichlet problem for the parabolic equation u t = u m m > 0, in a bounded, non-cylindrical and non-smooth domain ⊂ N+1 N ≥ 2. Existence and boundary regularity results are established. We introduce a notion of parabolic modulus of left-lower (or left-upper) semicontinuity at the points

We introduce a new concept of solution for the Dirichlet problem for the total variational flow named entropy solution. Using Kruzhkov's method of doubling variables both in space and in time we prove uniqueness and a comparison principle in L 1 for entropy solutions. To prove the existence we use t