A Note on the Regularization of the Discrete Poisson–Neumann Problem

## Abstract The requirement that near a singular point of the equations of motion the power series expansions of the old variables in terms of the new ones start with second order terms leads to the transformation __z__ = sin^2^1/2__w__ related to that of THIELE‐BURRAU. Using this new transformatio

The existence and uniqueness of a weak solution of a Neumann problem is discussed for a second-order quasilinear elliptic equation in a divergence form. The note is a continuation of a recent paper, where mixed boundary value problems were considered, which guaranteed the coerciveness of the problem

We describe regularity results for viscosity solutions of a fully nonlinear (possible degenerate) second-order elliptic PDE with inhomogeneous Neumann boundary condition holding in the generalized sense. These results only require that 0 is uniformly convex, 0 # C 1, / for some / # (0, 1) and that t

We consider problems in the enumeration of sequences suggested by the problem of determining the number of ways of performing a piano composition (Klavierstu ck XI) by Karlheinz Stockhausen.

The -Neumann operator on (0, q)-forms (1 q n) on a bounded convex domain 0 in C n is compact if and only if the boundary of 0 contains no complex analytic (equivalently: affine) variety of dimension greater than or equal to q.