Growth properties of solutions of non-linear elliptic equations

## Abstract We prove a removability result for nonlinear elliptic equations with__p__ (__x__)‐type nonstandard growth and estimate the growth of solutions near a nonremovable isolated singularity. To accomplish this, we employ a Harnack estimate for possibly unbounded solutions and the fact that so

GP 3754. Reproduction in whole or in part is permitted for any purpose of the United States Government. We shall sometimes write 0: for DL to avoid ambiguities. Standard vector notation is used throughout. The length of an n-vector x is written 1x1 ; dx denotes the element of volume in n-space, and

Periodic solutions of arbitrary period to semilinear partial differential equations of Zabusky or Boussinesq type are obtained. More generally, for a linear differential operator A ( y , a ) , the equation A ( y , a)u = ( -l)lYlas,f(y, Pu), y = (t, x) E Rk x G is studied, where homogeneous boundary

## Abstract Using a general symmetry approach we establish transformations between different non‐linear space–time dependent evolution equations of Schrödinger type and their respective solutions. As a special case we study the transformation of the standard non‐linear Schrödinger equation (NLS)‐eq