In this paper we consider the classic problem of scattering of waves

from perfectly conducting cylinders with piecewise smooth

boundaries. The scattering problems are formulated as integral

equations and solved using a Nyström scheme, where the corners of

the cylinders are efficiently handled by a method referred to as

Recursively Compressed Inverse Preconditioning (RCIP). This method

has been very successful in treating static problems in non-smooth

domains and the present paper shows that it works equally well for

the Helmholtz equation. In the numerical examples we focus on

scattering of E- and H-waves from a cylinder with one corner. Even

at a size kd=1000, where k is the wavenumber and $d$ the

diameter, the scheme produces at least 13 digits of accuracy in the

electric and magnetic fields everywhere outside the cylinder.