Particle reflection amplitudes in an(1) Toda field theories

We determine the exact quantum particle reflection amplitudes for all known vacua of a(n)((1))) affine Toda theories on the half-line with integrable boundary conditions. (Real non-singular vacuum solutions are known for about half of all the classically integrable boundary conditions.) To be able to do this we use the fact that the particles can be identified with the analytically continued breather solutions, and that the real vacuum solutions are obtained by analytically continuing stationary soliton solutions. We thus obtain the particle reflection amplitudes from the corresponding breather reflection amplitudes. These in turn we calculate by bootstrapping from soliton reflection matrices which we obtained as solutions of the boundary Yang-Baxter equation (reflection equation). We study the pole structure of the particle reflection amplitudes and uncover an unexpectedly (1, rich spectrum of excited boundary states, created by particles binding to the boundary. For a, and a(4)((1)) Toda theories we calculate the reflection amplitudes for particle reflection off all these excited boundary states. We are able to explain all physical strip poles in these reflection factors either in terms of boundary bound states or a generalisation of the Coleman-Thun mechanism. (C) 1999 Published by Elsevier Science B.V, All rights reserved.