A characteristics for a surface sum of two handlebodies along an annulus or a once-punctured torus to be a handlebody

Abstract

The main results of the paper is that we give a characteristics for an annulus sum and a once-punctured torus sum of two handlebodies to be a handlebody as follows: 1. The annulus sum H=H1A H2 of two handlebodies H1 and H2 is a handlebody if and only if the core curve of A is a longitude for either H1 or H2. 2. Let H=H1T H2 be a surface sum of two handlebodies H1 and H2 along a once-punctured torus T. Suppose that T is incompressible in both H1 and H2. Then H is a handlebody if and only if the there exists a collection \δ, σ\ of simple closed curves on T such that either \δ, σ\ is primitive in H1 or H2, or \δ\ is primitive in H1 and \σ\ is primitive in H2.