<div>The principal results presented in this thesis are Theorems 1 and 2 in ¶2.1, both of which are new. Theorem 1 gives the feather of a particular group of couplings with connectivity two, and Theorem 2 defines the feather of any coupling with connectivity one. The terms "coupling" and "connectivity" were defined by Davies and Umphrey in an unpublished paper. The term "feather" is new; it is defined and discussed in ¶1.2. All three terms are also defined in Appendix I. The conclusiions presented in Theorems 1 and 2 are always true provided only that the restriction of Bézout's theorem is complied with. In spite of this there are many apparent exceptions; a few examples of these are discussed in ¶2.2. As demonstrated there the apparent e...