Abstract

The term ellipsis has been applied to a wide range of phenomena across the centuries, from any situation in which words appear to be missing (in St. Isidore’s definition), to a much narrower range of particular constructions. Ellipsis continues to be of central interest to theorists of language exactly because it represents a situation where the usual form/meaning mappings, the algorithms, structures, rules, and constraints that in nonelliptical sentences allow us to map sounds and gestures onto their corresponding meanings, break down. In fact, in ellipsis, the usual mappings seems to be entirely absent. In ellipsis, there is meaning without form. VP-ellipsis and sluicing are two of the best investigated instances of ellipsis and generally show remarkable similarities in their licensing requirements, both usually necessitating some equivalent antecedent which is subject to some kind of parallelism. It is no exaggeration to say that debates over the nature of this parallelism have formed the core of most of the generative work on ellipsis over the last forty years. Almost all conceivable positions on the parallelism question have been explored and advanced, and these debates are important exactly because they are often used to argue for the necessity of one or another kind of linguistic representation. Most of the debate is located in the arena of semantics and abstract syntactic structures—it is clear that surface syntactic or phonological parallelism is not at stake—and as such, elliptical structures often play an important role in fundamental ontological debates in linguistics. The logic is clear: if the parallelism or identity conditions found in ellipsis resolution require reference to certain kinds of objects, then our theories of linguistic competence must countenance objects of that kind. In generative linguistics, research has focused on two sets of constructions. Central examples of the first set, drawn from English, include sluicing as in (1), verb phrase ellipsis (VP-ellipsis) as in (2), and NP-ellipsis (or N -ellipsis) 2 as in (3)..