Causativity and Transitivity in Igbò

Topological Transitivity and Strong Transitivity

We discuss the relation between (topological) transitivity and strong transitivity of dynamical systems. We show that a transitive and open self-map of a compact metric space satisfying a certain expanding condition is strongly transitive. We also prove a couple of results for interval maps; for example it is shown that a transitive piecewise monotone interval map is strongly transitive.

Transitivity and proportionality in causation

It is widely assumed that causation is transitive, but putative counterexamples abound. These examples come in three varieties: switching cases, short circuit cases, and what I will call mismatch cases. In this paper I focus on the mismatch variety, which is widely taken to be the easiest to resolve. I will first introduce the cases and the existing strategy for dealing with them, then present ...

Causativity Expression and Cross-linguistic Variation of Resultative Constructions

This paper aims to propose a new account for the cross-linguistic variation of resultative constructions in natural languages. Specifically, I shall show why certain languages like English have the typical resultatives while others like Romance languages or Japanese systemically miss them. I shall first review Washio’s (1996, 1997) typological pattern for resultative constructions as well as th...

Truth-Grounding and Transitivity

It is argued that if we take grounding to be univocal, then there is a serious tension between truthgrounding and one commonly assumed structural principle for grounding, namely transitivity. The primary claim of the paper is that truth-grounding cannot be transitive. Accordingly, it is either the case that grounding is not transitive or that truth-grounding is not grounding, or both.

Grounding, transitivity, and contrastivity