Abstract

Empty names are a problem for Russellians. I describe three ways to approach solving the problem. These are positing gappy propositions as contents, nonsingular propositions as contents, or denying that sentences containing empty names have contents. I discuss methods for deciding between solutions. I then argue for some methods over others and defend one solution using those methods. I reject the arguments that either intuitions about truth value, truth, content, or meaningfulness can decide between the solutions. I give an alternative argument which does decide between the three solutions. The alternative is based on the idea that a sentence and its internal negation are contrary: they cannot both be true, but they might both be false. I argue from Russellian premises to the conclusion that such sentences cannot be assigned truth values when they contain empty names. The argument shows that no Russellian should assign a truth value to a sentence containing an empty name, and therefore that no Russellian should assign a proposition as the content of such a sentence. This shows that Russellians should conclude that sentences containing empty names do not have contents, i.e. the no proposition view.