Abstract

The problem of measurement can be reformulated as the problem of measurability: What are the conditions under which measurement becomes possible at all? And what is the ontological status of concrete measurement outcomes? It will be shown in the course of this article that what Joel Michell deemed the ‘representational theory’ of measurement provides an adequate framework for answering these questions. However, contrary to Michell, I will point out that Hermann von Helmholtz should be seen as an important forerunner of the representational view. Furthermore, it will be argued that the Finnish logical empiricist Eino Kaila carried on Helmholtz’s approach by combining it with a certain form of ontological invariantism. On the whole, a ‘structural realist’ account of measurement will be suggested.