Where was the particle?

TL;DR

This paper critically examines the empty/full waves hypothesis in quantum mechanics, analyzing its implications for energy conservation, locality, and quantum paradoxes, and concludes it does not resolve key quantum puzzles.

Contribution

It provides a detailed analysis of the empty/full waves hypothesis, highlighting its limitations and the necessity of relaxing locality to avoid contradictions.

Findings

Energy conservation implies a continuous trajectory for full waves.

Contradictions arise with the hypothesis in multi-particle experiments like Hardy's.

Relaxing locality can resolve these contradictions.

Abstract

The hypothesis of empty/full waves considers that a click in a detector is triggered by a property carried by the wave-packet that impinges on that detector. Different authors call this property particle, but according to the terminology of this hypothesis, the term full wave is used in this text. The present article discusses the validity of the empty/full waves hypothesis. It is shown that the energy conservation principle imposes for a full wave a continuous trajectory from the source to the detector. That gives legitimacy to the question -- in case the wave function consists in a couple of space-separated branches -- which wave-packet was a full wave before the click in the detector, or, in other authors' terminology, where was the particle before the detector clicked. This question is a counterfactual question. In some multi-particle experiments, e.g. Hardy's thought-experiment with an electron and a positron, the combination of the empty/full waves hypothesis and counterfactual reasoning leads to a contradiction with the predictions of the quantum theory. However, it is shown here that this contradiction is solvable if the locality requirement is relaxed. To the difference from the local hidden variables, it is not possible to prove or disprove the idea of empty/ full waves, at least at present. But it is possible to ask whether this hypothesis offers a solution to the quantum puzzles. The answer is negative. For instance it offers no solution to the before-before loop. The question remains open whether the empty/full waves hypothesis is correct, or "God plays dice".