Ruling out higher-order interference from purity principles
Howard Barnum, Ciar\'an M. Lee, Carlo Maria Scandolo, John H. Selby

TL;DR
This paper demonstrates that principles based on purity in generalised probabilistic theories limit interference to the second order, aligning closely with quantum theory and excluding higher-order interference.
Contribution
It identifies fundamental purity principles that restrict interference to second order within generalised probabilistic theories, connecting these theories to Euclidean Jordan algebras.
Findings
Theories satisfying key purity principles exhibit at most second-order interference.
Systems in such theories correspond to Euclidean Jordan algebras.
Multi-slit experiments are described by pure projectors in these theories.
Abstract
As first noted by Rafael Sorkin, there is a limit to quantum interference. The interference pattern formed in a multi-slit experiment is a function of the interference patterns formed between pairs of slits, there are no genuinely new features resulting from considering three slits instead of two. Sorkin has introduced a hierarchy of mathematically conceivable higher-order interference behaviours, where classical theory lies at the first level of this hierarchy and quantum theory theory at the second. Informally, the order in this hierarchy corresponds to the number of slits on which the interference pattern has an irreducible dependence. Many authors have wondered why quantum interference is limited to the second level of this hierarchy. Does the existence of higher-order interference violate some natural physical principle that we believe should be fundamental? In the current work we…
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