Abstract
AbstractInformation is physical(Landauer 1961IBM J. Res. Dev.5183–91), and for a physical theory to be universal, it should model observers as physical systems, with concrete memories where they store the information acquired through experiments and reasoning. Here we address these issues in Spekkens’ toy theory (Spekkens 2005Phys. Rev.A71052108), a non-contextual epistemically restricted model that partially mimics the behaviour of quantum mechanics. We propose a way to model physical implementations of agents, memories, measurements, conditional actions and information processing. We find that the actions of toy agents are severely limited: although there are non-orthogonal states in the theory, there is no way for physical agents to consciously prepare them. Their memories are also constrained: agents cannot forget in which of two arbitrary states a system is. Finally, we formalize the process of making inferences about other agents’ experiments and model multi-agent experiments like Wigner’s friend. Unlike quantum theory (Nurgalieva and del Rio Lidia 2019Electron. Proc. Theor. Comput. Sci.287267–97; Fraseret al2020 Fitch’s knowability axioms are incompatible with quantum theory arXiv:2009.00321; Frauchiger and Renner 2018Nat. Commun.93711; Nurgalieva and Renner 2021Contemp. Phys.611–24; Brukner 2018Entropy20350) or box world (Vilasiniet al2019New J. Phys.21113028), in toy theory there are no inconsistencies when physical agents reason about each other’s knowledge.
Funder
Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung
National Centre of Competence in Research Quantum Science and Technology
Foundational Questions Institute
Institut Périmètre de physique théorique
Subject
General Physics and Astronomy
Reference37 articles.
1. Irreversibility and heat generation in the computing process;Landauer;IBM J. Res. Dev.,1961
2. Quantum information theory;Bennett;IEEE Trans. Inf. Theory,1998
3. Inadequacy of modal logic in quantum settings;Nurgalieva;Electron. Proc. Theor. Comput. Sci.,2019
4. Fitch’s knowability axioms are incompatible with quantum theory;Fraser,2020