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arxiv: 2509.00112 · v1 · pith:ICJ6QIDFnew · submitted 2025-08-28 · ❄️ cond-mat.stat-mech · cond-mat.str-el

Statistical Mechanics of Paraparticles

classification ❄️ cond-mat.stat-mech cond-mat.str-el
keywords paraparticlesobeyingexclusionparticlesprinciplestatisticsbosonscase
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Quantum mechanics broadly classifies the particles into two categories: $(1)$ fermions and $(2)$ bosons. Fermions are half-integer spin particles, obeying Pauli's exclusion principle and Fermi-Dirac statistics. Whereas bosons are integer spin particles, not obeying Pauli's exclusion principle, and obeying Bose-Einstein statistics. However, there are two exceptions to this standard case: first, anyons, which exist in 2-dimensional systems, and secondly, paraparticles, which can exist in any dimension. Paraparticles follow their non-trivial parastatistics, obeying their generalised exclusion principle. In this paper, we provide a detailed review of the foundations of paraparticle statistics established in \cite{wang2025particle}. We extend this work further and then derive an important expression for the heat capacity of paraparticles for a specific case, which would provide a handle for the experimental detection of paraparticles in appropriate systems.

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