We formulate an effective compact Abelian U (1) T gauge sector in which entropy is the conserved charge and kB is the elementary charge unit. With the Planck-scale normalization εₜ = kB²/ (4πℏ c), μₜ = 4πℏ/ (kB² c), the thermal fine-structure constant is αT = 1 and the reduced thermal flux is Φ̄T = ℏ/kB. The construction gives a four-potential Σ^μ, field tensor Θ^μν, thermal Maxwell equations, a stress tensor, and a Lorentz-force analogue from a variational principle. Covariance of Σ^μ is stated through a rest-frame decomposition. On an expanding S³ background with R (t) = ct, covariant conservation of the entropy current is compatible with global entropy growth when the associated effective fluid has wS = –1/3. The paper also records experimental signatures and parameter estimates: entropy-sector wave solutions, thermal Aharonov–Bohm and Josephson effects, a London-scale estimate in superfluid ⁴He under stated assumptions, compact monopole sectors, and a Planck-scale Schwinger-type threshold.
Yunus emre Tikbas (Tue,) studied this question.
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