Critical temperature equals coordination energy divided by the log of a multiplicity factor that splits into a lattice-topological constant and a q-state sampling term.
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The elastic Grüneisen ratio becomes arbitrarily large at low T near maximal frustration in Ising models, signaling extensive ground-state entropy, while Heisenberg models show phase transitions dominating the low-T response.
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Critical Temperatures from Domain-Wall Microstate Counting: A Topological Solution for the Potts Universality Class
Critical temperature equals coordination energy divided by the log of a multiplicity factor that splits into a lattice-topological constant and a q-state sampling term.
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Unveiling Magnetic Frustration via the Elastocaloric Effect
The elastic Grüneisen ratio becomes arbitrarily large at low T near maximal frustration in Ising models, signaling extensive ground-state entropy, while Heisenberg models show phase transitions dominating the low-T response.