In the diluted Bethe-lattice random-field Ising model the magnetization jump is the sum of contributions from sites with coordination 4, 3, 2, 1 and 0, all occurring at the identical critical field value.
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Volatility mixing in a networked wealth model neutralizes group-wise exponents and lowers the aggregate tail exponent, enabling a condensation transition across γ_c=2.
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Understanding jump discontinuity in disordered system
In the diluted Bethe-lattice random-field Ising model the magnetization jump is the sum of contributions from sites with coordination 4, 3, 2, 1 and 0, all occurring at the identical critical field value.
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Role of volatility mixing in wealth condensation transition
Volatility mixing in a networked wealth model neutralizes group-wise exponents and lowers the aggregate tail exponent, enabling a condensation transition across γ_c=2.