Publication: Spectral renormalization group for the Gaussian model andψ4theory on nonspatial networks
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American Physical Society (APS)
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Abstract
We implement the spectral renormalization group on different deterministic nonspatial networks without translational invariance. We calculate the thermodynamic critical exponents for the Gaussian model on the Cayley tree and the diamond lattice and find that they are functions of the spectral dimension, d[over ̃]. The results are shown to be consistent with those from exact summation and finite-size scaling approaches. At d[over ̃]=2, the lower critical dimension for the Ising universality class, the Gaussian fixed point is stable with respect to a ψ^{4} perturbation up to second order. However, on generalized diamond lattices, non-Gaussian fixed points arise for 2<d[over ̃]<4.
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Gaussian fixed point, Complex networks, Gaussian distribution, Crystal lattices, Thermodynamic limit, Lower critical dimension, Hierarchical lattices, Trees, Translational invariance, Universality class, Ising-model, Non-Gaussian fixed points, Condensed Matter - Statistical Mechanics, Finite size scaling, Statistical-mechanics, Systems, Lattices, Spectral dimensions, Cayley tree, Spectral renormalization, Order disorder transitions, Group theory, Statistical mechanics