Maximizing entanglement in the top-quark helicity space of Composite Higgs models selects symmetry structures that enforce a finite Higgs potential and relate left- and right-handed top sectors.
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D6 : (color online) Landscape of energy, Seven typical examples are chosen to demon- strate the frequency landscape as varying θ and φ
14 Pith papers cite this work. Polarity classification is still indexing.
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cond-mat.stat-mech 4 quant-ph 2 cond-mat.quant-gas 1 cs.CG 1 cs.LG 1 cs.SI 1 hep-ph 1 math.GT 1 math.PR 1 physics.soc-ph 1verdicts
UNVERDICTED 14representative citing papers
A perturbative series supplies explicit corrections to the big-jump approximation for sums of stretched-exponential random variables, describing the crossover to moderate deviations.
Most large 2SAPs have entanglement complexity F that grows at least linearly with system size m.
Exact combinatorial density of states for the critical 1D antiferromagnetic Ising model derived via Fibonacci/Lucas sequences, Diophantine equations, and transfer-matrix closed forms for both open and periodic boundaries.
On a complete graph the ballistic deposition model falls outside the KPZ universality class, showing saturation roughness that increases with system size and an ultrafast growth regime, while the RSOS model aligns more closely with continuum predictions.
A web system uses a Curve Segment Neighborhood Graph to support interactive community detection, force-directed layouts, and adjacency matrix views for exploring hundreds of thousands of streamlines in real time.
A 50-qubit quantum processor produces dynamical structure factors for KCuF3 that quantitatively match neutron-scattering measurements of its spinon spectrum.
Dynamic state expansion with infection memory improves pair approximation accuracy for SIS epidemic threshold and quasi-stationary distribution on arbitrary networks.
Derives novel scaling limit and explicit consensus probabilities for mean-field voter model with heavy-tailed waiting times, governed by extreme-value landscape of the tail index.
Exact classical solutions for dual-interaction LMG model yield a dynamical phase diagram with non-logarithmic criticality absent in single-interaction cases.
Symmetric TDVP on GPUs achieves converged 1D Fermi-Hubbard quench dynamics at chi~62000 up to t=7, certifying the high-entanglement regime and lowering the reported quantum advantage to ~36x.
Decomposes pre-softmax attention QK^T into symmetric and skew-symmetric components to derive Hopfield stability measures that correlate with fidelity-diversity in diffusion generation and introduces a circulation-based modulation knob.
Coupled entropy maximized by coupled stretched exponentials is the unique universal entropy meeting scale-specific uncertainty measurement and Hanel-Thurner extensivity requirements.
In spatial public goods games on lattices, allowing agents to reevaluate and change interaction groups promotes cooperation emergence, while high rates of group switching suppress it.
citing papers explorer
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Entanglement Maximization and Symmetry Selection in Composite Higgs Models
Maximizing entanglement in the top-quark helicity space of Composite Higgs models selects symmetry structures that enforce a finite Higgs potential and relate left- and right-handed top sectors.
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Beyond the Big Jump: A Perturbative Approach to Stretched-Exponential Processes
A perturbative series supplies explicit corrections to the big-jump approximation for sums of stretched-exponential random variables, describing the crossover to moderate deviations.
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Entanglement complexity of spanning pairs of lattice polygons
Most large 2SAPs have entanglement complexity F that grows at least linearly with system size m.
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Exact Combinatorial Density of States for the Critical 1D Ising Model
Exact combinatorial density of states for the critical 1D antiferromagnetic Ising model derived via Fibonacci/Lucas sequences, Diophantine equations, and transfer-matrix closed forms for both open and periodic boundaries.
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Discrete Lattice Models for Interface Growth on a Complete Graph
On a complete graph the ballistic deposition model falls outside the KPZ universality class, showing saturation roughness that increases with system size and an ultrafast growth regime, while the RSOS model aligns more closely with continuum predictions.
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Interactive Exploration of Large-scale Streamlines of Vector Fields via a Curve Segment Neighborhood Graph
A web system uses a Curve Segment Neighborhood Graph to support interactive community detection, force-directed layouts, and adjacency matrix views for exploring hundreds of thousands of streamlines in real time.
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Benchmarking quantum simulation with neutron-scattering experiments
A 50-qubit quantum processor produces dynamical structure factors for KCuF3 that quantitatively match neutron-scattering measurements of its spinon spectrum.
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Threshold and quasi-stationary distribution for the SIS model on networks
Dynamic state expansion with infection memory improves pair approximation accuracy for SIS epidemic threshold and quasi-stationary distribution on arbitrary networks.
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The mean field stubborn voter model
Derives novel scaling limit and explicit consensus probabilities for mean-field voter model with heavy-tailed waiting times, governed by extreme-value landscape of the tail index.
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Exact solutions and Dynamical phase transitions in the Lipkin-Meshkov-Glick model with Dual nonlinear interactions
Exact classical solutions for dual-interaction LMG model yield a dynamical phase diagram with non-logarithmic criticality absent in single-interaction cases.
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Pushing the Classical Frontier of 1D Fermi-Hubbard Quench Dynamics Beyond Current Quantum Simulations
Symmetric TDVP on GPUs achieves converged 1D Fermi-Hubbard quench dynamics at chi~62000 up to t=7, certifying the high-entanglement regime and lowering the reported quantum advantage to ~36x.
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Balancing Fidelity and Diversity in Diffusion Models via Symmetric Attention Decomposition: Hopfield Perspective
Decomposes pre-softmax attention QK^T into symmetric and skew-symmetric components to derive Hopfield stability measures that correlate with fidelity-diversity in diffusion generation and introduces a circulation-based modulation knob.
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The unique, universal entropy for complex systems
Coupled entropy maximized by coupled stretched exponentials is the unique universal entropy meeting scale-specific uncertainty measurement and Hanel-Thurner extensivity requirements.
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Cooperation in public goods game on square lattices with agents changing interaction groups
In spatial public goods games on lattices, allowing agents to reevaluate and change interaction groups promotes cooperation emergence, while high rates of group switching suppress it.