Related papers: The $O(n\to\infty)$ Rotor Model and the Quantum Spherical Model on Graphs

The $O(n\to\infty)$ Rotor Model and the Quantum Spherical Model on Graphs

URL: http://arxiv.org/abs/2601.14119v1
Date: Tue, 20 Jan 2026 16:14:01 GMT
Title: The $O(n\to\infty)$ Rotor Model and the Quantum Spherical Model on Graphs
Authors: Nikita Titov, Andrea Trombettoni,
Abstract summary: We show that the large $n$ limit of the $O(n)$ quantum rotor model defined on a general graph has the same critical behavior as the corresponding quantum spherical model.<n>We employ a classical to quantum mapping and use known results for the large $n$ limit of the classical $O(n)$ model on graphs.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We show that the large $n$ limit of the $O(n)$ quantum rotor model defined on a general graph has the same critical behavior as the corresponding quantum spherical model and that the critical exponents depend solely on the spectral dimension $d_s$ of the graph. To this end, we employ a classical to quantum mapping and use known results for the large $n$ limit of the classical $O(n)$ model on graphs. Away from the critical point, we discuss the interplay between the Laplacian and the Adjacency matrix in the whole parameter plane of the quantum Hamiltonian. These results allow us to paint the full picture of the $O(n)$ quantum rotor model on graphs in the large $n$ limit.

Related papers

Quantum simulation of massive Thirring and Gross--Neveu models for arbitrary number of flavors [40.72140849821964]
We consider the massive Thirring and Gross-Neveu models with arbitrary number of fermion flavors, $N_f$, discretized on a spatial one-dimensional lattice of size $L$.<n>We prepare the ground states of both models with excellent fidelity for system sizes up to 20 qubits with $N_f = 1,2,3,4$.<n>Our work is a concrete step towards the quantum simulation of real-time dynamics of large $N_f$ fermionic quantum field theories models.
arXiv Detail & Related papers (2026-02-25T19:00:01Z)
Quantum Max Cut for complete tripartite graphs [0.0]
The Quantum Max-$d$-Cut ($d$-QMC) problem is a special instance of a $2$-local Hamiltonian problem.<n>This article solves the $d$-QMC problem for complete tripartite graphs for small local dimensions, $d le 3$.
arXiv Detail & Related papers (2025-12-03T12:37:48Z)
A Graph-Theoretic Approach to Quantum Measurement Incompatibility [0.0]
We develop a graph-theoretic framework for quantifying measurement incompatibility.<n>We show that the Lovsz number yields the correct scaling for $k$-body Majorana observables.<n>We identify structural conditions under which the robustness is determined.
arXiv Detail & Related papers (2025-11-20T01:06:46Z)
From Laplacian-to-Adjacency Matrix for Continuous Spins on Graphs [0.0]
We show that the free energy at low and high temperature $T$ is determined by the spectrum of two crucial objects from graph theory.<n>For decorated lattices, the singular part of the free energy is governed by the Laplacian spectrum, whereas this is true for the full free energy only in the zero temperature limit.<n>Results for quantum spin models on a loopless graph are also presented.
arXiv Detail & Related papers (2025-11-15T19:14:35Z)
Theta-term in Russian Doll Model: phase structure, quantum metric and BPS multifractality [45.88028371034407]
We investigate the phase structure of the deterministic and disordered versions of the Russian Doll Model (RDM)<n>We find the pattern of phase transitions in the global charge $Q(theta,gamma)$, which arises from the BA equation.<n>We conjecture that the Hamiltonian of the RDM model describes the mixing in particular 2d-4d BPS sector of the Hilbert space.
arXiv Detail & Related papers (2025-10-23T17:25:01Z)
Field digitization scaling in a $\mathbb{Z}_N \subset U(1)$ symmetric model [0.0]
We propose to analyze field digitization by interpreting the parameter $N$ as a coupling in the renormalization group sense.<n>Using effective field theory, we derive generalized scaling hypotheses involving the FD parameter $N$.<n>We analytically prove that our calculations for the 2D classical-statistical $mathbbZ_N$ clock model are directly related to the quantum physics in the ground state of a (2+1)D $mathbbZ_N$ lattice gauge theory.
arXiv Detail & Related papers (2025-07-30T18:00:02Z)
Quantum Supercritical Crossover with Dynamical Singularity [2.9659182523095047]
We extend this notable concept of supercriticality from classical to quantum systems near the quantum critical point.<n>We reveal the existence of quantum supercritical (QSC) crossover lines, determined by not only response functions but also quantum information quantities.<n>Our work paves the way for exploring QSC crossovers in and out of equilibrium in quantum many-body systems.
arXiv Detail & Related papers (2024-07-07T17:52:02Z)
A Bosonic Model of Quantum Holography [0.0]
We analyze a model of qubits which we argue has an emergent quantum gravitational description similar to the fermionic Sachdev-Ye-Kitaev (SYK) model. The model is known as the quantum $q$-spin model because it features $q$-local interactions between qubits.
arXiv Detail & Related papers (2023-11-02T18:04:10Z)
Quantum tomography of helicity states for general scattering processes [55.2480439325792]
Quantum tomography has become an indispensable tool in order to compute the density matrix $rho$ of quantum systems in Physics. We present the theoretical framework for reconstructing the helicity quantum initial state of a general scattering process.
arXiv Detail & Related papers (2023-10-16T21:23:42Z)
Approximation Algorithms for Quantum Max-$d$-Cut [42.248442410060946]
The Quantum Max-$d$-Cut problem involves finding a quantum state that maximizes the expected energy associated with the projector onto the antisymmetric subspace of two, $d$-dimensional qudits over all local interactions. We develop an algorithm that finds product-state solutions of mixed states with bounded purity that achieve non-trivial performance guarantees.
arXiv Detail & Related papers (2023-09-19T22:53:17Z)
New insights on the quantum-classical division in light of Collapse Models [63.942632088208505]
We argue that the division between quantum and classical behaviors is analogous to the division of thermodynamic phases. A specific relationship between the collapse parameter $(lambda)$ and the collapse length scale ($r_C$) plays the role of the coexistence curve in usual thermodynamic phase diagrams.
arXiv Detail & Related papers (2022-10-19T14:51:21Z)
Quantum double aspects of surface code models [77.34726150561087]
We revisit the Kitaev model for fault tolerant quantum computing on a square lattice with underlying quantum double $D(G)$ symmetry. We show how our constructions generalise to $D(H)$ models based on a finite-dimensional Hopf algebra $H$.
arXiv Detail & Related papers (2021-06-25T17:03:38Z)

This list is automatically generated from the titles and abstracts of the papers in this site.