Related papers: Defect Bootstrap: Tight Ground State Bounds in Spontaneous Symmetry Breaking Phases

Defect Bootstrap: Tight Ground State Bounds in Spontaneous Symmetry Breaking Phases

URL: http://arxiv.org/abs/2511.20860v1
Date: Tue, 25 Nov 2025 21:17:54 GMT
Title: Defect Bootstrap: Tight Ground State Bounds in Spontaneous Symmetry Breaking Phases
Authors: Michael G. Scheer, Nisarg Chadha, Da-Chuan Lu, Eslam Khalaf,
Abstract summary: bootstrap methods have enabled rigorous two-sided bounds on local observables directly in the thermodynamic limit.<n>These bounds inevitably become loose in symmetry broken phases, where local constraints are insufficient to capture long-range order.<n>We introduce a $textitdefect bootstrap$ framework that resolves this limitation by embedding the system into an auxiliary $textitdefect model.<n>Our results demonstrate that physically motivated constraint sets can dramatically enhance the power of bootstrap methods for quantum many-body systems.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The recent development of bootstrap methods based on semidefinite relaxations of positivity constraints has enabled rigorous two-sided bounds on local observables directly in the thermodynamic limit. However, these bounds inevitably become loose in symmetry broken phases, where local constraints are insufficient to capture long-range order. In this work, we identify the origin of this looseness as order parameter defects which are difficult to remove using local operators. We introduce a $\textit{defect bootstrap}$ framework that resolves this limitation by embedding the system into an auxiliary $\textit{defect model}$ equipped with ancilla degrees of freedom. This construction effectively enables local operators to remove order parameter defects, yielding tighter bounds in phases with spontaneous symmetry breaking. This approach can be applied broadly to pairwise-interacting local lattice models with discrete or continuous internal symmetries that satisfy a property we call $\textit{defect diamagnetism}$, which requires that the ground state energy does not decrease upon adding any finite number of symmetry defects. Applying the method to the transverse field Ising models in 1D and 2D, we obtain significantly improved bounds on energy densities and spin correlation functions throughout the symmetry broken phase in 1D and deep within the phase in 2D. Our results demonstrate that physically motivated constraint sets can dramatically enhance the power of bootstrap methods for quantum many-body systems.

Related papers

Single-Nodal Spontaneous Symmetry Breaking in NLP Models [0.0]
We demonstrate the emergence of spontaneous symmetry breaking in natural language processing (NLP) models.<n>This phenomenon occurs at the level of individual attention heads and is scaled-down to its small subset of nodes.<n>Results are demonstrated using BERT-6 architecture pre-trained on Wikipedia dataset and fine-tuned on the FewRel classification task.
arXiv Detail & Related papers (2026-01-28T13:20:02Z)
Exact Mobility Edges in a Disorder-Free Dimerized Stark Lattice with Effective Unbounded Hopping [3.638953299008847]
A disorder-free one-dimensional single-particle Hamiltonian hosts an exact mobility edge (ME)<n>We analytically derive the bulk spectrum in reciprocal space, identifying a sharp ME where the energy magnitude equals the inter-cell hopping strength.<n>Our numerical results indicate that the ME is robust against potential experimental imperfections.
arXiv Detail & Related papers (2026-01-05T16:40:22Z)
Verifying Closed-Loop Contractivity of Learning-Based Controllers via Partitioning [52.23804865017831]
We address the problem of verifying closed-loop contraction in nonlinear control systems whose controller and contraction metric are both parameterized by neural networks.<n>We derive a tractable and scalable sufficient condition for closed-loop contractivity that reduces to checking that the dominant eigenvalue of a symmetric Metzler matrix is nonpositive.
arXiv Detail & Related papers (2025-12-01T23:06:56Z)
Generalized Linear Mode Connectivity for Transformers [87.32299363530996]
A striking phenomenon is linear mode connectivity (LMC), where independently trained models can be connected by low- or zero-loss paths.<n>Prior work has predominantly focused on neuron re-ordering through permutations, but such approaches are limited in scope.<n>We introduce a unified framework that captures four symmetry classes: permutations, semi-permutations, transformations, and general invertible maps.<n>This generalization enables, for the first time, the discovery of low- and zero-barrier linear paths between independently trained Vision Transformers and GPT-2 models.
arXiv Detail & Related papers (2025-06-28T01:46:36Z)
Non-Hermitian topology and skin modes in the continuum via parametric processes [44.99833362998488]
We show that Hermitian, nonlocal parametric pairing processes can induce non-Hermitian topology and skin modes.<n>Our model, stabilized by local dissipation, reveals exceptional points that spawn a tilted diabolical line in the dispersion.
arXiv Detail & Related papers (2025-05-05T16:38:20Z)
Symmetries, Conservation Laws and Entanglement in Non-Hermitian Fermionic Lattices [37.69303106863453]
Non-Hermitian quantum many-body systems feature steady-state entanglement transitions driven by unitary dynamics and dissipation.<n>We show that the steady state is obtained by filling single-particle right eigenstates with the largest imaginary part of the eigenvalue.<n>We illustrate these principles in the Hatano-Nelson model with periodic boundary conditions and the non-Hermitian Su-Schrieffer-Heeger model.
arXiv Detail & Related papers (2025-04-11T14:06:05Z)
Long-range entanglement from spontaneous non-onsite symmetry breaking [3.3754780158324564]
We show a frustration-free lattice model exhibiting SSB of a non-onsite symmetry. We analytically prove the two-fold ground-state degeneracy and the existence of a finite energy gap. Our work reveals the exotic features of SSB of non-onsite symmetries, which may lie beyond the framework of topological holography.
arXiv Detail & Related papers (2024-11-07T18:59:51Z)
Gapless Floquet topology [40.2428948628001]
We study the existence of topological edge zero- and pi-modes despite the lack of bulk gaps in the quasienergy spectrum. We numerically study the effect of interactions, which give a finite lifetime to the edge modes in the thermodynamic limit with the decay rate consistent with Fermi's Golden Rule.
arXiv Detail & Related papers (2024-11-04T19:05:28Z)
Localization with non-Hermitian off-diagonal disorder [0.0]
We discuss a non-Hermitian system governed by random nearest-neighbour tunnellings.<n>A physical situation of completely real eigenspectrum arises owing to the Hamiltonian's tridiagonal matrix structure.<n>The off-diagonal disorder leads the non-Hermitian system to a delocalization-localization crossover in finite systems.
arXiv Detail & Related papers (2023-10-20T18:02:01Z)
Simulating scalar field theories on quantum computers with limited resources [62.997667081978825]
We present a quantum algorithm for implementing $phi4$ lattice scalar field theory on qubit computers. The algorithm allows efficient $phi4$ state preparation for a large range of input parameters in both the normal and broken symmetry phases.
arXiv Detail & Related papers (2022-10-14T17:28:15Z)
Beyond the Edge of Stability via Two-step Gradient Updates [49.03389279816152]
Gradient Descent (GD) is a powerful workhorse of modern machine learning. GD's ability to find local minimisers is only guaranteed for losses with Lipschitz gradients. This work focuses on simple, yet representative, learning problems via analysis of two-step gradient updates.
arXiv Detail & Related papers (2022-06-08T21:32:50Z)
Noise-resilient Edge Modes on a Chain of Superconducting Qubits [103.93329374521808]
Inherent symmetry of a quantum system may protect its otherwise fragile states. We implement the one-dimensional kicked Ising model which exhibits non-local Majorana edge modes (MEMs) with $mathbbZ$ parity symmetry. MEMs are found to be resilient against certain symmetry-breaking noise owing to a prethermalization mechanism.
arXiv Detail & Related papers (2022-04-24T22:34:15Z)
Boundary theories of critical matchgate tensor networks [59.433172590351234]
Key aspects of the AdS/CFT correspondence can be captured in terms of tensor network models on hyperbolic lattices. For tensors fulfilling the matchgate constraint, these have previously been shown to produce disordered boundary states. We show that these Hamiltonians exhibit multi-scale quasiperiodic symmetries captured by an analytical toy model.
arXiv Detail & Related papers (2021-10-06T18:00:03Z)
Quasi-Locality Bounds for Quantum Lattice Systems. Part II. Perturbations of Frustration-Free Spin Models with Gapped Ground States [0.0]
We study the stability with respect to a broad class of perturbations of gapped ground state phases of quantum spin systems. Under a condition of Local Topological Quantum Order, the bulk gap is stable under perturbations that decay at long distances faster than a stretched exponential.
arXiv Detail & Related papers (2020-10-29T03:24:19Z)

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