Singular Euler–Maclaurin expansion on multidimensional lattices

We study the $$ T\overline{T} $$ T T ¯ deformation of two-dimensional Yang-Mills theory at genus zero by carrying out the analysis at the level of its instanton representation. We first focus on the perturbative sector by considering its power expansion in the deformation parameter μ. By studying the resulting asymptotic series through resurgence theory, we determine the nonperturbative contributions that enter the result for μ < 0. We then extend this analysis to any flux sector by solving the relevant flow equation. Specifically, we impose boundary conditions corresponding to two distinct regimes: the quantum undeformed theory and the semiclassical limit of the deformed theory. The full partition function is obtained as a sum over all magnetic fluxes. For any μ > 0, only a finite portion of the quantum spectrum survives and the partition function reduces to a sum over a finite set of representations. For μ < 0, nonperturbative contributions regularize the partition function through an intriguing mechanism that generates nontrivial subtractions.

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“…is well-defined for Re(ν) > N + deg P . A meromorphic continuation of S ν outside the region where it converges is given by [37] S ν = lim…”

Section: A Confluent Hypergeometric Functionsmentioning

confidence: 99%

Exact $$ T\overline{T} $$ deformation of two-dimensional Yang-Mills theory on the sphere

Panerai

Papalini

Seminara

2022

J. High Energ. Phys.

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Exact continuum representation of long-range interacting systems and emerging exotic phases in unconventional superconductors

Buchheit,

Keßler,

Schuhmacher

et al. 2023

Phys. Rev. Research

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Quantum phases of hardcore bosons with repulsive dipolar density-density interactions on two-dimensional lattices

Koziol,

Morigi,

Schmidt

2024

SciPost Phys.

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We analyse the ground-state quantum phase diagram of hardcore Bosons interacting with repulsive dipolar potentials. The bosons dynamics is described by the extended-Bose-Hubbard Hamiltonian on a two-dimensional lattice. The ground state results from the interplay between the lattice geometry and the long-range interactions, which we account for by means of a classical spin mean-field approach limited by the size of the considered unit cells. This extended classical spin mean-field theory accounts for the long-range density-density interaction without truncation. We consider three different lattice geometries: square, honeycomb, and triangular. In the limit of zero hopping the ground state is always a devil’s staircase of solid (gapped) phases. Such crystalline phases with broken translational symmetry are robust with respect to finite hopping amplitudes. At intermediate hopping amplitudes, these gapped phases melt, giving rise to various lattice supersolid phases, which can have exotic features with multiple sublattice densities. At sufficiently large hoppings the ground state is a superfluid. The stability of phases predicted by our approach is gauged by comparison to the known quantum phase diagrams of the Bose-Hubbard model with nearest-neighbour interactions as well as quantum Monte Carlo simulations for the dipolar case on the square and triangular lattice. Our results are of immediate relevance for experimental realisations of self-organised crystalline ordering patterns in analogue quantum simulators, e.g., with ultracold dipolar atoms in an optical lattice.

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Singular Euler–Maclaurin expansion on multidimensional lattices

Cited by 3 publications

References 32 publications

Exact $$ T\overline{T} $$ deformation of two-dimensional Yang-Mills theory on the sphere

Exact $$ T\overline{T} $$ deformation of two-dimensional Yang-Mills theory on the sphere

Exact continuum representation of long-range interacting systems and emerging exotic phases in unconventional superconductors

Quantum phases of hardcore bosons with repulsive dipolar density-density interactions on two-dimensional lattices

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