pith. sign in

Continuum limit and universality of the Columbia plot

1 Pith paper cite this work. Polarity classification is still indexing.

1 Pith paper citing it
abstract

Results on the thermal transition of QCD with 3 degenerate flavors, in the lower-left corner of the Columbia plot, are puzzling. The transition is expected to be first-order for massless quarks, and to remain so for a range of quark masses until it turns second-order at a critical quark mass. But this critical quark mass and resulting "pion" mass disagree violently between Wilson and staggered fermions at finite lattice spacing, and decrease sharply with the lattice spacing, for staggered fermions at least. To clarify this puzzle and eliminate potential systematic effects from rooting, we study the 4-flavor theory with staggered fermions, on lattices with 4 to 10 time-slices. Our results are qualitatively similar to the 3-flavor case, so that rooting is not an issue. However, dramatic cutoff effects are visible, even on our finest lattices. Universality implies that cutoff effects for Wilson fermions are even more dramatic. In order to obtain a first-order thermal transition in the continuum theory, extremely light quarks are needed.

fields

hep-lat 1

years

2026 1

verdicts

UNVERDICTED 1

representative citing papers

The QCD phase diagram for three-flavor M\"obius domain-wall fermions

hep-lat · 2026-06-26 · unverdicted · novelty 4.0

Lattice simulations with Möbius domain-wall fermions find the three-flavor QCD transition at mu_B=0 is a continuous crossover at pseudocritical quark masses of 184(10) MeV (Nt=6), 36-39 MeV (Nt=8), and 3.5-3.7 MeV (Nt=12) in the MSbar scheme.

citing papers explorer

Showing 1 of 1 citing paper.

  • The QCD phase diagram for three-flavor M\"obius domain-wall fermions hep-lat · 2026-06-26 · unverdicted · none · ref 66 · internal anchor

    Lattice simulations with Möbius domain-wall fermions find the three-flavor QCD transition at mu_B=0 is a continuous crossover at pseudocritical quark masses of 184(10) MeV (Nt=6), 36-39 MeV (Nt=8), and 3.5-3.7 MeV (Nt=12) in the MSbar scheme.