Matter-Antimatter Coexistence Method for Finite Density QCD

Abstract

We propose a "matter-antimatter coexistence method" for finite-density lattice QCD, aiming at a possible solution of the sign problem. In this method, we consider matter and anti-matter systems on two parallel R4-sheets in five-dimensional Euclidean space-time. For the matter system M with a chemical potential μ ∈ C on a R4-sheet, we also prepare the anti-matter system M with -μ* on the other R4-sheet shifted in the fifth direction. In the lattice QCD formalism, we introduce a correlation term between the gauge variables U eiagA in M and U eiag A in M, such as Sλ Σx, 2λ \Nc- Re~tr [U(x) U(x)]\ Σx 12λ a2 \Aa(x)- Aa(x)\2 with a real parameter λ. In the limit of λ → ∞, a strong constraint U(x)=U(x) is realized, and the total fermionic determinant is real and non-negative. In the limit of λ → 0, this system goes to two separated ordinary QCD systems with the chemical potential of μ and -μ*. On a finite-volume lattice, if one takes an enough large value of λ, U(x) U(x) is realized and there occurs a phase cancellation approximately between two fermionic determinants in M and M, which is expected to suppress the sign problem and to make the lattice calculation possible. For the obtained gauge configurations of the coexistence system, matter-side quantities are evaluated through their measurement only for the matter part M. By the calculations with gradually decreasing λ and their extrapolation to λ=0, physical quantities in finite density QCD are expected to be estimated.