Wilson chiral perturbation theory for dynamical twisted mass fermions vs lattice data - a case study


Abstract in English

We compute the low lying eigenvalues of the Hermitian Dirac operator in lattice QCD with $N_{rm f} = 2+1+1$ twisted mass fermions. We discuss whether these eigenvalues are in the $epsilon$-regime or the $p$-regime of Wilson chiral perturbation theory ($chi$PT) for twisted mass fermions. Reaching the deep $epsilon$-regime is practically unfeasible with presently typical simulation parameters, but still the few lowest eigenvalues of the employed ensemble evince some characteristic $epsilon$-regime features. With this conclusion in mind, we develop a fitting strategy to extract two low energy constants from analytical $epsilon$-regime predictions at a fixed index. Thus, we obtain results for the chiral condensate and the low energy constant $W_8$. We also discuss how to improve both the theoretical calculation and the lattice computation.

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