Physics – High Energy Physics – High Energy Physics - Lattice
Scientific paper
2010-10-14
JHEP 1101:058,2011
Physics
High Energy Physics
High Energy Physics - Lattice
27 pages, 24 figures; v2: comments and references added; v3: figures on U(1) mass independence and references added, to appear
Scientific paper
10.1007/JHEP01(2011)058
We show that N=(2,2) SU(N) super Yang-Mills theory on lattice does not have sign problem in the continuum limit, that is, under the phase-quenched simulation phase of the determinant localizes to 1 and hence the phase-quench approximation becomes exact. Among several formulations, we study models by Cohen-Kaplan-Katz-Unsal (CKKU) and by Sugino. We confirm that the sign problem is absent in both models and that they converge to the identical continuum limit without fine tuning. We provide a simple explanation why previous works by other authors, which claim an existence of the sign problem, do not capture the continuum physics.
Hanada Masanori
Kanamori Issaku
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