Double-winding Wilson loops in SU(N) lattice Yang-Mills gauge theory

Abstract

We study double-winding Wilson loops in SU(N) lattice Yang-Mills gauge theory by using both strong coupling expansions and numerical simulations. First, we examine how the area law falloff of a ``coplanar'' double-winding Wilson loop average depends on the number of color N. Indeed, we find that a coplanar double-winding Wilson loop average obeys a novel ``max-of-areas law'' for N=3 and the sum-of-areas law for N≥ 4, although we reconfirm the difference-of-areas law for N=2. Second, we examine a ``shifted'' double-winding Wilson loop, where the two constituent loops are displaced from one another in a transverse direction. We evaluate its average by changing the distance of a transverse direction and we find that the long distance behavior does not depend on the number of color N, while the short distance behavior depends strongly on N.