Webs and multiwebs for the symplectic group
Abstract
We define 2n-multiwebs on planar graphs and discuss their relation with Sp(2n)-webs. On a planar graph with a symplectic local system we define a matrix whose Pfaffian is the sum of traces of 2n-multiwebs. As application we generalize Kasteleyn's theorem from dimer covers to 2n-multiweb covers of planar graphs with U(n) gauge group. For Sp(4) we relate Kuperberg's ``tetravalent vertex'' to the determinant, and classify reduced 4-webs on some simple surfaces: the annulus, torus, and pair of pants. We likewise define, for Sp(2n) and q=1, a 2n-valent vertex corresponding to the determinant, and classify reduced 2n-webs on an annulus.
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