On partial abelianization of framed local systems
Abstract
D.~Gaiotto, G.~W.~Moore and A.~Neitzke introduced spectral networks to understand the framed G-local systems over punctured surfaces for G a split Lie group via a procedure called abelianization. We generalize this construction to groups G of the form GL2(A), where A is a unital associative ring, and to some of its subgroups. This relies on a precise analysis of the degree 2 ramified coverings associated with spectral networks and triangulations and on a matrix reinterpretation of their path lifting rules; along the way we provide another proof of the Laurent phenomenon brought to light by A.~Berenstein and V.~Retakh. The partial abelianization enables us to gives parametrizations of the moduli spaces of decorated G-local systems and of framed G-local systems over punctured surfaces. For (A, σ) a Hermitian involutive R-algebra the group G=Sp2(A, σ) is a classical Hermitian Lie group of tube type, and we are able to identify and parametrize the moduli space of maximal framed G-local systems.
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