Introduces birational Weyl group action on symplectic groupoid of A_n matrices via cluster transformations and proves invariants form finite central extension of matrix entry algebra, with applications to Teichmuller images and DT-transformations.
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2 Pith papers cite this work. Polarity classification is still indexing.
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A degeneration of the q-Garnier system of fourth order arises from confluences in quivers.
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Birational Weyl Group Action on the Symplectic Groupoid and Cluster Algebras
Introduces birational Weyl group action on symplectic groupoid of A_n matrices via cluster transformations and proves invariants form finite central extension of matrix entry algebra, with applications to Teichmuller images and DT-transformations.
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A degeneration of the $q$-Garnier system of fourth order arises from confluences in quivers
A degeneration of the q-Garnier system of fourth order arises from confluences in quivers.