Boundary Integrability from the Fuzzy Three Sphere
Abstract
We consider so4 invariant matrix product states (MPS) in the so6 symmetric integrable spin chain and prove their integrability. These MPS appear as fuzzy three-sphere solutions of matrix models with Yang-Mills-type interactions, and in particular they correspond to scalar defect sectors of N=4 SYM. We find that the algebra formed by the fuzzy three-sphere generators naturally leads to a boundary reflection algebra and hence a solution to the boundary Yang-Baxter equation for every representation of the fuzzy three-sphere. This allows us to find closed formula for the overlaps of Bethe states of so6 symmetric chains with the fuzzy three-sphere MPS for arbitrary bond dimensions.
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