Abstract
We analyze the scalar products of the elliptic Felderhof model introduced by Foda–Wheeler–Zuparic as an elliptic extension of the trigonometric face-type Felderhof model by Deguchi–Akutsu. We derive the determinant formula for the scalar products by applying the Izergin–Korepin technique developed by Wheeler to investigate the scalar products of integrable lattice models. By combining the determinant formula for the scalar products with the recently-developed Izergin–Korepin technique to analyze the wavefunctions, we derive a Cauchy formula for elliptic Schur functions.
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