Orthosymplectic $R$-matrices

TL;DR

This paper derives explicit formulas for trigonometric orthosymplectic R-matrices linked to parity sequences, utilizing q-bracketings and Lyndon words, and connects them with known Yang-Baxter solutions.

Contribution

It provides a new factorization formula for orthosymplectic R-matrices and evaluates their affine versions, linking them to classical and recent Yang-Baxter solutions.

Findings

Derived explicit formulas for orthosymplectic R-matrices.

Established their factorization into q-exponent products.

Connected these matrices with classical Yang-Baxter solutions.

Abstract

We present a formula for trigonometric orthosymplectic $R$-matrices associated with any parity sequence, and establish their factorization into the ordered product of $q$-exponents parametrized by positive roots in the corresponding reduced root systems. The latter is crucially based on the construction of orthogonal bases of the positive subalgebra through $q$-bracketings and combinatorics of dominant Lyndon words, as developed in [Clark, Hill, Wang, "Quantum shuffles and quantum supergroups of basic type", Quantum Topol. 7 (2016), no.3, 553-638]. We further evaluate the affine orthosymplectic $R$-matrices, establishing their intertwining property as well as matching them with those obtained through the Yang-Baxterization technique of [Ge, Wu, Xue, "Explicit trigonometric Yang-Baxterization", Internat. J. Modern Phys. A 6 (1991), no.21, 3735-3779]. This reproduces the celebrated formulas of [Jimbo, "Quantum $R$ matrix for the generalized Toda system", Comm. Math. Phys. 102 (1986), no.4, 537-547] for classical BCD types and the formula of [Mehta, Dancer, Gould, Links, "Generalized Perk-Schultz models: solutions of the Yang-Baxter equation associated with quantized orthosymplectic superalgebras", J. Phys. A 39 (2006), no.1, 17-26] for the standard parity sequence.