Abstract This paper investigates the generalized Yang-Baxter matrix equation A (XA) ᵐ=X (AX) ᵐ A (X A) m = X (A X) m for X M₂ (F) X ∈ M 2 (F) over a general field F F with char (F) 2 char (F) ≠ 2. Building upon our previous research 4 which characterized the set of nonsingular solutions S ₅^m (A) ^* S F m (A) ∗ for a nonsingular A, this study completes the classification by characterizing nonsingular solutions for singular A and describing the set of singular solutions S ₅^m (A) ^ S F m (A) ∘ for arbitrary 2 2 2 × 2 matrices A. Consequently, these results provide a comprehensive description of the full solution set S ₅ᵐ (A) S F m (A) for all 2 2 2 × 2 matrices and positive integers m.
Boaz Cohen (Thu,) studied this question.
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