Positivity properties for canonical bases of modified quantum affine $\frak{sl}_n$ (1407.4228v2)

Abstract: The positivity property for canonical bases asserts that the structure constants of the multiplication for the canonical basis are in ${\mathbb N}[v,v^{-1}]$. Let $\mathbf U$ be the quantum group over ${\mathbb Q}(v)$ associated with a symmetric Cartan datum. The positivity property for the positive part ${\mathbf U}^+$ of ${\mathbf U}$ was proved by Lusztig. He conjectured that the positivity property holds for the modified form $\dot{\mathbf U}$ of ${\mathbf U}$. In this paper, we prove that the structure constants for the canonical basis of $\dot{{\mathbf U}}(\widehat{\frak{sl}}_n)$ coincide with certain structure constants for the canonical basis of ${\mathbf U}(\widehat{\frak{sl}}_N)^+$ for $n<N$. In particular, the positivity property for $\dot{{\mathbf U}}(\widehat{\frak{sl}}_n)$ follows from the positivity property for ${\mathbf U}(\widehat{\frak{sl}}_N)^+$.