The q-Onsager algebra and the positive part of U_q({widehat{mathfrak{sl}}}₂)

The positive part $U^+_q$ of $U_q({\widehat{\mathfrak{sl}}}_2)$ has a presentation by two generators $X,Y$ that satisfy the $q$-Serre relations. The $q$-Onsager algebra $\mathcal O_q$ has a presentation by two generators $A,B$ that satisfy the $q$-Dolan/Grady relations. We give two results that describe how $U^+_q$ and $\mathcal O_q$ are related. First, we consider the filtration of $\mathcal O_q$ whose $n$th component is spanned by the products of at most $n$ generators. We show that the associated graded algebra is isomorphic to $U^+_q$. Second, we introduce an algebra $\square_q$ and show how it is related to both $U^+_q$ and $\mathcal O_q$. The algebra $\square_q$ is defined by generators and relations. The generators are $\lbrace x_i \rbrace_{i \in \mathbb Z_4}$ where $\mathbb Z_4$ is the cyclic group of order 4. For $i \in \mathbb Z_4$ the generators $x_i, x_{i+1}$ satisfy a $q$-Weyl relation, and $x_i,x_{i+2}$ satisfy the $q$-Serre relations. We show that $\square_q$ is related to $U^+_q$ in the following way. Let $ \square^{\rm even}_q$ (resp. $ \square^{\rm odd}_q$) denote the subalgebra of $ \square_q$ generated by $x_0, x_2$ (resp. $x_1, x_3$). We show that (i) there exists an algebra isomorphism $U^+_q \to \square^{\rm even}_q$ that sends $X\mapsto x_0$ and $Y\mapsto x_2$; (ii) there exists an algebra isomorphism $U^+_q \to \square^{\rm odd}_q$ that sends $X\mapsto x_1$ and $Y\mapsto x_3$; (iii) the multiplication map $\square^{\rm even}_q \otimes \square^{\rm odd}_q \to \square_q$, $u \otimes v \mapsto uv$ is an isomorphism of vector spaces. We show that $\square_q$ is related to $\mathcal O_q$ in the following way. For nonzero scalars $a,b$ there exists an injective algebra homomorphism $ \mathcal O_q \to \square_q$ that sends $A \mapsto a x_0+ a^{-1} x_1$ and $B \mapsto b x_2+ b^{-1} x_3$.