For given $n,\ell\in\mathbb N_0$, I am interested in studying the following recursion relation for some $\mu\in\mathbb R$:
$$\sqrt{-1} \tfrac{j(\ell-j+1)(n-j+1)(n+j+1)}{2(2j-1)(2j+1)}  a_{j-1} - \tfrac {j(j+1)}2 a_j
 - \sqrt{-1}   \tfrac{(j+1)(\ell+j+2)}2 a_{j+1} = \mu  a_j,$$
for $j\ge0$, assuming $a_{-1}=0$.

The trivial solution is $a_j=0,\   \forall j\in\mathbb N_0$. The value of $a_0$ determines the entire sequence, no matter what is $\mu$.

Since this three term recurrence relation is given by matrix valued spherical functions of the symmetric pair $(\mathrm{SO }(4) ,\mathrm{SO }(3) )$ one expects to be solvable by a set of orthogonal polynomials on a finite discrete set, for some $\mu$.

Does anybody recognize this expression or know any family of polynomials solving this?

From already thank you very much.