Theta classes: generalized topological recursion, integrability and $\mathcal{W}$-constraints
Abstract: We study the intersection theory of the $\Theta{r,s}$-classes, where $r \geq 2$ and $1 \le s \le r-1$, which are cohomological field theories obtained as the top degrees of Chiodo classes. We show that the recently introduced generalized topological recursion on the $(r,s)$ spectral curves computes the descendant integrals of the $\Theta{r,s}$-classes. As a consequence, we deduce that the descendant potential of the $\Theta{r,s}$-classes is a tau function of the $r$-KdV hierarchy, generalizing the Br\'ezin--Gross--Witten tau function (the special case $r=2$, $s=1$). We also explicitly compute the $\mathcal{W}$-constraints satisfied by the descendant potential, obtained as differential representations of the $\mathcal{W}(\mathfrak{gl}_r)$-algebra at self-dual level. This work extends previously known results on the Witten $r$-spin class, the $r$-spin $\Theta$-classes (the case $s=r-1$), and the Norbury $\Theta$-classes (the special case $r=2$, $s=1$).
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