A \(\phi_{1,3}\)-filtration of the Virasoro minimal series \(M(p,p')\) with \(1<p'/p<2\) (Q935903)

In the paper under review the authors present certain results and conjectures about basis of the minimal models \(M_{r,s} ^{(p,p')}\) for the Virasoro algebra in the case \(1 < p' /p < 2\). They study filtration of minimal models by the \((1,3)\)-primary field \(\phi_{1,3}(z)\). In order to support their conjecture, the authors prove that the character of the proposed basis coincides with the character of \(M_{r,s} ^{(p,p')}\). They also show that in the unitary case, the bi-graded character of the proposed basis and that of \(\text{gr} ^{E} M_{r,s} ^{(p,p')}\) coincide, where \(\text{gr} ^{E} M_{r,s} ^{(p,p')}\) is the associated graded space with respect to the filtration defined by \(\phi_{1,3}(z)\).