Cohomological descendent series for Quot schemes on surfaces with pg=0 are rational for nonzero beta and N>1.
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2 Pith papers cite this work. Polarity classification is still indexing.
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The authors relate the remaining two Capparelli-Meurman-Primc-Primc conjectures to non-standard specializations of standard modules for A_{2n}^{(2)} and D_{n+1}^{(2)} using prior Rogers-Ramanujan work for affine Lie algebras.
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Rationality of cohomological descendent series for Quot schemes on surfaces with $p_g=0$
Cohomological descendent series for Quot schemes on surfaces with pg=0 are rational for nonzero beta and N>1.
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Remarks on the conjectures of Capparelli, Meurman, Primc and Primc
The authors relate the remaining two Capparelli-Meurman-Primc-Primc conjectures to non-standard specializations of standard modules for A_{2n}^{(2)} and D_{n+1}^{(2)} using prior Rogers-Ramanujan work for affine Lie algebras.