On a conjecture of Moreno-Fr\'ias and Rosales for numerical semigroups
Abstract
The present paper addresses a semimodule counting conjecture of Moreno-Fr\'ias and Rosales for numerical semigroups. Applying Pfister and Steenbrink's Theory for punctual Hilbert schemes of curve singularities, we show that this conjecture is true for any numerical semigroup.
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