We investigate the nearly Gorenstein property among d-dimensional cyclic quotient singularities k[[x_1, . . . , x_d]]^G, where k is an algebraically closed field and G ⊆ GL(d, k) is a finite small cyclic group whose order is invertible in k. We prove a necessary and sufficient condition to be nearly Gorenstein that also allows us to find several new classes of such rings.
Caminata A, Strazzanti F (In stampa/Attività in corso). Nearly Gorenstein cyclic quotient singularities. BEITRAGE ZUR ALGEBRA UND GEOMETRIE, non ancora noto, N/A-N/A [https://doi.org/10.1007/s13366-020-00533-4].
Nearly Gorenstein cyclic quotient singularities
Strazzanti F
In corso di stampa
Abstract
We investigate the nearly Gorenstein property among d-dimensional cyclic quotient singularities k[[x_1, . . . , x_d]]^G, where k is an algebraically closed field and G ⊆ GL(d, k) is a finite small cyclic group whose order is invertible in k. We prove a necessary and sufficient condition to be nearly Gorenstein that also allows us to find several new classes of such rings.File in questo prodotto:
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