Abstract
AbstractWe investigate the nearly Gorenstein property among d-dimensional cyclic quotient singularities $$\Bbbk \llbracket x_1,\dots ,x_d\rrbracket ^G$$
k
〚
x
1
,
⋯
,
x
d
〛
G
, where $$\Bbbk $$
k
is an algebraically closed field and $$G\subseteq {\text {GL}}(d,\Bbbk )$$
G
⊆
GL
(
d
,
k
)
is a finite small cyclic group whose order is invertible in $$\Bbbk $$
k
. We prove a necessary and sufficient condition to be nearly Gorenstein that also allows us to find several new classes of such rings.
Funder
Istituto Nazionale di Alta Matematica “Francesco Severi”
Publisher
Springer Science and Business Media LLC
Subject
Geometry and Topology,Algebra and Number Theory