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Nearly Gorenstein vs Almost Gorenstein Affine Monomial Curves
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AbstractWe extend some results on almost Gorenstein affine monomial curves to the nearly Gorenstein case. In particular, we prove that the Cohen–Macaulay type of a nearly Gorenstein monomial curve in $${\mathbb {A}}^4$$
A
4
is at most 3, answering a question of Stamate in this particular case. Moreover, we prove that, if $${\mathcal {C}}$$
C
is a nearly Gorenstein affine monomial curve that is not Gorenstein and $$n_1, \dots , n_{\nu }$$
n
1
,
⋯
,
n
ν
are the minimal generators of the associated numerical semigroup, the elements of $$\{n_1, \dots , \widehat{n_i}, \dots , n_{\nu }\}$$
{
n
1
,
⋯
,
n
i
^
,
⋯
,
n
ν
}
are relatively coprime for every i.
Springer Science and Business Media LLC
Title: Nearly Gorenstein vs Almost Gorenstein Affine Monomial Curves
Description:
AbstractWe extend some results on almost Gorenstein affine monomial curves to the nearly Gorenstein case.
In particular, we prove that the Cohen–Macaulay type of a nearly Gorenstein monomial curve in $${\mathbb {A}}^4$$
A
4
is at most 3, answering a question of Stamate in this particular case.
Moreover, we prove that, if $${\mathcal {C}}$$
C
is a nearly Gorenstein affine monomial curve that is not Gorenstein and $$n_1, \dots , n_{\nu }$$
n
1
,
⋯
,
n
ν
are the minimal generators of the associated numerical semigroup, the elements of $$\{n_1, \dots , \widehat{n_i}, \dots , n_{\nu }\}$$
{
n
1
,
⋯
,
n
i
^
,
⋯
,
n
ν
}
are relatively coprime for every i.
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