The Coefficients of the Hilbert Polynomial and the Reduction Number of an Ideal

We present a formula for vector-valued modular forms, expressing the value of the Hilbert-polynomial of the module of holomorphic forms evaluated at specific arguments in terms of traces of representation matrices, restricting the weight distribution of the free generators.

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Borel-fixed ideals and reduction number

Journal of Algebra ◽

10.1016/s0021-8693(03)00367-3 ◽

2003 ◽

Vol 270 (1) ◽

pp. 335-346 ◽

Cited By ~ 10

Author(s):

Lê Tuân Hoa ◽

Ngô Viêt Trung

Keyword(s):

Reduction Number

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Analysis of dengue model with fractal-fractional Caputo–Fabrizio operator

Advances in Difference Equations ◽

10.1186/s13662-020-02881-w ◽

2020 ◽

Vol 2020 (1) ◽

Cited By ~ 1

Author(s):

Fatmawati ◽

Muhammad Altaf Khan ◽

Cicik Alfiniyah ◽

Ebraheem Alzahrani

Keyword(s):

Statistical Data ◽

Dengue Infection ◽

Fractional Operator ◽

Novel Approach ◽

Reduction Number ◽

Best Fitting ◽

The Stability ◽

Parameter Values ◽

Graphical Illustration ◽

Stability Results

AbstractIn this work, we study the dengue dynamics with fractal-factional Caputo–Fabrizio operator. We employ real statistical data of dengue infection cases of East Java, Indonesia, from 2018 and parameterize the dengue model. The estimated basic reduction number for this dataset is $\mathcal{R}_{0}\approx2.2020$ R 0 ≈ 2.2020 . We briefly show the stability results of the model for the case when the basic reproduction number is $\mathcal{R}_{0} <1$ R 0 < 1 . We apply the fractal-fractional operator in the framework of Caputo–Fabrizio to the model and present its numerical solution by using a novel approach. The parameter values estimated for the model are used to compare with fractal-fractional operator, and we suggest that the fractal-fractional operator provides the best fitting for real cases of dengue infection when varying the values of both operators’ orders. We suggest some more graphical illustration for the model variables with various orders of fractal and fractional.

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On the Singular Sheaves in the Fine Simpson Moduli Spaces of 1-dimensional Sheaves

Canadian Mathematical Bulletin ◽

10.4153/cmb-2016-059-7 ◽

2017 ◽

Vol 60 (3) ◽

pp. 522-535 ◽

Cited By ~ 1

Author(s):

Oleksandr Iena ◽

Alain Leytem

Keyword(s):

Projective Plane ◽

Moduli Space ◽

Moduli Spaces ◽

Blow Up ◽

Line Bundles ◽

Hilbert Polynomial ◽

Stable Sheaves ◽

Closed Subvariety

AbstractIn the Simpson moduli space M of semi-stable sheaves with Hilbert polynomial dm − 1 on a projective plane we study the closed subvariety M' of sheaves that are not locally free on their support. We show that for d ≥4 , it is a singular subvariety of codimension 2 in M. The blow up of M along M' is interpreted as a (partial) modification of M \ M' by line bundles (on support).

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Reduction numbers and Hilbert polynomials of ideals in higher dimensional CohenMacaulay local rings

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100075149 ◽

1992 ◽

Vol 111 (1) ◽

pp. 47-56 ◽

Cited By ~ 4

Author(s):

Yinghwa Wu

Keyword(s):

Local Ring ◽

Residue Field ◽

Primary Ideal ◽

Local Rings ◽

Hilbert Polynomials ◽

Higher Dimensional ◽

Reduction Number ◽

Minimal Reduction ◽

System Of Parameters

Throughout, (R, m) will denote a d-dimensional CohenMacaulay (CM for short) local ring having an infinite residue field and I an m-primary ideal in R. Recall that an ideal J I is said to be a reduction of I if Ir+1 = JIr for some r 0, and a reduction J of I is called a minimal reduction of I if J is generated by a system of parameters. The concepts of reduction and minimal reduction were first introduced by Northcott and Rees12. If J is a reduction of I, define the reduction number of I with respect to J, denoted by rj(I), to be min {r 0 Ir+1 = JIr}. The reduction number of I is defined as r(I) = min {rj(I)J is a minimal reduction of I}. The reduction number r(I) is said to be independent if r(I) = rj(I) for every minimal reduction J of I.

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On the Chern numbers and the Hilbert polynomial of an almost complex manifold with a circle action

Communications in Contemporary Mathematics ◽

10.1142/s0219199717500432 ◽

2017 ◽

Vol 19 (04) ◽

pp. 1750043 ◽

Cited By ~ 3

Author(s):

Silvia Sabatini

Keyword(s):

Fixed Points ◽

Complex Manifold ◽

Index Formula ◽

Circle Action ◽

Hilbert Polynomial ◽

Dimensional Manifold ◽

Hamiltonian Action ◽

Almost Complex Manifold ◽

Almost Complex ◽

Chern Numbers

Let [Formula: see text] be a compact, connected, almost complex manifold of dimension [Formula: see text] endowed with a [Formula: see text]-preserving circle action with isolated fixed points. In this paper, we analyze the “geography problem” for such manifolds, deriving equations relating the Chern numbers to the index [Formula: see text] of [Formula: see text]. We study the symmetries and zeros of the Hilbert polynomial, which imply many rigidity results for the Chern numbers when [Formula: see text]. We apply these results to the category of compact, connected symplectic manifolds. A long-standing question posed by McDuff and Salamon asked about the existence of non-Hamiltonian actions with isolated fixed points. This question was answered recently by Tolman, with an explicit construction of a 6-dimensional manifold with such an action. One issue that this raises is whether one can find topological criteria that ensure the manifold can only support a Hamiltonian or only a non-Hamiltonian action. In this vein, we are able to deduce such criteria from our rigidity theorems in terms of relatively few Chern numbers, depending on the index. Another consequence is that, if the action is Hamiltonian, the minimal Chern number coincides with the index and is at most [Formula: see text].

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Moduli of Space Sheaves with Hilbert Polynomial 4m+ 1

Canadian Mathematical Bulletin ◽

10.4153/cmb-2017-030-4 ◽

2018 ◽

Vol 61 (2) ◽

pp. 328-345 ◽

Cited By ~ 1

Author(s):

Mario Maican

Keyword(s):

Euler Characteristic ◽

Moduli Space ◽

Elementary Proof ◽

Hilbert Polynomial ◽

Space Curves ◽

Irreducible Components

AbstractWe investigate the moduli space of sheaves supported on space curves of degree and having Euler characteristic 1. We give an elementary proof of the fact that this moduli space consists of three irreducible components.

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