دسترسی نامحدود
برای کاربرانی که ثبت نام کرده اند
دانلود کتاب Numerical Semigroups: IMNS 2018
دانلود کتاب نیمه گروه های عددی: IMNS 2018
مشخصات کتاب
Numerical Semigroups: IMNS 2018
ویرایش: 1 نویسندگان: Valentina Barucci (editor), Scott Chapman (editor), Marco D'Anna (editor), Ralf Fröberg (editor) سری: Springer INdAM ISBN (شابک) : 3030408213, 9783030408213 ناشر: Springer Nature سال نشر: 2020 تعداد صفحات: 373 زبان: English فرمت فایل : PDF (درصورت درخواست کاربر به PDF، EPUB یا AZW3 تبدیل می شود) حجم فایل: 5 مگابایت
قیمت کتاب (تومان) : 38,000
در صورت ایرانی بودن نویسنده امکان دانلود وجود ندارد و مبلغ عودت داده خواهد شد
در صورت تبدیل فایل کتاب Numerical Semigroups: IMNS 2018 به فرمت های PDF، EPUB، AZW3، MOBI و یا DJVU می توانید به پشتیبان اطلاع دهید تا فایل مورد نظر را تبدیل نمایند.
توجه داشته باشید کتاب نیمه گروه های عددی: IMNS 2018 نسخه زبان اصلی می باشد و کتاب ترجمه شده به فارسی نمی باشد. وبسایت اینترنشنال لایبرری ارائه دهنده کتاب های زبان اصلی می باشد و هیچ گونه کتاب ترجمه شده یا نوشته شده به فارسی را ارائه نمی دهد.
توضیحاتی در مورد کتاب نیمه گروه های عددی: IMNS 2018
این کتاب وضعیت هنر در نیمه گروههای عددی و موضوعات مرتبط را ارائه میکند، دیدگاههای مختلفی را در مورد تحقیقات در این زمینه ارائه میکند و شامل نتایج و نمونههایی است که یافتن آنها در یک نمایشگاه ساختاریافته در جای دیگر بسیار دشوار است. محتویات شامل جلسات INdAM جلسه بین المللی در مورد نیمه گروه های عددی 2018 است که در کورتونا، ایتالیا برگزار شد. گفتگوها در این جلسه نه تنها بر روی انواع سنتی نیمه گروه های عددی، مانند Arf یا متقارن، و ویژگی های معمول آنها، بلکه در مورد انواع نیمه گروه های مرتبط مانند affine، Puiseux، Weierstrass، و اولیه و کاربردهای آنها در شاخه های دیگر متمرکز بود. جبر، از جمله حلقه های نیمه گروهی، نظریه کدگذاری، عملیات ستاره و توابع هیلبرت. مقالات موجود در این کتاب منعکس کننده انواع گفتگوها هستند و از حوزه های تحقیقاتی از جمله نظریه نیمه گروهی، نظریه فاکتورسازی، هندسه جبری، ترکیبیات، جبر جابه جایی، نظریه کدگذاری و نظریه اعداد مشتق شده اند. این کتاب برای محققان و دانشجویانی در نظر گرفته شده است که می خواهند در مورد پیشرفت های اخیر در نظریه نیمه گروه های عددی و ارتباط آن با سایر زمینه های تحقیقاتی بیاموزند.
توضیحاتی درمورد کتاب به خارجی
This book presents the state of the art on numerical semigroups and related subjects, offering different perspectives on research in the field and including results and examples that are very difficult to find in a structured exposition elsewhere. The contents comprise the proceedings of the 2018 INdAM International Meeting on Numerical Semigroups, held in Cortona, Italy. Talks at the meeting centered not only on traditional types of numerical semigroups, such as Arf or symmetric, and their usual properties, but also on related types of semigroups, such as affine, Puiseux, Weierstrass, and primary, and their applications in other branches of algebra, including semigroup rings, coding theory, star operations, and Hilbert functions. The papers in the book reflect the variety of the talks and derive from research areas including Semigroup Theory, Factorization Theory, Algebraic Geometry, Combinatorics, Commutative Algebra, Coding Theory, and Number Theory. The book is intended for researchers and students who want to learn about recent developments in the theory of numerical semigroups and its connections with other research fields.
فهرست مطالب
Preface
Contents
Counting Numerical Semigroups by Genus and Even Gaps via Kunz-Coordinate Vectors
1 Introduction
2 Apéry Set and Kunz-Coordinate Vector
3 The Main Result and an Application to a Counting Problem
References
Patterns on the Numerical Duplication by Their Admissibility Degree
1 Introduction
2 Preliminaries
3 Patterns and Their Admissibility Degree
4 Patterns Equivalent to the Arf Pattern
5 Patterns on the Numerical Duplication
6 Patterns on Rings
References
Primality in Semigroup Rings
1 Introduction
2 Primal Elements in Monoids
3 Primal Elements in a Graded Domain
4 Primal Elements in Semigroup Rings
References
Conjecture of Wilf: A Survey
1 Introduction
1.1 Terminology and Notation
1.2 A Convenient Way to Visualize Numerical Semigroups
2 Two Problems Posed by Wilf
2.1 Wilf\'s Paper
2.2 Problem (a.i): Wilf\'s Conjecture
2.3 Problem (a.ii): Another Open Problem
2.4 Problem (b): Counting Numerical Semigroups
3 Some Classes of Wilf Semigroups
3.1 The Type as an Important Ingredient
3.2 Semigroups Given by Sets of Generators
3.3 Semigroups with Nonnegative Eliahou Numbers
3.4 Natural Constructions
3.5 Semigroups with Small Multiplicity
3.6 Semigroups with Large Embedding Dimension (Compared to the Multiplicity)
3.6.1 Some Comments
3.7 Semigroups with Big Multiplicity (and Possibly Small Embedding Dimension)
3.8 Semigroups with Large Multiplicity (Compared to the Conductor)
3.8.1 Some Comments
3.9 Considering Unusual Invariants
3.10 Families Described Through One Invariant
4 Quasi-Generalization
References
Gapsets of Small Multiplicity
1 Introduction
2 Gapset Filtrations
2.1 The Canonical Partition
2.2 Gapset Filtrations
3 The Case m=3
4 Some More General Tools
4.1 On m-Extensions and m-Filtrations
4.2 Gapset Filtrations Revisited
4.3 A Compact Representation
4.4 Complementing an m-Extension
4.5 The Insertion Maps fi
5 The Case m=4
5.1 Concluding Remark
References
Generic Toric Ideals and Row-Factorization Matrices in Numerical Semigroups
1 Preliminaries
1.1 Numerical Semigroups
1.2 The Fibers of Elements in Numerical Semigroups
1.3 Semigroup Rings
2 Generic Toric Ideals
2.1 Main Results
2.2 Basic Fibers
References
Symmetric (Not Complete Intersection) Semigroups Generated by Six Elements
1 Introduction
2 Symmetric (Not CI) Semigroups Generated by Six Integers and Polynomial Identities
3 The Lower Bound for the Frobenius Numbers of Semigroups S6
4 Are There Any Constraints on Betti\'s Numbers of Symmetric (Not CI) Semigroups S6?
5 Symmetric (Not CI) Semigroups S6 with the W and W2 Properties
References
Syzygies of Numerical Semigroup Rings, a Survey Through Examples
1 Introduction
2 Principal Matrices and Gorenstein Sequences of Length 4
3 Arithmetic Sequences
4 Gluing
References
Irreducibility and Factorizations in Monoid Rings
1 Introduction
2 Notation and Background
2.1 General Notation
2.2 Monoids
2.3 Factorizations
2.4 Monoid Rings
3 Irreducibility Criteria for Monoid Rings
3.1 Extended Gauss\'s Lemma
3.2 Extended Eisenstein\'s Criterion
4 Factorizations in Monoid Algebras
References
On the Molecules of Numerical Semigroups, Puiseux Monoids, and Puiseux Algebras
1 Introduction
2 Monoids, Atoms, and Molecules
2.1 General Notation
2.2 Monoids
2.3 Atoms and Molecules
3 Molecules of Numerical Semigroups
3.1 Betty Elements
3.2 On the Sizes of the Sets of Molecules
4 Molecules of Puiseux Monoids
4.1 Molecules of Generic Puiseux Monoids
4.2 Molecules of Prime Reciprocal Monoids
5 Molecules of Puiseux Algebras
References
Arf Numerical Semigroups with Multiplicity 9 and 10
1 Introduction
2 Arf Numerical Semigroups
3 Arf Numerical Semigroups with Multiplicity 9
4 Arf Numerical Semigroups with Multiplicity 10
References
Numerical Semigroup Rings of Maximal Embedding Dimension with Determinantal Defining Ideals
1 Introduction
2 Proof of Theorem 2
2.1 Proof of (3) (2) and the Assertion (a)
2.2 Proof of (2) (4)
2.3 Proof of (b) and (c)
3 Examples
References
Embedding Dimension of a Good Semigroup
1 Introduction
2 Semiring Associated to a Good Semigroup and Irreducible Absolutes
2.1 Semiring ΓS and Basic Properties
2.2 A System of Generators of ΓS as a Semiring
3 Embedding Dimension of a Good Semigroup
3.1 An Inferior Bound for the Embedding Dimension
3.2 A Superior Bound for the Embedding Dimension
3.3 An Algorithm for the Computation of the Embedding Dimension of a Semigroup SN2
4 Properties of Embedding Dimension
4.1 Relationship Between Embedding Dimension of a Ring and Embedding Dimension of Its Value Semigroup
4.2 Relationship Between Embedding Dimension and Multiplicity
References
On Multi-Index Filtrations Associated to Weierstraß Semigroups
1 Introduction
2 Terminology and Notation
2.1 Branches and Parametrizations
2.2 Divisors on Smooth Curves
3 Brill-Noether Theory for Curves
4 The Weierstraß Semigroup at Several Points
4.1 Dimension of the Riemann-Roch Quotients with Respect to Pi and Associated Functions
4.2 Computing the Weierstraß Semigroup at Two Points
5 Computational Aspects Using Singular
5.1 Hints of Usage of brnoeth.lib
5.2 Procedures Generalizing to Several Points
References
On the Hilbert Function of Four-Generated Numerical SemigroupRings
1 Introduction
2 Preliminaries
3 The Case Embedding Dimension 4
4 Cases with Cardinality of A2≤ 4
5 Case D2 = {n3, n4}
6 The Hilbert Function Does Not Decrease at Level 3
7 Conclusions
References
Lattice Ideals, Semigroups and Toric Codes
1 Introduction
2 The Algebraic Approach
3 Lattice Ideals and Subgroups of the Torus TX
3.1 Degenerate Tori
4 Vanishing Ideals of Subsgroups of TX
4.1 The Length of the Code Cα,YQ
References
The Number of Star Operations on Numerical Semigroups and on Related Integral Domains
1 Introduction
2 Notation
3 Star Operations
4 Estimates Through the Genus
5 Estimates Through the Multiplicity
6 Multiplicity 3
7 Prime Multiplicity
8 Linear Families
9 Algorithms and Explicit Data
10 The Ring Version
References
Torsion in Tensor Products over One-Dimensional Domains
1 Introduction
2 Some Evidence
References
Almost Symmetric Numerical Semigroups with Odd Generators
1 Introduction
2 Basic Concepts
3 Symmetric Semigroups
4 Pseudo-Symmetric Semigroups
5 Almost Symmetric Semigroups with Type Three
References
Poincaré Series on Good Semigroup Ideals
1 Introduction
2 Preliminaries
2.1 Good Semigroups and Their Ideals
2.2 Distance of Semigroup Ideals
2.3 Canonical Semigroup Ideals
2.4 Value Semigroups
3 Distance and Duality
4 Symmetry of the Poincaré Series
References
A Short Proof of Bresinski\'s Theorem on Gorenstein Semigroup Rings Generated by Four Elements
1 Basic Concepts
2 The Proof
References
