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Lecture
Field Properties: Irreducibility and Units
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Related lectures (32)
Properties of Euclidean Domains
Covers the properties of Euclidean domains and irreducible elements in polynomial rings.
Polynomials, Division, and Ideals
Explores polynomials, their operations, and the concept of ideals in polynomial rings.
Polynomials: Theory and Operations
Covers the theory and operations related to polynomials, including ideals, minimal polynomials, irreducibility, and factorization.
Chinese Remainder Theorem: Rings and Fields
Covers the Chinese remainder theorem for commutative rings and integers, polynomial rings, and Euclidean domains.
Polynomials on a Field: Properties and Applications
Explores the properties and applications of polynomials on a field, including formal derivation and uniqueness.
Irreducible Factors and Noetherian Rings
Discusses irreducible factors in rings and the properties of Noetherian rings.
Properties of Euclidean Domains
Explores the properties of Euclidean domains, including gcd, lcm, and the Chinese remainder theorem for polynomial rings.
Ideals: Polynomials and Definitions
Explores ideals in K[X], including PGCD, uniqueness, coprimality, and theorems of Bézout and Gauss.
Dimension Theory of Rings
Explores the dimension theory of rings, focusing on chains of ideals and prime ideals.
Ring Operations: Ideals and Classes
Covers the operations in rings, ideals, classes, and quotient rings.
Polynomials: Roots and Factorization
Explores polynomial roots, factorization, and the Euclidean algorithm in depth.
Irreducible Factors and Noetherian Rings
Explores irreducible factors, Noetherian rings, ideal stability, and unique factorization in rings.
Commutative Algebra: Recollections
Covers fundamental concepts in commutative algebra, including rings, units, zero divisors, and local rings.
Polynomials on a Field: Basics and Operations
Introduces the basics of polynomials on a field, focusing on definitions, operations, and properties.
Finite Fields: Construction and Properties
Explores the construction and properties of finite fields, including irreducible polynomials and the Chinese Remainder Theorem.
Polynomials: Definition and Operations
Covers polynomials, their operations, division theorem, and provides illustrative examples.
Rings and Fields: Principal Ideals and Ring Homomorphisms
Covers principal ideals, ring homomorphisms, and more in commutative rings and fields.
Ideals and PPCM
Covers the concept of ideals in polynomial rings and their properties.
Euclidean Algorithm
Explains the Euclidean algorithm for polynomials over a field K, illustrating its application with examples.
Chinese Remainder Theorem: Euclidean Domains
Explores the Chinese Remainder Theorem for Euclidean domains and the properties of commutative rings and fields.
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