Difference between revisions of "Algebra Qualifying Syllabus"

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Galois field extensions, the main theorem of Galois theory, primitive elements, Kummer
 
Galois field extensions, the main theorem of Galois theory, primitive elements, Kummer
 
extensions, cyclotomic extensions, quintic polynomials.
 
extensions, cyclotomic extensions, quintic polynomials.
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===random pages to be categorized===
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[[Cayley-Hamilton Theorem]]

Revision as of 18:01, 10 March 2023

Group Theory: Groups, subgroups, homomorphisms, cosets, quotients, isomorphism theorems, direct and semidirect products, solvable groups, structure of cyclic, symmetric and alternating groups; free groups, structure theorem for finite abelian groups.

Group Actions: Groups acting on sets, cosets, and themselves; orbits and stabilizers, permutation representations, Cayley’s Theorem, the class equation, inner automorphisms and automorphism groups, p-subgroups and the Sylow Theorems.

Ring Theory: Definition and examples, homomorphisms, ideals, quotients, integral domains and their fields of fractions, maximal and prime ideals. Factorization in Commutative Rings: Euclidean domains, Unique Factorization Domains, Principal Ideal Domains, Gauss’s Lemma, polynomial factorization, Eisenstein’s criterion, Gaussian integers.

Modules: Definition and examples: matrices, free modules, and bases over arbitrary commutative rings, Structure Theorem for finitely generated modules over PIDs, applications to linear operators: Jordon and rational canonical forms.

Basic Linear Algebra: vector spaces, bases, dimension, bases for infinite dimensional spaces (Zorn’s Lemma), linear transformations, eigenvectors, characteristic polynomial, diagonalization, Cayley-Hamilton Theorem.

Field Theory: Definition and examples, algebraic and transcendental extensions, degree of a finite extension, multiplicativity of degrees, adjunction of roots, finite fields.

Basic Galois Theory for Finite Separable Extensions: Definitions of Galois group and Galois field extensions, the main theorem of Galois theory, primitive elements, Kummer extensions, cyclotomic extensions, quintic polynomials.


random pages to be categorized

Cayley-Hamilton Theorem