Syllabus for Algebra 1 Qualifying Exam
The Algebra 1 exam covers essentially the material taught in MTH G111 (Algebra 1). There will be 10 problems: 5 from Linear Algebra and 5 from Group Theory. Minimum required for passing the exam is 70%.
Linear Algebra
Vector spaces, bases, matrices, linear maps, kernel, image.
Scalar products and orthogonality, bilinear maps, dual space, quadratic forms, Sylvester theorem.
Determinants, inverse of a matrix, rank, subdeterminants.
Symmetric, Hermitian and unitary operators.
Eigenvectors, eigenvalues, characteristic polynomial.
Diagonalization, triangulation, Jordan normal form.
Tensor products of vector spaces: universality property and construction.
Exterior and symmetric powers of a vector space, exterior and symmetric multiplication, contractions.
Group Theory
Groups, subgroups, normal subgroups, cosets, quotient groups, group homomorphisms.
Isomorphism theorems, actions of groups (G-sets), counting orbits.
Sylow theory, normal series, solvable groups.
Abelian groups and their homomorphisms, exact sequences of abelian groups, classification of finite abelian groups.
References
Serge Lang, Algebra, revised third edition, Springer GTM #211, 2002 (Chapter 1)
Serge Lang, Introduction to Linear Algebra, second edition, Springer GTM #211, 1997
George D. Mostow, Joseph H. Sampson, Jean-Pierre Meyer, Fundamental Structures of Algebra, McGraw-Hill, New York 1963.
Joseph J. Rotman, An Introduction to the Theory of Groups, Springer GTM #148 (Chapters 1-6 and 10)
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Started: Sept. 8, 2003. Last modified: Last modified: Sept. 8, 2003
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