MATH 3320 - Set Theory

Description
To provide students with a solid background in set theory and to develop mathematical sophistication in general, this is a course in which covers ZF (Zermelo Frankel Axioms) and ZFC (ZF + the Axiom of Choice), DeMorgan's laws, Power Set, Set Algebra, Zorn's Lemma and other equivalent versions of AC, equivalence relations, well orderings and partial orderings, bijections, Russell's paradox, confinal maps, mathematical induction, transfinite induction, ordinals and cardinals, ordinal and cardinal arithmetic, the Continuum Hypothesis, and the Constructible Universe.
Credits
3
Attributes
College of Natural/Comp Sci
Recent Professors
Open Seat Checker
Schedule Planner
Recent Semesters
Spring 2019, Spring 2017
Offered
TuTh
Avg. Class Size
25
Avg. Sections
1