Difference between revisions of "Math 622: Matrix Theory 2"
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=== Title === | === Title === | ||
+ | Matrix Theory 2. | ||
− | === | + | === Credit Hours === |
− | + | 3 | |
− | + | ||
=== Prerequisite === | === Prerequisite === | ||
+ | [[Math 570]]. | ||
+ | [[Math 621]] | ||
=== Description === | === Description === | ||
− | + | Research topics in combinatorial matrix theory. | |
− | + | ||
== Desired Learning Outcomes == | == Desired Learning Outcomes == | ||
=== Prerequisites === | === Prerequisites === | ||
+ | |||
+ | Permission of instructor | ||
=== Minimal learning outcomes === | === Minimal learning outcomes === | ||
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</div> | </div> | ||
+ | As a course directed toward research in combinatorial matrix theory. Topics are picked according to the developing interests of the research community and of faculty and student researchers. The emphasis in this course will be to develop some facility in a current research topic. Topics covered in past courses include the Colin de Verdiere parameter, the minimum rank problem for graphs, and Ramanujan graphs. | ||
+ | |||
+ | Students should learn the foundational theorems in the fields being covered. Students should learn to find and read research papers in those fields. Students should learn to solve challenging problems, develop proofs of theorems on their own, and present those proofs clearly and coherently with appropriate illustrative examples. | ||
+ | |||
+ | === Textbooks === | ||
+ | |||
+ | Typically the course material will come from recent research papers. | ||
=== Additional topics === | === Additional topics === |
Latest revision as of 16:43, 3 April 2013
Contents
Catalog Information
Title
Matrix Theory 2.
Credit Hours
3
Prerequisite
Description
Research topics in combinatorial matrix theory.
Desired Learning Outcomes
Prerequisites
Permission of instructor
Minimal learning outcomes
As a course directed toward research in combinatorial matrix theory. Topics are picked according to the developing interests of the research community and of faculty and student researchers. The emphasis in this course will be to develop some facility in a current research topic. Topics covered in past courses include the Colin de Verdiere parameter, the minimum rank problem for graphs, and Ramanujan graphs.
Students should learn the foundational theorems in the fields being covered. Students should learn to find and read research papers in those fields. Students should learn to solve challenging problems, develop proofs of theorems on their own, and present those proofs clearly and coherently with appropriate illustrative examples.
Textbooks
Typically the course material will come from recent research papers.