MATH 367
Homological Algebra Spring 2016 Division III; Quantative/Formal Reasoning;
This is not the current course catalog

Archive Search

Class Details

Though a relatively young subfield of mathematics, Homological Algebra has earned its place by supplying powerful tools to solve questions in the much older fields of Commutative Algebra, Algebraic Geometry and Representation Theory. This class will introduce theorems and tools of Homological Algebra, grounding its results in applications to polynomial rings and their quotients. We will focus on some early groundbreaking results and learn some of Homological Algebra’s most-used constructions. Possible topics include tensor products, chain complexes, homology, Ext, Tor and Hilbert’s Syzygy Theorem.
The Class: Type: lecture
Limit: 20
Expected: 12
Class#: 3947
Requirements/Evaluation: evaluation will be based primarily on homework and exams
Extra Info: may not be taken on a pass/fail basis
Prerequisites: Math 355
Enrollment Preference: junior and senior math majors
Distributions: Division III; Quantative/Formal Reasoning;

Class Grid

  • HEADERS Column header 1
    CLASSES
    Column header 2
    DREQ
    Column header 3
    INSTRUCTORS
    Column header 4
    TIMES
    Column header 5
    CLASS#
    Column header 6
    ENROLL
    Column header 7
  • MATH 367 - 01 (S) LEC Homological Algebra
    MATH 367 - 01 (S) LEC Homological Algebra
    Division III; Quantative/Formal Reasoning;
    Haydee M. A. Lindo
    MR 2:35 pm - 3:50 pm
    Bronfman 104
    3947

Course Catalog Archive Search

TERM/YEAR
SUBJECT
DIVISION



DISTRIBUTION



ENROLLMENT LIMIT
COURSE TYPE
Start Time
End Time
Day(s)