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MATH228
- Topology/Lecture
This course continues the study (begun in MATH131 and MATH172) of the topological properties of subsets of Euclidean space, developing algebraic tools like homology (the proper context for Stokes’ theorem from MATH131) and fundamental groups, with an emphasis on finite simplicial complexes. Further topics may include knot theory and topological modeling in psychology. Prerequisites: MATH131 and MATH172, or permission. Mr. Rudolph/Offered every other year
Faculty
Lee Rudolph, Ph.D. - Professor of Mathematics and Computer Science
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Additional Resources
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