报告题目:An elementary introduction to persistence modules
报告人:Javad Asadollahi 教授
主持人: Rasool Hafezi
报告时间:12月6日(周二)下午14:30-15:30
BBB: https://vroom.ui.ac.ir/b/jav-qqx-92n-2wr
报告摘要:
Persistent homology is one of the basic tools of topological data analysis (TDA) to study the persistence, i.e. the lifetime, of topological features in a one-parameter increasing family of spaces. Persistence modules are central objects of study in this theory. In this talk, we review the definitions and basic properties of persistence modules. If time permits, we will explain how these modules are related to topological data analysis. The talk is aimed at undergraduate students. We only assume that the audiences are familiar with the basic set theory and linear algebra.
报告人简介:
Javad Asadollahi is a professor of mathematics at the University of Isfahan, Isfahan, Iran. His research interests include the representation theory of algebras, homological algebra, and category theory. In particular, he is interested in homological methods in the representation theory of algebras. He has published over 60 papers in international journals such as Trans. Amer. Math. Society, Math. Research Letters, J. Algebra, J. Pure Appl. Algebra and Science China Math. He has completed 14 Ph.D. students and established an active and successful research group at Isfahan, organizing several scientific activities each year. He is interested in teaching, in particular at the undergraduate level.
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数学与统计学院
2022年12月5日
