Rigorous introduction to topology.
1 Apr 2014 to 13 May 2014
The formal basics of topology are taught in this lecture series. The axioms of topology are assumed. Expected to be a follow up to the series introduction to topology.
Lecturer: Udayan Kanade.
Venue: Noumenon Multiphysics.
List of lectures:
|1 Apr 2014||Axioms of topology; sequential topology|
|3 Apr 2014||Sequential and basic closure|
|4 Apr 2014||Subtopology|
|9 Apr 2014||Basis and subbasis|
|10 Apr 2014||Basis and subbasis|
|11 Apr 2014||Product of finite topologies|
|22 Apr 2014||Product of arbitrary topologies|
|24 Apr 2014||Product of arbitrary topologies|
|29 Apr 2014||Topologies of N→R and R→R using product topology|
|30 Apr 2014||Non-tearing strategies|
|6 May 2014||Identities of relations and functions|
|9 May 2014||Continuity|
|13 May 2014||Continuity|
This lecture series occurred in the past. If you wish to hold a similar lecture series at your venue, please send an email to firstname.lastname@example.org.
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