We prove that supernilpotent and nilpotent semirings with absorbing zero are the same and provide a necessary and sufficient condition for supernilpotency (nilpotency).
Supernilpotent semirings
Tue, Apr. 29 3:30pm (MATH 3…
Topology
Emily Montelius (CU Boulder)
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We will cover a brief overview of how to view tiling spaces topologically and then overview different directions that mathematicians expand on this approach. The talk covers chapter 1 of "Topology of Tiling Spaces" by Lorenzo Sadun. It is meant to be a friendly exposition to increase our knowledge of other work in topology, similar to last year's talk "How is knot theory related to topology?".
Supernilpotent semirings