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Description: |
Ergodic theorems are classic measure theoretical results in dynamical systems or, more precisely, ergodic theory. They state that convergence of Birkhoff averages is typical, in a measure theoretical sense. This work aims to explain how these results can be reìnterpreted in light of topology and probability theory. The first relationship is presented through a Baire category analogue of a standard version of Birkhoff's ergodic theorem (assuming ergodicity). Instead of convergence of Birkhoff averages, the topological typical behavior will be the opposite: averages do not converge in a dramatic way. If time permits, we will also explore the second relationship, which examines how the law of large numbers interacts with Birkhoff's ergodic theorem (assuming ergodicity).
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Date: |
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11:30 |
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Speaker: |
Lucas Amorim (UC|UP PhD student)
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Institution: |
Universidade do Porto
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Place: |
Sala 004, UP Math. Dept.
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See more:
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<Main>
<UC|UP MATH PhD Program>
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