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Description: |
Previous work on partitions simultaneously s-core and t-core has enumerated such partitions broadly, but missing from the literature is a description of the generating function that would count them. We can produce one, following part of Jaclyn Anderson's original proof of the overall number of s/t-cores. For general s and t, the function appears combinatorially unwieldy; the situation improves in some special cases of interest. Time permitting, we will take a look at partitions {S}-core for |S|>2.
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Date: |
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Start Time: |
15:00 |
Speaker: |
William Keith (CELC, Lisboa)
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Institution: |
-
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Place: |
Room 5.5
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Research Groups: |
-Algebra and Combinatorics
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See more:
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<Main>
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