Irreducibility of Random Hilbert Schemes
| Contribuinte(s) |
Queen's University (Kingston, Ont.). Theses (Queen's University (Kingston, Ont.)) |
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| Data(s) |
11/09/2016
13/09/2016
13/09/2016
13/09/2016
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| Resumo |
We prove that a random Hilbert scheme that parametrizes the closed subschemes with a fixed Hilbert polynomial in some projective space is irreducible and nonsingular with probability greater than $0.5$. To consider the set of nonempty Hilbert schemes as a probability space, we transform this set into a disjoint union of infinite binary trees, reinterpreting Macaulay's classification of admissible Hilbert polynomials. Choosing discrete probability distributions with infinite support on the trees establishes our notion of random Hilbert schemes. To bound the probability that random Hilbert schemes are irreducible and nonsingular, we show that at least half of the vertices in the binary trees correspond to Hilbert schemes with unique Borel-fixed points. Thesis (Ph.D, Mathematics & Statistics) -- Queen's University, 2016-09-11 13:52:03.771 |
| Identificador | |
| Idioma(s) |
en en |
| Relação |
Canadian theses |
| Direitos |
Queen's University's Thesis/Dissertation Non-Exclusive License for Deposit to QSpace and Library and Archives Canada ProQuest PhD and Master's Theses International Dissemination Agreement Intellectual Property Guidelines at Queen's University Copying and Preserving Your Thesis This publication is made available by the authority of the copyright owner solely for the purpose of private study and research and may not be copied or reproduced except as permitted by the copyright laws without written authority from the copyright owner. |
| Palavras-Chave | #lexicographic ideal #K-polynomial #Hilbert scheme #Hilbert polynomial #strongly stable ideal |
| Tipo |
Thesis |
