Cohen-Lenstra heuristics and local conditions

Wood, Melanie Matchett

doi:10.1007/s40993-018-0134-x

Cited by 16 publications

(20 citation statements)

References 27 publications

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“…When G is abelian and of odd order, then Theorem 1.2 is roughly the same as a result of Achter [Ach06]. Also, when |G| is odd, Ellenberg, Venkatesh, and Westerland [EVW16] (for abelian G, in the imaginary quadratic case), the author [Woo17b] (for abelian G, in the real quadratic case) and Boston and the author [BW17] (for any G, in the imaginary quadratic case) prove a result like Theorem 1.2, but with a limit in n, before a limit in q, making it closer to the analog of Conjecture 1.1.…”

Section: Introductionmentioning

confidence: 66%

“…The other lines are all exact values forẼ ≤X (A, A −1 C 2 ), (or more precisely its analog for quadratic fields of discriminant congruent to 5 mod 8) where A is an abelian group. These other three lines are all conjectured, by the Cohen-Lenstra Heuristics [CL84] (see also [Woo17b] and [BV16, Corollary 4]), to go to 1. The new insight of our paper leads to predicting that, unlike averages of unramified abelian extensions,Ẽ ≤X (A 4 , G ) should instead go to 2.…”

Section: Melanie Matchett Wood and Philip Matchett Woodmentioning

confidence: 82%

“…This is a local condition at 2 on the quadratic fields. It is predicted that such local conditions do not affect the Cohen-Lenstra heuristics and in particular the conjectured averages in the case that G is abelian (see [BV15,BV16,Woo17b]).…”

Section: A Refined Conjecturementioning

confidence: 99%

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Nonabelian Cohen–Lenstra moments

Wood¹,

Wood²

2019

Duke Math. J.

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In this paper we give a conjecture for the average number of unramified Gextensions of a quadratic field for any finite group G. The Cohen-Lenstra heuristics are the specialization of our conjecture to the case that G is abelian of odd order. We prove a theorem towards the function field analog of our conjecture, and give additional motivations for the conjecture including the construction of a lifting invariant for the unramified Gextensions that takes the same number of values as the predicted average and an argument using the Malle-Bhargava principle. We note that for even |G|, corrections for the roots of unity in Q are required, which can not be seen when G is abelian.

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Section: Introductionmentioning

confidence: 66%

Section: Melanie Matchett Wood and Philip Matchett Woodmentioning

confidence: 82%

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Nonabelian Cohen–Lenstra moments

Wood¹,

Wood²

2019

Duke Math. J.

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“…Setting d = ∞, u = 1 and noting that this inequality holds for all p ≥ 3 gives Lemma 5.1. • Similarly, setting d = ∞, u = 1/p w (with p prime and w a positive integer) gives Proposition 2.3 of [26].…”

Section: Remarksmentioning

confidence: 99%

“…Friedman and Washington do not discuss this explicitly, but using the same methods as in [12] one can show that taking the limit as d → ∞ of the probability that a randomly chosen d × (d + w) matrix over Z p has cokernel isomorphic to a finite abelian p-group of type λ is given by P ∞,1/p w (λ). See the discussion above Proposition 2.3 of [26]. Similarly, Tse considers rectangular matrices with more rows than columns and shows that P ∞,1/p w (λ) is equal to the d → ∞ probability that a randomly chosen (d + w) × d matrix over Z p has cokernel isomorphic to Z w p ⊕ G, where G is a finite abelian p-group of type λ [23].…”

Section: Introductionmentioning

confidence: 99%

Random Partitions and Cohen–Lenstra Heuristics

Fulman

Kaplan

2019

Ann. Comb.

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Limits and fluctuations of p-adic random matrix products

Peski¹

2021

Sel. Math. New Ser.

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We study the distribution of singular numbers of products of certain classes of padic random matrices, as both the matrix size and number of products go to ∞ simultaneously. In this limit, we prove convergence of the local statistics to a new random point configuration on Z, defined explicitly in terms of certain intricate mixed q-series/exponential sums. This object may be viewed as a nontrivial p-adic analogue of the interpolating distributions of Akemann-Burda-Kieburg [6], which generalize the sine and Airy kernels and govern limits of complex matrix products. Our proof uses new Macdonald process computations and holds for matrices with iid additive Haar entries, corners of Haar matrices from GLN (Zp), and the p-adic analogue of Dyson Brownian motion studied in [80]. Contents 1. Introduction 1 2. p-adic matrix background 3. Symmetric function background 4. The limit of the Plancherel/principal Hall-Littlewood measure 5. Residue expansions 6. Tightness and the limiting random variable 7. An indeterminate moment problem 8. Examples of residue formula for L k,t,χ 9. The case of pure α specializations 10. From processes of infinitely many particles to finite matrix bulk limits Appendix A. Parallels with complex matrix products Appendix B. A Hall-Littlewood proof of [80, Theorem 1.2] References

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Cohen-Lenstra heuristics and local conditions

Cited by 16 publications

References 27 publications

Nonabelian Cohen–Lenstra moments

Nonabelian Cohen–Lenstra moments

Random Partitions and Cohen–Lenstra Heuristics

Limits and fluctuations of p-adic random matrix products

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