---
_id: '63078'
abstract:
- lang: eng
text: "For a finite group $G$, we describe the asymptotic growth of the number of\r\nconnected
components of Hurwitz spaces of marked $G$-covers (of both the affine\r\nand projective
lines) whose monodromy classes are constrained in a certain way,\r\nas the number
of branch points grows to infinity. More precisely, we compute\r\nboth the exponent
and (in many cases) the coefficient of the leading monomial\r\nin the count of
components containing covers whose monodromy group is a given\r\nsubgroup of $G$.
By the work of Ellenberg, Tran, Venkatesh and Westerland, this\r\nasymptotic behavior
is related to the distribution of field extensions\r\nof~$\\mathbb{F}_q(T)$ with
Galois group $G$."
author:
- first_name: Beranger Fabrice
full_name: Seguin, Beranger Fabrice
id: '102487'
last_name: Seguin
citation:
ama: Seguin BF. Counting Components of Hurwitz Spaces. Israel Journal of Mathematics.
Published online 2025. doi:10.1007/s11856-025-2848-5
apa: Seguin, B. F. (2025). Counting Components of Hurwitz Spaces. Israel Journal
of Mathematics. https://doi.org/10.1007/s11856-025-2848-5
bibtex: '@article{Seguin_2025, title={Counting Components of Hurwitz Spaces}, DOI={10.1007/s11856-025-2848-5},
journal={Israel Journal of Mathematics}, publisher={Springer Science and Business
Media LLC}, author={Seguin, Beranger Fabrice}, year={2025} }'
chicago: Seguin, Beranger Fabrice. “Counting Components of Hurwitz Spaces.” Israel
Journal of Mathematics, 2025. https://doi.org/10.1007/s11856-025-2848-5.
ieee: 'B. F. Seguin, “Counting Components of Hurwitz Spaces,” Israel Journal
of Mathematics, 2025, doi: 10.1007/s11856-025-2848-5.'
mla: Seguin, Beranger Fabrice. “Counting Components of Hurwitz Spaces.” Israel
Journal of Mathematics, Springer Science and Business Media LLC, 2025, doi:10.1007/s11856-025-2848-5.
short: B.F. Seguin, Israel Journal of Mathematics (2025).
date_created: 2025-12-12T23:09:07Z
date_updated: 2025-12-12T23:12:23Z
doi: 10.1007/s11856-025-2848-5
language:
- iso: eng
publication: Israel Journal of Mathematics
publication_identifier:
issn:
- 0021-2172
- 1565-8511
publication_status: published
publisher: Springer Science and Business Media LLC
status: public
title: Counting Components of Hurwitz Spaces
type: journal_article
user_id: '102487'
year: '2025'
...
---
_id: '63262'
abstract:
- lang: eng
text: "AbstractRadially symmetric global unbounded
solutions of the chemotaxis system $$\\left\\{
{\\matrix{{{u_t} = \\nabla \\cdot (D(u)\\nabla u) - \\nabla \\cdot (uS(u)\\nabla
v),} \\hfill & {} \\hfill \\cr {0 = \\Delta v - \\mu + u,} \\hfill & {\\mu
= {1 \\over {|\\Omega |}}\\int_\\Omega {u,} } \\hfill \\cr } } \\right.$$\r\n \r\n
\ \r\n {\r\n
\ \r\n \r\n \r\n
\ \r\n \r\n
\ \r\n u\r\n
\ t\r\n \r\n
\ =\r\n ∇\r\n
\ ⋅\r\n (\r\n
\ D\r\n (\r\n
\ u\r\n )\r\n
\ ∇\r\n u\r\n
\ )\r\n −\r\n
\ ∇\r\n ⋅\r\n
\ (\r\n u\r\n
\ S\r\n (\r\n
\ u\r\n )\r\n
\ ∇\r\n v\r\n
\ )\r\n ,\r\n
\ \r\n \r\n
\ \r\n \r\n
\ \r\n \r\n
\ \r\n \r\n
\ \r\n 0\r\n
\ =\r\n Δ\r\n
\ v\r\n −\r\n
\ μ\r\n +\r\n
\ u\r\n ,\r\n
\ \r\n \r\n
\ \r\n \r\n
\ μ\r\n =\r\n
\ \r\n 1\r\n
\ \r\n |\r\n
\ Ω\r\n |\r\n
\ \r\n \r\n
\ \r\n \r\n
\ \r\n ∫\r\n
\ Ω\r\n \r\n
\ \r\n u\r\n
\ ,\r\n \r\n
\ \r\n \r\n
\ \r\n \r\n
\ \r\n \r\n
\ \r\n \r\n \r\n
\ are considered
in a ball Ω = BR(0)
⊂ ℝn, where n
≥ 3 and R > 0.Under the assumption
that D and S suitably generalize
the prototypes given by D(ξ)
= (ξ + ι)m−1
and S(ξ) = (ξ
+ 1)−λ−1 for all ξ > 0 and
some m ∈ ℝ, λ >0 and ι
≥ 0 fulfilling $$m + \\lambda
< 1 - {2 \\over n}$$\r\n
\ m\r\n +\r\n
\ λ\r\n <\r\n
\ 1\r\n −\r\n
\ \r\n 2\r\n n\r\n
\ \r\n ,
a considerably large set of initial data u0
is found to enforce a complete mass aggregation in infinite time in the sense
that for any such u0, an associated
Neumann type initial-boundary value problem admits a global classical solution
(u, v) satisfying $${1
\\over C} \\cdot {(t + 1)^{{1 \\over \\lambda }}} \\le ||u( \\cdot ,t)|{|_{{L^\\infty
}(\\Omega )}} \\le C \\cdot {(t + 1)^{{1 \\over \\lambda }}}\\,\\,\\,{\\rm{for}}\\,\\,{\\rm{all}}\\,\\,t
> 0$$\r\n
\ \r\n \r\n 1\r\n
\ C\r\n \r\n
\ \r\n ⋅\r\n \r\n
\ (\r\n t\r\n
\ +\r\n 1\r\n
\ \r\n )\r\n
\ \r\n \r\n \r\n
\ 1\r\n λ\r\n
\ \r\n \r\n
\ \r\n \r\n \r\n
\ ≤\r\n \r\n |\r\n
\ \r\n \r\n |\r\n
\ \r\n u\r\n (\r\n
\ ⋅\r\n ,\r\n
\ t\r\n )\r\n
\ \r\n |\r\n \r\n
\ \r\n \r\n \r\n
\ |\r\n \r\n
\ \r\n \r\n \r\n
\ L\r\n ∞\r\n
\ \r\n \r\n
\ (\r\n Ω\r\n
\ )\r\n \r\n
\ \r\n \r\n ≤\r\n
\ C\r\n ⋅\r\n
\ \r\n (\r\n t\r\n
\ +\r\n 1\r\n
\ \r\n )\r\n
\ \r\n \r\n \r\n
\ 1\r\n λ\r\n
\ \r\n \r\n
\ \r\n \r\n \r\n
\ \r\n \r\n \r\n
\ \r\n \r\n f\r\n
\ o\r\n r\r\n
\ \r\n \r\n \r\n
\ \r\n \r\n \r\n
\ a\r\n l\r\n
\ l\r\n \r\n
\ \r\n \r\n \r\n
\ t\r\n >\r\n
\ 0\r\n
as well as $$||u( \\cdot
\\,,t)|{|_{{L^1}(\\Omega \\backslash {B_{{r_0}}}(0))}} \\to 0\\,\\,\\,{\\rm{as}}\\,\\,t
\\to \\infty \\,\\,\\,{\\rm{for}}\\,\\,{\\rm{all}}\\,\\,{r_0} \\in (0,R)$$\r\n |\r\n
\ |\r\n u\r\n
\ (\r\n ⋅\r\n
\ ,\r\n t\r\n
\ )\r\n |\r\n
\ \r\n |\r\n \r\n
\ \r\n L\r\n
\ 1\r\n \r\n
\ (\r\n Ω\r\n
\ \\\r\n \r\n
\ B\r\n \r\n
\ \r\n r\r\n
\ 0\r\n \r\n
\ \r\n \r\n (\r\n
\ 0\r\n )\r\n
\ )\r\n \r\n
\ \r\n →\r\n 0\r\n
\ as\r\n t\r\n
\ →\r\n ∞\r\n
\ for all\r\n \r\n
\ r\r\n 0\r\n
\ \r\n ∈\r\n (\r\n
\ 0\r\n ,\r\n
\ R\r\n )\r\n
\ with some
C > 0."
author:
- first_name: Michael
full_name: Winkler, Michael
id: '31496'
last_name: Winkler
citation:
ama: Winkler M. Complete infinite-time mass aggregation in a quasilinear Keller–Segel
system. Israel Journal of Mathematics. 2024;263(1):93-127. doi:10.1007/s11856-024-2618-9
apa: Winkler, M. (2024). Complete infinite-time mass aggregation in a quasilinear
Keller–Segel system. Israel Journal of Mathematics, 263(1), 93–127.
https://doi.org/10.1007/s11856-024-2618-9
bibtex: '@article{Winkler_2024, title={Complete infinite-time mass aggregation in
a quasilinear Keller–Segel system}, volume={263}, DOI={10.1007/s11856-024-2618-9},
number={1}, journal={Israel Journal of Mathematics}, publisher={Springer Science
and Business Media LLC}, author={Winkler, Michael}, year={2024}, pages={93–127}
}'
chicago: 'Winkler, Michael. “Complete Infinite-Time Mass Aggregation in a Quasilinear
Keller–Segel System.” Israel Journal of Mathematics 263, no. 1 (2024):
93–127. https://doi.org/10.1007/s11856-024-2618-9.'
ieee: 'M. Winkler, “Complete infinite-time mass aggregation in a quasilinear Keller–Segel
system,” Israel Journal of Mathematics, vol. 263, no. 1, pp. 93–127, 2024,
doi: 10.1007/s11856-024-2618-9.'
mla: Winkler, Michael. “Complete Infinite-Time Mass Aggregation in a Quasilinear
Keller–Segel System.” Israel Journal of Mathematics, vol. 263, no. 1, Springer
Science and Business Media LLC, 2024, pp. 93–127, doi:10.1007/s11856-024-2618-9.
short: M. Winkler, Israel Journal of Mathematics 263 (2024) 93–127.
date_created: 2025-12-18T19:08:34Z
date_updated: 2025-12-18T20:14:59Z
doi: 10.1007/s11856-024-2618-9
intvolume: ' 263'
issue: '1'
language:
- iso: eng
page: 93-127
publication: Israel Journal of Mathematics
publication_identifier:
issn:
- 0021-2172
- 1565-8511
publication_status: published
publisher: Springer Science and Business Media LLC
status: public
title: Complete infinite-time mass aggregation in a quasilinear Keller–Segel system
type: journal_article
user_id: '31496'
volume: 263
year: '2024'
...
---
_id: '63352'
author:
- first_name: Johannes
full_name: Lankeit, Johannes
last_name: Lankeit
- first_name: Michael
full_name: Winkler, Michael
id: '31496'
last_name: Winkler
citation:
ama: Lankeit J, Winkler M. Counterintuitive dependence of temporal asymptotics on
initial decay in a nonlocal degenerate parabolic equation arising in game theory.
Israel Journal of Mathematics. 2019;233(1):249-296. doi:10.1007/s11856-019-1900-8
apa: Lankeit, J., & Winkler, M. (2019). Counterintuitive dependence of temporal
asymptotics on initial decay in a nonlocal degenerate parabolic equation arising
in game theory. Israel Journal of Mathematics, 233(1), 249–296.
https://doi.org/10.1007/s11856-019-1900-8
bibtex: '@article{Lankeit_Winkler_2019, title={Counterintuitive dependence of temporal
asymptotics on initial decay in a nonlocal degenerate parabolic equation arising
in game theory}, volume={233}, DOI={10.1007/s11856-019-1900-8},
number={1}, journal={Israel Journal of Mathematics}, publisher={Springer Science
and Business Media LLC}, author={Lankeit, Johannes and Winkler, Michael}, year={2019},
pages={249–296} }'
chicago: 'Lankeit, Johannes, and Michael Winkler. “Counterintuitive Dependence of
Temporal Asymptotics on Initial Decay in a Nonlocal Degenerate Parabolic Equation
Arising in Game Theory.” Israel Journal of Mathematics 233, no. 1 (2019):
249–96. https://doi.org/10.1007/s11856-019-1900-8.'
ieee: 'J. Lankeit and M. Winkler, “Counterintuitive dependence of temporal asymptotics
on initial decay in a nonlocal degenerate parabolic equation arising in game theory,”
Israel Journal of Mathematics, vol. 233, no. 1, pp. 249–296, 2019, doi:
10.1007/s11856-019-1900-8.'
mla: Lankeit, Johannes, and Michael Winkler. “Counterintuitive Dependence of Temporal
Asymptotics on Initial Decay in a Nonlocal Degenerate Parabolic Equation Arising
in Game Theory.” Israel Journal of Mathematics, vol. 233, no. 1, Springer
Science and Business Media LLC, 2019, pp. 249–96, doi:10.1007/s11856-019-1900-8.
short: J. Lankeit, M. Winkler, Israel Journal of Mathematics 233 (2019) 249–296.
date_created: 2025-12-19T10:51:24Z
date_updated: 2025-12-19T10:51:33Z
doi: 10.1007/s11856-019-1900-8
intvolume: ' 233'
issue: '1'
language:
- iso: eng
page: 249-296
publication: Israel Journal of Mathematics
publication_identifier:
issn:
- 0021-2172
- 1565-8511
publication_status: published
publisher: Springer Science and Business Media LLC
status: public
title: Counterintuitive dependence of temporal asymptotics on initial decay in a nonlocal
degenerate parabolic equation arising in game theory
type: journal_article
user_id: '31496'
volume: 233
year: '2019'
...