EVEN SOLUTIONS OF SOME MEAN FIELD EQUATIONS AT NON-CRITICAL PARAMETERS ON A FLAT TORUS

Ting Jung Kuo; Chang Shou Lin

doi:10.1090/proc/15721

EVEN SOLUTIONS OF SOME MEAN FIELD EQUATIONS AT NON-CRITICAL PARAMETERS ON A FLAT TORUS

Ting Jung Kuo, Chang Shou Lin

數學系

研究成果: 雜誌貢獻 › 期刊論文 › 同行評審

摘要

In this paper, we consider the mean field equation Δu + e^u = Σ₃_i=0 4πn_iδω_i/2 in E_τ , where ni ∈ ℤ_≥0, E_τ is the flat torus with periods ω₁ = 1, ω₂ = τ and Im τ > 0. Assuming N = Σ³_i₌₀ n_i is odd, a non-critical case for the above PDE, we prove: (i) If among {ni|i = 0, 1, 2, 3} there is only one odd integer, then there is always an even solution. Furthermore, if n0 = 0 and n₃ is odd, then up to SL₂(Z) action, except for finitely many E_τ , there are exactly n₃+1/2 even solutions. (ii) If there are exactly three odd integers in {ni|i = 0, 1, 2, 3}, then the equation has no even solutions for any flat torus E_τ . Our second result might suggest the symmetric solution of the above mean field equation does not hold in general.

原文	英語
頁（從 - 到）	1577-1590
頁數	14
期刊	Proceedings of the American Mathematical Society
卷	150
發行號	4
DOIs	https://doi.org/10.1090/proc/15721
出版狀態	已發佈 - 2022

ASJC Scopus subject areas

數學(全部)
應用數學

存取文件

10.1090/proc/15721

其它文件與鏈接

引用此

@article{f537247935c64a1abbdd0194fb715773,

title = "EVEN SOLUTIONS OF SOME MEAN FIELD EQUATIONS AT NON-CRITICAL PARAMETERS ON A FLAT TORUS",

abstract = "In this paper, we consider the mean field equation Δu + eu = Σ3i=0 4πniδωi/2 in Eτ , where ni ∈ ℤ≥0, Eτ is the flat torus with periods ω1 = 1, ω2 = τ and Im τ > 0. Assuming N = Σ3i=0 ni is odd, a non-critical case for the above PDE, we prove: (i) If among {ni|i = 0, 1, 2, 3} there is only one odd integer, then there is always an even solution. Furthermore, if n0 = 0 and n3 is odd, then up to SL2(Z) action, except for finitely many Eτ , there are exactly n3+1/2 even solutions. (ii) If there are exactly three odd integers in {ni|i = 0, 1, 2, 3}, then the equation has no even solutions for any flat torus Eτ . Our second result might suggest the symmetric solution of the above mean field equation does not hold in general.",

author = "Kuo, {Ting Jung} and Lin, {Chang Shou}",

note = "Funding Information: Received by the editors January 31, 2021, and, in revised form, June 8, 2021, June 14, 2021, June 15, 2021, and June 16, 2021. 2020 Mathematics Subject Classification. Primary 35J15, 35J60, 34M45, 34M03. The research of the first author was supported by MOST 107-2628-M-003-002-MY4. Publisher Copyright: {\textcopyright} 2022 American Mathematical Society",

year = "2022",

doi = "10.1090/proc/15721",

language = "English",

volume = "150",

pages = "1577--1590",

journal = "Proceedings of the American Mathematical Society",

issn = "0002-9939",

publisher = "American Mathematical Society",

number = "4",

}

TY - JOUR

T1 - EVEN SOLUTIONS OF SOME MEAN FIELD EQUATIONS AT NON-CRITICAL PARAMETERS ON A FLAT TORUS

AU - Kuo, Ting Jung

AU - Lin, Chang Shou

N1 - Funding Information: Received by the editors January 31, 2021, and, in revised form, June 8, 2021, June 14, 2021, June 15, 2021, and June 16, 2021. 2020 Mathematics Subject Classification. Primary 35J15, 35J60, 34M45, 34M03. The research of the first author was supported by MOST 107-2628-M-003-002-MY4. Publisher Copyright: © 2022 American Mathematical Society

PY - 2022

Y1 - 2022

N2 - In this paper, we consider the mean field equation Δu + eu = Σ3i=0 4πniδωi/2 in Eτ , where ni ∈ ℤ≥0, Eτ is the flat torus with periods ω1 = 1, ω2 = τ and Im τ > 0. Assuming N = Σ3i=0 ni is odd, a non-critical case for the above PDE, we prove: (i) If among {ni|i = 0, 1, 2, 3} there is only one odd integer, then there is always an even solution. Furthermore, if n0 = 0 and n3 is odd, then up to SL2(Z) action, except for finitely many Eτ , there are exactly n3+1/2 even solutions. (ii) If there are exactly three odd integers in {ni|i = 0, 1, 2, 3}, then the equation has no even solutions for any flat torus Eτ . Our second result might suggest the symmetric solution of the above mean field equation does not hold in general.

AB - In this paper, we consider the mean field equation Δu + eu = Σ3i=0 4πniδωi/2 in Eτ , where ni ∈ ℤ≥0, Eτ is the flat torus with periods ω1 = 1, ω2 = τ and Im τ > 0. Assuming N = Σ3i=0 ni is odd, a non-critical case for the above PDE, we prove: (i) If among {ni|i = 0, 1, 2, 3} there is only one odd integer, then there is always an even solution. Furthermore, if n0 = 0 and n3 is odd, then up to SL2(Z) action, except for finitely many Eτ , there are exactly n3+1/2 even solutions. (ii) If there are exactly three odd integers in {ni|i = 0, 1, 2, 3}, then the equation has no even solutions for any flat torus Eτ . Our second result might suggest the symmetric solution of the above mean field equation does not hold in general.

UR - http://www.scopus.com/inward/record.url?scp=85124597748&partnerID=8YFLogxK

UR - http://www.scopus.com/inward/citedby.url?scp=85124597748&partnerID=8YFLogxK

U2 - 10.1090/proc/15721

DO - 10.1090/proc/15721

M3 - Article

AN - SCOPUS:85124597748

SN - 0002-9939

VL - 150

SP - 1577

EP - 1590

JO - Proceedings of the American Mathematical Society

JF - Proceedings of the American Mathematical Society

IS - 4

ER -

EVEN SOLUTIONS OF SOME MEAN FIELD EQUATIONS AT NON-CRITICAL PARAMETERS ON A FLAT TORUS

摘要

ASJC Scopus subject areas

存取文件

其它文件與鏈接

指紋

引用此