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 - 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.
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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 -