TY - JOUR
T1 - Classification of Solutions to Mixed Order Conformally Invariant Systems in R2
AU - Guo, Yuxia
AU - Peng, Shaolong
N1 - Publisher Copyright:
© 2022, Mathematica Josephina, Inc.
PY - 2022/6
Y1 - 2022/6
N2 - In this paper, we are concerned with the following mixed-order conformally invariant system with coupled nonlinearity in R2: {(-Δ)12u(x)=up1(x)eq1v(x),x∈R2,(-Δ)v(x)=up2(x)eq2v(x),x∈R2,where 0≤p1<11+K, p2> 0 , q1> 0 , q2≥ 0 , u> 0 and satisfies ∫R2up2(x)eq2v(x)dx<+∞. Under the assumptions, u(x) = O(| x| K) at ∞ for some K≥ 1 arbitrarily large and v+(x) = O(ln | x|) if q2> 0 at ∞. We firstly derived the equivalent integral representation formula for (0.1). Then we discuss the exact asymptotic behavior of the solutions to system (0.1) as | x| → ∞. At last, by using the method of moving spheres in integral form, we give the classification of the classical solutions to (0.1).
AB - In this paper, we are concerned with the following mixed-order conformally invariant system with coupled nonlinearity in R2: {(-Δ)12u(x)=up1(x)eq1v(x),x∈R2,(-Δ)v(x)=up2(x)eq2v(x),x∈R2,where 0≤p1<11+K, p2> 0 , q1> 0 , q2≥ 0 , u> 0 and satisfies ∫R2up2(x)eq2v(x)dx<+∞. Under the assumptions, u(x) = O(| x| K) at ∞ for some K≥ 1 arbitrarily large and v+(x) = O(ln | x|) if q2> 0 at ∞. We firstly derived the equivalent integral representation formula for (0.1). Then we discuss the exact asymptotic behavior of the solutions to system (0.1) as | x| → ∞. At last, by using the method of moving spheres in integral form, we give the classification of the classical solutions to (0.1).
KW - Classification of solutions
KW - Conformally invariant system
KW - Coupled nonlinearity
KW - Method of moving spheres
KW - Mixed order
UR - https://www.scopus.com/pages/publications/85127610101
U2 - 10.1007/s12220-022-00916-0
DO - 10.1007/s12220-022-00916-0
M3 - 文章
AN - SCOPUS:85127610101
SN - 1050-6926
VL - 32
JO - Journal of Geometric Analysis
JF - Journal of Geometric Analysis
IS - 6
M1 - 178
ER -