Classification of solutions for some mixed order elliptic system
Abstract
In this paper, we classify the solution of the following mixed-order conformally invariant system with coupled nonlinearity in R4: equation\ aligned & - u(x) = up1(x) eq1v(x), x∈ R4,\\ & (-)2 v(x) = up2(x) eq2v(x), x∈ R4, aligned . equation where 0≤ p1 < 1, p2 >0, q1 > 0, q2 ≥ 0, u>0 and satisfies ∫R4 up1(x) eq1v(x) dx < ∞, ∫R4 up2(x) eq2 v(x) dx < ∞. Under additional assumptions (H1) or (H2), we study the asymptotic behavior of the solutions to the system and we establish the equivalent integral formula for the system. By using the method of moving spheres, we obtain the classification results of the solutions in the system.
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