We study the following nonlinear Schrodinger system{-△u+P(|x|)u=μu^3+βv^2u,x∈R^2, -△v+Q(|x|)v=υv^3+βu^2v,x∈R^2,where P(r) and Q(r) are positive radial functions, μ〉 0, υ 〉 0, and 3 E R is a...We study the following nonlinear Schrodinger system{-△u+P(|x|)u=μu^3+βv^2u,x∈R^2, -△v+Q(|x|)v=υv^3+βu^2v,x∈R^2,where P(r) and Q(r) are positive radial functions, μ〉 0, υ 〉 0, and 3 E R is a coupling constant. This type of system arises, particularly, in models in Bose-Einstein condensates theory. Applying a finite reduction method, we construct an unbounded sequence of nonradial positive vector solutions of segregated type when β is in some suitable interval, which gives an answer to an interesting problem raised by Peng and Wang in Remark 4.1 (Arch. Ration. Mech. Anal., 208(2013), 305-339).展开更多
基金partially supported by National College Students Innovation Training Project(48)the fund from NSFC(11301204)the phD specialized grant of the Ministry of Education of China(20110144110001)
文摘We study the following nonlinear Schrodinger system{-△u+P(|x|)u=μu^3+βv^2u,x∈R^2, -△v+Q(|x|)v=υv^3+βu^2v,x∈R^2,where P(r) and Q(r) are positive radial functions, μ〉 0, υ 〉 0, and 3 E R is a coupling constant. This type of system arises, particularly, in models in Bose-Einstein condensates theory. Applying a finite reduction method, we construct an unbounded sequence of nonradial positive vector solutions of segregated type when β is in some suitable interval, which gives an answer to an interesting problem raised by Peng and Wang in Remark 4.1 (Arch. Ration. Mech. Anal., 208(2013), 305-339).
