Let D be the open unit disk in the complex plane C. For a〉 -1, let dAa(z)=(1 +a) (1 -|z}^2) ^a da(z)be the weighted Lebesgue measure on ]D. For a positive function ω ∈ L^1(D,dAa), the generalized weight...Let D be the open unit disk in the complex plane C. For a〉 -1, let dAa(z)=(1 +a) (1 -|z}^2) ^a da(z)be the weighted Lebesgue measure on ]D. For a positive function ω ∈ L^1(D,dAa), the generalized weighted Bergman-Orlicz spaceA^ψω(D,dAa)is||f||ω^ψ=∫Dψ|F(z)|ω(z)dA^(z) 〈 ∞,where q; is a strictly convex Orlicz function that satisfies other technical hypotheses. Let G be a measurable subset of D, we say G satisfies the reverse Carleson condition for A^ψω (D, dAa) if there exists a positive constant C such that ∫Gψ(f(z))ω(z)dAa(z)≥C∫Dψ(|f(z)dAa(z).for all f ∈ .A^ψω (D,dAa). Let μ be a positive Borel measure, we say μ satisfies the direct Carleson condition if there exists a positive constant M such that for all f∈Aψ^ω (D,dAa),∫Dψ(|f(z)|)dμ(z)≤M∫Dψ(|f(z)|)ω(z)dAa(a).In this paper, we study the direct and reverse Carleson condition on the generalized weighted Bergman-Orlicz space Aω^ψ(D,dAa).We present conditions on the set G such that'the reverse Carleson condition'holds. "Moreover, we give a sufficient condition for the finite positive Borel measure μ to satisfy the direct carleson condition on the generalized weighted Bergman-Orlicz spaces.展开更多
In this paper, we study the dynamical behavior for a 4-dimensional reversible system near its heteroclinic loop connecting a saddle-focus and a saddle. The existence of infinitely many reversible 1-homoclinic orbits t...In this paper, we study the dynamical behavior for a 4-dimensional reversible system near its heteroclinic loop connecting a saddle-focus and a saddle. The existence of infinitely many reversible 1-homoclinic orbits to the saddle and 2-homoclinic orbits to the saddle-focus is shown. And it is also proved that, corresponding to each 1-homoclinic (resp. 2-homoclinic) orbit F, there is a spiral segment such that the associated orbits starting from the segment are all reversible 1-periodic (resp. 2-periodic) and accumulate onto F. Moreover, each 2-homoclinic orbit may be also accumulated by a sequence of reversible 4-homoclinic orbits.展开更多
文摘Let D be the open unit disk in the complex plane C. For a〉 -1, let dAa(z)=(1 +a) (1 -|z}^2) ^a da(z)be the weighted Lebesgue measure on ]D. For a positive function ω ∈ L^1(D,dAa), the generalized weighted Bergman-Orlicz spaceA^ψω(D,dAa)is||f||ω^ψ=∫Dψ|F(z)|ω(z)dA^(z) 〈 ∞,where q; is a strictly convex Orlicz function that satisfies other technical hypotheses. Let G be a measurable subset of D, we say G satisfies the reverse Carleson condition for A^ψω (D, dAa) if there exists a positive constant C such that ∫Gψ(f(z))ω(z)dAa(z)≥C∫Dψ(|f(z)dAa(z).for all f ∈ .A^ψω (D,dAa). Let μ be a positive Borel measure, we say μ satisfies the direct Carleson condition if there exists a positive constant M such that for all f∈Aψ^ω (D,dAa),∫Dψ(|f(z)|)dμ(z)≤M∫Dψ(|f(z)|)ω(z)dAa(a).In this paper, we study the direct and reverse Carleson condition on the generalized weighted Bergman-Orlicz space Aω^ψ(D,dAa).We present conditions on the set G such that'the reverse Carleson condition'holds. "Moreover, we give a sufficient condition for the finite positive Borel measure μ to satisfy the direct carleson condition on the generalized weighted Bergman-Orlicz spaces.
基金Project supported by NNSFC under Grant 10371040NNSFC under Grant 10371040Jinan University Research Funds for Doctors(B0636)
文摘In this paper, we study the dynamical behavior for a 4-dimensional reversible system near its heteroclinic loop connecting a saddle-focus and a saddle. The existence of infinitely many reversible 1-homoclinic orbits to the saddle and 2-homoclinic orbits to the saddle-focus is shown. And it is also proved that, corresponding to each 1-homoclinic (resp. 2-homoclinic) orbit F, there is a spiral segment such that the associated orbits starting from the segment are all reversible 1-periodic (resp. 2-periodic) and accumulate onto F. Moreover, each 2-homoclinic orbit may be also accumulated by a sequence of reversible 4-homoclinic orbits.
