共查询到20条相似文献,搜索用时 62 毫秒
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讨论二阶四点微分方程组边值问题u″+p(t)f(t,u(t),v(t))=0,0 t 1,v″+q(t)g(t,u(t),v(t))=0,0 t 1,u(0)=a1x(ξ1),u(1)=b1x(η1)v(0)=a2x(ξ2),v(1)=b2x(η2)如果函数f,g:[0,1]×[0,∞)×[0,∞)→[0,∞)是连续的,并赋予f、g一定的增长条件,利用Leggett-Williama不动点定理,证明了上述边值问题至少存在三对正解. 相似文献
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研究下列具有p-Laplacian算子的四阶三点边值问题{(φp(u″(t)))″=f(t,u(t),u″(t)),t∈[0,1] u(0)-ξu(1)=0,u′(1)-ηu′(0)=0 u″(0)-a1u″(δ)=0,(φp(u″))′(1)-b1(φp(u″))′(δ)=0其中φp(s)=|s|p-2s,p>1,0<ξ,η<1,0相似文献
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设 K 是 n 次代数数域.令Ψ(x,u,η)=(?)∧(b),其中 u~b mod η(?)α、β∈Z_k,α≡β(modη),α(?)0,β(?)0,(α,η)=(β,η)=1,(α)u=(β)b、h(η)表等价类 modη的类数,T(η)=(U∶U'),其中 U 表示域 K 中全体单位所成的群,U'={ε|ε∈U,ε(?)0,ε≡1(modη}.我们证明了下述定理:对于任一正常数 A,存在一正常数 B=B(A)>0,当 Q=x~(1/(n+1))(log x)~(-B),x≥1时有sum from Nη≤Q(?)1/(T(η))|ψ(z,u,η)-z/(h(η))|(?)x/(log~Ax). 相似文献
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Yuan-sheng TIAN 《应用数学学报(英文版)》2013,29(3):661-672
In this paper, we study the multiplicity of positive solutions to the following m-point boundary value problem of nonlinear fractional differential equations: Dqu(t) + f(t, u(t)) = 0, 0 < t < 1, u(0) = 0, u(1) =sum (μiDpu(t)|t = ξi ) from i =1 to ∞ m-2, where q ∈R , 1
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Qi-Keng Lu 《中国科学 数学(英文版)》2010,53(7):1679-1684
In 1965, Lu Yu-Qian discovered that the Poisson kernel of the homogenous domain S m,p,q={Z∈Cm×m, Z1∈Cm×p,Z2 ∈Cq×m|2i1( Z-Z+)-Z1Z1′-Z2′Z20} does not satisfy the Laplace-Beltrami equation associated with the Bergman metric when S m,p,q is not symmetric. However the map T0:Z→Z, Z1→Z1 , Z2→Z2 transforms S m,p,q into a domain S I (m, m + p + q) which can be mapped by the Cayley transformation into the classical domains R I (m, m + p + q). The pull back of the Bergman metric of R I (m, m + p + q) to S m,p,q is a Riemann metric ds 2 which is not a Khler metric and even not a Hermitian metric in general. It is proved that the Laplace-Beltrami operator associated with the metric ds 2 when it acts on the Poisson kernel of S m,p,q equals 0. Consequently, the Cauchy formula of S m,p,q can be obtained from the Poisson formula. 相似文献
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Yong Ding Senhua Lan 《分析论及其应用》2006,22(4):339-352
Let A be a symmetric expansive matrix and Hp(Rn) be the anisotropic Hardy space associated with A. For a function m in L∞(Rn), an appropriately chosen function η in Cc∞(Rn) and j ∈ Z define mj(ξ) = m(Ajξ)η(ξ). The authors show that if 0 < p < 1 and (m)j belongs to the anisotropic nonhomogeneous Herz space K11/p-1,p(Rn), then m is a Fourier multiplier from Hp(Rn) to Lp(Rn). For p = 1, a similar result is obtained if the space K10,1(Rn) is replaced by a slightly smaller space K(w).Moreover, the authors show that if 0 < p ≤ 1 and if the sequence {(mj)V} belongs to a certain mixednorm space, depending on p, then m is also a Fourier multiplier from Hp(Rn) to Lp(Rn). 相似文献
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Let X[a,b] be a compact set containing at least n+1 points and Kan n-dimensional Haar subspace in c[a,b]. Let F(x,y) be a nonnegativefunction, defined on X×(-∞,∞), satisfying ‖F(·,p)‖<∞ with the L_∞norm forsome∈K, where F(x,p)≡F(x,p(x)). The minimization problem discussed in this paper is to find an elementp∈K such that ‖F(·,p)‖=inf ‖F(·,q)‖, such an element p(if any) is saidto be a minimum to F in K~(q∈K). The author in [1,2] studied this problem and has given the main theoremsin the Cbebyshev theory under the following assumptions: (A) lim F(x,y)=∞, x∈X; (B) lim F(x,u)=F(x,y), x∈X,y; (C)lim F(u,υ)=F(x,y),x∈X,y; (D) For each x∈X there existtwo real numbers f~-(x) and f~+(x),f~-(x)f~+(x). such that F(x,y) is strictlydecreasing with respect to y on (-∞,f~-(x)] and strictly increasing on [f~+(x),∞), and F(x,y)=F(x):=inf F(x,υ) on [f~-(x),f~+(x)]. Denote f_1(x)=inf{y:F(x,y)‖F~*‖},f_2(x)=sup{y:F(x,) ‖F‖},f_1(x)=lim f_1(u),f_2(x)=lim f_2(u), G=(q∈K: f_1qf_2}.For pεK set X_p={ 相似文献
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对两个独立样本ξi,1≤i≤n1,ξ1~N(a1,σ2);ηi,1≤i≤m2,η1~N(a2,σ2),证明了ξ-η-与√n1S21+n2S22独立,进而证明(√)n1n2(n1+n2-2)/n1+n2·(-ξ--η)-(a1-a2)/(√)n1S21+n2S22服从参数为n1+n2-2的t分布. 相似文献
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李国祯 《应用泛函分析学报》2004,6(4):351-357
得到Banach空间中随机隐函数存在定理、随机反函数定理和随机Hahn-Banach定理,它们是著名隐函数定理、反函数定理和Hahn-Banach控制延拓定理的随机化推广,这些定理在随机算子理论中将起重要作用。 相似文献
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Yuri Kifer 《Transactions of the American Mathematical Society》1998,350(4):1481-1518
I derive general relativized central limit theorems and laws of iterated logarithm for random transformations both via certain mixing assumptions and via the martingale differences approach. The results are applied to Markov chains in random environments, random subshifts of finite type, and random expanding in average transformations where I show that the conditions of the general theorems are satisfied and so the corresponding (fiberwise) central limit theorems and laws of iterated logarithm hold true in these cases. I consider also a continuous time version of such limit theorems for random suspensions which are continuous time random dynamical systems.
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We introduce a new condition for {Yτn} to have the same asymptotic distribution that {Yn} has, where {Yn} is a sequence of random elements of a metric space (S, d) and {τn} is a sequence of random indices. The condition on {Yn} is that maxiDnd(Yi, Yan)→p0 as n → ∞, where Dn = {i: |ki−kan| ≤ δankan} and {δn} is a nonincreasing sequence of positive numbers. The condition on {τn} is that P(|(kτn/kan)−1| > δan) → 0 as n → ∞. Under these conditions, we will show that d(Yτn, Yan) → P0 and apply this result to the CLT for a general class of sequences of dependent random variables. 相似文献
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LinXi LiChuanmu 《数学研究》1994,27(1):109-115
The extension theorem for linear random functionals in linear apaces is proved. And the representation theorem for bounded linear random functionals and the continuous linear random functionals are studied 相似文献
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给出了可数状态空间中时间随机环境下可逗留随机游动的一个统一模型,对于一维紧邻时间随机环境下的随机游动,在一定的条件下,讨论它的极限性质和中心极限定理,该结论类似于空间随机环境下的随机游动的有关结论. 相似文献
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随机结构空间的数学期望及应用 总被引:1,自引:1,他引:0
苏永福 《应用泛函分析学报》2005,7(1):76-82
设(E,S,Ω,f)是随机结构空间,当(E,S,Ω,f)是随机度量空间,随机赋范空间,随机内积空间时,其向量的随机度量,随机范数,随机内积是随机变量.证明了它们的数学期望分别是拟度量,拟范数,内积.应用关于数学期望的结果,进而得到了随机Hilbert空间中线性连续泛函的Riesz表示定理. 相似文献
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