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25 October 2003, Volume 23 Issue 5 Previous Issue    Next Issue

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Positive Solutions to Some Nonlinear Eigenvalue Problems of ThirdOrder Ordinary Differential Equations YAO Qing-Liu Acta mathematica scientia,Series A. 2003, 23 (5):  513-519.  Abstract ( 1966 )   RICH HTML PDF (337KB) ( 2146 )   Save Some nonlinear eigenvalue problems of third order ordinary differential equations are investigated. By considering the properties of nonlinear terms on bounded sets, the existence and multiplicity of these problems a reestablished. References | Related Articles | Metrics

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Hypermonogenic Functions in Complex Clifford Analysis LI Yu-Cheng Acta mathematica scientia,Series A. 2003, 23 (5):  520-525.  Abstract ( 1247 )   RICH HTML PDF (314KB) ( 1212 )   Save In this paper, the authors research hypermonogenic functions in complex Clifford analysis ralating to the solution of the equation z_n Df(z)+(n-1)Qf′=0  in which f(z)=Pf(z)+Qf(z)e_n,f(z)∈C^2(Ω),f(z): Ω → C^{n+1},Ω C^{n+1}, The authors obtain several properties of hypermonogenic functions. References | Related Articles | Metrics

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The Variational Equations and the Integral Invariants for Relativistic Birkhoffian Systems ZHANG Yi Acta mathematica scientia,Series A. 2003, 23 (5):  526-529.  Abstract ( 1371 )   RICH HTML PDF (292KB) ( 1375 )   Save This paper established the variational equations for relativistic Birk hoffian systems, and making use of the  Birkhoff equations  of the systems a nd their variational equations, the paper has proved that an integral invariant  can be directly constructed by a first integral of the systems. In the paper,two examples are given to illustrate the application of the results. References | Related Articles | Metrics

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A Class of Shock Solution for Nonlinear Equations MO Jia-Qi Acta mathematica scientia,Series A. 2003, 23 (5):  530-534.  Abstract ( 1249 )   RICH HTML PDF (291KB) ( 1372 )   Save In this paper, a class of shock solution for nonlinear equations is considered u sing the matching condition. The relation of the shock solution and its boundary  conditions is discussed.  References | Related Articles | Metrics

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Testing for Varying Dispersion in Exponential Family Nonlinear Models with Random Coefficients LIN Jin-Guan, WUIBo-Cheng Acta mathematica scientia,Series A. 2003, 23 (5):  535-544.  Abstract ( 1885 )   RICH HTML PDF (405KB) ( 1087 )   Save Exponential family nonlinear models with random coeff icients are the extension of models studied by Smith & Heitjan (1993) and Wei et al (1998). This paper dea ls with this type of models and discusses the tests of varying dispersion for constant and nonconstan t weights of dispersion respectively. Several score  test  statistics are obtain ed . European rabbit data (Ratkowsky (1983) are presented for normal, Γand inverse aussian nonlinear models respecti vely to illustrate the methodology. References | Related Articles | Metrics

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The Uniform Hausdorff Dimensions for the Image Sets and Graph Sets of the Nondegenerate Multidimensional Diffusion Processes YANG Xin-Jian Acta mathematica scientia,Series A. 2003, 23 (5):  545-553.  Abstract ( 1550 )   RICH HTML PDF (357KB) ( 1106 )   Save  Let X(t)=X(0)+∫^t_0α(X(s))dB(s)+∫^t_0β( X(s))ds be a d dimensional nondegenerate diffusion process, whereB(t) is a Brownian motion. If α(x) and β(x) are bounded continuous on R^d and satisfying Lipschitz condition, and a(x)=α(x)α(x)^* is uniformly positive definite, that is for  some positive constant C_0, a(x)≥C_0{d×d}, for all x∈R^d, then we prove that, when d≥3:P(ω: dimX(E,ω)=dimGRX(E,ω)=2dimE, for all E∈B([0,∞)))=1,where dimF denotes the Hausdorff dimension of F for F R^l(l≥1), and X(E,ω)={X(t,ω): t∈E},GRX(E,ω)={(t, X(t,ω)): t∈E}, ω∈Ω. References | Related Articles | Metrics

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The Hausdorff Dimension of Generalized Statistically Self Similar Sets DENG Ai-Jiao, HU Di-He Acta mathematica scientia,Series A. 2003, 23 (5):  554-564.  Abstract ( 1489 )   RICH HTML PDF (393KB) ( 1116 )   Save In this paper the authors study further the fractal properties of generalized statistically self similar sets that they constructed in [1]. The authors get  the Hausdorff dimension and the exact Hausdorff measure function for this class of sets. Their results ex tended the corrsponding conclusions of [4]. References | Related Articles | Metrics

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Strong Convergence Theorems for Arbitrary Stochastic Sequence YANG Wei-Guo, LIU Wen Acta mathematica scientia,Series A. 2003, 23 (5):  565-572.  Abstract ( 1508 )   RICH HTML PDF (330KB) ( 1616 )   Save In this paper, the authors study the strong limit theorems for an arbitrary stoc ha stic sequence. As corollaries, a strong law of large numbers for a martingale di ff erence sequence and a class of strong limit theorems of equitable ratios for an  arb itrary stochastic sequence are obtained. We also study the strong limit theorem  for estimation of the sum of a stochastic sequence.  References | Related Articles | Metrics

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On Moments of sup_{n≥1}(S_n/n^{1/r})(0<r<2)和sup_{n≥1}(S_n/sqat(n lnln n)) CHEN Ping-Yan, GAN Shi-Xin Acta mathematica scientia,Series A. 2003, 23 (5):  573-582.  Abstract ( 2483 )   RICH HTML PDF (365KB) ( 2003 )   Save Let {X_n,n≥1} be a φ mixing sequence of identicall y distributed random variables, and S_n=∑^n_{i=1}X_i(n≥1). In the paper, the authors  will study the moments of sup_{n≥1}(S_n/n^{1/r})(0<r<2)和sup_{n≥1}(S_n/sqat(n lnln n)) under the conditions of some moments and the rate of mixing. References | Related Articles | Metrics

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Positive Solutions of a Singular Nonlinear Three point Boundary Value Problem MA Yu-Hong, MA Ru-Yun Acta mathematica scientia,Series A. 2003, 23 (5):  583-588.  Abstract ( 1862 )   RICH HTML PDF (314KB) ( 1511 )   Save By simple application of the fixed point theorem in cones,an existence theorem  of  positive solutions is established to a singular nonlinear threepoint boundary  value problem（u″(t)+a(t)f(u)=0,0＜t＜1,αu(0)-βu′(0)=0,u(1)-ku(η)=0．）Where η∈(0,1) is a constant,a∈C((0,1),［0,+∞ )),f∈C(［0,+∞),［0,+∞)). References | Related Articles | Metrics

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On the Boundedness of the Solutions of a Class of Nonlinear Differential System LIU Bing-Wen, BANG Le-Qun, TU De-Zhi Acta mathematica scientia,Series A. 2003, 23 (5):  589-597.  Abstract ( 1567 )   RICH HTML PDF (364KB) ( 1463 )   Save In this paper the authors study the boundedness of solutions of  the follo wing nonlinear differential system (dx/dt)=h(y)-φ(x), (dy/dt)=-h(y)f(x)-g(x)k(y)The authors obtain a new sufficient condition for all solutions of (E) to be bou nded. This result can be applied to the Liénard type equation. d^2x/dt^2+f^*(x)(dx/dt)+g)^*(x)=0 The result extends and improves some results associated with the same problems i n the literature ［1－6］. References | Related Articles | Metrics

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Mean Consistency for a Semiparametric Regression Model BO Guang-Ming, HU Shu-He, FANG Li-Bao, CHENG Zheng-Dong Acta mathematica scientia,Series A. 2003, 23 (5):  598-606.  Abstract ( 1637 )   RICH HTML PDF (370KB) ( 1521 )   Save For a semiparametric regression model y(n)i=x (n)iβ+g(t(n)i)+ε(n)i  with Lq mixin gale errors, the authors define estimators βD(-*8〗∧[DD)]n and [AKg ＾]n(t) for β and g respectively,and obtain its qth mean consistency  under suitable conditions.  Related Articles | Metrics

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Potential Function Model of Uniformity Measurement HU Dong-Hong, LI De-Hua, WANG Zu-Xi Acta mathematica scientia,Series A. 2003, 23 (5):  607-612.  Abstract ( 1833 )   RICH HTML PDF (450KB) ( 2422 )   Save The basic characteristics that  any criterion of uniformity measurement  should have are discussed. According to the model of physics potential and forc e, a new criterion of uniformity measurement, potential function model of unifor mity measurement, is proposed. The model  not only can solve the problems suc h as  computability and the adjustable character for uniformity, but also has all the  good characters, which a uniformity measurement should have, such as rotation s ymmetry , translation symmetry and center reflection symmetry. An example is shown and  the uniformity of lower dimension projection is discussed at the end.   References | Related Articles | Metrics

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The Growth of Solutions of a Certain Higher Order Differential Equations  LI Chun-Hong, HUANG Xiao-Jun Acta mathematica scientia,Series A. 2003, 23 (5):  613-618.  Abstract ( 1493 )   RICH HTML PDF (334KB) ( 1507 )   Save This  paper investigates the growth problem of solutions of a class of higher  order linear differenntial equations and proves two theorems which extend some results obtained by M.Frei, M.Ozawa, G.Gundersen, J.K.Jangley and Z. X.Chen References | Related Articles | Metrics

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A Criterion for Generalized Exponential Dichotomy and Existence of Bounded Solution LIN Mu-Ren Acta mathematica scientia,Series A. 2003, 23 (5):  619-626.  Abstract ( 1370 )   RICH HTML PDF (348KB) ( 1344 )   Save In this paper,  the authors provide a sufficient condition for  the generalized exponential dichotomy of a linear system (dx/dt)]=A(t)x. As an application, the authors study the existence of bounded solut ions of a nonlinear perturbed equation. The  results generalize those given in  ［1］ and ［2］. References | Related Articles | Metrics

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On Positive Entire Solutions to Singular Nonlinear PolyHarmonic Equations in R^2 Wu Jiong-Qi Acta mathematica scientia,Series A. 2003, 23 (5):  627-640.  Abstract ( 1671 )   RICH HTML PDF (441KB) ( 1441 )   Save In this paper, two dimensional singular nonlinear poly harmonic equation of the form Δ((Δ\+nu)\+\{p-1*\}) = f(|x|, u, |u|)u\+\{-β\},\ x∈R\+2 is  considered, where \$p>1, β≥0, n\$ is an integer \$(n≥1),ξ\+\{α*\}:=|ξ|\+\{α-1\}ξ,ξ∈R,α>0.\$   and \$f: [AKR-]\-+×R\-+×[AKR-]\-+→R\-+\$ is a continuous function. It is shown that any positive radially symmet ric entire solution grows at least as fast as positive constant multiples of \$|x|\+\{2n\}(\%log\%|x|)\+\{1/(p-1)\}\$ as \$|x|→∞\$. It is given that some sufficient conditions and nec essary conditions for the existence of infinitely many positive symmetric entire  solutions which are asymptotic to positive constant multiples of \$ |x|\+\{2n\}(log|x|)\+\{1/(p-1)\}\$ as \$|x|→∞\$. The results can be extended to certain equations of more genera l form, e.g.Δ((Δ\+nu)\+\{p-1*\})=f(|x|, u, |u|,|u\+2u|,\:,|u|\+\{2n-1\})u\+\{-β\}, x∈R^2. References | Related Articles | Metrics