2026年, 第42卷, 第1期　刊出日期：2026-01-15

  

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  Orbital Stability of Solitary Waves to the mKdV-Schrödinger System with Cubic-quintic Nonlinear Term

  Yue-yang FENG, Bo-ling GUO

  应用数学学报(英文版). 2026, 42(1): 1-9. https://doi.org/10.1007/s10255-025-0088-4

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  This paper concerned with the orbital stability of solitary waves for the mKdV-Schrödinger system with cubic-quintic nonlinear terms through detailed spectral analysis and abstract stability theorem. First, we derived the explicit solitary wave solutions by assuming the solution expression. Then, through using the orbital stability theory developed by Grillakis et al., we established a general criteria for assessing the orbital stability for solitary waves of this system.
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  Information Protocol Equilibrium in n-insider Perfect Competition with a Random Deadline

  Qi-hong NIE, Ji-xiu QIU, Ji-ze LI, Yong-hui ZHOU

  应用数学学报(英文版). 2026, 42(1): 10-22. https://doi.org/10.1007/s10255-024-1073-z

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  This paper studies a model of $n$ insiders with perfect information trading on a risky asset with value normally distributed and disclosed at a random deadline. We propose a concept of information protocol equilibrium under semi-strong efficient pricing, consisting of an $n-$profile of insider trading strategies with terminal residual information protocols, and find that if a common protocol on terminal residual information before trading is obeyed by all insiders, then, in the market with more than two insiders there exists a uique equilibrium only when it requires to release common partial information eventually, or it does not exist if it requires to release all or not any; but in the market with a single insider, the insider may release all private information eventually to make a maximal profit. Thereby, the existence and uniqueness of information protocol equilibrium among $n$ insiders are deduced. Finally, numerical results illustrate some market characteristics of equilibria with different information protocols required before trading.
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  Inertia and Spectral Symmetry for the Eccentricity Matrices of Clique Trees

  Xiao-hong LI, Jian-feng WANG, Maurizio BRUNETTI

  应用数学学报(英文版). 2026, 42(1): 23-38. https://doi.org/10.1007/s10255-024-1140-5

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  The eccentricity matrix $\mathcal E(G)$ of a connected graph $G$ is obtained from the distance matrix of $G$ by leaving unchanged the largest nonzero entries in each row and each column, and replacing the remaining ones with zeros. In this paper, we consider the set $\mathcal C \mathcal T$ of clique trees whose blocks contain at most two cut-vertices of the clique tree. Along with studying the structural properties of a clique tree in $\mathcal C \mathcal T$, we prove its eccentricity matrix to be irreducible, and then determine its inertia showing that every graph in $\mathcal C \mathcal T$ with more than four vertices and odd diameter has two positive and two negative $\mathcal E$-eigenvalues. Positive $\mathcal E$-eigenvalues and negative $\mathcal E$-eigenvalues turn out to be equal in number even for graphs in $\mathcal C \mathcal T$ with even diameter; that shared cardinality also counts the `diametrally distinguished' vertices. Finally, we prove that the spectrum of the eccentricity matrix of a clique tree $G$ in $\mathcal C \mathcal T$ is symmetric with respect to the origin if and only if $G$ has an odd diameter and exactly two adjacent central vertices. Our results generalize those achieved on trees by I. Mahato and M. R. Kannan in 2022.
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  Uniformly Exponential Stability of Semi-discrete Difference Scheme for One-dimensional Euler-Bernoulli Beam with Local Viscosity

  Kun-yi YANG, Zhuo-xuan DONG

  应用数学学报(英文版). 2026, 42(1): 39-53. https://doi.org/10.1007/s10255-025-0061-2

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  In this paper, we establish the exponential stability of the one-dimensional Euler-Bernoulli beam equation with local viscosity. On the one hand, we demonstrate that the Euler-Bernoulli beam equation system is exponentially stable by employing the multiplier method, which relies on an appropriately constructed Lyapunov function. On the other hand, we discretize the Euler-Bernoulli beam equation system using the finite volume difference method. For the resulting semi-discrete system, we construct a discretized multiplier based on the discretized Lyapunov function. Finally, we prove that the semi-discrete Euler-Bernoulli beam equation system is also uniformly exponentially stable.
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  Meromorphic Solutions of Logistic Delay Differential Equations of the Lotka-Volterra Type and Beyond

  Ling XU, Run-zi LUO, Ting-bin CAO

  应用数学学报(英文版). 2026, 42(1): 54-60. https://doi.org/10.1007/s10255-025-0073-y

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  Let $\tau\in\mathbb{C}\setminus\{0\},$ let $p$ and $q$ be distinct positive integers, and let $a,$ $b,$ $c$ be meromorphic functions such that at least one of $b$ and $c$ is not identically equal to zero. The main purpose of this paper is to study the logistic delay differential equations of the Lotka-Volterra type $$w'(z)=w(z)[a(z)+b(z)w^{p}(z-\tau)+c(z)w^{q}(z-\tau)].$$ We prove that any admissible meromorphic solution $w$ of the equation satisfies that the counting function $N(r, w)$ of poles and the characteristic function $T(r, w)$ have the same growth category. Furthermore, we obtain that ``most" of admissible meromorphic solutions of a more general delay differential equation \begin{eqnarray*} w'(z)=w(z)\Big[a(z)+\sum_{j=1}^{k}b_{j}(z)w^{j}(z-\tau)\Big], \qquad k\in \mathbb{N}, \end{eqnarray*} have a pole at least.
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  Riemann-Hilbert Approach to the Fifth-order Nonlinear Schrödinger Equation with Non-vanishing Boundary Conditions

  Jin-jie YANG, Shou-fu TIAN, Zhi-qiang LI

  应用数学学报(英文版). 2026, 42(1): 61-82. https://doi.org/10.1007/s10255-024-1062-2

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  The Cauchy problem of the fifth-order nonlinear Schrödinger (foNLS) equation is investigated with nonzero boundary conditions in detailed. Firstly, the spectral analysis of the scattering problem is carried out. A Riemann surface and affine parameters are introduced to transform the original spectral parameter to a new spectral parameter in order to avoid the multi-valued problem. Based on Lax pair of the foNLS equation, the Jost functions are obtained, and their analytical, asymptotic, symmetric properties, as well as the corresponding properties of the scattering matrix are established systematically. For the inverse scattering problem, we discuss the cases that the scattering coefficients have simple zeros and double zeros, respectively, and we further derive their corresponding exact solutions via solving a suitable Riemann-Hilbert problem. Moreover, some interesting phenomena are found when we choose some appropriate parameters for these exact solutions, which are helpful to study the propagation behavior of these solutions.
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  Stability of Solitary Waves for Trapped Dipolar Quantum Gases in the Limit Case of the Cigar-Shaped Model

  Sheng WANG, Juan HUANG

  应用数学学报(英文版). 2026, 42(1): 83-94. https://doi.org/10.1007/s10255-024-1139-y

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  This paper concerns the existence and stability of solitary waves for the nonlinear Schrödinger equation with a partial confinement, which describes the limit case of the cigar-shaped model in Bose-Einstein condensate of dipolar quantum gases. More precisely, we applied a compactness argument, which comes from the confining potential $x_1^2+x_2^2$, to overcome the lack of compactness caused by the translation invariance with respect to $x_3$. Then, since the mass supercritical character of this equation, we construct orbitally stable solutions by adapting a suitable localized minimization problem. Finally, the stability of solitary waves is obtained.
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  Stability of Semilinear Elliptic Equations with Hénon Type Weighted Exponential Nonlinearity in Hyperbolic Space

  Xia HUANG, Chun-yi ZHAO

  应用数学学报(英文版). 2026, 42(1): 95-104. https://doi.org/10.1007/s10255-025-0040-7

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  This study delves into the Hénon-type weighted elliptic equation, given by $-\Delta_g u = (\sinh r)^\alpha e^u$, within the context of hyperbolic space $\mathbb{H}^n$, where $\alpha > 0$ and $n > 2$. Our research reveals notable distinctions in the stability of solutions when compared to the Euclidean case.
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  Two Nonmonotone Proximal Gradient Methods for Nonsmooth Optimization over the Stiefel Manifold

  Jin-chao ZHANG, Juan GAO, Ya-kui HUANG, Xin-wei LIU

  应用数学学报(英文版). 2026, 42(1): 105-120. https://doi.org/10.1007/s10255-024-1065-z

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  We propose two nonmonotone retraction-based proximal gradient methods for solving a class of nonconvex nonsmooth optimization problems over the Stiefel manifold. The proposed methods are equipped with the descent direction obtained by a proximal mapping restricted in tangent space of the manifold and the Barzilai-Borwein stepsizes determined by two recent iteration points and the corresponding descent directions. By employing, respectively, the Grippo-Lampariello-Lucidi nonmonotone line search strategy and the Dai-Fletcher nonmonotone line search strategy, our proposed methods are proved to be globally convergent. Analysis on the iteration complexity for obtaining an $\epsilon$-stationary solution is provided. Numerical results on the sparse principle component analysis problems demonstrate the efficiency of our methods.
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  Ergodicity of a Special Class of Markov Chains

  Xin-yu HU, Ping HE

  应用数学学报(英文版). 2026, 42(1): 121-133. https://doi.org/10.1007/s10255-024-1141-4

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  The paper focuses on the ergodicity of a $\phi$-irreducible Markov chain $\{X_{n},n\geq0\}$ that is generated iteratively through the expression $X_{n+1}=f(X_{n})+\epsilon_{n+1}$. Here, $\{\epsilon_n,n\geq1\}$ is a sequence of independent identically distributed centered random variables, $f(\cdot)$ is an $\mathbb{R}$-valued continuous function, and $X_{0}$ is arbitrary but independent of $\{\epsilon_{n},n\geq1\}$. Our main contribution is to provide necessary and sufficient conditions for the ergodicity of this special class of Markov chains. We also present a generalized approach for $f(\cdot)$ in the end.
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  Global Dynamics of a Delayed HIV-1 Infection Model with Cell-to-cell Transmission, Humoral Immunity and Immune Impairment

  Rui XU, An-li XUE, Chen-wei SONG

  应用数学学报(英文版). 2026, 42(1): 134-145. https://doi.org/10.1007/s10255-024-1063-1

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  In this paper, an HIV-1 infection model with intracellular delay, humoral immunity and immune impairment is investigated, in which both virus-to-cell infection and cell-to-cell transmission are considered. The basic reproduction ratio is calculated and the existence of feasible equilibria is established. By analyzing the distributions of roots of the corresponding characteristic equations, the local asymptotic stability of each of feasible equilibria is established. With the help of appropriate Lyapunov functionals and LaSalle's invariance principle, it is proved that if the basic reproduction ratio is less than unity, the infection-free equilibrium is globally asymptotically stable, and the virus is eventually eliminated; if the basic reproduction ratio is greater than unity, the chronic-infection equilibrium is globally asymptotically stable. Finally, numerical simulations are carried out to illustrate the effects of some parameters on HIV-1 infection dynamics.
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  Laguerre Series Expansion for Scale Functions and Its Applications in Risk Theory

  Jia-yi XIE, Zhen-yu CUI, Zhi-min ZHANG

  应用数学学报(英文版). 2026, 42(1): 146-162. https://doi.org/10.1007/s10255-024-1066-y

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  We propose an exact explicit closed-form Laguerre series expansion formula to compute the $q$-scale function of a spectrally negative Lévy process (SNLP), and other functions associated to the scale function for the first time. The proposed closed-form formula for the scale function has many applications in applied probability and in particular in the Lévy insurance risk theory. We shall show that the new series expansion formulas can be used to express the expected discounted penalty functions, the moments of the present value of total dividend payments as well as the time value of Parisian ruin in the Lévy risk models.
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  Local Regularity Criteria for the 3D Co-rotational Beris-Edwards System in Lorentz Spaces

  Zhong-bao ZUO

  应用数学学报(英文版). 2026, 42(1): 163-178. https://doi.org/10.1007/s10255-024-1068-9

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  In this paper, we present some new regularity criteria for suitable weak solutions to the 3D corotational Beris-Edwards system. First, we prove that suitable weak solutions are regular if the scaled $L^{p ; q}$-norm of the velocity field or gradient of velocity is small with $\frac{2}{p}+\frac{3}{q}=2,1＜p \leq \infty$. Next, we give $\varepsilon$-regularity criteria in terms of velocity field $\mathbf{u}$ and director field $\mathbf{Q}$ in Lorentz spaces, which extends the results obtained by Wang et al (J. Evol. Equ. 21: 1627-1650, 2021) for Navier-Stokes equations.
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  An Empirical Likelihood-based Portmanteau Test for the Autoregressive Model Regardless of Its Properties

  Xiao-hui LIU, Yu-zi LIU, Ya-wen FAN, Ling PENG

  应用数学学报(英文版). 2026, 42(1): 179-203. https://doi.org/10.1007/s10255-025-0043-4

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  Portmanteau tests have drawn much interest in economics and finance because of their strong relationship to model specification. The majority of current testing, however, concentrates on stationary time series. This article proposes an empirical likelihood-based portmanteau test for the autoregressive model, no matter if it is stationary, nearly integrated, or unit root, and with or without an intercept. It turns out that the final statistic is always asymptotically chi-squared distributed. A simulation study confirms the good finite sample performance of the proposed test before illustrating its practical merit in analyzing real data sets.
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  Global Existence and Blow up for Hyperbolic Coupled Systems with Internal Damping and Logarithmic Nonlinearities

  Yi-fei DAI, Zhi-fei ZHANG

  应用数学学报(英文版). 2026, 42(1): 204-228. https://doi.org/10.1007/s10255-025-0032-7

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  The initial boundary value problem of a class of coupled hyperbolic systems with logarithmic source terms is considered. In this article, we classify the initial data for the global existence, finite time blow-up and long time decay of the solution. By using potential well method combined with Sobolev embedding theorem, the sufficient initial conditions of global existence, asymptotic behavior, the upper and lower bounds of blow-up time are derived at low energy level $E(0) < d$. These results are extended in parallel to the critical case $E(0) = d$. Besides, with additional assumptions on initial data, the finite time blow up result is given with arbitrary positive initial energy $E(0) > 0$.
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  Energy Decay for a Nonlinear Wave Equation with p(x)-Laplacian Damping

  Meng-lan LIAO, Xiao-lei LI, Zayd HAJJEJ

  应用数学学报(英文版). 2026, 42(1): 229-239. https://doi.org/10.1007/s10255-025-0049-y

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  This paper is concerned with the energy decay rate of the total energy to a wave equation with $p(x)$-Laplacian damping (nonlinear strong damping) and nonlinear source. With some suitable restrictions on variable growth exponents $r(x)$ and $p(x)$, first, we prove that the local solution can be extended to exist globally. Second, by using suitable and weighted multiplier techniques, it is proved that the total energy decays logarithmically. The key and main difficulty is to give a prior estimate for the wighted integral $\int_{\Omega}\chi^{p(x)-1}(\tau)|\nabla u(\tau)|^{p(x)}dx$ by some differential inequality techniques. In the proof of energy decay, the traditional method to eliminate the lower-order terms by exploiting the unique continuation and compactness arguments is not needed in our energy decay estimate.
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  Solution of Static Bogomol'nyi-Prasad-Sommerfield Bimagnetic Monopoles

  Rui-feng ZHANG, Jing-shuang YANG

  应用数学学报(英文版). 2026, 42(1): 240-253. https://doi.org/10.1007/s10255-025-0077-7

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  In this paper, we study bimagnetic monopoles which are topological solitons in three space dimensions. We prove the existence and uniqueness of solution of a static and radially symmetric Bogomol'nyi-Prasad-Sommerfield (BPS) bimagnetic monopoles formulated and presented in a recent study of Bazeia, Marques and Menezes. Our method is based on a dynamical shooting approach depending on two shooting parameters which provides an effective framework for constructing the BPS equations in magnetic core and magnetic shell. Furthermore, we obtain the relation between the BPS and non-BPS monopoles solutions, and properties of static BPS monopoles solutions.
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  Analysis of Time-domain Elastic Obstacle Scattering Problems in Three Dimensions

  Guo-fang CHEN, Jia-hui GAO, Jun-liang LV

  应用数学学报(英文版). 2026, 42(1): 254-269. https://doi.org/10.1007/s10255-025-0078-6

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  A time-domain elastic scattering problem is considered in three dimensions. In problem setting, a rigid obstacle is immersed in an unbounded domain filled with homogeneous and isotropic elastic medium. In order to analyze the well-posedness of the target problem, we reduce the scattering problem into an initial boundary value problem in a bounded domain over a finite time interval by using a compressed coordinate transformation. The Galerkin method is adopted to prove the uniqueness results, and the energy method is used to prove the stability of the scattering problem. In addition, we derive a priori estimate with explicit time dependence.
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  The Path-Connectivity of Hierarchical Cubic Networks

  Ruo-xuan LI, Rong-xia HAO, Zhen HE, Young Soo KWON

  应用数学学报(英文版). 2026, 42(1): 270-284. https://doi.org/10.1007/s10255-024-1138-z

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  Let $G$ be a simple connected graph with vertex set $V(G)$. For $S \subseteq V(G)$, let $\pi_G(S)$ denote the maximum cardinality of internally disjoint $S$-paths in $G$. For an integer $k$ with $k\ge 2$, the $k$-path-connectivity $\pi_k(G)$ is defined as the minimum $\pi_G(S)$ over all $k$-subsets $S$ of $V(G)$. It is proved that deciding whether $\pi_G(S) \ge r$ is NP-complete problem [Graphs Combin. 37 (2021) 2521-2533]. The hypercube $Q_n$ is the famous Cayley graph, which is widely studied in the research of developing multiprocessor systems. The hierarchical cubic network $HCN_n$ is given in [IEEE TPDS 6 (1995) 427-435] which takes $Q_n$ as building clusters and emulates the desirable properties very efficiently. In this paper, we consider the $3$-path-connectivity of $HCN_n$ and prove that $\pi_3(HCN_n)=\lfloor \frac{3n+2}{4} \rfloor$ for $n \ge 2$ by constructing multiple internally disjoint $S$-paths. This result improves the $3$-tree-connectivity [Discrete Appl. Math. 322 (2022) 203-209] from trees to paths.
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  Propagation Dynamics of Nonlocal Dispersal Cooperative Systems in Shifting Environment

  Biao LIU, Wan-tong LI, Wen-bing XU

  应用数学学报(英文版). 2026, 42(1): 285-312. https://doi.org/10.1007/s10255-025-0085-7

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  This paper investigates the propagation dynamics of nonlocal dispersal cooperative systems within a shifting environment characterized by a contracting favorable region. We examine two distinct types of dispersal kernels. For thin-tailed kernels, we study the existence, uniqueness, and stability of forced waves using upper and lower solutions, the sliding method, and the dynamical systems approach. In the case of partially heavy-tailed kernels, considering compactly supported initial value functions, we demonstrate that for each species, the right side of the level sets exhibits accelerated rightward propagation, while transferability occurs. Conversely, the propagation on the left side does not move leftward but rather rightward, with a spreading speed equivalent to that of the shifting environment. Consequently, species with thin-tailed kernels inherently persist in a shifting habitat, provided they are part of a cooperative and irreducible system that includes at least one species with a heavy-tailed kernel, regardless of the magnitude of the shifting environment's speed. This behavior markedly diverges from the dynamics observed in scalar equations.
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  Continuity of Periodic Solutions for a Class of Kolmogorov Systems in Coefficient Functions

  Gang MENG, Yi-fei WANG, Zhe ZHOU

  应用数学学报(英文版). 2026, 42(1): 313-322. https://doi.org/10.1007/s10255-025-0039-0

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  In this paper, we consider a model which is derived from a class of the $2$-dimensional Kolmogorov systems. Our purpose is to investigate the continuity of periodic solutions for this model in coefficient functions with respect to weak topologies. Finally, we provide an example as an application to Lotka-Volterra systems.
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  Meromorphic Solutions to Higher Order Nonlinear Delay Differential Equations

  Ye-zhou LI, Ming-yue WU, He-qing SUN

  应用数学学报(英文版). 2026, 42(1): 323-336. https://doi.org/10.1007/s10255-024-1098-3

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  Let $w(z)$ be non-rational meromorphic solutions with hyper-order less than $1$ to a family of higher order nonlinear delay differential equations \begin{align*} w(z+1)w(z-1)+a(z)\frac{w^{(k)}(z)}{w(z)}=R(z,w(z)), \qquad k\in\mathbb{N^{+}}, \end{align*} where $a(z)$ is rational, $R(z,w(z))=\frac{P(z,w(z))}{Q(z,w(z))}$ is an irreducible rational function in $w$ with rational coefficients in $z$. This paper mainly show the relationships of the degree of $P(z,w(z))$ and $Q(z,w(z))$ when the above equations exist such solutions $w(z)$. There are also some examples to show that our results are sharp.