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The Schödinger Uncertainty Relation in the Fock-Type Spaces Li Wenxin,Lian Pan,Liang Yuxia Acta mathematica scientia,Series A    2023, 43 (5): 1321-1332.   Abstract （230）   HTML （20）    PDF（pc） （660KB）（465）       Save In this paper, the Schödinger uncertainty relation for the unilateral weighted shift operators on Fock space is established, and the explicit expression when the equality attained is given, which further extends the Heisenberg uncertainty relation on Fock space established in [4] and overcomes the difficulty in [16]. In addition, we generalize the uncertainty relation to the multiple operators case. A new uncertainty inequality in the form of non-self adjoint operators is obtained as well. Reference | Related Articles | Metrics

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An Extension of Minkowski Formulae for Free Boundary Hypersurfaces in a Ball Sheng Weimin, Wang Yinhang Acta mathematica scientia,Series A    2023, 43 (6): 1641-1648.   Abstract （186）   HTML （18）    PDF（pc） （508KB）（364）       Save In this article, we prove a generalization of Hsiung-Minkowski formula for free boundary hypersurfaces in a ball in space forms. As corollaries, we obtain some Alexandrov-type results. Table and Figures | Reference | Related Articles | Metrics

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Robust Accessible Hyperbolic Repelling Sets Xiao Jianrong Acta mathematica scientia,Series A    2024, 44 (1): 1-11.   Abstract （183）   HTML （11）    PDF（pc） （800KB）（291）       Save By operating Denjoy like surgery on a piecewise linear map, we constructed a family of$C^1$maps$f_\alpha \ (1<\alpha<3 )$admitting the following properties: 1)$f_\alpha$admits a hyperbolic repelling Cantor set$\mathcal{A}_\alpha$with positive Lebesgue measure, and$\mathcal{A}_\alpha$is also a wild attractor of$f_{\alpha}$; 2) The attractor$\mathcal{A}_\alpha$is accessible: the difference set$\mathbb{B}(A_\alpha)\backslash A_\alpha$between the basin of attraction$\mathbb{B}(A_\alpha)$and$A_\alpha$has positive Lebesgue measure; 3) The family is structurally stable:$f_{\alpha}$is topologically conjugate to$f_{\alpha'}$for all$1<\alpha,\ \alpha'<3$. The surgery involves blowing up the discontinuity and its preimages set into open intervals. The$C^1$smoothness of$f_{\alpha}$is ensured by the prescribed lengths of glued intervals and the maps defined on the glued intervals. Table and Figures | Reference | Related Articles | Metrics

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Uncertainty Principles of Fractional Fourier Transform Zhou Yue, Yang Yan Acta mathematica scientia,Series A    2024, 44 (2): 257-264.   Abstract （151）   HTML （10）    PDF（pc） （564KB）（137）       Save Referring to the properties of Fourier transform, the authors find the uncertainty principle of discrete fractional Fourier transform and uncertainty principle of continuous fractional Fourier transform under Lebesgue measure, which makes the uncertainty principles of fractional Fourier transform more general. Table and Figures | Reference | Related Articles | Metrics

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Hankel Operators on Vector-Valued Bergman Space with Exponential Type Weights Dong Jianxiang Acta mathematica scientia,Series A    2024, 44 (3): 513-524.   Abstract （113）   HTML （10）    PDF（pc） （747KB）（110）       Save In this paper, we study some characterizations of Hankel operators on vector-valued exponential type weights Bergman spaces $A^{2}_{\varphi}(\mathcal{H})$ induced by operator-valued function symbols and co-analytic operator-valued function symbols. Main results including the boundedness and compactness of Hankel operators. Reference | Related Articles | Metrics

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On the Blow-Up Solutions of Inhomogeneous Nonlinear Schrödinger Equation with a Partial Confinement Jian Hui, Gong Min, Wang Li Acta mathematica scientia,Series A    2023, 43 (5): 1350-1372.   Abstract （111）   HTML （5）    PDF（pc） （797KB）（363）       Save This paper is devoted to the Cauchy problem of inhomogeneous nonlinear Schrödinger equation in the presence of a partial confinement, which is an important model in Bose-Einstein condensates. Combining the variational characterization of the ground state of a nonlinear elliptic equation and the conservations of mass and energy, we first obtain a global solution and show the existence of blow-up solutions for some special initial data by scaling techniques. Then, we study the $L^2$-concentration phenomenon for the blow-up solutions. Finally, we apply the variational arguments connected to the above ground state to investigate the dynamics of $L^2$-minimal blow-up solutions, i.e., the limiting profile, mass-concentration and blow-up rate of the blow-up solutions with minimal mass. We extend the global existence and blow-up results of Zhang[34] to the case of inhomogeneous nonlinearities and improve partial results of Pan and Zhang[23] to space dimensions $N\geq2$ in the inhomogeneous case. Reference | Related Articles | Metrics

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The Reproducing Kernel of Bergman Space and the Eigenvectors of Toeplitz Operator Ding Xuanhao,Hou Lin,Li Yongning Acta mathematica scientia,Series A    2023, 43 (5): 1333-1340.   Abstract （109）   HTML （5）    PDF（pc） （614KB）（193）       Save In the Bergman space, it is well-known that $ T_{\varphi}K_{z}=\varphi(z)K_{z} $ for $ \varphi\in \overline{H^{\infty}} $, that is, $ K_{z} $ is the eigenvector of $ T_{\varphi} $ corresponding the eigenvalue $ \varphi(z) $, where $ K_{z} $ is the reproducing kernel of Bergman space. Conversely, if $ \varphi $ is a bounded harmonic function and if there is $ z\in \mathbb{D} $ (or for every $ z\in\mathbb{D} $), $ K_{z} $ is a eigenvector of $ T_{\varphi} $, whether there must be $ \varphi\in \overline{H^{\infty}} $ ? In view of the above questions, in this paper we give a complete characterization of the Toeplitz operator with the bounded harmonic symbol which have the reproducing kernels $ K_{z} $ as their eigenvectors. Moreover, we partially describe the Toeplitz operators with the bounded harmonic symbol whose eigenvalues are all $ \varphi(z) (z\in \mathbb{D}) $. Reference | Related Articles | Metrics

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On Second Order Complex Differential Equations with Coefficients of Period $ {2\pi{\rm i}}$ Zhang Jie,Zhao Donghai Acta mathematica scientia,Series A    2023, 43 (5): 1382-1390.   Abstract （107）   HTML （10）    PDF（pc） （633KB）（266）       Save This paper mainly learned classic book `Nevanlinna theory and complex differential equations' due to Laine and considered the second order complex differential equation $f ''(z) + A (z) f(z)=0, \lambda(f)<\infty$ with coefficient $A (z) $ whose period is $2 \pi{\rm i}$. It found a possible error in the original proof and gave its partial correction, and also it gave a slightly weaker conclusion than its possibly controversial result in the original literature. Reference | Related Articles | Metrics

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The Fine Pseudo-spectra of$2 \times 2$Diagonal Block Operator Matrices Shen Runshuan, Hou Guolin Acta mathematica scientia,Series A    2024, 44 (1): 12-25.   Abstract （102）   HTML （1）    PDF（pc） （557KB）（174）       Save Let$A$,$B$be densely closed linear operators in a separable Hilbert space$X$and$M_{0}=\left( \begin{array} {cc}{A} & {0}\\ {0}& {B} \end{array} \right)$be the corresponding$2\times2$block operator matrices. In this paper, we establish the fine pseudo-spectra of$M_{0}$including the pseudo-point spectrum, the pseudo-residual spectrum, and the pseudo-continuous spectrum under diagonal perturbation, which are, respectively, compared with its point spectrum, residual spectrum, and continuous spectrum. And a concrete example is constructed to justify the proved result. Finally, we obtain the pseudo-point spectrum of$M_{0}$under the upper-triangular perturbation by using the technology of space decomposition. Reference | Related Articles | Metrics

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The Discrete Series of Affine Symmetric Space ${SO^\ast(6)/SO(3,\mathbb{C})}$ Lan Chao, Fan Xingya Acta mathematica scientia,Series A    2023, 43 (6): 1649-1658.   Abstract （91）   HTML （9）    PDF（pc） （594KB）（108）       Save In this paper, the partial discrete sequence of $SO^\ast(6)/SO(3,\mathbb{C})$ is obtained by local isomorphism of Hermite-type affine symmetric space, and the specific form of the holomorphic discrete sequence generated by the cyclic vector is given. Reference | Related Articles | Metrics

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Multi-Scale Approach for Diffeomorphic Multi-Modality Image Registration Ding Zijuan,Han Huan Acta mathematica scientia,Series A    2023, 43 (5): 1620-1640.   Abstract （85）   HTML （6）    PDF（pc） （2647KB）（247）       Save Multi-modality image registration is widely used in remote sensing, clinical medicine and other fields. Many models for multi-modality image registration have been proposed in the past few decades. Concerning this problem, there are two major challenges: (1) the existence of physical mesh folding; (2) the ill-posedness of similarity measure minimization/maximization problem. In order to address those problems, a multi-scale approach for diffeomorphic image registration based on Rényi's statistical dependence measure is proposed, which can avoid estimating joint probability density function, and obtain a smooth minimizer of the energy functional without mesh folding and prior regularization. In addition, the existence of solution for the proposed model and the convergence of the multi-scale approach are proved. And numerical experiments are performed to show the efficiency of the proposed algorithm in the monomodality image registration and multi-modality image registration. Table and Figures | Reference | Related Articles | Metrics

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Time Decay Rate for Large-Solution About 3D Compressible MHD Equations Chen Fei,Wang Shuai,Zhao Yongye,Wang Chuanbao Acta mathematica scientia,Series A    2023, 43 (5): 1397-1408.   Abstract （84）   HTML （4）    PDF（pc） （697KB）（359）       Save This paper focus on time decay rate for large-solution about compressible magnetohydrodynamic equations in $\mathbb{R}^3$. Provided that $(\sigma_{0}-1,u_{0},M_{0})\in L^1\cap H^2$, based on the work of Chen et al.[1], $\|\nabla(\sigma-1,u,M)\|_{H^1}\leqslant C(1+t)^{-\frac{5}{4}}$ is obtained in reference [2], obviously, time decay rate of the 2nd-order derivative of the solution in [2] is not ideal. Here, we improve that of $\|\nabla^2 (\sigma-1,u,M)\|_{L^2}$ to be $(1+t)^{-\frac{7}{4}}$ by the frequency decomposition method[3]. Reference | Related Articles | Metrics

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A Vanishing Theorem for$p$-harmonic$\ell$-forms in Space with Constant Curvature Zhang Youhua Acta mathematica scientia,Series A    2024, 44 (1): 26-36.   Abstract （84）   HTML （1）    PDF（pc） （551KB）（150）       Save Let$M^{n}(n \geq 3)$be a complete non-compact submanifold immersed in a space with constant curvature$N^{n+m}(c)$with flat normal bundle. By using Bochner-Weitzenböck formula, Sobolev inequality, Moser iteration and Fatou lemma, we prove that every$L^{\beta}~p$-harmonic forms on$M$is trivial if$M^{n}$satisfies some geometic conditions, where$\beta\geq p\geq 2$. Reference | Related Articles | Metrics

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$q$-Ramanujan Asymptotic Formula and $q$-Ramanujan $R$-function Bao Qi, Wang Miaokun, Chu Yuming Acta mathematica scientia,Series A    2023, 43 (6): 1659-1666.   Abstract （82）   HTML （3）    PDF（pc） （530KB）（210）       Save In this paper, the Ramanujan asymptotic formula of the Gaussian hypergeometric function $_{2}F_{1}$ and its related Ramanujan $R$-function will be generalized to the case of basic hypergeometric series $_{2}\phi_{1}$. On the one hand, we shall present the $q$-Ramanujan asymptotic formula of $_{2}\phi_{1}$ and introduce the $q$-Ramanujan $R$-function; on the other hand, we shall mainly study the $q$-Ramanujan $R$-function, and prove some analytical properties of the $q$-Ramanujan $R$-function including series expansions, complete monotonicity property and monotonicity property with respect to the parameter $q$. As applications, several sharp inequalities for the $q$-Ramanujan $R$-function will be derived. Reference | Related Articles | Metrics

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Existence of Positive Solutions for a Class of Schrödinger-Newton Systems with Critical Exponent Cheng Qingfang,Liao Jiafeng,Yuan Yanxiang Acta mathematica scientia,Series A    2023, 43 (5): 1373-1381.   Abstract （80）   HTML （5）    PDF（pc） （629KB）（326）       Save In this paper, we study the existence of positive solutions for a class of Schrödinger-Newton system with critical exponents on bounded domain, and obtain two positive solutions by the variational method. Reference | Related Articles | Metrics

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Some Reverse Bonnesen-style Inequalities in $n$-Dimensional Euclidean Space $\mathbb{R} ^n$ Wang Hejun Acta mathematica scientia,Series A    2023, 43 (4): 985-993.   Abstract （77）   HTML （3）    PDF（pc） （320KB）（103）       Save This paper mainly studies reverse Bonnesen-style inequalities in $n$-dimensional Euclidean space $\mathbb{R} ^n$. By the Urysohn inequality, the dual isoperimetric inequality, mean width and mean intersection area, some new reverse Bonnesen-style inequalities for general convex bodies are obtained in $\mathbb{R} ^n$. Reference | Related Articles | Metrics

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Survival Analysis of an SVIR Epidemic Model with Media Coverage Li Dan,Wei Fengying,Mao Xuerong Acta mathematica scientia,Series A    2023, 43 (5): 1595-1606.   Abstract （74）   HTML （3）    PDF（pc） （1602KB）（310）       Save We consider the long-term properties of a stochastic SVIR epidemic model with media coverage and the logistic growth in this paper. We firstly derive the fitness of a unique global positive solution. Then we construct appropriate Lyapunov functions and obtain the existence of ergodic stationary distribution when ${R}_{0}^{s}>1$ is valid, and also derive sufficient conditions for persistence in the mean. Moreover, the exponential extinction to the density of the infected is figured out when ${R}_{0}^{e}<1$ holds. Table and Figures | Reference | Related Articles | Metrics

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Comparison on the Criticality Parameters for Two Supercritical Branching Processes in Random Environments Fan Xiequan,Hu Haijuan,Wu Hao,Ye Yinna Acta mathematica scientia,Series A    2023, 43 (5): 1440-1470.   Abstract （73）   HTML （4）    PDF（pc） （839KB）（252）       Save Let $\{Z_{1,n}, n\geq 0\}$ and $\{Z_{2,n}, n\geq 0\}$ be two supercritical branching processes in different random environments, with criticality parameters $\mu_1$ and $\mu_2$ respectively. It is known that with certain conditions, $\frac{1}{n} \ln Z_{1,n} \rightarrow \mu_1$ and $\frac{1}{m} \ln Z_{2,m} \rightarrow \mu_2$ in probability as $m, n \rightarrow \infty.$ In this paper, we are interested in the comparison on the two criticality parameters, which can be regarded as two-sample $U$-statistic. To this end, we prove a non-uniform Berry-Esseen's bound and Cramér's moderate deviations for $\frac{1}{n} \ln Z_{1,n} - \frac{1}{m} \ln Z_{2,m}$ as $m, n \rightarrow \infty.$ An application is also given for constructing confidence intervals of $\mu_1-\mu_2$. Reference | Related Articles | Metrics

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On Symmetry of the Product of Two Higher-Order Regular Quasi-Differential Operators Xiang Yanyu, Wang Aiping Acta mathematica scientia,Series A    2024, 44 (2): 265-275.   Abstract （73）   HTML （3）    PDF（pc） （553KB）（47）       Save The symmetric realizations of the product of two general regular quasi-differential expressions in Hilbert space are investigated. The two-point boundary conditions which determine symmetric operators are characterized and a sufficient and necessary condition for the product of two higher-order regular differential operators to be symmetric is obtained. The presented result contains the self-adjoint do-main characterization as a special case. Several examples of regular symmetric product operators are given. Reference | Related Articles | Metrics

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An Effective Fourier Spectral Approximation for Fourth-Order Eigenvalue Problems with Periodic Boundary Conditions He Ya, An Jing Acta mathematica scientia,Series A    2024, 44 (1): 37-49.   Abstract （72）   HTML （0）    PDF（pc） （624KB）（164）       Save In this paper, we put forward an effective Fourier spectral approximation method for fourth-order eigenvalue problems with periodic boundary conditions. Firstly, we introduce the appropriate Sobolev space and the corresponding approximation space according to the periodic boundary conditions, establish a weak form of the original problem and its discrete form, and derive the equivalent operator form. Then we define an orthogonal projection operator and prove its approximation properties. Combined with the spectral theory of compact operators, we prove the error estimates of approximation eigenvalues. In addition, we construct a set of basis functions of the approximation space, and derive the matrix form based on tensor product associated with the discrete scheme. Finally, we provide some numerical examples, and the numerical results show our algorithm is effective and spectral accuracy. Table and Figures | Reference | Related Articles | Metrics