Dec 2019, Volume 14 Issue 6

    

• Select all

• RESEARCH ARTICLE

  Improved global algorithms for maximal eigenpair

  Mu-Fa CHEN, Yue-Shuang LI

  2019, 14(6): 1077-1116. https://doi.org/10.1007/s11464-019-0799-z

  Download PDF

  This paper is a continuation of our previous paper [Front. Math. China, 2017, 12(5): 1023{1043] where global algorithms for computing the maximal eigenpair were introduced in a rather general setup. The efficiency of the global algorithms is improved in this paper in terms of a good use of power iteration and two quasi-symmetric techniques. Finally, the new algorithms are applied to Hua's economic optimization model.

• RESEARCH ARTICLE

  Matchings extend to Hamiltonian cycles in hypercubes with faulty edges

  Xie-Bin CHEN

  2019, 14(6): 1117-1132. https://doi.org/10.1007/s11464-019-0810-8

  Download PDF

  We consider the problem of existence of a Hamiltonian cycle containing a matching and avoiding some edges in an n-cube {{\displaystyle Q}}_n, and obtain the following results. Let n\ge \mathrm{3},\hspace{0.17em}M\subset E({{\displaystyle Q}}_n), and F\subset E({{\displaystyle Q}}_n)\backslash M with \mathrm{1}\le \left|F\right|\le \mathrm{2}n-\mathrm{4}-\left|M\right|. If M is a matching and every vertex is incident with at least two edges in the graph {{\displaystyle Q}}_n-F, then all edges of M lie on a Hamiltonian cycle in {{\displaystyle Q}}_n-F. Moreover, if \left|M\right|=\mathrm{1} or \left|M\right|=\mathrm{2}, then the upper bound of number of faulty edges tolerated is sharp. Our results generalize the well-known result for \left|M\right|=\mathrm{1}.

• RESEARCH ARTICLE

  Weak and smooth solutions to incompressible Navier-Stokes-Landau-Lifshitz-Maxwell equations

  Boling GUO, Fengxia LIU

  2019, 14(6): 1133-1161. https://doi.org/10.1007/s11464-019-0800-x

  Download PDF

  Considering the Navier-Stokes-Landau-Lifshitz-Maxwell equations, in dimensions two and three, we use Galerkin method to prove the existence of weak solution. Then combine the a priori estimates and induction technique, we obtain the existence of smooth solution.

• RESEARCH ARTICLE

  Global weak solutions to Landau-Lifshitz equations into compact Lie algebras

  Zonglin JIA, Youde WANG

  2019, 14(6): 1163-1196. https://doi.org/10.1007/s11464-019-0803-7

  Download PDF

  We consider a parabolic system from a bounded domain in a Euclidean space or a closed Riemannian manifold into a unit sphere in a compact Lie algebra g; which can be viewed as the extension of Landau-Lifshitz (LL) equation and was proposed by V. Arnold. We follow the ideas taken from the work by the second author to show the existence of global weak solutions to the Cauchy problems of such LL equations from an n-dimensional closed Riemannian manifold T or a bounded domain in {ℝ}^n into a unit sphere {{\displaystyle S}}_g(\mathrm{1}) in g. In particular, we consider the Hamiltonian system associated with the nonlocal energy-micromagnetic energy defined on a bounded domain of {ℝ}^{\mathrm{3}} and show the initial-boundary value problem to such LL equation without damping terms admits a global weak solution. The key ingredient of this article consists of the choices of test functions and approximate equations.

• RESEARCH ARTICLE

  On 4-order Schrödinger operator and Beam operator

  Dan LI, Junfeng LI

  2019, 14(6): 1197-1211. https://doi.org/10.1007/s11464-019-0804-6

  Download PDF

  We show that there is no localization for the 4-order Schrödinger operator {{\displaystyle \mathcal{S}}}_{t,\mathrm{4}}f and Beam operator {{\displaystyle B}}_{t}f, more precisely, on the one hand, we show that the 4-order Schrödinger operator {{\displaystyle S}}_{t,\mathrm{4}}f does not converge pointwise to zero as t\to \mathrm{0} provided f\in H^s(ℝ) with compact support and 0<s<1/4 by constructing a counterexample in ℝ. On the other hand, we show that the Beam operator Btf also has the same property with the 4-order Schrödinger operator {{\displaystyle \mathcal{S}}}_{t,\mathrm{4}}f. Hence, we find that the Hausdorff dimension of the divergence set for {{\displaystyle \mathcal{S}}}_{t,\mathrm{4}}f and {{\displaystyle B}}_{t}f is {{\displaystyle \alpha }}_{\mathrm{1},{{\displaystyle S}}_{\mathrm{4}}}(s)={{\displaystyle \alpha }}_{\mathrm{1},B}(s)=\mathrm{1} as 0<s<1/4.

• RESEARCH ARTICLE

  Minimal least eigenvalue of connected graphs of order n and size m = n + k (5≤k≤8)

  Xin LI, Jiming GUO, Zhiwen WANG

  2019, 14(6): 1213-1230. https://doi.org/10.1007/s11464-019-0805-5

  Download PDF

  The least eigenvalue of a connected graph is the least eigenvalue of its adjacency matrix. We characterize the connected graphs of order n and size n + k (5≤k≤8 and n>k + 5) with the minimal least eigenvalue.

• RESEARCH ARTICLE

  Normalized integral table algebras generated by a faithful real element of degree 2 and having 4 linear elements

  Yu LI, Guiyun CHEN

  2019, 14(6): 1231-1258. https://doi.org/10.1007/s11464-019-0809-1

  Download PDF

  We completely classify the normalized integral table algebra (A, B) generated by a faithful real element of degree 2 and having four linear elements.

• RESEARCH ARTICLE

  Critical survival barrier for branching random walk

  Jingning LIU, Mei ZHANG

  2019, 14(6): 1259-1280. https://doi.org/10.1007/s11464-019-0806-4

  Download PDF

  We consider a branching random walk with an absorbing barrier, where the associated one-dimensional random walk is in the domain of attraction of an α-stable law. We shall prove that there is a barrier and a critical value such that the process dies under the critical barrier, and survives above it. This generalizes previous result in the case that the associated random walk has finite variance.

• RESEARCH ARTICLE

  Least squares estimator of Ornstein-Uhlenbeck processes driven by fractional Lévy processes with periodic mean

  Guangjun SHEN, Qian YU, Yunmeng LI

  2019, 14(6): 1281-1302. https://doi.org/10.1007/s11464-019-0801-9

  Download PDF

  We deal with the least squares estimator for the drift parameters of an Ornstein-Uhlenbeck process with periodic mean function driven by fractional Lévy process. For this estimator, we obtain consistency and the asymptotic distribution. Compared with fractional Ornstein-Uhlenbeck and Ornstein-Uhlenbeck driven by Lévy process, they can be regarded both as a Lévy generalization of fractional Brownian motion and a fractional generaliza- tion of Lévy process.

• RESEARCH ARTICLE

  Generalization of Erdős-Kac theorem

  Yalin SUN, Lizhen WU

  2019, 14(6): 1303-1316. https://doi.org/10.1007/s11464-019-0808-2

  Download PDF

  Let ω(n) is the number of distinct prime factors of the natural number n,we consider two cases where \ell is even and odd natural numbers, and then we prove a more general form of the classical Erdős-Kac theorem.

• RESEARCH ARTICLE

  Nash inequality for diffusion processes associated with Dirichlet distributions

  Feng-Yu WANG, Weiwei ZHANG

  2019, 14(6): 1317-1338. https://doi.org/10.1007/s11464-019-0807-3

  Download PDF

  For any N\ge \mathrm{2} and \alpha ={(\alpha }_1,\mathrm{...},{\alpha }_{N+1})\in {(0,\infty )}^{N+1}, let {\mu }_{\alpha }^{(N)} be the Dirichlet distribution with parameter α on the set {\mathrm{\Delta }}^{(N)}:={\{x\in [0,1]}^N:{\displaystyle {\sum }_{\mathrm{1}\le i\le N}}{x}_i\le \mathrm{1}\}. The multivariate Dirichlet diffusion is associated with the Dirichlet form

  {\mathcal{E}}_{\alpha }^{(N)}(f,f):={\displaystyle \sum _{n=\mathrm{1}}^N}{\displaystyle {\int }_{{\mathrm{\Delta }}^{(N)}}}(\mathrm{1}-{\displaystyle \sum _{\mathrm{1}\le i\le N}}{x}_i)x_n{({\partial }_{n}f)}^{\mathrm{2}}(x){\mu }_{\alpha }^{(N)}(\mathrm{d}x)

  with Domain \mathcal{D}({\mathcal{E}}_{\alpha }^{(N)}) being the closure of {C^1(\mathrm{\Delta }}^{(N)}). We prove the Nash inequality

  {\mu }_{\alpha }^{(N)}(f^{\mathrm{2}})\le C{\mathcal{E}}_{\alpha }^{(N)}{(f,f)}^{p/(p+\mathrm{1})}{\mu }_{\alpha }^{(N)}{(|f|)}^{\mathrm{2}/(p+\mathrm{1})},\mathrm{\hspace{0.17em}}f\in \mathcal{D}({\mathcal{E}}_{\alpha }^{(N)}),{\mu }_{\alpha }^{(N)}(f)=0,

  for some constant C>0 and p={({\alpha }_{N+\mathrm{1}}-\mathrm{1})}^{+}+{\displaystyle {\sum }_{i=\mathrm{1}}^N\mathrm{1}}\vee (\mathrm{2}{\alpha }_i), where the constant p is sharp when {\max }_{\mathrm{1}\le i\le N}\mathrm{\hspace{0.17em}}{\alpha }_i\le 1/2 and {\alpha }_{N+\mathrm{1}}\ge \mathrm{1}. This Nash inequality also holds for the corresponding Fleming-Viot process.

• RESEARCH ARTICLE

  Determination of generalized exact boundary synchronization matrix for a coupled system of wave equations

  Yanyan WANG

  2019, 14(6): 1339-1352. https://doi.org/10.1007/s11464-019-0798-0

  Download PDF

  For a coupled system of wave equations with Dirichlet boundary controls, this paper deals with the possible choice of its generalized synchronization matrices so that the admissible generalized exact boundary synchronizations for this system are obtained.

• RESEARCH ARTICLE

  Constructing super D-Kaup-Newell hierarchy and its nonlinear integrable coupling with self-consistent sources

  Hanyu WEI, Tiecheng XIA

  2019, 14(6): 1353-1366. https://doi.org/10.1007/s11464-019-0802-8

  Download PDF

  How to construct new super integrable equation hierarchy is an important problem. In this paper, a new Lax pair is proposed and the super D-Kaup-Newell hierarchy is generated, then a nonlinear integrable coupling of the super D-Kaup-Newell hierarchy is constructed. The super Hamiltonian structures of coupling equation hierarchy is derived with the aid of the super variational identity. Finally, the self-consistent sources of super integrable coupling hierarchy is established. It is indicated that this method is a straight- forward and efficient way to construct the super integrable equation hierarchy.

• RESEARCH ARTICLE

  Regular automorphisms of order p²

  Tao XU, Heguo LIU

  2019, 14(6): 1367-1373. https://doi.org/10.1007/s11464-019-0790-8

  Download PDF

  Let G be a group, and let α be a regular automorphism of order p² of G, where p is a prime. If G is polycyclic-by-finite and the map ϕ : G →G defined by g^ϕ= [g,α] is surjective, then G is soluble. If G is polycyclic, then C_G(α^p) and G/[G,α^p] are both nilpotent-by-finite.