Three-qubit海森堡XYZ各向异性自旋链系统QMA熵不确定度的量子调控

本文研究了three-qubit海森堡XYZ各向异性自旋链系统各项参数和外加磁场对量子存储支撑(Quantum memory assisted,QMA)熵不确定度及其下限的调控行为,以及对被测系统与存储系统之间量子纠缠的影响.结果表明:增大系统的Dzyaloshinski-Moriya(DM)相互作用强度、降低系统温度、增大沿Z正方向磁场强度可以提高被测系统与存储系统之间的量子纠缠,降低系统QMA熵不确定度及其下限,被测系统与存储系统之间的量子纠缠与QMA熵不确定度及其下限呈类反相关.

乘积∏_(k=1)~n(ak^2+bk+c)的平方性

本文证明了乘积∏_(k=1)~n(ak^2+6k+c)(f(x)=ax^2+bx+c∈Z[x]是二次不可约多项式)在n充分大时不是平方数.

二阶滞后型微分方程解的有界性与平方可积性

首先得到了一类含滞后变元的积分不等式的解 ,然后考虑二阶非线性微分方程(r(t)x′(t) )′ +[a(t) +b(t) ]x(t) =f[t,x(t) ,x( φ(t) ) ],假设它的解存在 ,文中得到了解的有界性与平方可积性的两个结论 .

二阶非齐次泛函微分方程解的平方可积性与有界性

通过构造辅助泛函，得到了保证二阶非齐次泛函微分方程（ｒ（ｔ）ｘ′（ｔ））′＋ｐ（ｔ）ｘ′（ｔ）＋ｑ１（ｔ）ｘ（ｔ）＋ｑ２（ｔ）ｘ（ｈ（ｔ））＝ｆ（ｔ）所有解均平方可积与有界的充分条件。

一类N阶常微分方程解的平方可积性与有界性

本文考虑ｎ阶微分方程：（ｒ（ｔ）ｙ（ｎ－１））’＋ｎ－２∑ｉ＝０ａｉ（ｔ）ｙ（ｉ）＝ｆ（ｔ，ｙ）借助积分不等式，得到了该方程的所有解属于 Ｌ２［０，∞）及有界的充分条件．

二阶非齐次微分方程解的平方可积性与有界性

本文借助于一类带有参数 m,n∈ R的辅助函数，得到了二阶非齐次线性微分方程 (r(t)x′ )′＋ p(t)x′＋ [q1(t)＋ q2(t)]x=f(t) 的所有解均平方可积及所有解都有界的判定准则。所得结果改进和推广了现有的许多判定准则。

非线性时滞微分方程解的平方可积性与有界性

借助于积分不等式,研究了一类n阶非线性时滞微分方程的解的平方可积性与有界性,所得的结论推广和改进了已有的结果.

平方可对角化矩阵的刻划

本文刻划了平方可对角化矩阵、实性平方可对角化矩阵，并改正了文[1]证明中的一个失误．

二阶非齐次时滞微分方程解的平方可积性与有界性

借助于辅助泛函,得到了二阶非齐次非线性时滞微分方程(r(t)x′(t))′+p(t)x′(t)+q1(t)x(t)+q2(t)x(h(t))=f(t,x(t))

二阶非齐次线性微分方程解的平方可积性与有界性

本文借助于辅助函数，得到了二阶非齐次线性微分方程所有解均平方可积及所有解都有界的判定准则．

一类二阶泛函微分方程解的平方可积性和有界性

讨论了二阶泛函微分方程x(″t)+p(t)x(′t)+q1(t)x(t)+q2(t)x(t-τ)=f(t)通过构造一类泛函,借助于两个重要不等式建立了其属于L.S或L.S∩L.C(L.S表示解有界,L.C表示平方可积)的充分条件.

A Fast Method to Compute the Inertia of Bezout Matrix and Its Application

In this paper, we present a fast and fraction free procedure for computing the inertia of Bezout matrix and we can determine the numbers of different real roots and different pairs of conjugate complex roots of a polynomial equation with integer coefficients quickly based on this result.

多角度理解绝对值的概念

绝对值是中学数学中一个非常重要的概念．从绝对值的两种意义、绝对值的教材处理、绝对值的逻辑分析、绝对值的广泛应用、绝对值的解题策略等多个角度思考绝对值概念的理解．

二阶泛函微分方程属于L.S或L.C的判定

通过构造一类泛函,借助于两个重要不等式,讨论了方程(r(t)x′(t))+′p(t)x(′t)+q1(t)x(t)+q2(t)x(h(t))=f(t),建立了其属于L.C或L.C∩L.S的充分条件.

Study on rate azimuth platform inertial navigation system

The cost of the gravity passive inertial navigation system will be lower witha rate azimuth platform and gravity sensor constituting a gravity measurement and navigationsystem. According to the system performance characteristics, we study the rate azimuth platforminertial navigation system (RAPINS), give the system navigation algorithm, error equations of theattitude, velocity and position of the rate azimuth platform, and random error models of theaccelerometer and gyro. Using the MATLAB/Simulink tools, we study the RAPINS and RAPINS withvelocity damping. Simulation results demonstrate that the RAPINS with velocity damping has smallerrors in platform attitude and position and satisfies gravity measurement and navigationrequirement.

一类二阶非齐次时滞微分方程属于L．S∩L．C的判定

通过构造泛函，并引入辅助函数Ｆ（ｔ），得到了保证一类二阶非齐次时滞微分方程ｘ″（ｔ）＋ｐ（ｔ）ｘ′（ｔ）＋ｑ１（ｔ）ｘ（ｔ）＋ｑ２（ｔ）ｘ（τ（ｔ））＝ｆ（ｔ）所有解ｘ（ｔ）均满足ｘ（ｔ）∈Ｌ２［ａ，∞）∩Ｌ∞［ａ，∞）的充分条件。

Phase field method simulation of faceted dendrite growth with arbitrary symmetries

A numerical simulation based on a regularized phase field model is developed to describe faceted dendrite growth morphology. The effects of mesh grid, anisotropy, supersaturation and fold symmetry on dendrite growth morphology were investigated, respectively. These results indicate that the nucleus grows into a hexagonal symmetry faceted dendrite. When the mesh grid is above 640×640, the size has no much effect on the shape. With the increase in the anisotropy value, the tip velocities of faceted dendrite increase and reach a balance value, and then decrease gradually. With the increase in the supersaturation value, crystal evolves from circle to the developed faceted dendrite morphology. Based on the Wulff theory and faceted symmetry morphology diagram, the proposed model was proved to be effective, and it can be generalized to arbitrary crystal symmetries.

Anti-Plane Elasticity Problem and Mode Ⅲ Crack Problem of Cubic Quasicrystal

The fracture theory of cubic quasicrystal was developed. The exact analytic solution of a Mode Ⅲ Griffith crack in the material was obtained by using the Fourier transform and dual integral equations theory, and so the displacement and stress fields, the stress intensity factor and strain energy release rate were determined. The results show that the stress intensity factor is independent of material constants, and the strain energy release rate is dependent on all material constants. These provide important information for studying the deformation and fracture of the new solid material.

Solitary Wave and Non-traveling Wave Solutions to Two Nonlinear Evolution Equations

By applying the extended homogeneous balance method, we find some new explicit solutions to two nonlinear evolution equations, which include n-resonance plane solitary wave and non-traveling wave solutions.

NONPARALLEL BOUNDARY LAYER STABILITY IN HIGH SPEED FLOWS

The parabolized stability equations （PSEs） for high speed flows, especially supersonic and hypersonic flows, are derived and used to analyze the nonparallel boundary layer stability. The proposed numerical techniques for solving PSE include the following contents： introducing the efficiently normal transformation of the boundary layer, improving the computational accuracy by using a high-order differential scheme near the wall, employing the predictor-corrector and iterative approach to satisfy the important normalization condition, and implementing the stable spatial marching. Since the second mode dominates the growth of the disturbance in high Mach number flows, it is used in the computation. The evolution and characteristics of the boundary layer stability in the high speed flow are demonstrated in the examples. The effects of the nonparallelizm, the compressibility and the cooling wall on the stability are analyzed. And computational results are in good agreement with the relevant data.