Strong Feller Property for SDEs with Super-linear Drift and Hölder Diffusion Coefficients

In this paper,we investigate the strong Feller property of stochastic differential equations(SDEs)with super-linear drift and Hölder diffusion coefficients.By utilizing the Girsanov theorem,coupling method,truncation method and the Yamada-Watanabe approximation technique,we derived the strong Feller property of the solution.

Existence of a Hölder Continuous Extension on Embedded Balls of the 3-Torus for the Periodic Navier Stokes Equations

This article gives a general model using specific periodic special functions, which is degenerate elliptic Weierstrass P functions whose presence in the governing equations through the forcing terms simplify the periodic Navier Stokes equations (PNS) at the centers of cells of the 3-Torus. Satisfying a divergence-free vector field and periodic boundary conditions respectively with a general spatio-temporal forcing term which is smooth and spatially periodic, the existence of solutions which have finite time singularities can occur starting with the first derivative and higher with respect to time. The existence of a subspace of the solution space where v3 is continuous and {C, y1, y12}, is linearly independent in the additive argument of the solution in terms of the Lambert W function, (y12=y2, C∈R) together with the condition v2=-2y1v1. On this subspace, the Biot Savart Law holds exactly [see Section 2 (Equation (13))]. Also on this subspace, an expression X (part of PNS equations) vanishes which contains all the expressions in derivatives of v1 and v2 and the forcing terms in the plane which are related as with the cancellation of all such terms in governing PDE. The y3 component forcing term is arbitrarily small in ε ball where Weierstrass P functions touch the center of the ball both for inviscid and viscous cases. As a result, a significant simplification occurs with a v3 only governing PDE resulting. With viscosity present as v changes from zero to the fully viscous case at v =1 the solution for v3 reaches a peak in the third component y3. Consequently, there exists a dipole which is not centered at the center of the cell of the Lattice. Hence since the dipole by definition has an equal in magnitude positive and negative peak in y3, then the dipole Riemann cut-off surface is covered by a closed surface which is the sphere and where a given cell of dimensions [-1, 1]3 is circumscribed on a sphere of radius 1. For such a closed surface containing a dipole it necessarily follows that the flux at the surface of the sphere of v3 wrt to surface normal n is zero including at the points where the surface of sphere touches the cube walls. At the finite time singularity on the sphere a rotation boundary condition is deduced. It is shown that v3 is spatially finite on the Riemann Sphere and the forcing is oscillatory in y3 component if the velocity v3 is. It is true that . A boundary condition on the sphere shows the rotation of a sphere of viscous fluid. Finally on the sphere a solution for v3 is obtained which is proven to be Hölder continuous and it is shown that it is possible to extend Hölder continuity on the sphere uniquely to all of the interior of the ball.

From Hölder Continuous Solutions of 3D Incompressible Navier-Stokes Equations to No-Finite Time Blowup on [ 0,∞ ]

This article gives a general model using specific periodic special functions, that is, degenerate elliptic Weierstrass P functions composed with the LambertW function, whose presence in the governing equations through the forcing terms simplify the periodic Navier Stokes equations (PNS) at the centers of arbitrary r balls of the 3-Torus. The continuity equation is satisfied together with spatially periodic boundary conditions. The yicomponent forcing terms consist of a function F as part of its expression that is arbitrarily small in an r ball where it is associated with a singular forcing expression both for inviscid and viscous cases. As a result, a significant simplification occurs with a v3(vifor all velocity components) only governing PDE resulting. The extension of three restricted subspaces in each of the principal directions in the Cartesian plane is shown as the Cartesian product ℋ=Jx,t×Jy,t×Jz,t. On each of these subspaces vi,i=1,2,3is continuous and there exists a linear independent subspace associated with the argument of the W function. Here the 3-Torus is built up from each compact segment of length 2R on each of the axes on the 3 principal directions x, y, and z. The form of the scaled velocities for non zero scaled δis related to the definition of the W function such that e−W(ξ)=W(ξ)ξwhere ξdepends on t and proportional to δ→0for infinite time t. The ratio Wξis equal to 1, making the limit δ→0finite and well defined. Considering r balls where the function F=(x−ai)2+(y−bi)2+(z−ci)2−ηset equal to −1e+rwhere r>0. is such that the forcing is singular at every distance r of centres of cubes each containing an r-ball. At the centre of the balls, the forcing is infinite. The main idea is that a system of singular initial value problems with infinite forcing is to be solved for where the velocities are shown to be locally Hölder continuous. It is proven that the limit of these singular problems shifts the finite time blowup time ti∗for first and higher derivatives to t=∞thereby indicating that there is no finite time blowup. Results in the literature can provide a systematic approach to study both large space and time behaviour for singular solutions to the Navier Stokes equations. Among the references, it has been shown that mathematical tools can be applied to study the asymptotic properties of solutions.

Hölder不等式的两种新证法及Cauchy-Schwarz不等式的加细

Hölder不等式是一类重要的不等式。本文分别利用Cauchy-Schwarz不等式及关于凸函数的Jensen不等式,给出了积分型Hölder不等式的两种新的证明方法。据此,结合受控理论给出Cauchy-Schwarz不等式的一种加细及一个新的反向Hölder不等式。

Hölder不等式的一种新证法及推广

1引言Hölder不等式是非常重要的不等式,本文首先给出Hölder不等式的一个等价形式,然后利用函数的凸性给出了Hölder不等式的一种新的证明方法,并据此结合受控理论(theory of majorization)给出Cauchy-Schwarz不等式的一种加细及一个新的反向Hölder不等式.我们需要一些简单的符号和高等数学知识.

急性脑梗死患者血清CFH、VASH-1表达与病情、疾病转归的关系

目的分析急性脑梗死患者血清补体H因子(CFH)、血管生成抑制蛋白-1(VASH-1)表达与病情、疾病转归的关系。方法选择96例急性脑梗死患者为研究组,根据美国国立卫生院卒中量表(NIHSS)评分分为轻度组、中度组、重度组,按疾病转归分为恶化组、转归组。另选取同期体检健康者80例为对照组。比较各组血清CFH、VASH-1水平。采用ROC评估血清CFH、VASH-1对急性脑梗死患者疾病转归的诊断价值,Logistic回归分析影响疾病转归的因素。结果血清CFH水平研究组<对照组,重度组<中度组<轻度组,恶化组<转归组;血清VASH-1水平研究组>对照组,重度组>中度组>轻度组,恶化组>转归组(P<0.05)。血清CFH、VASH-1及二者联合评估急性脑梗死疾病转归的AUC分别为0.830、0.866、0.915。血清低CFH、高VASH-1及高NHISS评分为急性脑梗死患者疾病转归的危险因素(P<0.05)。结论急性脑梗死患者血清CFH、VASH-1水平与病情、疾病转归有关,可作为评估急性脑梗死患者疾病转归的可靠生物学标志物。

Sufficient Optimality Conditions for Multiobjective Programming Involving (V, ρ)h,ψ-type Ⅰ Functions

New classes of functions namely (V, ρ)_(h,φ)-type I, quasi (V, ρ)_(h,φ)-type I and pseudo (V, ρ)_(h,φ)-type I functions are defined for multiobjective programming problem by using BenTal's generalized algebraic operation. The examples of (V, ρ)_(h,φ)-type I functions are given. The sufficient optimality conditions are obtained for multi-objective programming problem involving above new generalized convexity.

Lysine-specific demethylase 1 inhibitor rescues the osteogenic ability of mesenchymal stem cells under osteoporotic conditions by modulating H3K4 methylation

Bone tissue engineering may be hindered by underlying osteoporosis because of a decreased osteogenic ability of autologous seed cells and an unfavorably changed microenvironment in these patients. Epigenetic regulation plays an important role in the developmental origins of osteoporosis; however, few studies have investigated the potential of epigenetic therapy to improve or rescue the osteogenic ability of bone marrow mesenchymal stem cells(BMMSCs) under osteoporotic conditions. Here, we investigated pargyline, an inhibitor of lysine-specific demethylase 1(LSD1), which mainly catalyzes the demethylation of the di- and mono-methylation of H3K4. We demonstrated that 1.5 mmol·Lpargyline was the optimal concentration for the osteogenic differentiation of human BMMSCs. Pargyline rescued the osteogenic differentiation ability of mouse BMMSCs under osteoporotic conditions by enhancing the dimethylation level of H3K4 at the promoter regions of osteogenesis-related genes. Moreover, pargyline partially rescued or prevented the osteoporotic conditions in aged or ovariectomized mouse models, respectively. By introducing the concept of epigenetic therapy into the field of osteoporosis, this study demonstrated that LSD1 inhibitors could improve the clinical practice of MSC-based bone tissue engineering and proposes their novel use to treat osteoporosis.

Strontium chloride-catalyzed one-pot synthesis of 4(3H)-quinazolinones under solvent-free conditions

Strontium chloride was used as an efficient and recyclable catalyst in one-pot condensation of anthranilic acid, ortho esters and amines leading to the formation of 4（3H）-quinazolinone derivatives in good yields at room temperature under solvent-free conditions.

Hölder Derivative of the Koch Curve

In this paper, we introduce a K H&#246;lder p-adic derivative that can be applied to fractal curves with different H&#246;lder exponent K. We will show that the Koch curve satisfies the H&#246;lder condition with exponent and has a 4-adic arithmetic-analytic representation. We will prove that the Koch curve has exact -H&#246;lder 4-adic derivative.

Temporal Stability Analysis of Magnetized Hybrid Nanofluid Propagating through an Unsteady Shrinking Sheet: Partial Slip Conditions

The unsteady magnetohydrodynamic(MHD)flow on a horizontal preamble surface with hybrid nanoparticles in the presence of the first order velocity and thermal slip conditions are investigated.Alumina(Al_(2)O_(3))and copper(Cu)are considered as hybrid nanoparticles that have been dispersed in water in order to make hybrid nanofluid(Cu-Al_(2)O_(3)/water).The system of similarity equations is derived from the system of partial differential equations(PDEs)by using variables of similarity,and their solutions are gotten with shooting method in the Maple software.In certain ranges of unsteadiness and magnetic parameters,the presence of dual solutions can be found.Further,it is examined that layer separation is deferred due to the effect of the hybrid nanoparticles.Moreover,the capacity of the thermal enhancement of Cu-Al_(2)O_(3)/water hybrid nanofluid is higher as compared to Al_(2)O_(3)/water based nanofluid and enhancements inCu are caused to rise the fluid temperature in both solutions.In the last,solutions stability analyzes were also carried out and the first solution was found to be stable.

可积函数HÖlder不等式的等价不等式

HÖlder不等式在分析学和初等不等式理论中扮演着极其重要的角色。作为相关研究的一个重要方面, 它与其它不等式之间的等价关系的研究也越来越受到重视。本文证明了测度空间上积分形式的H¨older不等式与算术平均-几何平均不等式,以及它与喜平均不等式之间的等价关系。这些结果极大地推广了李勇涛等最近建立的离散不等式等价关系。

THE WEIGHTED KATO SQUARE ROOT PROBLEMOF ELLIPTIC OPERATORS HAVING A BMOANTI-SYMMETRICPART

Let n≥2 and let L be a second-order elliptic operator of divergence form with coefficients consisting of both an elliptic symmetric part and a BMO anti-symmetric part in ℝ^(n).In this article,we consider the weighted Kato square root problem for L.More precisely,we prove that the square root L^(1/2)satisfies the weighted L^(p)estimates||L^(1/2)(f)||L_(ω)^p(R^(n))≤C||■f||L_(ω)^p(R^(n);R^(n))for any p∈(1,∞)andω∈Ap(ℝ^(n))(the class of Muckenhoupt weights),and that||■f||L_(ω)^p(R^(n);R^(n))≤C||L^(1/2)(f)||L_(ω)^p(R^(n))for any p∈(1,2+ε)andω∈Ap(ℝ^(n))∩RH_(2+ε/p),(R^(n))(the class of reverse Hölder weights),whereε∈(0,∞)is a constant depending only on n and the operator L,and where(2+ε/p)'denotes the Hölder conjugate exponent of 2+ε/p.Moreover,for any given q∈(2,∞),we give a sufficient condition to obtain that||■f||L_(ω)^p(R^(n);R^(n))≤C||L^(1/2)(f)||L_(ω)^p(R^(n))for any p∈(1,q)andω∈A_(p)(R^(n))∩pRH_(q/p),(R^(n)).As an application,we prove that when the coefficient matrix A that appears in L satisfies the small BMO condition,the Riesz transform∇L^(−1/2)is bounded on L_(ω)^(p)(ℝ^(n))for any given p∈(1,∞)andω∈Ap(ℝ^(n)).Furthermore,applications to the weighted L^(2)-regularity problem with the Dirichlet or the Neumann boundary condition are also given.

400 km/h高速铁路实现3 min追踪间隔时间技术条件分析

400 km/h高速铁路将是我国未来高速铁路发展的重要方向,而实现列车3 min追踪间隔是建设400 km/h高速铁路亟需解决的关键问题。为解决上述问题,本研究通过理论分析与仿真实验分析了400 km/h高速铁路实现3 min追踪间隔时间所需达到的技术条件。理论分析阶段,根据我国高速铁路目前采用的闭塞防护技术,分别分析了列车出发、区间和到达3类追踪间隔的计算方法与影响因素,并结合线路实际设计、运营情况和敏感性分析筛选出具有优化价值的关键影响因素。仿真实验阶段,利用计算机仿真建立多因素列车追踪运行仿真模型,以实现列车3 min追踪间隔为目标,运用控制变量法分析得到了整套技术条件。研究成果对于研究实现400 km/h高速铁路3 min追踪间隔时间具有一定参考意义。

新型H型钢前撑在复杂边界条件下深基坑的应用研究

前撑注浆钢管支护体系是近几年应用的一种新型基坑支护技术,已在长三角地区地下一层广泛应用与实践。与传统钢斜撑相比具有施工便捷、节省工期和对周边环境影响小等明显优势。以某杭州地区某复杂边界条件下深大基坑工程为例,从方案选型、施工技术要点、支护效果等方面对新型H型钢前撑体系进行了详细的分析和介绍,通过现场试验、数值模拟分析和现场监测等手段,进一步分析验证了H型钢前撑体系使用的可行性,为类似地质和边界条件下深大基坑工程设计提供参考。

一类Hlder连续的混沌系统分析和控制

构造了新的三维连续时间混沌系统.该系统含有两个参数和一个非线性项,其中的非线性项满足1/2阶Hlder连续但不满足Lipschitz连续性条件.通过理论分析和数值仿真研究了系统的动力学特性.此外,利用线性状态反馈对此混沌系统进行了控制,实现了系统的全局镇定.通过分段线性状态反馈方法对新混沌系统的同步进行了研究,实现了系统的全局同步.

度量空间中某类泛函极小的Hlder连续性

主要研究了牛顿空间中泛函F(u,gu)=∫f(u,gu)dμ的极小问题,其中对某常数c>0,泛函满足gup-c|u|p≤f(u,gu)≤gpu+c|u|p.牛顿空间是Sobolev空间在度是空间中的推广,具有更一般的性质.在该空间中研究偏微分方程,对建立更一般的偏微分方程理论具有指导和开拓意义.本文利用De Giorgi迭代的方法研究了该泛函极小的正则性,证明了该泛函极小的Hlder连续性.这使得我们在不求精确解的情况下,利用方程本身的条件可以对方程解进行数值估计.

从贝努利不等式到Hlder不等式的演变过程及应用

首先利用贝努利不等式给出几何平均算术平均不等式的证明,然后给出Young不等式和Young逆不等式的初等证明方法,进而给出Hlder不等式的初等证明,并将这些结果应用到一些重要不等式的证明.

A-调和方程弱解的逆Hlder不等式及其应用

本文给出A 调和方程弱解的逆H lder不等式及其若干应用 .

一个抛物型方程侧边值问题的具有Hlder连续性的Fourier正则化方法(英文)

逆热传导问题是具有重要应用背景的严重不适定问题,但目前已有结果大都仅局限于标准的热传导方程侧边值问题的讨论.本文对一个抛物型方程侧边值问题给出了一种新的具有Hlder连续性的Fourier正则化方法。