引力波探测中的被动隔振系统

介绍了引力波探测实验中的被动隔振系统的基本原理和研究现状,讨论其性能及特点.低频被动隔振系统,如七级气体弹簧隔振系统,多级隔振堆,四级悬臂弹簧隔振系统以及三级弯曲弹簧隔振系统在10Hz以上,都具有好的隔振性能;倒摆、折叠摆、 X摆和锥摆等超低频水平隔振系统实现了几十秒的共振周期;建立在对称扭杆弹簧系统基础上,构思新颖的被动垂直隔振系统克服了传统被动垂直隔振系统无法解决的困难,实现了超低频被动垂直隔振.      

油酸修饰TiO2纳米微粒水溶液润滑下GCr15钢摩擦磨损性能研究

用四球摩擦磨损试验机考察了脂肪酸修饰TiO2纳米微粒水溶液润滑下GCr15钢的摩擦磨损性能,并用电子探针和X射线光电子能谱研究了钢球磨损表面边界润滑膜的化学组成和元素分布.摩擦磨损试验结果表明:脂肪酸修饰TiO2纳米微粒在水中具有较好的润滑性能、良好的极压性能及较高的承载能力.添加质量分数为0.1%～1.0%的油酸TiO2纳米微粒可使水的承载能力提高6～12倍,烧结负荷提高51～100%,抗磨减摩性能也有较大提高,卡咬负荷由150N提高至1000～1800N.磨损表面分析表明:油酸TiO2纳米微粒在较高负荷(>300N)下发生了摩擦化学反应,生成含TiO2及油酸复合物的边界润滑膜,从而起减摩抗磨作用     

增材制造八角桁架点阵结构材料的力学行为

基于激光选区熔化增材制造技术(SLM), 以GP1不锈钢为母材, 制备4种相对密度的八角桁架点阵结构试样, 开展了准静态单轴压缩和直接撞击式霍普金森压杆实验, 并结合显式有限元计算模拟, 研究了相对密度和加载速率对八角桁架点阵结构试样在力学响应、变形模式和吸能特性的影响. 结果显示: (1)相对密度是影响八角桁架点阵结构材料力学响应的关键参数, 屈服载荷随着相对密度基本呈线性增长, 并且表现出明显的应变率强化效应; (2)在准静态压缩下, 随着相对密度增大, 八角桁架点阵结构的变形模式由弯扭屈曲模式逐渐向稳定屈服模式转变; 而在冲击压缩下, 八角桁架点阵结构的变形模式随着冲击速度由对称稳定变形模式向非对称逐渐压垮模式转变; (3)八角桁架点阵结构总吸能随着相对密度线性增大, 而比吸能随着相对密度呈现双线性变化, 在相对密度30%处出现拐折, 当相对密度高于30%后, 比吸能增大缓慢; (4)与准静态加载相比, 冲击加载下八角桁架点阵结构的总吸能和比吸能都显著提升.     

林杏琴会堂的音质分析及改进设想

采用精密声级计和双通道声学分析仪，对林杏琴会堂的声场分布、噪声本底和混响时间作了分区测试，应用建筑声学理论对会堂的音质状况进行了分析，并提出改善会堂音质的若干建议．     

带加法白噪声的随机Boussinesq方程组的解的渐近行为

考虑速度和温度同时在加法白噪声扰动下的随机Boussinesq方程组的解的渐近特征.可以接轨道得到该随机方程组的唯一解,并可以验证该解生成随机动力系统,进而证明了该随机动力系统存在随机吸引子.     

Nonnormality and stochastic differential equations

A highly nonnormal Jacobian may give rise to large transients. This behaviour has been shown to have implications for (a) the relevance of linearising a nonlinear system and (b) the timestep restrictions required to keep a numerical method stable. Here, we show that nonnormality also manifests itself for stochastic differential equations. We give an example of a family of systems that is stable without noise, but can be made exponentially unstable in mean-square by a noise perturbation that shrinks to zero as the nonnormality increases. We then show via finite-time convergence theory that an Euler approximation shares the same property, giving a discrete analogue of the result. In memory of Germund Dahlquist (1925–2005).AMS subject classification (2000) 65C30, 34F05     

Hitting probabilities and the Hausdorff dimension of the inverse images of a class of anisotropic random fields

Let X = {X(t):t ∈ R~N} be an anisotropic random field with values in R~d.Under certain conditions on X,we establish upper and lower bounds on the hitting probabilities of X in terms of respectively Hausdorff measure and Bessel-Riesz capacity.We also obtain the Hausdorff dimension of its inverse image,and the Hausdorff and packing dimensions of its level sets.These results are applicable to non-linear solutions of stochastic heat equations driven by a white in time and spatially homogeneous Gaussian noise and anisotropic Guassian random fields.     

Accumulation of Particles and Formation of a Dissipative Structure in a Nonequilibrium Bath

The standard textbooks contain good explanations of how and why equilibrium thermodynamics emerges in a reservoir with particles that are subjected to Gaussian noise. However, in systems that convert or transport energy, the noise is often not Gaussian. Instead, displacements exhibit an α-stable distribution. Such noise is commonly called Lévy noise. With such noise, we see a thermodynamics that deviates from what traditional equilibrium theory stipulates. In addition, with particles that can propel themselves, so-called active particles, we find that the rules of equilibrium thermodynamics no longer apply. No general nonequilibrium thermodynamic theory is available and understanding is often ad hoc. We study a system with overdamped particles that are subjected to Lévy noise. We pick a system with a geometry that leads to concise formulae to describe the accumulation of particles in a cavity. The nonhomogeneous distribution of particles can be seen as a dissipative structure, i.e., a lower-entropy steady state that allows for throughput of energy and concurrent production of entropy. After the mechanism that maintains nonequilibrium is switched off, the relaxation back to homogeneity represents an increase in entropy and a decrease of free energy. For our setup we can analytically connect the nonequilibrium noise and active particle behavior to entropy decrease and energy buildup with simple and intuitive formulae.     

数控裁剪机切割刀壳体振动噪声预测分析

高频往复式切割刀是柔性材料数控裁剪机的核心部件.该文对切割刀壳体的振动噪声改进措施进行研究.首先对切割刀进行刚体动力学分析,获取其所受动载荷情况,并通过数值计算验证了切割刀刚体动力学模型的可靠性.其次,基于有限元法获取切割刀壳体模态特性,并通过锤击激振实验验证了有限元模型的准确性.然后基于模态仿真结果进行谐响应分析,将...