微型平面复合薄膜电爆炸开关的设计和研究（英文）

开关技术是影响爆炸箔起爆系统可靠作用、微型化、低能化、集成化的关键技术。电爆炸平面开关是利用强脉冲电流使触发极金属桥箔发生电爆炸,产生高温高压等离子体,使爆炸桥区两侧的电极导通。基于微加工技术,采用Al/CuO复合薄膜材料作为触发电极,设计制造了微型平面复合薄膜电爆炸开关。采用扫描电子显微镜、差示扫描量热法和光谱谱线测温研究了触发极Al/CuO复合薄膜的形貌、反应性和电爆炸等离子体温度,通过放电电流测试研究了开关性能。结果表明,在主回路电压2000V时,开关输出电流峰值约为1938A,上升时间390ns,性能优于仅以铜薄膜为触发电极的电爆炸平面开关。     

微通道换热器复合翅片的传热特性研究

研究了管径对微通道换热器传热性能的影响,并在百叶窗翅片的基础上开发了两种复合翅片。计算结果表明:在同一迎面风速下,1mm管径的百叶窗翅片Nu数分别比1.5mm和1.8mm管径的大4.8%~10.5%和24.6%~25.8%。JF值增加11%~15%和26%~28%,说明管径为1mm时微通道换热器的综合性能更好。与百叶窗翅片相比,百叶窗-三角翼复合翅片的换热系数减小1.9%~5.4%,但压降降低7.8%~12.7%,表明复合翅片是一种高效低阻翅片。     

气凝胶在空间探测中的应用

气凝胶独特的物理特性使得它能在空间探测中被广泛应用。气凝胶超低的密度、极低的热导率以及多孔网络结构使得它能成功地应用在超高速宇宙尘埃粒子捕获、高效热防护、低温推进剂存储、太空服制造等空间探测任务中。对气凝胶在空间探测中的应用情况进行了综述。     

辐射接枝法制备膨化聚四氟乙烯杂化膜及其抗菌性表征

通过共辐射接枝的方法,将聚丙烯酸成功接枝到膨化聚四氟乙烯薄膜上. 采用NaBH₄还原吸附在接枝链上的银离子,在膜中原位负载银纳米粒子,制备了抗菌性ePTFE杂化膜. 杂化膜的SEM、XPS、XRD和TGA表征结果表明,负载的银纳米粒子粒径为几十纳米至100 nm. 而银纳米粒子的负载量可由聚丙烯酸的接枝率控制. 细菌平板计数法测试结果证明,所制备的杂化膜具有优异的抗菌性,对大肠杆菌的抗菌率高达100%.     

非晶碳氧化硅纳米线的合成与光致发光

利用直流电弧放电合成非晶碳氧化硅(SiCO)纳米线,不使用催化剂和模板,独立的SiCO 纳米线沉积在石墨锅的表面．通过XRD、SEM、TEM、XPS、FTIR等对SiCO纳米线进行了表征．结果表明,纳米线长度为20～100 μm,直径为10～100 nm,Si原子同C原子和氧原子分享成键组成SiCO单元．SiCO纳米线的光致发光谱在454和540 nm呈现了强而稳定的白色发光峰． SiCO纳米线的生长机制为等离子辅助气―固生长机制．     

可调焦胶囊内窥镜光学系统设计

为解决胶囊内窥镜分辨率与景深相互制约的问题,将一种单液体、电控、可变焦液体透镜应用到内窥镜光学系统中进行光学设计,在保证分辨率的同时,扩大了系统景深.采用CODE V软件进行设计,建立系统初始结构,构造液体透镜模型,基于液体透镜中液体的体积不变,曲率、孔径和厚度可变的结构约束特点,在MATLAB中计算出不同物距下透镜的曲率、孔径和厚度数据,将其导入CODE V的系统模型中,并提出了相应的优化流程.设计并优化带有液体透镜的胶囊内窥镜系统,实现了系统在3~100mm景深范围内的清晰成像,视场角大于110°,全视场范围内调制传递函数在40lp/mm频率下均大于0.3.     

Global continuum of positive solutions for discrete <Emphasis Type="Italic">p</Emphasis>-Laplacian eigenvalue problems

We discuss the discrete p-Laplacian eigenvalue problem,

$$\left\{ \begin{gathered} \Delta (\phi _p (\Delta u(k - 1))) + \lambda a(k)g(u(k)) = 0,k \in \{ 1,2,...,T\} , \hfill \\ u(0) = u(T + 1) = 0, \hfill \\ \end{gathered} \right.$$

where T > 1 is a given positive integer and φ _p (x):= |x| ^p?2 x, p > 1. First, the existence of an unbounded continuum C of positive solutions emanating from (λ, u) = (0, 0) is shown under suitable conditions on the nonlinearity. Then, under an additional condition, it is shown that the positive solution is unique for any λ > 0 and all solutions are ordered. Thus the continuum C is a monotone continuous curve globally defined for all λ > 0.

     

A well-balanced and asymptotic-preserving scheme for the one-dimensional linear Dirac equation

The numerical approximation of one-dimensional relativistic Dirac wave equations is considered within the recent framework consisting in deriving local scattering matrices at each interface of the uniform Cartesian computational grid. For a Courant number equal to unity, it is rigorously shown that such a discretization preserves exactly the \(L^2\) norm despite being explicit in time. This construction is well-suited for particles for which the reference velocity is of the order of \(c\), the speed of light. Moreover, when \(c\) diverges, that is to say, for slow particles (the characteristic scale of the motion is non-relativistic), Dirac equations are naturally written so as to let a “diffusive limit” emerge numerically, like for discrete 2-velocity kinetic models. It is shown that an asymptotic-preserving scheme can be deduced from the aforementioned well-balanced one, with the following properties: it yields unconditionally a classical Schrödinger equation for free particles, but it handles the more intricate case with an external potential only conditionally (the grid should be such that \(c \Delta x\rightarrow 0\)). Such a stringent restriction on the computational grid can be circumvented easily in order to derive a seemingly original Schrödinger scheme still containing tiny relativistic features. Numerical tests (on both linear and nonlinear equations) are displayed.     

Block partitions of sequences

Given a sequence A = (a ₁, …, a _n ) of real numbers, a block B of A is either a set B = {a _i , a _i+1, …, a _j } where i ≤ j or the empty set. The size b of a block B is the sum of its elements. We show that when each a _i ∈ [0, 1] and k is a positive integer, there is a partition of A into k blocks B ₁, …, B _k with |b _i ?b _j | ≤ 1 for every i, j. We extend this result in several directions.