运用操纵模拟器试验进行超大型船舶航道宽度计算研究

运用船舶操纵模拟器模拟试验的方法,通过试验分析风、流压偏角等因素与超大型船舶在航行时航迹带宽度之间的关系,提出了超大型船舶在风、流以及波浪作用下,进出港航行所需航道宽度的计算方法。     

基于核主成分分析的柴油机技术状态评估

提出了一种基于核主成分分析的柴油机技术状态评估方法,该方法通过跟踪柴油机全寿命周期内的机体振动信号,引入振动信号频域内振动烈度与统计特征值构成特征子集,利用核主成分分析方法获得特征子集的主分量,选用极限学习机对主分量特征样本进行分类和测试,可有效地消除冗余信息,提高识别精度。对柴油机技术状态评估后的结果表明,该方法较主成分分析法识别精度约提高了25个百分点。     

顺置式吊杆锚固区受力特性与极限承载力研究

为掌握顺桥向设置的吊杆锚固区在吊杆力作用下的受力特性和极限承载力,以某在建斜拉-自锚式悬索组合体系桥为依托工程,利用ANSYS软件建立壳单元空间有限元模型,对锚固区在最不利荷载作用下的受力性能进行研究;并分别采用线弹性及非线性分析方法对吊杆锚固区极限承载力进行分析,讨论构件的受力情况。结果表明:在最不利荷载作用下,钢锚箱及钢锚梁应力较横隔板应力小;除钢锚梁与横隔板焊接处应力集中现象显著外,各构件应力分布较均匀;各构件顺桥向变形较大。不同极限承载力分析方法表明,此类结构采用壳单元建模进行极限承载力分析时应仅考虑材料非线性。建议在此类结构设计时,对于横隔板刚度不足问题应给予足够重视。     

连续刚构桥长悬臂施工状态抗风临时措施比较

连续刚构桥长悬臂施工状态结构具有大、轻、柔的特点,阻尼下降,因而对风的作用十分敏感,风致振动对结构影响较大。在研究国内外连续刚构长悬臂状态下抗风临时措施应用基础上,针对某海峡大桥长悬臂施工状态提出五种抗风临时措施,建立有限元模型比较不同措施下风槽钢连接的措施能最大程度降低结构响应,大大提高结构抗风性能,这对连续刚构长悬臂施工状态风振控制具有一定的借鉴意义。     

城市公交车与社会车辆混合流速度模型及交通运行状态分析

为了精确解析城市公交车和社会车辆混合运行的状态,在基本路段车速模型适用性分析的基础上,引入公交车流量、社会车辆流量、公交车比例等参数,建立了改进的混合机动车运行速度模型,分别选取单向二车道和单向三车道路段进行交通试验调查,采用Metrocount 5600气压管式车辆分型系统进行数据采集并用于改进模型的参数标定,并分别建立了2种车型的速度差模型,提出了路段混合车流3种不同交通运行状态的评价方法。研究结果表明：同等车流量情况下,不同公交车比例对社会车辆速度的影响表现为3个显著的变化区间;随着路段饱和度的增加,社会车辆和公交车之间的速度差呈现出从几乎不变、快速缩小到接近于零3个较为明显的运行状态;考虑车流组成中公交车比例的变化可以细化路段车流畅通状态、拥堵形成状态以及拥堵状态的判别。     

板式无砟轨道交通引起的环境振动数值分析

利用已研究出的高速铁路动荷载,采用粘弹性边界,运用有限元法建立轨道-路基-大地二维动力分析模型,分析板式无砟轨道交通引起的振动在大地中的传播特性。计算分析表明:地表的振动强度随着离轨道中心线的距离增加而逐渐衰减。离轨道中心线近处,地表振动较强,而且加速度主要频段在20 Hz以上;离轨道中心线较远处,振动较小,加速度主要频段在10 Hz以下。随着离轨道中心距离的增加,加速度幅值随之减小,而且地表20 Hz以上的振动衰减得较快,10 Hz以下的振动衰减得较慢。     

双套拱塔斜拉桥索力张拉优化及控制

为研究双套拱塔斜拉桥施工控制技术,尤其是塔间索及斜拉索的张拉方案合理性及张拉控制方法,以小凌河大桥为背景,采用MIDAS Civil有限元软件建立该桥空间计算模型,进行施工过程的模拟计算,根据计算结果对拉索安装和张拉方案进行了优化。优化后,赋予塔间索初张拉无应力长度,二次调索时调整到成桥状态的无应力长度;斜拉索自内而外安装并张拉,索力小于250kN的斜拉索,调整其初张拉无应力长度使索力满足测量要求,其他斜拉索直接张拉到设计的无应力长度。监控结果表明,采用优化后的索力张拉方法对该类桥梁进行施工控制,整个施工过程中结构安全、受力明确,得到的成桥索力误差小。     

Dynamic Train-Track Interaction: Variability Attributable to Scatter in the Track Properties

A numerical method to simulate vertical dynamic interaction between a rolling train and a railway track has been used to investigate the influence of stochastic properties of the track structure. A perturbation technique has been used to investigate the influence of the scatter in selected track properties. The train-track interaction problem has been numerically solved by use of an extended state-space vector approach in conjunction with a complex modal superposition for the whole track structure. All numerical simulations have been carried out in the time-domain with a moving mass model. Properties such as rail pad stiffness, ballast stiffness, dynamic ballast-subgrade mass and sleeper spacing have been studied. To obtain sufficient statistical information from track structures, full-scale measurements in the field and laboratory measurements have been carried out. The influence of scatter in the track properties on the maximum contact force between the rail and the wheel, the maximum magnitude of the vertical wheelset acceleration, and the maximum sleeper displacement have been studied. Mean values and standard deviations of these quantities have been calculated. The effects of the variation of the investigated track properties are discussed.     

Theoretical and experimental excitation force spectra for railway-induced ground vibration: vehicle–track–soil interaction,irregularities and soil measurements

Excitation force spectra are necessary for a realistic prediction of railway-induced ground vibration. The excitation forces cause the ground vibration and they are themselves a result of irregularities passed by the train. The methods of the related analyses – the wavenumber integration for the wave propagation in homogeneous or layered soils, the combined finite-element boundary-element method for the vehicle–track–soil interaction – have already been presented and are the base for the advanced topic of this contribution. This contribution determines excitation force spectra of railway traffic by two completely different methods. The forward analysis starts with vehicle, track and soil irregularities, which are taken from literature and axle-box measurements, calculates the vehicle–track interaction and gets theoretical force spectra as the result. The second method is a backward analysis from the measured ground vibration of railway traffic. A calculated or measured transfer function of the soil is used to determine the excitation force spectrum of the train. A number of measurements of different soils and different trains with different speeds are analysed in that way. Forward and backward analysis yield the same approximate force spectra with values around 1 kN for each axle and third of octave.