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1.
对采用混合可压缩流体方法分析非饱和土一维固结问题的固结方程进行了求解,在得到的解析解的基础上,对影响非饱和土一维固结的因素进行了分析。分析结果表明,在采用混合流体方法计算非饱和土一维固结的孔隙水压力时,所用公式与计算饱和土一维固结的太沙基理论公式基本相同,不同之处在于引入Bishop有效应力系数来体现孔隙气对孔隙水的影响。而在非饱和土孔隙气压的计算公式中除了体现孔隙水对孔隙气的影响参数以外,还有体现孔隙气体的可压缩性对固结影响的参数。在所有影响因素中,影响非饱和土一维固结最重要的因素是孔隙流体的渗流路径。 相似文献
2.
《岩土力学》2021,(4)
非饱和土的固结研究对道路工程、软土地基处理工程等具有十分重要的意义。基于Fredlund和Hasan提出的非饱和土一维固结理论,给出了土体内孔隙水压力和孔隙气压力变化的控制方程,并给出了单层非饱和土的初始条件与一类随时间变化的混合非齐次边界条件,构成了非饱和土一维固结的定解问题。通过非齐次边界条件齐次化和特征函数展开法,得到了土体内孔隙水压力和孔隙气压力消散的精确时域解析解。最后,通过对比验证了解析方法的正确性,并分析了边界条件指数变化对非饱和土体内孔隙水压力和孔隙气压力的消散以及土体沉降的影响。结果表明,边界处孔压或孔压梯度随时间的指数变化对非饱和土固结过程有明显影响。 相似文献
3.
非饱和粉质粘土固结压缩特性及体变试验研究 总被引:2,自引:0,他引:2
为进一步研究与基质吸力相关联的非饱和土固结压缩特性,扩展非饱和土固结理论在工程实际中的适用性,通过分析非饱和粉质粘土水土特征曲线变化规律,对非饱和土固结变形机理进行研究。试验结果表明:非饱和土的最终沉降量仅与土骨架的压缩模量有关。对于不同饱和度的非饱和土而言,固结速度随初始饱和度的增加而减小,饱和土固结过程所需要的时间比非饱和土固结过程所需要的时间短。由于孔隙流体的压缩性导致高饱和土体的瞬时沉降比低饱和土体的瞬时沉降小,但高饱和土体的后期固结沉降受饱和度和吸力的影响,比低饱和土体要大得多。
相似文献
4.
为研究非饱和中等压缩性土地基各施工阶段的沉降特性,针对胶济客专沿线的工程地质情况,结合建设和运营过程中现场沉降监测、室内固结试验以及数值模拟等方法,研究了不同加固方法非饱和中等压缩性土地基的沉降规律、初始饱和度对非饱和土固结变形的影响等。结果表明:非饱和中等压缩性土地基在分级填筑的情况下,路基填筑期(4个月左右)可完成总沉降的75%以上,经过短期放置(4个月左右)可完成总沉降的90%以上;气相连续的非饱和粉质粘土,低饱和度时固结完成时间比高饱和度时缩短;不同加固方法对地基沉降变形特性影响不同;放置期的确定应考虑地基加固方法的不同,对于采用的三种加固方法,只要放置期不少于6个月,其工后沉降都满足无砟轨道沉降控制要求。 相似文献
5.
以Biot(1941)提出的理想土体的三维固结理论为基础,在水流连续条件中增加了考虑孔隙流体本身的压缩变形,并将这一因素以高饱和度土体的饱和度的变化为表征,写入文中建立的平面应变下的Biot二维固结方程。通过实施Laplace变换和Fourier正余弦变换获得基本方程组,求解得到初始函数表达式;再利用数值反变换得到任意时刻、任意一点的数值解,并侧重分析了高饱和土饱和度的变化对孔隙流体的压缩性能的影响,以及由此而产生的固结全过程的变化,表明了考虑孔隙流体的压缩对分析高饱和度土体的固结行为的意义。该解可以进一步推广到其它类型荷载作用在土体不同位置,以及不同边界条件下多层地基的二维固结分析。 相似文献
6.
基于Fredlund非饱和土一维固结理论,研究了有限厚度的表面透水透气、底面不透水不透气的线弹性和黏弹性非饱和土地基在加荷随时间指数性变化时的一维固结特性。分别得到了两类地基在固结过程中同时考虑液相、气相渗透系数非线性变化和仅考虑液相渗透系数变化两种情况下的半解析解答。利用典型算例进行计算,分析了不同情况下两类地基中超孔隙水、气压力消散以及地基固结度随时间的变化规律,并与不考虑渗透系数变化时的半解析解计算结果进行了对比。结果发现:固结过程中渗透系数呈非线性变化;只考虑液相渗透系数变化时,超孔隙气压力的消散变化不大,超孔隙水压力的消散加快;气相渗透系数变化对超孔隙气的消散产生明显影响,对超孔隙水压力消散影响不大。同时考虑液相和气相渗透系数变化时,土体中超孔隙水、气压力的消散均有明显变化,土体固结速度也相应加快;分析结果对非饱和土固结的进一步研究具有重要意义。 相似文献
7.
成层土在工程中很常见,研究降雨过程中成层非饱和土的渗流-变形耦合对非饱和土土力学的发展具有重要的意义。由流体质量守恒,Darcy定律和Lloret等的非饱和土本构模型可得成层非饱和土渗流-变形耦合的控制方程。采用Gardner的非饱和土的渗透系数公式以及Boltzman模型,基于Laplace变换得到耦合方程的解析解。解析及其参数分析表明,渗流和变形耦合是具有时间效应的。与吸力变化相关的土的模量F,对成层土的孔隙水压力分布有明显影响。两层土的F差异越大,孔隙水压力消散得越慢,耦合效应越不显著。增大表层土的F值有利于降低耦合效应。成层土饱和体积含水率变化对吸力变化产生有限的影响 相似文献
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9.
基于Dakshanamurthy和Fredlund提出的二维非饱和土固结理论,利用Fourier正弦级数展开、Laplace变换,分别给出了分段循环荷载作用下二维非饱和土固结问题的超孔隙气压力、超孔隙水压力和沉降的半解析解,并应用退化法验证了本文所得半解析解的正确性。然后,结合3种具体的荷载形式,分析了分段循环荷载作用下气相与液相渗透系数之比(ka/kw)、水平方向与竖直方向渗透系数之比(kx/kz)和荷载特征参数(a)对二维非饱和土固结特性的影响。结果表明:ka/kw和kx/kz的增大均会加速固结沉降进程;荷载特征参数越大,沉降发展越早,沉降值越小;二维非饱和土固结特性受分段循环荷载作用影响明显。因此,在实际施工过程中改变施工速度和设置径向排水装置可有效控制二维条件下非饱和土体的固结过程,该研究成果可为非饱和土地基的设计和施工提供重要理论依据。 相似文献
10.
非饱和土是地球表层土体一种常见的存在形式。与经典的饱和土Biot固结理论相比,非饱和土固结理论还亟待发展。基于Fredlund非饱和土双应力变量固结理论,放弃传统理论固结过程中骨架总应力不变的假设,推导出变荷载作用下非饱和土全耦合轴对称固结理论的控制方程组。通过Laplace-Hankel变换处理变量t和r,所得的控制方程被处理为常微分方程组;扩展的精细积分法将被进一步运用求解方程组以得到层状非饱和土地基在变换域内的固结解答,而最终的解答将通过Laplace-Hankel逆变换技术求得。将非饱和土地基退化为饱和土地基,与现有文献结果进行对比,验证所提方法结果的可靠性;最后,提供3个数值算例,以讨论加载时间T0、孔隙水关于净应力的体积变化系数m1w以及土体分层性对非饱和土固结特性的影响。 相似文献
11.
非饱和土层一维固结特性分析 总被引:1,自引:0,他引:1
在Fredlund非饱和土的一维固结理论的基础上进行假设,由得出的液相及气相的控制方程、Darcy定律及Fick定律,采用Laplace 变换、逆变换等数学方法得到了大面积均布瞬时加载下表面为透水透气面、底面为不透水和不透气面的非饱和土层一维固结时间域内的超孔隙水压力、超孔隙气压力及土层沉降的解析解;应用典型算例,分析了不同气、水渗透系数比情况下土体超孔隙水压力、超孔隙气压力消散及土层沉降随时间的变化规律以及不同时间超孔隙水压力、超孔隙气压力消散随深度的变化规律。将得出的结果退化成相应的饱和土的解与太沙基饱和土固结理论结果比较,验证了其正确性。 相似文献
12.
This paper presents semi-analytical solutions to Fredlund and Hasan’s one-dimensional consolidation for unsaturated soils under symmetric semi-permeable drainage boundary conditions. Two variables are introduced to transform two coupled governing equations of pore-air and pore-water pressures into an equivalent set of partial differential equations, which are easily solved by the Laplace transform. Then, the pore-air and pore-water pressures, and soil settlement are obtained in the Laplace domain. Crump’s method is adopted to perform the inverse Laplace transform in order to obtain semi-analytical solutions in time domain. It is shown that the present solution is more applicable to various types of drainage boundary conditions, and in a good agreement with existing solutions from the literature. Furthermore, several numerical examples are provided to investigate the consolidation behavior of an unsaturated single-layer soil with traditional drainage boundary (single or double), and single-sided and double-sided semi-permeable drainage boundaries. Finally, it illustrates the changes in pore-air and pore-water pressures and soil settlement with time at different values of symmetric semi-permeable drainage boundary conditions parameters. In addition, parametric studies are conducted by the variations of pore-air and pore-water pressures at different ratios of air-water permeability coefficient and the depth. 相似文献
13.
This note presents an analytical solution to one-dimensional consolidation in unsaturated soils with a finite thickness under confinement in the lateral direction and vertical loading varying exponentially with time. The boundary conditions are that the top surface is permeable to water and air and the bottom is impermeable to water and air. The transfer relationship between the state vectors at the top surface and any depth is gained by applying the Laplace transform and Cayley-Hamilton mathematical methods to the governing equations of water and air, Darcy’s law and Fick’s law. The excess pore-air and pore-water pressures and settlement in the Laplace-transformed domain are obtained by using the Laplace transform with the initial and boundary conditions. By performing the inverse Laplace transforms, the analytical solutions of the excess pore-air and pore-water pressures at any depth and settlement are obtained in the time domain. 相似文献
14.
This paper presents a semi-analytical solution to one-dimensional consolidation of viscoelastic unsaturated soils with a finite thickness under oedometric conditions and subjected to a sudden loading. The solution is obtained by using Lee’s correspondence principle based on the semi-analytical solution to one-dimensional consolidation of elastic unsaturated soils. The boundary contains the top surface permeable to water and air and the bottom impermeable to water and air. A typical example is given to show the evolution of excess pore-air and pore-water pressures as well as the total degree of consolidation of the soil layer with time for different ratios of air–water permeability coefficient, elastic modulus and viscoelastic coefficient. The one-dimensional consolidation behavior of viscoelastic unsaturated soil is discussed according to the semi-analytical solution. These results contribute to a better understanding of the consolidation behavior of viscoelastic unsaturated soils. 相似文献
15.
Based on Fredlund’s one-dimensional consolidation equation for unsaturated soil, Darcy’s law and Fick’s law, a semi-analytical solution was presented to the free drainage well with a finite thickness under application of uniform vertical loading and the boundary of the top and bottom surfaces impermeable to water and air. According to the polar governing equations of water and air phases and the boundary and initial conditions, the excess pore-air and pore-water pressures and the soil layer settlement in the Laplace transformed domain are obtained by performing the Laplace transform and utilizing the Bessel functions. Crump’s method is used to perform the inversion of Laplace transform in order to obtain numerical solutions in the real time domain. Finally, a typical example is given to illustrate the changes in the excess pore-air and pore-water pressures and soil layer settlement with time factor at different ratios of air–water permeability coefficient and/or different distances from the well. 相似文献
16.
The study presents semi-analytical solutions of two-dimensional plane strain consolidation problem in unsaturated soils incorporating the lateral semipermeable drainage boundary by adopting Fourier sine series and Laplace transform. The two-dimensional plane strain consolidation equations in the form of two-order partial differential equations with three variables are firstly converted to two-order partial differential equations with two variables, which are similar to those of one-dimensional consolidation problem. The four-order ordinary differential equations about excess pore-air and excess pore-water pressures are got by applying Laplace transform and the substitution method. Then, the solutions of excess pore pressures and settlement are achieved in the Laplace transform domain. Afterwards, on the basis of Crump's method, the inverse Laplace transform is conducted to obtain the analytical solutions in time domain. The comparison is conducted to verify the exactness of the obtained solutions, and the two-dimensional plane strain consolidation property with the lateral semipermeable drainage boundary is illustrated and discussed. Parametric studies are demonstrated for the excess pore pressures and normalized settlement with the change of the boundary parameters, air-water and lateral-vertical permeability coefficients, and the distance and depth. It can be found that the lateral semipermeable drainage boundary impedes the consolidation rate obviously, and when different investigated parameters are adopted, the consolidation property is similar to each other under the later permeable and semipermeable drainage boundary conditions. 相似文献
17.
《工程地质学报》2017,25(3):605-611
在以往对非饱和土砂井地基固结理论研究中,均将涂抹区与非涂抹区土体渗透系数视为相等,这与实际工程并不相符。本文将考虑涂抹区土体渗透系数的变化,分析其对超孔隙气、水压力消散规律的影响。基于Fredlund一维固结理论以及Darcy定律和Fick定律,对有限厚度线弹性非饱和土砂井地基,在大面积均布瞬时荷载作用下,考虑涂抹区土体渗透系数的变化,利用Laplace变换并引入Bessel函数推导出Laplace变换下的解,再通过Crump方法编程实现Laplace逆变换得到超孔隙气压力、超孔隙水压力的半解析解。利用典型算例进行计算,分别得到在不同半径、不同涂抹区半径和不同涂抹程度的情况下,超孔隙气压力、超孔隙水压力随时间的变化规律。得出考虑涂抹作用时,超孔隙气、水压力的消散速度降低;涂抹区半径越大、涂抹程度越高速度越慢,反之消散越快。本研究丰富了非饱和土砂井固结理论,对非饱和土砂井固结特性的研究具有一定的工程参考价值。 相似文献