Abstract
The effective stress equation for unsaturated soil is the most important equation in unsaturated soil mechanics. It has been derived by many scholars using different methods. However, none of them considered the gradient of the pore water content, which results in unreasonable force balance equations for different constituent phases in unsaturated soil. To introduce the gradient, we propose an extended three-phase physical model that includes capillary water, air, and generalized soil skeletons. Based on this model, three balance equations for these three constituent phases are separately formulated by considering the gradient of the pore water content. Comparing the result of the superposition of these three balance equations with the total balance equation, we derive a generalized Terzaghi’s effective stress equation. This equation states that the effective stress is equal to the total stress minus the neutral stress. In comparison with the classical Bishop’s equation, the generalized Terzaghi’s equation ensures a smooth and continuous transition from unsaturated to saturated conditions not only in mathematical expression but also in physical meaning. Furthermore, the different pressure effects of capillary water and adsorbed water, their volumetric (or areal) effects, and the transformation between them can be considered by adopting the effective saturation of the capillary water as the effective stress parameter. Therefore, the generalized Terzaghi’s equation can provide a better choice for estimating the effective stress in unsaturated soils.
Highlights
The effective stress equation is the fundamental equation of soil mechanics and even porous media mechanics [1, 2]
The derivation of the effective stress equation is performed by formulating the force balance equations of an unsaturated soil differential element (DE) and its constituent phases DEs
An extended three-phase porous medium model is presented, which consists of capillary water, pore air, and a generalized soil skeleton
Summary
The effective stress equation is the fundamental equation of soil mechanics and even porous media mechanics [1, 2]. Lu and Likos [18] introduced three types of interparticle forces to formulate mechanical balance equations for the RVEs of unsaturated soils and coin the concept of suction stress, which serves as a mechanical foundation for better understanding the effective stress equation from a microscopic particle level to an RVE level. The second category does not consider the interaction forces and the water content gradient They neglected the stresses that act on the cross-section of soil particles and on the contact area between soil particles induced by the pore-fluid pressure in unsaturated soils. The objective of this study is to derive a new generalized Terzaghi’s effective stress equation for unsaturated soils by considering the pore water content gradient. The implications of this new equation are drawn out by comparing with some existing Bishop-type effective stress equations
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