Abstract

The reasonable determination of ultimate bearing capacity is crucial to an optimal design of shallow foundations. Soils surrounding shallow foundations are commonly located above the water table and are thus in an unsaturated state. The intermediate principal stress has an improving effect on the unsaturated soil strength. In this study, the ultimate bearing capacity formulation of strip foundations in unsaturated soils is presented by using Terzaghi’s theory. The unified shear strength equation of unsaturated soils under a plane strain condition is utilized to capture the intermediate principal stress effect. Furthermore, two profiles of matric suction are considered and a hyperbolic function of the friction angle related to matric suction (φ^b) is adopted to describe strength nonlinearity. The validity of this study is demonstrated by comparing it with model tests and a theoretical solution reported in the literature. Finally, parameter studies are conducted to investigate the effects of intermediate principal stress, matric suction, and base roughness on the ultimate bearing capacity of strip foundations. Besides, the effect of strength nonlinearity is discussed with two methods representing the angle φ^b.

1. Introduction

The ultimate bearing capacity of a foundation denotes the maximum load that foundation soils can withstand [1–3], and its reasonable determination is one of the pivotal parts in foundation designs. Numerous studies about the ultimate bearing capacity of strip foundations are focused on saturated soils [4–8]. However, foundation soils are mostly in an unsaturated state on account of common uses of waterproof and draining measures [9–12]. Using the saturated soil mechanics to calculate the ultimate bearing capacity of foundations in unsaturated soils neglects the strength contribution from matric suction [9–17]. There are several attempts to account for the effect of matric suction in the determination of bearing capacity for shallow foundations within the context of the unsaturated soil mechanics.

Based on Fredlund’s two independent stress state variables theory, Oloo et al. [18] derived a formulation of ultimate bearing capacity for strip foundations in unsaturated soils by incorporating the effect of matric suction. Vanapalli and Mohamed [19] performed model tests to measure soil suction, and the result highlighted that matric suction can significantly increase the ultimate bearing capacity of rectangular foundations. Zhao et al. [20] conducted an upper-bound analysis of the ultimate bearing capacity for strip foundations in unsaturated soils under uniform and linear suction profiles, whereas a computer code was required to find optimal results. Oh and Vanapalli [21, 22] revealed nonuniform variations of matric suction with depth through a series of model tests for square foundations and conducted an extended finite element analysis by modifying the total stress approach to investigate the ultimate bearing capacity of shallow foundations in unsaturated soils. Vo and Russell [23] presented a slip line solution of ultimate bearing capacity for strip foundations in unsaturated soils where the contribution of matric suction to the effective stress is approximated as a function that varies linearly with depth, while the solution was represented in a dimensionless form not the traditional superposition one of three components. Tang et al. [24] established alternative equations of ultimate bearing capacity for strip foundations in unsaturated soils with the effective stress shear strength theory by assuming both uniform and varied suction stress profiles. Mahmoudabadi and Ravichandran [25] defined a coupled geotechnical-hydrological model incorporating site-specific rainfall and water table data to calculate the ultimate bearing capacity of shallow foundations based on unsaturated soil principles, yet the acquisition of site-specific historical hydrological data is difficult. Garakani et al. [26] proposed a new analytical solution for the ultimate bearing capacity of unsaturated soils by introducing a correction factor C_f, which could satisfactorily predict the measured result of various physical loading tests. However, the correction factor C_f is achieved from fitting or backcalculating the existing test results; that is, experimental data are firstly demanded to use this solution.

Note that these above results are based on the Mohr–Coulomb criterion, and hence the intermediate principal stress effect cannot be considered. The ultimate bearing capacity calculation of a strip foundation is often taken as a plane strain problem [1–3]. The plane strain condition signifies a true three-dimensional stress state where soil strength is higher than that under a conventional triaxial compression state. Extensive true triaxial test results of unsaturated soils [27, 28] and predictions of the Drucker–Prager criterion [29] and the unified strength theory [30, 31] have confirmed that a conservative result is obtained by utilizing the Mohr–Coulomb criterion without reflecting the influence of intermediate principal stress. Meanwhile, the intermediate principal stress has a marked impact on the strength of saturated soils [32–34]. The unified strength theory proposed by Yu [30] is a set of failure criteria including or approximating various conventional ones, and the intermediate principal stress effect can be reasonably reflected. On the basis of the unified strength theory [30] and the theory of two independent stress state variables [35], Zhang et al. [36, 37] presented a unified equation for the plane strain shear strength of unsaturated soils to reasonably capture the effect of intermediate principal stress. In addition, the relationship between the unsaturated soil strength and matric suction is nonlinear over a broad range of matric suctions rather than linear ones, and the friction angle related to matric suction (φ^b) varies nonlinearly with increasing matric suction [38–43]. A hyperbolic function of the angle φ^b was introduced to exhibit strength nonlinearity of unsaturated soils. Moreover, there are two profiles of matric suction commonly used in engineering practice [9, 10, 16, 40]: one is the matric suction distributing uniformly with depth, and the other is the matric suction decreasing linearly with depth.

The primary objective of this study is to present a formulation of the ultimate bearing capacity for strip foundations in unsaturated soils under uniformly and linearly distributed suctions. The unified shear strength equation of unsaturated soils and a hyperbolic function of the angle φ^b are adopted to account for the influences from intermediate principal stress and strength nonlinearity. The validity of the proposed formulation is further verified by comparing with two existing results reported in the literature. Additionally, a parametric study is carried out to study various effects of intermediate principal stress, matric suction and its distribution, strength nonlinearity, and base roughness on the ultimate bearing capacity of strip foundations.

2. Basic Theories

2.1. Unified Shear Strength Equation of Unsaturated Soils under Plane Strain Conditions

Shear strength τ_f for saturated soils using the Mohr–Coulomb criterion is written aswhere c′ is the effective cohesion, φ′ is the effective internal friction angle, and σ is the effective normal stress.

Shear strength of unsaturated soils based on the theory of two independent stress state variables [35] and the Mohr–Coulomb criterion is expressed aswhere φ^b is the friction angle related to matric suction, u_a is the pore air pressure, u_w is the pore water pressure, (u_a − u_w) is the matric suction, and (σ − u_a) is the net normal stress. Equation (2) degenerates into equation (1) for saturated soils when (u_a − u_w) = 0.

The angle φ^b is usually predicted by two methods [16, 40]. Method I: the relationship between unsaturated soil strength and matric suction is assumed to be linear for an overall suction range, which means that φ^b is a small stable value. Method II is divided into two segments: when matric suction is not larger than the air-entry value (u_a − u_w)_b, φ^b is a constant equal to φ′; when matric suction is larger than (u_a − u_w)_b, φ^b decreases continuously as a hyperbolic function. The expression of φ^b for Method II is written aswhere m and n are the two parameters representing the intercept and slope when equation (3b) is transformed into a linear equation, respectively, and n is further fitted as [37, 40].

The unified strength theory was proposed by Yu [30] to account for the intermediate principal stress effect. Shear strength of saturated soils under plane strain conditions from the unified strength theory is derived aswhere is the unified effective cohesion, is the unified effective internal friction angle, and b is the unified strength theory parameter, 0 ≤ b ≤ 1.

The value of parameter b is expressed aswhere σ_c is the uniaxial compressive strength, σ_t is the uniaxial tensile strength, and τ_o is the pure shear strength.

The parameter b not only describes the effect of intermediate principal stress, but also represents a choice of different failure criteria. Limit loci of the unified strength theory on a deviatoric plane are shown in Figure 1. Different failure criteria are achieved with the variation of parameter b. Moreover, the Mohr–Coulomb criterion is the lower bound with b = 0, while the twin-shear stress criterion is the upper bound with b = 1 [30].

Figure 1 

Limit loci of the unified strength theory on a deviatoric plane [30].

Therefore, when b = 0, equation (4) becomes to equation (1) with the Mohr–Coulomb criterion; when b = 1, equation (4) reduces to that with the twin-shear stress criterion; when 0 < b < 1, a series of new shear strength equations are introduced from equation (4). The intermediate principal stress effect is clearly presented by the parameter b varying from 0 to 1. In addition, a specific value of parameter b is in correspondence with the type of soils, and its calibration needs true triaxial test results. The parameter b is not simply a fitting parameter that can be obtained by three approaches: (1) the value of b is calculated through equation (5) when an unsaturated soil element fails in a pure shear stress state; (2) the value of b is found by comparing limit loci of the unified strength theory with true triaxial test results; (3) the value of b is obtained by a comparison of estimated results with measured ones of practical engineering problems such as the slope stability and the bearing capacity of shallow foundations.

Zhang et al. [36, 37] have taken comprehensive effects of matric suction and intermediate principal stress into account and then presented a unified equation for the shear strength of unsaturated soils under plane strain conditions by using the analogy method. The unified shear strength equation of unsaturated soils under a plane strain condition is formulated aswhere is the unified friction angle related to matric suction and c_tt is the unified total cohesion.

When (u_a − u_w) = 0, equation (6) becomes to be equation (4) for saturated soils with the unified strength theory; when b = 0 or 1, equation (6) degenerates into equation (2) for unsaturated soils with the Mohr–Coulomb criterion and the twin-shear stress criterion, respectively; when 0 < b < 1, equation (6) corresponds to a series of new shear strength equations for unsaturated soils.

2.2. Profiles of Matric Suction

Two profiles of matric suction are allowed for [9, 10, 16, 40]: the uniform suction (u_a − u_w) in Figure 2(a) is a constant with depth, and the linear suction in Figure 2(b) decreases linearly with depth from the surface suction (u_a − u_w)₀ at the ground surface and becomes zero at the water table D_w. When the water table D_w ⟶ ∞, the change of matric suction along depth can be neglected and linear suction becomes uniform suction.

(a)

(b)

(a)
(b)

Figure 2 

Two profiles of matric suction. (a) Uniform suction. (b) Linear suction.

2.3. Ultimate Bearing Capacity of Strip Foundations with Terzaghi’s Theory

Terzaghi’s ultimate bearing capacity of strip foundations in saturated soils is provided by effective cohesion, surcharge, and soil weight. The ultimate bearing capacity q_u is analyzed by limit equilibrium method of a rigid-plasticity body with the Mohr–Coulomb criterion. Figure 3 shows Terzaghi’s failure mode of a shallow strip foundation [1], where B is the width of strip foundations and D is the buried depth. The water table D_w is assumed to be located below the sliding surface of strip foundations.

Figure 3 

Failure mode of strip foundations based on Terzaghi’s theory.

Conventional Terzaghi’s ultimate bearing capacity of a strip foundation in saturated soils with equation (1) is written aswhere γ is the unit weight of foundation soils, q is the surcharge equal to soil weights above foundation base, and q is the γD; N_c, N_q, and N_γ are the bearing capacity factors of effective cohesion, surcharge, and soil weight using the Mohr–Coulomb criterion, respectively, which are expressed aswhere ψ is the angle between the plane EG and foundation base EF and ψ = φ′ for a completely rough foundation base, or ψ = 45^o + φ′/2 for a completely smooth one. Moreover, equation (8c) is a semiempirical equation proposed by Terzaghi [1].

Oloo et al. [18] established a formulation of ultimate bearing capacity for strip foundations in unsaturated soils with equation (2), and the formulation is given as

The contribution of matric suction to bearing capacities of unsaturated soils is represented by (u_a − u_w) tanφ^b × N_c in equation (9). When (u_a − u_w) = 0, equation (9) becomes to be equation (7) for saturated soils.

Fan et al. [44] applied the unified strength theory to account for the effect of intermediate principal stress and obtained a unified expression of ultimate bearing capacity for strip foundations in saturated soils with equation (4). This unified expression is written aswhere N_ct, N_qt, and N_γt are the bearing capacity factors based on the unified strength theory, which are expressed aswhere ψ =  for a completely rough foundation base or ψ = 45° +  for a completely smooth one.

Equation (10) only includes the effect of intermediate principal stress not considering matric suction. When b = 0, equation (10) reduces to equation (7) with the Mohr–Coulomb criterion not accounting for the intermediate principal stress effect.

Equations (9) and (10) merely reflect the effects of matric suction and intermediate principal stress, respectively. The unified shear strength equation for unsaturated soils under plane strain conditions as expressed in equation (6) is capable of describing comprehensive effects of matric suction and intermediate principal stress. Hence, equation (6) can be utilized to present a new formulation of ultimate bearing capacity for strip foundations in unsaturated soils with consideration of the intermediate principal stress effect.

3. Ultimate Bearing Capacity of Strip Foundations in Unsaturated Soils

The effect of intermediate principal stress and two profiles of matric suction (i.e., uniform and linear suctions) would be taken into account to derive the ultimate bearing capacity of a strip foundation in unsaturated soils.

3.1. Uniform Suction with Depth

The assumption of a uniform suction profile is widely used in geotechnical engineering problems of unsaturated soils [16, 36, 37, 40], such as the Earth pressure on retaining walls, the slope stability, and the bearing capacity of shallow foundations. The uniform suction profile is preferred because theoretical solutions of geotechnical engineering problems in unsaturated soils could be conveniently extended from those of saturated soils. For the case of uniform suction, strip foundations are in a general shear failure model, as shown in Figure 3. The wedge EFG is always in an elastic state, and EG is the inner boundary of a sliding zone with an angle ψ between EG and the horizontal plane.

Unsaturated soils in the sliding zone are in a plastic equilibrium state consisting of radial shear zone ② and Rankine passive zone. ③ The sliding surface can be described by a log spiral aswhere r₀ is the initial radius (i.e., the length of EG or FG) and θ is the angle between any radius r and the initial radius r₀, which are shown in Figure 3.

Figure 4 illustrates the force analysis of an elastic wedge EFG, where Q_u is the ultimate load of a strip foundation. Then, vertical force equilibrium of the elastic wedge EFG is written aswhere P_p is the total passive Earth pressure acting on the boundary surface EG (or FG).

Figure 4 

Force analysis of an elastic wedge EFG.

The total passive Earth pressure P_p given in equation (14) resulted from the unified total cohesion c_tt, the surcharge q, and the soil weight γ [1, 44], respectively. For a completely rough base, Terzaghi regarded the elastic wedge boundary EG as a retaining wall surface on the basis of the Earth pressure theory to determine the passive Earth pressure P_p:where P_py is the vertical component of P_p.

P_py is calculated in three steps as follows:(1)When q = γ = 0, the passive Earth pressure P_pc only caused by the cohesion c_tt is obtained as where k_pc is the coefficient of passive Earth pressure for cohesion.(2)When c_tt = γ = 0, the passive Earth pressure P_pq only caused by the surcharge q is calculated as where k_pq is the coefficient of passive Earth pressure for surcharge.(3)When c_tt = q = 0, the passive Earth pressure P_pγ only caused by the soil weight γ is written aswhere k_pγ is the coefficient of passive Earth pressure for soil weight and k_pγ needs to be determined by a trial method. More detailed derivations of the above three passive Earth pressure components can be found in Terzaghi [1] and Fan et al. [44]. Then, the vertical component P_py of total passive Earth pressure is brought by superimposing equations (15)–(17) as Substituting equations (14) and (18) into (13), the ultimate bearing capacity q_u of strip foundations in unsaturated soils for uniform suction can be rearranged as

Through some mathematical transformations, N_ct, N_qt, and N_γt are found to be the same as equations (11a)–(11c).

Equation (19) can represent comprehensive effects of intermediate principal stress (0 ≤ b ≤ 1) and uniform suction (u_a − u_w). The unified strength theory parameter b depicts the effect of intermediate principal stress as well as the selection of different failure criteria. When b = 0, equation (19) degenerates into equation (9) for unsaturated soils with the Mohr–Coulomb criterion; when b = 1, equation (19) becomes the ultimate bearing capacity for unsaturated soils with the two-shear stress criterion; when 0 < b < 1, equation (19) generates a series of new ultimate bearing capacity equations for strip foundations in unsaturated soils. Matric suction (u_a − u_w) > 0 corresponds to an unsaturated state of foundation soils. When (u_a − u_w) = 0, equation (19) reverts to equation (10) for saturated soils with the unified strength theory. When b = 0 and (u_a − u_w) = 0, equation (19) reduces to equation (7) for saturated soils with the Mohr–Coulomb criterion.

3.2. Linear Suction with Depth

For the case of linear suction, matric suction decreases linearly with depth and becomes zero at the water table D_w. As illustrated in Figure 5, Oh et al. [21, 22, 45] defined the average matric suction (u_a − u_w)_m at the centroid of zone ① correspondingly to the stress bulb within a depth of 1.5B beneath foundation base as a representative matric suction value. The value of (u_a − u_w)_m can be adopted to calculate the contribution of matric suction with a linear profile to the ultimate bearing capacity of strip foundations. The zone ① in Figure 5(a) is a trapezoid with a height of 1.5B, a top side length of (1 − D/D_w) (u_a − u_w)₀, and a bottom side length of (1 − (D + 1.5B)/D_w) (u_a − u_w)₀. The location of the centroid for zone ① is assumed at a distance h from the bottom side. According to the theorem of area moment, h is obtained as

(a)

(b)

(a)
(b)

Figure 5 

Average matric suction under the nonuniform suction profiles. (a) Linear suction. (b) Nonlinear suction.

Then, (u_a − u_w)_m is derived as

By implementing similar derivations of uniform suction with depth in Section 3.1, the ultimate bearing capacity of strip foundations in unsaturated soils for linear suction is written as

It is seen from equation (22) that the effect of linear suction is accounted for by the surface suction (u_a − u_w)₀ and the water table D_w. When the water table D_w ⟶ ∞, the change of matric suction along depth can be neglected and linear suction becomes uniform suction; then, equation (22) reduces to equation (19) for uniform suction (i.e., equation (19) is a special case of equation (22) for D_w ⟶ ∞).

The matric suction of unsaturated soils is more of a nonlinear profile with depth that mainly depends on the soil characteristics (such as the soil type, soil saturation level, and saturated hydraulic conductivity) and different environmental conditions (surface evaporation and rainfall) or man-made activities. Regarding shallow foundations of buildings or roads, there are some protective measures existing on the ground surface. The unsaturation profile of near-surface soils is thus in a steady state and is less affected by environmental conditions and man-made activities. In the absence of measured suction data in practice, the assumption of linear suction above the water table can be made under a hydrostatic pressure condition. This is a safe assumption as a conservative ultimate bearing capacity is obtained, and its calculation process is simple and practical.

This study merely addresses two simple suction profiles, i.e., the uniform and linear suction profiles. For a measured suction profile or nonlinear suction profile shown in Figure 5(b), the average matric suction concept can be extended based on similar procedures in this paper, and then the ultimate bearing capacity of strip foundations in unsaturated soils is easily obtained.

4. Validation of the Proposed Formulation

The validity of the proposed ultimate bearing capacity formulations as expressed in equations (19) and (22) is verified by comprising with the results of Vanapalli and Mohamed [19] and Zhao et al. [20].

4.1. A Comparison with the Result of Vanapalli and Mohamed [19]

Rectangular foundation model tests for estimating the ultimate bearing capacity of unsaturated coarse-grained soils were carried out by Vanapalli and Mohamed [19]. The size of a model tank is length × width × height = 900 mm × 900 mm × 750 mm, and the size of a foundation is B × L = 100 mm × 100 mm; soil parameters are γ = 16.02 kN/m³, c′ = 0.6 kPa, and φ′ = 35.3°. The rectangular foundation was placed on the ground surface with D = 0. The air-entry value (u_a − u_w)_b equal to 3 kPa was obtained by the fitted soil-water characteristic curve (SWCC). Vanapalli and Mohamed [19] performed four model tests along with the average matric suction (u_a − u_w)_m of 0, 2, 4, and 6 kPa, and the corresponding bearing capacity was 121, 570, 715, and 840 kPa, respectively. An equation was also presented for estimating the ultimate bearing capacity of rectangular foundations in unsaturated soils by incorporating the degree of saturation and the SWCC. Figure 6 shows the comparison of this study with the result of Vanapalli and Mohamed [19]. Additionally, the angle φ^b is determined by Method II with m = 0.5 kPa and n = 0.0297. The ultimate bearing capacity formulation of this study needs to be modified for a rectangular foundation with shape factors aswhere ξ_γ, ξ_q, and ξ_c are Vesic’s shape factors of soil weight, surcharge, and cohesion [3], respectively.

Figure 6 

Comparisons with the result of Vanapalli and Mohamed [19].

As can be seen from Figure 6, matric suction considerably enhances the ultimate bearing capacity of shallow foundations. When (u_a − u_w)_m is increased from 0 to 6 kPa, q_u of model tests is increased by 5.94 times, so the contribution of matric suction to the ultimate bearing capacity of unsaturated soils is very remarkable. When b = 0.75, predictions of this study from equation (23) are in good agreement with model test results of Vanapalli and Mohamed [19]. Accordingly, the validity of equation (23) is well demonstrated. On the other hand, Figure 6 suggests that the strength of coarse-grained soils used in this model test should be described by equation (6) with b = 0.75.

When b = 0, the prediction of equation (23) is distinctly less than the result of this model test. It means that the Mohr–Coulomb criterion (i.e., b = 0) underestimates actual bearing capacities of unsaturated soils due to neglecting the intermediate principal stress effect. Nevertheless, when b = 1, the prediction of equation (23) is higher than model test results and exaggerates the improving effect of intermediate principal stress.

In addition, the result of this study with b = 0.75 is close to the estimation of Vanapalli and Mohamed [19] for a suction range from 0 to 6 kPa. However, the estimated ultimate bearing capacity of Vanapalli and Mohamed [19] shows a reduction after matric suction reaches 6 kPa. It is because that the degree of saturation in the equation of Vanapalli and Mohamed [19] has a more reducing effect than the strengthening effect of increasing matric suction on the ultimate bearing capacity. In this study, the angle φ^b of Method II decreases nonlinearly with increasing matric suction, and the decrease of φ^b would reduce the ultimate bearing capacity. There are three cases of the relationship between a strengthening effect of increasing matric suction and a reducing effect of decreasing the angle φ^b on the ultimate bearing capacity, and detailed analyses are discussed in Section 5.3. For the specific experimental condition of Vanapalli and Mohamed [19], the reducing effect of φ^b is less than the strengthening effect of increasing matric suction, and the reduction in ultimate bearing capacity is not captured in this study while the increasing rate is decreased. Furthermore, the reduction in ultimate bearing capacity of Vanapalli and Mohamed [19] is only predicted not measured. Oh and Vanapalli [21] also revealed the decline in the estimated ultimate bearing capacity of shallow foundations, while there is no decrease in model test results.

4.2. A Comparison with the Result of Zhao et al. [20]

Based on the Mohr–Coulomb criterion, Zhao et al. [20] derived upper-bound solutions of the ultimate bearing capacity for strip foundations in unsaturated soils with uniform and linear suction profiles. Figure 7 shows the comparison between the results of Zhao et al. [20] and this study with equations (19) and (22) for B = 0.5 m, D = 0.5 m, D_w = 4 m, γ = 18.3 kN/m³, c′ = 5 kPa, φ′ = 20°, and φ^b = 15°. The parameter b takes three values (i.e., 0, 0.5, and 1).

(a)

(b)

(a)
(b)

Figure 7 

Comparisons with the result of Zhao et al. [20]. (a) Uniform suction. (b) Linear suction.

It is indicated from Figure 7 that predictions of this study with b = 0 not incorporating the intermediate principal stress effect are reasonably consistent with the upper-bound results of Zhao et al. [20] using the Mohr–Coulomb criterion. Furthermore, if the effect of intermediate principal stress is taken effectively, i.e., b = 0.5 and 1, the prediction of this study is larger than that of the upper-bound method, particularly for the uniform suction profile in Figure 7(a).

5. Parametric Studies

Influence characteristics of intermediate principal stress, matric suction, strength nonlinearity from nonlinearity in the angle φ^b, and base roughness on the ultimate bearing capacity of strip foundations in unsaturated soils are investigated herein for input parameters of B = 4 m, D = 3 m, D_w = 12 m, γ = 19.5 kN/m³, c′ = 20 kPa, and φ′ = 30°. The angle φ^b of Method II is only considered to discuss the effect of strength nonlinearity, while φ^b = 20° of Method I is used for the other three influence factors. In addition, a completely rough foundation base is adopted in Sections 5.1–5.3.

5.1. Effect of Intermediate Principal Stress

The effect of intermediate principal stress is described by the parameter b in the unified strength theory, and a larger b value represents a more significant effect of intermediate principal stress. Figure 8 illustrates the variation of ultimate bearing capacity with the change of parameter b.

(a)

(b)

(a)
(b)

Figure 8 

Effect of intermediate principal stress. (a) (u_a − u_w) = (u_a − u_w)₀ = 30 kPa. (b) (u_a − u_w) = (u_a − u_w)₀ = 90 kPa.

Figure 8 displays that the ultimate bearing capacity q_u has a nearly linear increase with b. When b is changed from 0 to 1, q_u for the case of uniform suction is increased by 92.7% for (u_a − u_w) = (u_a − u_w)₀ = 30 kPa, which is roughly identical to that of linear suction (increased by 93.4%). Therefore, the effect of intermediate principal stress should be taken into account to calculate the ultimate bearing capacity of strip foundations in unsaturated soils, and the result without incorporating the intermediate principal stress effect is conservative. Additionally, q_u in case of linear suction is smaller than that of uniform suction, especially for (u_a − u_w) = (u_a − u_w)₀ = 90 kPa. A reasonable profile of matric suction is necessarily estimated in practical engineering. Meanwhile, comparisons of Figures 8(a) and 8(b) indicate that larger matric suctions will yield a more conspicuous difference in the results between uniform and linear suctions.

5.2. Effect of Matric Suction

Matric suction is a unique property of unsaturated soils, and its influence on the ultimate bearing capacity of unsaturated soils lies in two aspects: suction magnitude and profile pattern. Figure 9 shows the relationship between the ultimate bearing capacity of unsaturated soils and matric suction under uniformly and linearly distributed suctions with b = 0 and 1, and matric suction ranges from 0 to 150 kPa.

(a)

(b)

(a)
(b)

Figure 9 

Effect of matric suction. (a) b = 0. (b) b = 1.

Figure 9 indicates that q_u increases approximately linearly with matric suction. When b = 1 and matric suction increases from 0 to 150 kPa, q_u in case of uniform suction is increased by 54.6%, which is much larger than that of linear suction (increased by 29.6%). Ignoring the change of matric suction along the depth, q_u of uniform suction is rather larger, and then foundation designs based on this assumption may be unsafe. Moreover, the effect of suction profile on the ultimate bearing capacity of strip foundations cannot be neglected. Comparisons between Figures 9(a) and 9(b) suggest that the difference between two suction profiles is larger for b = 1 than b = 0. Hence, the influence of matric suction including the suction magnitude and suction prolife is significant, and the profile of matric suction in different situations should be monitored in situ.

5.3. Effect of Strength Nonlinearity

Sections 5.1 and 5.2 have demonstrated that the result of linear suction is similar to that of uniform suction. Accordingly, only uniform suction is considered herein to explore the effect of strength nonlinearity. The air-entry value (u_a − u_w)_b is assumed to be 90 kPa, b takes 0 and 1, and matric suction ranges from 0 to 240 kPa. Figure 10 presents the effect of strength nonlinearity on the ultimate bearing capacity of a strip foundation in unsaturated soils. The angle φ^b of Method I is a small constant with φ^b = 20°. For Method II, when (u_a − u_w) ≤ (u_a − u_w)_b, φ^b = φ′ = 30°; once (u_a − u_w) > (u_a − u_w)_b, φ^b is calculated from equation (3b) with n = 0.0354, and m is taken as 1, 5, and 20 kPa, respectively.

(a)

(b)

(a)
(b)

Figure 10 

Effect of strength nonlinearity. (a) b = 0. (b) b = 1.

It can be seen from Figure 10 that q_u of Method I increases linearly without a turning point. However, the result of Method II is divided into two stages: when (u_a − u_w) ≤ (u_a − u_w)_b = 90 kPa, q_u increases linearly with (u_a − u_w); when (u_a − u_w) > (u_a − u_w)_b = 90 kPa, q_u is closely related to the parameter m. A comparison between the predictions of Method I and Method II implies the result of Method II is larger than that of Method I in the low suction region of (u_a − u_w) ≤ (u_a − u_w)_b = 90 kPa. This is because φ^b of Method I is smaller than that of Method II in the low suction region. In the high suction region of (u_a − u_w) > (u_a − u_w)_b = 90 kPa, relative magnitude of the predictions from Method I and Method II is dependent on the parameter m.

The value of m can describe the dual-effect of high suction on the ultimate bearing capacity through the relationship between a strengthening effect of increasing matric suction and a reducing effect of decreasing the angle φ^b. There are three cases of this dual effect. Case 1: when the reducing effect of φ^b is more pronounced than the strengthening effect of matric suction, q_u decreases nonlinearly with matric suction and approaches a constant value, which is in accordance with the result of m = 1 kPa. Case 2: when the reducing effect of φ^b is slightly weaker than the strengthening effect of matric suction, q_u increases somewhat with matric suction corresponding to that of m = 5 kPa. Case 3: when the reducing effect of φ^b is much less than the strengthening effect of matric suction, q_u increases markedly with matric suction, and the result of m = 20 kPa belongs to this case.

Consequently, high suction has a complex dual effect and m can be referred to as an index to characterize the changing velocity of φ^b with matric suction. Variation laws of the ultimate bearing capacity for strip foundations under high suction values are in fact attributed to strength nonlinearity of unsaturated soils in terms of a decreasing angle φ^b.

5.4. Effect of Base Roughness

The roughness of foundation base affects the ultimate bearing capacity of strip foundations through directly influencing the angle ψ between the elastic wedge ① and the horizontal plane EF. The ultimate bearing capacity for two limits of base roughness (i.e., a completely rough base and a completely smooth base) under uniform and linear suctions is shown in Figure 11 with (u_a − u_w) = (u_a − u_w)₀ = 90 kPa.

(a)

(b)

(a)
(b)

Figure 11 

Effect of base roughness. (a) Completely rough. (b) Completely smooth.

From Figure 11, it can be seen that base roughness has a remarkable influence on the ultimate bearing capacity of strip foundations and q_u of a completely rough base is larger than that of a completely smooth base. In the case of uniform suction, q_u of a completely rough base is increased by 82.3% when b varies from 0 to 1, while that of a completely smooth base is increased by 79.4%. As a result, the intermediate principal stress effect is more pronounced for a completely rough base. Measures should be taken to improve the roughness of foundation base avoiding adverse impacts on foundation safety.

6. Conclusions

(1)The ultimate bearing capacity formulation of strip foundations under two suction profiles is presented by incorporating the intermediate principal stress effect. The ultimate bearing capacity equations of strip foundations in saturated soils using the Mohr–Coulomb criterion and using the unified strength theory are both special cases of the proposed formulation. Furthermore, the proposed formulation can degenerate into that of unsaturated soils based on the Mohr–Coulomb criterion. Meanwhile, the validity and wide applicability of this study are confirmed by comprising with model test results and an upper-bound solution available in the literature.(2)The ultimate bearing capacity of strip foundations is found to be sensitive for improving the effect of intermediate principal stress and increases distinctly with the unified strength theory parameter b. The result with b = 0 not including the intermediate principal stress effect is conservative. Consequently, the effect of intermediate principal stress should be appropriately considered to achieve more potentialities of unsaturated soils and reduce project costs.(3)Matric suction and its profiles can significantly enhance the ultimate bearing capacity of strip foundations in unsaturated soils. The ultimate bearing capacity increases linearly with matric suction and the effect of uniform suction is more obvious. Field monitoring of matric suction at shallow depths is preferred to accurately model a suction profile. Base roughness is able to markedly affect the ultimate bearing capacity of strip foundations, and reasonable measures are taken to increase the roughness of foundation base.(4)The effect of strength nonlinearity was investigated by comparing Method I with Method II. Method I with a small and stable value of the angle φ^b has simple calculation steps but its results are not precise enough. Method II with a hyperbolic function of the angle φ^b is more consistent with practical conditions, but its calculation is more complicated due to the difficulty in obtaining an intercept m. The dual effect of high suction on unsaturated soil strength (and thus on the ultimate bearing capacity of strip foundations) should be well addressed.

The matric suction of unsaturated soils has nonlinear variations with depth that is highly dependent on the soil characteristics and different environmental conditions. This study merely addresses uniform and linear suction profiles, and nonlinear profiles of matric suction versus the depth to develop an accurate and general framework for calculating the ultimate bearing capacity of strip foundations will be implemented in future works. On the other hand, this paper mainly conducts theoretical research studies on the design of strip foundations considering the effect of matric suction. Although some simplified assumptions are made, it is useful for many readers and researchers due to the fact that closed-form equations of the ultimate bearing capacity concerning the intermediate principal stress effect and strength nonlinearity are obtained. The finite element analysis, laboratory model tests, and in situ investigations will be performed in future studies.

Data Availability

The data used to support the findings of this study are available from the corresponding author upon request.

Conflicts of Interest

The authors declare that there are no conflicts of interest regarding the publication of this paper.

Acknowledgments

The financial supports provided by the National Natural Science Foundation of China (NSFC) (Grant nos. 51878056 and 41202191), the Opening Fund of State Key Laboratory of Geohazard Prevention and Geoenvironment Protection (Grant no. SKLGP2020K022), the Fundamental Research Funds for the Central Universities, and CHD (Grant nos. 300102289720 and 300102280108) are gratefully acknowledged.