Flexural Performance of Steel Reinforced ECC-Concrete Composite Beams Subjected to Freeze–Thaw Cycles

Abstract

Experimental and theoretical investigations on the flexural performance of steel reinforced ECC-concrete composite beams subjected to freeze–thaw cycles are presented in this paper. Four groups of reinforced composite beams with different ECC height replacement ratios subject to 0, 50, 100 and 150 cycles of freeze–thaw were physically tested to failure. Experimental results show that the bending capacity decreases with the increase of freeze–thaw cycles regardless of ECC height replacement ratios. However, the ultimate moment, stiffness and durability of ECC specimens and ECC-concrete composite specimens are greater than those of traditional concrete specimens, owing to the excellent tensile performance of ECC materials. With the increase of ECC height, the crack width and average crack spacing gradually decrease. According to materials’ constitutive models, compatibility and equilibrium conditions, three failure modes with two boundary failure conditions are proposed. Simplified formulas for the moment capacity are also developed. The results predicted by the simplified formulas show good agreement with the experimental moment capacity and failure modes. A parametric analysis is conducted to study the influence of strength and height of ECC, amount of reinforcement, concrete strength and cycles of freeze–thaw on moment capacity and curvature ductility of ECC-concrete composite beams.

1 Introduction

Many structures are subjected to harsh environment in the cold regions of the world, for example northern Europe, Canada, Russian, northeast Asia, causing partial or full damage due to freeze–thaw severe environment. Engineered cementitious composite (ECC) has been successfully used in many structures as it has excellent tensile performance and exhibits multiple micro cracks, resulting in a greatly improvement of strain capacity, toughness, ductile performance and energy dissipation ability (Li et al. 2001; Li 2012; Yoo and Yoon 2016; Kang et al. 2016; Smarzewski and Barnat-Hunek 2017). ECC has also shown self-healing capability (Liu et al. 2017; Hung and Su 2016), excellent freeze–thaw resistance ability (Yun et al. 2011; Ge et al. 2018; Özbay et al. 2013), fire-resistance ability (Wu and Li 2017; Pourfalah 2018) and durability in severe environment (Liu et al. 2017; Özbay et al. 2013).

Experimental investigations show that replacement of concrete with ECC material has improved both the bending capacity (Zhang 2014; Zhang et al. 2017; Wu et al. 2017; Ding et al. 2018; Ge et al. 2018) and ductility (Zhang et al. 2017; Wu et al. 2017; Ding et al. 2018; Ge et al. 2018), but, also significantly reduced the crack width especially before yielding of steel (Pourfalah 2018). Consequently, waterproof and corrosion resistance (Maalej and Li 1995; Maalej and Leong 2005; Maalej et al. 2012) are also enhanced, resulting in durability improvement of ECC-concrete composite components.

Many research studies have focused on investigating various properties of reinforced concrete beams exposed to freeze–thaw cycling. For example, acoustic emission activity of CFRP-strengthened reinforced concrete beams (Choi and Yun 2015), steel reinforced/prestressed concrete beams (Cao et al. 2015, 2016; Qin et al. 2016), the effect of subfreezing temperatures on the behavior and ultimate capacity of GFRP-reinforced concrete beams (Berry et al. 2017) and the flexural performance of reinforced concrete beams subjected to the coupling action of freeze–thaw cycles and sustained loading in mixed aggressive environment (Diao et al. 2009). On the other hand, investigations on the flexural performance of steel reinforced ECC-concrete elements in severe environment, including freeze–thaw cycling, are relatively limited.

In this paper, experimental and analytical studies are conducted to evaluate the effect of freeze–thaw cycles on deflections, cracks, bending capacity and failure modes of ECC-concrete composite beams. Based on the analytical investigation developed, three failure modes, two boundary failure conditions and their discriminant are proposed. A comprehensive parametric study is also conducted, considering the effect of strength and amount of reinforcement, concrete strength, ECC strength and height on flexural performance of composite beams after freeze–thaw cycles.

2 Experimental Program

2.1 Test Specimens Design

Table 1 lists the sixteen beams and the values of the two main parameters considered in this investigation, namely the ECC height replacement ratio, r_h and number of freeze–thaw cycles, n. Fig 1 shows the geometrical dimensions, reinforcement, materials used and supporting system test specimens. The specimen total span length l = 1000 mm, flexural-shear span length l_mv = 300 mm, pure flexural span length l_m = 300 mm. Cross-section width b and height h are 100 and 150 mm, respectively, the vertical distance of the cross-section bottom edge to the centroid of steel bars a_s is 25 mm, the cross-section effective height h₀ is 125 mm. The top steel reinforcement is 2φ10, h_e is the ECC replacement height and r_h is the ECC height replacement ratio, r_h = h_e/h₀. The bottom longitudinal reinforcement is 2φ12 for all test specimens. Each group notation is selected to identify the ECC height replacement ratio used (BA, BB, BC and BD represents r_h = 0, 0.30, 0.60 and 1.20, respectively) and the cycles n (0, 50, 100 and 150) of freeze–thaw. All specimens were loaded by two equal point loads and simply supported as shown in Fig. 1.

Table 1 Specimen design parameters.

Fig. 1

Details of test specimens.

2.2 Test Instrumentation Layout

Displacement trancedusers were located at midspan, loading and supporting points to measure movements at these locations. The load was applied by a manual hydraulic jack and measured by a load transducer. Two electrical resistance strain acquisition units (DP3862) were used to capture strains at various stages of loading: one was connected to the load transducer while the other was used to capture strains from mid-span strain gauges attached to steel reinforcement. Equidistant dial indicators installed along the height of the beam cross-section at midspan were used to measure the average ECC/concrete strains. The size of cracks along the span was measured by crack width measurement instrument KON-FK (B) (Zhou 2013).

2.3 Freeze–Thaw Cycles Test

The rapid water freezing and thawing method was adopted (China Renewable Energy Engineering Institute 2006), the maximum and minimum temperatures at the core area of specimens should be controlled at 8 ± 2 °C and − 17 ± 2 °C, respectively, and every cycle should be accomplished within 4 h. The freeze–thaw test system was used to accomplish the required cycles. Once achieved the predetermined cycles, tests of concrete cubes, ECC (flat-plates for tension and prisms for compression), flexural specimens (concrete beams, ECC-concrete composite beams and ECC beams) were conducted as explained below.

2.4 Materials

2.4.1 Concrete

Concrete cubic compressive properties were determined from testing 150 × 150 × 150 mm³ concrete cube specimens (China Academy of Building Research 2003) (three specimens for each group) and are presented in Table 2. f_cu is the compressive strength of concrete cube, u and CoV represent the mean and variation coefficient of measured compressive strength, respectively. Compressive strength, tensile strength and modulus of elasticity are calculated in accordance to reference (China Academy of Building Research 2010).

Table 2 Compressive strength of concrete cubes.

2.4.2 Ecc

Tensile properties presented in Table 3 were obtained from testing three 40 × 15 × 160 mm³ rectangular flat-plates (Ge et al. 2018). u and CoV represent the mean and variation coefficient of measured tensile strength, respectively. ECC compressive properties presented in Table 4 were captured from testing three 40 × 40 × 160 mm³ prismatic specimens (Ge et al. 2018; Xu et al. 2009). f_ecp and ε_ecp are the stress and strain corresponding to the peak point of curves, respectively. The measured stress–strain curves of ECC are shown in Fig. 2.

Table 3 Tensile properties of ECC rectangular flat-plates.

Table 4 Compressive properties of ECC prismatic specimens.

Fig. 2

Stress–strain of unfrozen ECC.

2.4.3 Steel reinforcement

Table 5 presents the mechanical properties (General Administration of Quality Supervision, Inspection and Quarantine of the People’s Republic of China. Metallic materials tensile testing at ambient temperature GB/T228-2002) of steel reinforcements, as the tested freeze–thaw temperature range (− 17 ± 2 °C – 8 ± 2 °C) has less effect (Liu et al. 2008), their values are considered as constant.

Table 5 Mechanical properties of reinforcing bars

3 Test Results

3.1 Load–Strain Distribution

Figure 3 (taking group BC for example) presents the cross-section average strain distributions at various loads, Fig. 3a–d for 0, 50, 100 and 150 freeze–thaw cycles, respectively.

Fig. 3

Cross-section average strain distributions.

As observed from Fig. 3, the cross-section strain is generally linearly distributed, validating the plane-section assumption and no delamination between concrete and ECC.

Figure 4 presents the specimens midspan moment-steel strain curves. As observed from Fig. 4, the steel bars of all specimens yielded. After yielding of steel reinforcement, the steel strains of group BA (reinforced concrete specimens) increase, even the load does not increase, indicating full but gradual collapse of test specimens. On the other hand, test specimens in group BD (reinforced ECC specimens), groups BB and BC (reinforced ECC-concrete composite specimens) are able to carry more moments beyond yielding of steel, indicating that ECC materials in tensile zone can provide tensile resistance together with steel bar.

Fig. 4

Effect of freeze–thaw cycles on moment-strain curves.

3.2 Midspan Load–Deflection Curves

Figure 5 presents the specimens midspan moment-deflection curves. Relative bending capacity and deflections with respect to control unfrozen reinforced concrete beams are presented in Table 6. M_u is the bending capacity of each specimen, M_u0 is the bending capacity of control unfrozen specimen in each group. M_q0 and d_q are the moment and the corresponding deflections under quasi-permanent combinations of unfrozen specimen (BA-0, BB-0, BC-0 and BD-0), respectively.

Fig. 5

Effect of freeze–thaw cycles on moment-deflection curves.

Table 6 Comparison of bending capacity and deflection—taking unfrozen specimen as control specimen.

As observed from Fig. 5 and Table 6, the bending capacities decrease with the increase of freeze–thaw cycles regardless of the cross-section form. After 50, 100 and 150 cycles, the bending capacities of group BA are 97%, 93% and 69% of that of its control unfrozen specimen BA-0, respectively. The ultimate moments of group BB are 96%, 91% and 82% of that of its comparison control unfrozen specimen BB-0, respectively. The ultimate moments of group BC are 86%, 80% and 73% of that of its control unfrozen specimen BC-0 respectively. The ultimate moments of group BD are 93%, 91% and 90%, respectively, of that of its control unfrozen specimen BD-0. Deflections of specimens after 50 and 100 cycles are generally lower, but after 150 cycles are higher, than that of control unfrozen specimen. This observation is in agreement with a previous investigation (Ge et al. 2018) that showed that the positive effect of water conservation environment on the elastic modulus is greater than the negative effect of freeze–thaw less than 100 cycles.

Table 7 presents the comparisons of bending capacities and deflections, where the reinforced concrete specimens are taken as comparison specimen. M_uc is the bending capacities of control concrete specimen without ECC layer (BA-0, BA-50, BA-100 and BA-150) in each group. M_qc and d_q are the moment and corresponding deflection under quasi-permanent combinations of control concrete specimen, respectively.

Table 7 Comparison of bending capacity and deflection - taking concrete specimen as control specimen.

As observed from Table 7, the bending capacities of ECC-concrete composite specimens (group BB and BC) and ECC specimens (group BD) are greater than that of concrete specimens (group BA). Compared with the control specimen BA-0, the bending capacities improvement of BB-0, BC-0 and BD-0 are 4%, 28% and 12%, respectively. Specimens subjected to 50, 100 and 150 cycles show the same trend. For unfrozen specimens, the deflections of specimen BB-0, BC-0 and BD-0 under the quasi-permanent moment combinations are 79%, 81% and 85% of that of the control concrete specimen BA-0, respectively. Similar trends to specimens subjected to 50, 100 and 150 cycles, illustrating the bending capacity and flexural stiffness are improved when the tension zone was replaced by ECC layer.

3.3 Maximum Crack Width

Figure 6 presents the tested maximum crack widths at the same height of steel reinforcement for various load. ω_max,lim is the crack width limit value (Liu et al. 2008) and τ_l is the crack widths amplification coefficient under long-term load action (China Academy of Building Research 2010) of reinforced concrete specimen, ω_max,lim/τ_l is the limit value under testing load. Table 9 presents the crack width of specimens under the quasi-permanent moment combinations of tested control concrete specimens. M_qc and ω_q are the moment under quasi-permanent combinations of specimen BA-0 and the corresponding crack width, respectively. The average crack spacing l_cr and number of cracks n_cr are also presented in Fig. 7.

Fig. 6

Maximum crack widths under testing load.

Fig. 7

Average crack spacing and number of cracks.

As can be seen from Figs. 6, 7 and Table 8, for unfrozen specimens, the crack width under quasi-permanent moment combinations of specimen BB-0, BC-0 and BD-0 are 59%, 50% and 44% of that of the control concrete specimen BA-0, respectively, indicating that crack widths decrease as the ECC height replacement ratios increase. It is also noted that the crack widths under quasi-permanent moment combinations all meet the requirement of service state, less than 0.2 mm. The average crack spacing decreases while number of cracks increases as the ECC height replacement ratios increase, illustrating that the application of ECC can control the cracks distributed along the specimens tensile zone effectively.

Table 8 Comparison of bending capacities and deflection—taking concrete specimen as control specimen.

3.4 Failure Modes

Typical under-reinforced flexural failure occurred for all specimens where steel reinforcement yielded, followed by crushing of concrete/ECC in the compressive zone (concrete for reinforced concrete specimens (group BA) and ECC-concrete composite specimens (group BB and BC), ECC for reinforced ECC specimens (group BD)). Fig 8 presents the failure modes of representative specimens. For unfrozen concrete specimens (for example specimen BA-0), after yielding of steel reinforcement, several visible cracks occurred near failure and, finally, the concrete compressive zone crushed. For concrete specimens subjected to freeze–thaw cycles (for example specimen BA-150), large volume of mortars dropped out and gravels exposed, several visible cracks occurred in the tensile zone. After yielding of steel reinforcement, a major crack occurred near failure and, finally, the concrete compressive zone crushed. For unfrozen composite specimens (for example specimen BC-0), multi-cracks occurred in the tensile zone, with the increase of loading, many new cracks developed and, then the steel reinforcement yield, finally, the concrete compressive zone crushed. For composite specimens subjected to freeze–thaw cycles (for example specimen BC-50, BC-100 and BC-150), with increasing the freeze–thaw cycles, mortar dropped out, and the bottom ECC layer exposed more fiber while the upper concrete layer exposed more sand and gravel. After yielding of steel reinforcement, several visible cracks occurred near failure and, finally, the concrete compressive zone crushed. For ECC specimens, the initial characteristics were similar to ECC-concrete composite specimens. After yielding of steel reinforcement, the outermost layer of ECC specimens reached its ultimate strain and then crushed, but the fibers distributed in cementitious materials can hold the crushed ECC blocks in contact.

Fig. 8

Failure modes of selected test specimens.

4 Theoretical Analysis

4.1 Basic Assumption

The following assumptions have been considered in developing the predictions of flexural performance of steel reinforced ECC-concrete composite beams subjected to freeze–thaw cycles:

• The three materials used in beams tested, namely, concrete, ECC and steel bars, have perfect bond with each other. This assumption is validated in the current experimental investigation and other previous studies (Ge et al. 2018; ACI Committee 224 2001).

• Beam cross-section perpendicular to the neutral axis before loading remains plane after loading (Ge et al. 2018) as shown in Fig. 3.

• The concrete tensile force at failure is neglected. Although concrete close to the neutral axis is not cracked, the tensile force of uncrack concrete and its moment is small and also ignored.

• According to the experimental observation of load-deformation relationship, there exist three obvious stages (Ge et al. 2018), uncracked stage (elastic stage), service stage and failure stage.

• The following simplified constitutive relationships are used.

The constitutive model of steel bars (China Academy of Building Research 2010) simplified to a bilinear curve is expressed as Eq. 1. ε_s and σ_s are the steel reinforcement’s strain and stress, respectively, E_s and f_sy are the modulus of elasticity and the yield strength, respectively, ε_sy and ε_su are the yield and ultimate tensile strain.

$$ \sigma_{\text{s}} = \left\{ \begin{aligned} E_{\text{s}} \varepsilon_{\text{s}} \, ,0 \le \varepsilon_{\text{s}} \le \varepsilon_{\text{sy}} \hfill \\ \, f_{\text{y}} ,\varepsilon_{\text{sy}} < \varepsilon_{\text{s}} \le \varepsilon_{\text{su}} \\ \end{aligned} \right. .$$

(1)

The tensile constitutive model of ECC (Li et al. 2001) simplified to a bilinear curve is shown in Fig. 9a and presented by Eq. 2 as below. ε_et and σ_et are the ECC material’s tensile strain and stress, respectively. ε_etc,n and ε_etu,n are the ECC material’s cracking and ultimate strain subjected to n freeze–thaw cycles, respectively. f_etc,n and f_etu,n are the cracking and ultimate stresses subjected to n freeze–thaw cycles, respectively.

$$ \sigma_{\text{et}} = \left\{ \begin{aligned} \frac{{f_{\text{etc,n}} }}{{\varepsilon_{\text{etc,n}} }}\varepsilon_{\text{et}} , \quad 0 < \varepsilon_{\text{et}} \le \varepsilon_{\text{etc,n}} \hfill \\ \, f_{\text{etc,n}} + \frac{{f_{\text{etu,n}} - f_{\text{etc,n}} }}{{\varepsilon_{\text{etu,n}} - \varepsilon_{\text{etc,n}} }}(\varepsilon_{\text{et}} - \varepsilon_{\text{etc,n}} ) \, ,\varepsilon_{\text{etc,n}} < \varepsilon_{\text{et}} \le \varepsilon_{\text{etu,n}} \hfill \\ \end{aligned} \right. . $$

(2)

Fig. 9

Constitutive relationships of ECC.

The mechanical properties of ECC subjected to n freeze–thaw cycles established by regression analysis of the tested data are expressed as follows.

$$ f_{\text{etc,n}} = f_{\text{etc,0}} ( - 0.00119n + 0.98762) $$

(3)

$$ f_{\text{etu,n}} = f_{\text{etu,0}} ( - 0.00116n + 1.00747) $$

(4)

$$ \varepsilon_{\text{etc,n}} = \varepsilon_{\text{etc,0}} (0.0025n + 1.0) $$

(5)

$$ \varepsilon_{\text{etu,n}} = \varepsilon_{\text{etu,0}} (0.00152n + 1.00112). $$

(6)

The compressive constitutive model of ECC (Yuan et al. 2013) simplified to a trilinear curve is shown in Fig. 9b and expressed by Eq. 7. ε_ec and σ_ec are the ECC material’s compressive strain and stress, respectively; f_ecp,n and f_ecu,n are the maximum (peak point) and ultimate (after peak point) stress, respectively; ε_ecp,n and ε_ecu,n are the strain corresponding to maximum and ultimate compressive stress, respectively, subjected to n freeze–thaw cycles.

$$ \sigma_{\text{ec}} = \left\{ \begin{array}{ll} 2\frac{{f_{\text{ecp,n}} }}{{\varepsilon_{\text{ecp,n}} }}\varepsilon_{\text{ec}} ,& \quad 0 \le \varepsilon_{\text{ec}} \le \varepsilon_{\text{ecp,n}} /3 \hfill \\ \frac{{f_{\text{ecp,n}} }}{2} + \frac{{f_{\text{ecp,n}} }}{{2\varepsilon_{\text{ecp,n}} }}\varepsilon_{\text{ec}} , &\quad \varepsilon_{\text{ecp,n}} /3 < \varepsilon_{\text{ec}} \le \varepsilon_{\text{ecp,n}} \hfill \\ 2f_{\text{ecp,n}} - \frac{{f_{\text{ecp,n}} }}{{\varepsilon_{\text{ecp,n}} }}\varepsilon_{\text{ec}} ,&\quad \varepsilon_{\text{ecp,n}} < \varepsilon_{\text{ec}} \le \varepsilon_{\text{ecu,n}} \hfill \\ \end{array} \right. .$$

(7)

The compressive values of ECC subjected to n freeze–thaw cycles as required by Eq. (7) established by regression analysis of the tested data are expressed as follows.

$$ f_{\text{ecp,n}} = f_{\text{ecp,0}} ( - 0.00120n + 1.00666) $$

(8)

$$ f_{\text{ecu,n}} = f_{\text{ecu,0}} ( - 0.00120n + 1.00662) $$

(9)

$$ \varepsilon_{\text{ecp,n}} = \varepsilon_{\text{ecp,0}} (0.00167n + 1.0) $$

(10)

$$ \varepsilon_{\text{ecu,n}} = \varepsilon_{\text{ecu,0}} (0.00167n + 1.0). $$

(11)

The compressive constitutive model of concrete (Hognestad 1951; Wang 2017) simplified to a parabolic curve is shown in Fig. 10a and expressed by Eq. 12. f_c,n and f_c,n are the maximum (peak point) and ultimate stress (after peak point), respectively; ε_co,n and ε_cu,n are the strain corresponding to maximum and ultimate stress, respectively, subjected to n freeze–thaw cycles. ε_c and σ_c are the concrete compressive strain and corresponding stress.

$$ \sigma_{\text{c}} = \left\{ \begin{aligned} & f_{\text{c,n}} \left[ {2\varepsilon_{\text{c}} /\varepsilon_{\text{co,n}} - (\varepsilon_{\text{c}} /\varepsilon_{\text{co,n}} )^{2} } \right], \quad 0 \le \varepsilon_{\text{c}} \le \varepsilon_{\text{co,n}} \\ & f_{\text{c,n}} \left[ {1 - 0.15\frac{{\varepsilon_{\text{c}} - \varepsilon_{\text{co,n}} }}{{\varepsilon_{\text{cu,n}} - \varepsilon_{\text{co,n}} }}} \right] , \quad \varepsilon_{\text{co,n}} < \varepsilon_{\text{c}} \le \varepsilon_{\text{cu,n}} \\ \end{aligned} \right. .$$

(12)

Fig. 10

Constitutive relationships of concrete.

The predicted compressive performances of concrete subjected to n freeze–thaw cycles established by regression analysis of experimental data are expressed as follows.

$$ f_{\text{c,n}} = f_{\text{c,0}} ( - 0.00284n + 0.96128) $$

(13)

$$ f_{\text{cu,n}} = f_{\text{cu,0}} ( - 0.00284n + 0.96125) $$

(14)

$$ \varepsilon_{\text{co,n}} = \varepsilon_{\text{co,0}} (0.01370n + 0.95890) $$

(15)

$$ \varepsilon_{\text{cu,n}} = \varepsilon_{\text{cu,0}} (0.01054n + 0.98382). $$

(16)

The tensile constitutive model of concrete (China Academy of Building Research 2010; Cao et al. 2012) is simplified to a linear curve as shown in Fig. 10b and presented by Eq. 17 as below. ε_ctu,n and f_ctu,n are the concrete ultimate tensile strain and stress subjected to n freeze–thaw cycles, respectively. ε_ct and σ_ct are the strain and corresponding stress in tensile concrete, respectively.

$$ \sigma_{\text{ct}} = \frac{{f_{\text{ctu,n}} }}{{\varepsilon_{\text{ctu,n}} }}\varepsilon_{\text{ct}} ,\quad 0 \le \varepsilon_{\text{ct}} \le \varepsilon_{\text{ctu,n}}. $$

(17)

The predicted tensile performances of concrete subjected to n freeze–thaw cycles established by regression analysis of experimental data are expressed as follows.

$$ f_{\text{ctu,n}} = f_{\text{ctu,0}} ( - 0.0040n + 1.0114) $$

(18)

$$ \varepsilon_{\text{ctu,n}} = \varepsilon_{\text{ctu,0}} ( - 0.0039n + 1.0139). $$

(19)

Comparisons of experimental and predicted mechanical performances of ECC and concrete subjected to n freeze–thaw cycles are shown in Fig. 11, where R² is the coefficient of determination.

Fig. 11

Comparison of experimental and predicted critical values required by constitutive models of ECC and concrete.

As observed from Fig. 11, the coefficients of determination are, all, greater than 0.95, showing good agreement between the predicted critical values and experimental test results.

4.2 Analysis of Cross-Section

4.2.1 Failure Modes

Based on the materials’ simplified constitutive (stress–strain curves) models, two failure modes occurred for ECC-concrete composite specimens, namely tensile or compressive failure. In Fig. 12, failure modes can be identified as following and their corresponding strain distribution are given. ① Compressive failure before steel reinforcement yielding (over-reinforced case): ε_c = ε_cu,n, ε_s < ε_sy, ε_et < ε_etu,n, as shown in Fig. 12b. ② Compressive failure 2 after yielding of steel: ε_c = ε_cu,n, ε_sy ≤ ε_s < ε_su, ε_et < ε_etu,n, as shown in Fig. 12c. ③ Tensile failure: ε_c < ε_cu,n, ε_s < ε_su, ε_et = ε_etu,n, as shown in Fig. 12d. Where ε_et is the ECC bottom tensile strain, ε_s is the steel bars tensile strain, ε_c and ε_ct are the concrete maximum compressive and tensile strain, respectively. h and b are the height and width of cross-section, h_e is the height of ECC, a_s is the vertical distance between the cross-section bottom edge and the centroid of steel bars, h₀ is the effective height of cross-section, h₀ = h – a_s. h_t is the tensile height (neutral axis depth) of cross-section, x_c is the compressive height (above the neutral axis) of cross-section.

Fig. 12

Cross-section strain distribution at different failure mode.

4.2.2 Failure modes discrimination

When ε_c = ε_cu,n and ε_s = ε_sy simultaneously take place, as shown in Fig. 12e, balanced failure 1 occurs. If ε_c = ε_cu,n and ε_et = ε_etu,n simultaneously take place, as shown in Fig. 12f, balanced failure 2 occurs.

According to triangle similarity, the relative compressive height ξ, which is defined as the cross-section compressive height x_c to the effective height h₀, ξ = x_c/h_0, for two balanced failure stage, can be expressed as follows.For balanced failure 1:

$$ \xi_{\text{cb1}} = \frac{{x_{\text{c1}} }}{{h_{ 0} }} = \frac{{\varepsilon_{\text{cu,n}} }}{{\varepsilon_{\text{cu,n}} + \varepsilon_{\text{sy}} }} $$

(20)

For balanced failure 2:

$$ \xi_{\text{cb2}} = \frac{{x_{\text{c2}} }}{{h_{ 0} }} = \frac{{x_{\text{c2}} }}{h} \cdot \frac{h}{{h_{ 0} }} = \frac{{\varepsilon_{\text{cu,n}} }}{{\varepsilon_{\text{cu,n}} + \varepsilon_{\text{etu,n}} }} \cdot \frac{h}{{h_{ 0} }} $$

(21)

If ξ > ξ_cb1, failure mode ① occurs; if ξ_cb2≤ ξ ≤ ξ_cb1, failure mode ② occurs; and if ξ < ξ_cb2, failure mode ③ occurs.

The following equation can be obtained on the base of cross-section force equilibrium.

$$ \int_{0}^{{x_{\text{c}} }} {\sigma_{\text{c}} b} dx = \sigma_{\text{s}} A_{\text{s}} + \int_{0}^{{h_{\text{e}} }} {\sigma_{\text{et}} b} dx $$

(22)

where σ_c and σ_et are the concrete compressive stress and ECC tensile stress, respectively, A_s and σ_s are the steel bars cross-sectional area and tensile stress, respectively.

In order to simplify the calculation formula, considering σ_et = f_etc,n, Eq. (22) can be transformed into following.For balanced failure 1, x_c = ε_cu,n h₀/(ε_cu,n + ε_sy).

$$ f_{\text{c,n}} bh_{ 0} \frac{{\varepsilon_{\text{cu,n}} - \varepsilon_{\text{co,n}} /3}}{{\varepsilon_{\text{cu,n}} + \varepsilon_{\text{sy}} }} = f_{\text{sy}} A_{\text{s}} + f_{\text{etc,n}} bh_{\text{e}} $$

(23)

Equation (23) can be transformed into the expression of reinforcement ratio, as below.

$$ \rho_{\text{s,b1}} = \frac{{f_{\text{c,n}} }}{{f_{\text{sy}} }} \cdot \frac{{\varepsilon_{\text{cu,n}} - \varepsilon_{\text{co,n}} /3}}{{\varepsilon_{\text{cu,n}} + \varepsilon_{\text{sy}} }} - r_{\text{h}} \frac{{f_{\text{etc,n}} }}{{f_{\text{sy}} }} $$

(24)

For balanced failure 2, x_c = ε_cu,n h/(ε_cu,n + ε_etu,n), ε_s = (ε_etu,n h₀ − ε_cu,n a_s)/h.

$$ f_{\text{c,n}} bh\frac{{\varepsilon_{\text{cu,n}} - \varepsilon_{\text{co,n}} /3}}{{\varepsilon_{\text{cu,n}} + \varepsilon_{\text{etu,n}} }} = f_{\text{sy}} A_{\text{s}} + f_{\text{etc,n}} bh_{\text{e}} $$

(25)

Equation (25) can be transformed into the expression of reinforcement ratio, as below.

$$ \rho_{\text{s,b2}} = \frac{{f_{\text{c,n}} }}{{f_{\text{sy}} }}\frac{{\varepsilon_{\text{cu,n}} - \varepsilon_{\text{co,n}} /3}}{{\varepsilon_{\text{cu,n}} + \varepsilon_{\text{etu,n}} }}\frac{h}{{h_{0} }} - r_{\text{h}} \frac{{f_{\text{etc,n}} }}{{f_{\text{sy}} }} $$

(26)

ρ_s,b1 and ρ_s,b2 are defined as the maximum and minimum balanced reinforcement ratio, respectively. So, if ρ_s> ρ_s,b1, failure mode ① occurs; if ρ_s,b2≤ ρ_s≤ ρ_s,b1, failure mode ② occurs; if ρ_s< ρ_s,b2, failure mode ③ occurs.

4.2.3 Experimental verifications

The maximum and minimum balanced reinforcement ratio for ECC-concrete specimens subject to freeze–thaw cycles can be calculated by formulas (24) and (26). The balanced reinforcement ratio formulas for composite specimens can be also applied to concrete specimens by just substituting f_etc,n = 0. Figure 13 presents the corresponding curves of balanced reinforcement ratio against freeze–thaw cycles.

Fig. 13

The corresponding curves of balanced reinforcement ratio and freeze–thaw cycles.

As observed from Fig. 13, with increasing the cycles of freeze–thaw, the minimum balanced reinforcement ratio ρ_s,b2, initially slightly increases, and, then, decreases, while the maximum balanced reinforcement ratio ρ_s,b1 gradually decreases. For this experimental investigation, the actual reinforcement ratio ρ_s (= 1.8%) is always greater than ρ_s,b2. However, ρ_s,b1 is initially greater than ρ_s (appropriate tensile failure occurs), but smaller than ρ_s (over-reinforced failure occurs) after certain cycles of freeze–thaw.

Comparisons of tested and predicted failure modes are presented in Table 9. CFM and EFM indicate calculated failure mode and experimental failure mode, respectively. SY, SNY and CC indicate steel yielded, steel not yielded and concrete crushed, respectively.

Table 9 Comparisons of experimental and predicted failure modes

As observed from Table 9, the predicted failure modes show good agreement with that observed in the experiments.

4.3 Simplified Formula for Bending Capacity

In this section of the paper, simplified formulas for bending capacities of ECC-concrete composite and ECC specimens are developed as summarized in Table 10, where the first row (I) presents the cross-section (a), strain distribution (b) as well as actual and simplified stress distributions (c) along the cross-section height of ECC-concrete composite specimen and ECC specimen, respectively, for failure mode ②.

Table 10 Simplified bending capacity formulas development for ECC-concrete composite and ECC specimens

Based on force equilibrium, Eq. (27) can be obtained, while Eq. (28) obtained according to the plane-section assumption. x_c and x_e are the height of concrete and ECC compressive stresses, respectively, x is the simplified height for compressive stress block (x = β_c,n x_c for ECC-concrete composite specimen and x = β_e,n x_e for ECC specimen), α_c,n, a_e,n, β_c,n and β_e,n are coefficients associated with the equivalent compressive stress distribution for concrete and ECC subjected to freeze–thaw cycles. Then, based on the resultant force and moment equivalent principle, Eqs. (29) and (30) can be obtained. Substituting the concrete compressive properties into Eqs. (29) and (30), α_c,n/a_e,n and β_c,n/β_e,n can be calculated as presented in Table 11.

Table 11 Values of simplified coefficients α_c,n, β_c,n, α_e,n and β_e,n for freeze–thaw cycles

Rearranging Eq. (27) for x, Eq. (31) can be obtained. Then, taking moment about the resultant compressive force in concrete/ECC, the simplified formula for the bending capacity can be obtained as expressed in formula (32).

Table 12 presents comparisons of tested and predicted bending capacity, where M_u,e, M_u,c are the experimental and predicted bending capacity, respectively.

Table 12 Comparison of tested and predicted bending capacities

As observed from Table 12, the average value and their variation coefficients of M_u,c/M_u,e are 0.93 and 0.06, respectively, indicating the predicted bending capacity agrees well with tested results.

5 Parametric study

The influence of multi-parameters, for example the amount of steel reinforcement, height and strength of ECC, concrete strength and freeze–thaw cycles on the flexural performance of reinforced ECC-concrete composite beams are analyzed in this section. The cross-section width b = 100 mm and height h = 150 mm, respectively. The vertical distance of the centroid of steel reinforcement to the cross-section tensile edge a_s = 25 mm, the cross-section effective height h₀ = 125 mm.

When one main parameter changes, other basic parameters of unfrozen tested specimens are maintained constant. Reinforcement ratio is 1.2%, steel yield strength is 400 N mm ⁻², ECC height replacement ratio is 0.48. Concrete compressive strength and ultimate strain are 26.8 N mm ⁻² and 0.003522, respectively. ECC tensile cracking strength and strain are 5.0 N mm ⁻² and 0.00032, respectively. ECC ultimate tensile strength and strain are 5.0 N mm ⁻² and 0.03, respectively. The simplified constitutive relationships proposed in Sect. 4.1 are used to predict the mechanical properties of ECC and concrete subjected to freeze–thaw cycles.

The specimen is considered to be failed when tensile strains in reinforcement, ε_s, top concrete maximum compressive strain, ε_c, or bottom ECC maximum tensile strains, ε_et, reaches their respective ultimate strain.

M_y and M_u represent yield moment and ultimate moment, respectively. φ_y, φ_u and φ_u represent yield curvature, ultimate curvature and curvature ductility, u_φ = φ_u/φ_y. E_e, E_p and r_E represent elastic energy dissipation (the area included in the elastic section of moment–curvature curve), plastic energy dissipation (the area included in the whole section of moment–curvature curve) and energy dissipation ratio, r_E = E_p/E_e).

5.1 Steel Reinforcement Ratio

Figure 14 represents the relationship curves of ultimate moment and curvature ductility against the steel reinforcement ratio. Five steel reinforcement ratios ρ_s, 0.4%, 0.8%, 1.2%, 1.6% and 2.4% are studied.

Fig. 14

Influence of ECC height replacement ratio on moment capacity, curvature ductility and energy dissipation.

As observed from Fig. 14, with the increase of reinforcement ratio, the yield and ultimate moments gradually increase. The yield curvature increases, the ultimate curvature decreases and curvature ductility, thus, decreases gradually. The elastic energy dissipation increases, plastic energy dissipation decreases and energy dissipation ratio gradually decreases. After the reinforcement ratio exceed the maximum balanced reinforcement ratio ρ_sb1,n, the ultimate moment is equal to the yield moment and the plastic energy dissipation is also equal to the elastic energy dissipation.

Furthermore, with the increase of freeze–thaw cycles, the yield and the ultimate moments gradually decreases, the maximum balanced reinforcement ratio gradually decreases.

5.2 ECC Height Replacement Ratio

Figure 15 presents the relationship curves of ultimate moment and curvature ductility against the ECC height replacement ratio (0, 0.24, 0.48, 0.72, 0.96 and 1.20).

Fig. 15

Influence of ECC strength on moment capacity, curvature ductility and energy dissipation.

As observed from Fig. 15, with the increase of ECC replacement ratio, the yield and ultimate moment gradually increases. The yield curvature, first increase, and then decrease while the ultimate curvature, first decrease, then increase, and then decrease; the curvature ductility, first decreases, and then increases, except for specimens exhibited over-reinforced failure. The elastic energy dissipation, first increases, and then decrease, the plastic energy dissipation, first decreases, and then increase, the energy dissipation ratio, first decreases, and then increase.

5.3 Strength of ECC

Figure 16 shows the relationship curves of ultimate moment and curvature ductility against the ECC strength. Five ECC grades, f_etc,A = f_etu,A = 3.0 N mm ⁻², f_ecp,A = 30 N mm ⁻², f_etc,B = f_etu,B = 4.0 N mm ⁻², f_ecp,B = 35 N mm ⁻², f_etc,C = f_etu,C = 5.0 N mm ⁻², f_ecp,C = 40 N mm ⁻², f_etc,D = f_etu,D = 6.0 N mm ⁻², f_ecp,D = 45 N mm ⁻², f_etc,E = f_etu,E = 7.0 N mm ⁻², f_ecp,E = 50 N mm ⁻², ε_etc = 0.0003, ε_etu = 0.03, ε_ecp = 0.0036 and ε_ecu = 0.0054 are studied.

Fig. 16

Influence of concrete strength on moment capacity, curvature ductility and energy dissipation.

As observed from Fig. 16, with the improvement of ECC strength, the yield and ultimate moments gradually increase. The yield curvature gradually increases, the ultimate curvature gradually decreases, and hence the curvature ductility gradually decreases. The elastic energy dissipation increases, the plastic energy dissipation decreases, and hence the energy dissipation ratio gradually decreases.

5.4 Strength of Concrete

Figure 17 shows the relationship curves of ultimate moment and curvature ductility against the concrete strength. Five concrete compressive strength f_c, 20.1, 23.4, 26.8, 29.6 and 32.4 N mm ⁻² are studied.

Fig. 17

Influence of concrete strength on moment capacity, curvature ductility and energy dissipation.

As observed from Fig. 17, with the improvement of concrete strength, the yield and ultimate moment gradually increases. The yield curvature gradually decreases, the ultimate curvature gradually increases, and hence the curvature ductility gradually increases. The elastic energy dissipation decreases, the plastic energy dissipation increases, hence the energy dissipation ratio gradually increases.

6 Conclusions

Experimental and theoretical investigations on the flexural performance of steel reinforced ECC-concrete composite beams subjected to freeze–thaw cycles are conducted. The following conclusions are drawn.

1. 1.

   Three failure modes and two boundary failure states are proposed on the bases of plane-section assumption and materials constitutive models, and the discriminate formulas are also given. The predicted failure modes agree well with tested results.

2. 2.

   The ultimate moments of ECC specimens and composite specimens are greater than those of traditional concrete beams. The deflection and crack width of ECC specimens and composite specimens are less than those of traditional concrete beams under the same load. The ECC layers placed in the tension zone can effectively improve specimens’ deformation and cracks-resistance ability.

3. 3.

   Based on the simplified materials’ constitutive models and regression analysis of test results, the predicted mechanical performances of ECC and concrete subjected to freeze–thaw cycles are established.

4. 4.

   With the increase of freeze–thaw cycles, the maximum balanced reinforcement ratio gradually decreases while the minimum balanced reinforcement ratio, initially slightly increases, and, then, decreases.

5. 5.

   Simplified ultimate moment formulas are developed from simplified materials constitutive models and plane-section assumption. Experimental results show that the simplified formulas agree well with the test results, illustrating the validity of developed formulas.

6. 6.

   Based on the parametric study conducted, it was shown that the yield and ultimate moments gradually increase with the increase of reinforcement ratio, ECC replacement height ratio as well as strengths of concrete and ECC. On the other hand, as the ECC replacement ratio increases, the curvature ductility, first decreases, and then increases, except for over reinforced specimens.