Abstract

In recent years, research on recycled aggregate concrete has become a hot issue in the field of civil engineering. This paper mainly studies the size effects on compressive and tensile strengths of the recycled aggregate concrete. Firstly, four sets of recycled concrete cube specimens with different sizes are produced in the laboratory. Secondly, the experiments on compressive and tensile strengths are carried out to obtain the rules of the strength value with the change of the specimen size. Thirdly, a standard neutrosophic number is proposed and used in modelling the size effect law more reasonably. According to the experimental results, it was found that the compressive and tensile strengths of recycled concrete both have obvious size effects. In general, the strength value decreases gradually with the increase of specimen size. Using the standard neutrosophic number, the proposed new formula on size effect law is more suitable for tackling the indeterminacy in the experimental data. It has been shown that the size effect law based on the standard neutrosophic number is more realistic than the existing size effect law. The results may be useful for the engineering application of the recycled concrete and can be extended to other types of size effect laws in the future.

1. Introduction

Demanding by environmental protection, some research on recycled aggregate concrete (RAC) has been carried on in many countries in recent years. At present, the research on recycled aggregate concrete mainly focuses on its mechanical properties or durability. Barhmaiah et al. [1] investigated the effect of recycled aggregate on strength of concrete and the results were compared with virgin aggregate concrete. Wu and Jin [2] studied the compressive fatigue behavior of compound concrete containing demolished concrete lumps and recycled aggregate concrete. It was found that satisfactory compressive strength can be attained when the total waste content in RLAC reaches 54.6%. Akono et al. [3] investigated the basic creep and fracture response of fine recycled aggregate concrete using nanoscale mechanical characterization modules integrated with nonlinear micromechanical modelling and machine learning methods. It has been shown that the fracture toughness of fine recycled aggregate concrete is 8% lower than that of plain concrete. Sasanipour et al. [4] investigated the effects of the surface pretreatment method by soaking recycled concrete aggregates in silica fume slurry on the mechanical and durability properties of recycled aggregate concrete. Results revealed that using pretreated recycled aggregates significantly improved the durability properties of mixes especially chloride ion penetration and electrical resistivity. Zhu et al. [5] investigate the long-term performance of recycled aggregate concrete beams for a period of 3045 days and the bending behavior of test beams after the sustained load is removed. It was found that the RAC beams exhibit more significant stiffness degradation characteristics in the flexural test. Mi et al. [6] studied the influences of the compressive strength ratio between original concrete and recycled aggregate concrete on the slump, compressive strength, and carbonation resistance of recycled aggregate concrete. Results revealed that adjusting the compressive strength ratio can furnish different slump, compressive strength, and carbonation depth values, while also reducing mortar inhomogeneities. Wang et al. [7] studied the influences and mechanisms of the single and coupled effect of carbonation, dry-wet cycles, and freeze-thaw cycles on the durability of three types of recycled aggregate concrete. The results showed that carbonation and dry-wet cycles can improve the pore tortuosity and reduce the connectivity of pores.

As is well known, the strength of quasibrittle materials like concrete and rock is size dependent due to the heterogeneity [811]. Generally, the geometrically similar samples will not behave similarly for different sizes; this is named as size effect (or scale effect). In the past few decades, the size effect problem has been widely investigated by many scientists and engineers. Overall, the existing scale effect laws can be divided into three types: (1) statistical size effect [12,13], (2) energetic size effect [1418], and (3) fractal size effect [19,20]. Additionally, some researchers used the artificial neural network (ANN) technique to forecast the size effect of concrete strength [21,22]. In these laws, the energetic size effect proposed by Bazant [11,1418,2329] has been shown very effective and promising for those quasibrittle materials. Although much progress has been made in the size effect mechanism, much further research is needed for new type concrete and recycled aggregate concrete. On the other hand, it is well known that most of the physical quantities in engineering practice cannot be correctly expressed by using crisp numbers due to the limitation of experimental test techniques and the complexity of objective things. Apparently, the tested concrete strength is just the physical quantity that always fluctuates within a certain range. It is difficult to express these strength parameters only by using determined values. As a result, it is very necessary to extend the existing size effect law to tackle the indeterminacy in the tested strength data.

To handle indeterminate information in practice, Smarandache [3032] presented the concept of a neutrosophic number for the first time. The neutrosophic number, which consists of a determinate part and an indeterminate part, is very suitable for the expression of data with indeterminacy. However, little progress has been made for handling indeterminate problems by neutrosophic numbers in scientific and engineering areas in the past two decades. Recently, Ye [33,34] used the neutrosophic number as a tool for solving the group decision-making and fault diagnosis problems, respectively. It has been shown that the neutrosophic number can effectively deal with real problems with indeterminacy. In this paper, a standard neutrosophic number is firstly proposed for the improvement of the multiplication of neutrosophic numbers to a certain extent. And then the standard neutrosophic number is used to modify the size effect laws on the compressive and tensile strengths of the recycled aggregate concrete. The proposed size effect law based on the standard neutrosophic number provides a simple and effective way to tackle the indeterminacy in the strength parameters.

The presentation of this work is organized as follows: Section 2 presents the size effect experimental scheme and material properties used in the recycled aggregate concrete. Section 3 gives the testing results of the compressive and tensile strengths for the cube specimens. In Section 4, the neutrosophic number is briefly reviewed and a standard neutrosophic number is developed and used to improve the size effect law for reflecting the indeterminacy in data. Finally, the conclusions of this work are summarized in Section 5.

2. Experimental Scheme and Material Properties

As shown in Figure 1, four sets of recycled concrete cube specimens with different sizes are designed to investigate the strength-size effect. Each group has six test blocks (three for compressive test, three for splitting tensile test) and the total number of these specimens is 24. The side lengths of these cube specimens are 70 mm, 100 mm, 150 mm, and 200 mm, respectively.


Figure 1 
Cube specimen geometry size (unit: mm).

Tables 13 present the main material properties of the cement, fine aggregate, and recycled coarse aggregate used in this experiment, respectively. The cement is the ordinary PM32.5 Portland cement and the fine aggregate is the natural river sand. The recycled coarse aggregate as shown in Figure 2 is manufactured from the waste concrete in the process of old building dismantling.

Table 1 
Main properties of PM32.5 cement.
Table 2 
Main properties of fine aggregate.
Table 3 
Main properties of recycled coarse aggregate.
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Figure 2 
Recycled coarse aggregate.

Table 4 gives the mixture ratio, water-cement ratio, and replacement ratio of recycled coarse aggregate used in the experiment. In all these factors, the mixture ratio design is the key factor to determine the strength grade of concrete.

Table 4 
The mixture ratio, water-cement ratio, and replacement ratio of recycled coarse aggregate.

Finally, these recycled concrete cube specimens as shown in Figure 3 are produced in the laboratory. After curing in water for 28 days, the compressive and splitting tensile strength tests are carried out.

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Figure 3 
Recycled concrete cube specimens.

3. Experiment Test and Result Analysis

Figure 4 presents the experiment equipment used for the compressive and splitting tensile strengths, respectively. The experiment equipment is called the STYE-3000E automatic pressure testing machine. The detailed testing steps strictly complied with the norms of “standard for test methods of mechanical properties of ordinary concrete (GB/T 50081–2002)” [35].

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Figure 4 
Experiment equipment for compressive and splitting tensile strengths.

Table 5 and Figure 5 present the test results of the compressive strengths, respectively. Table 6 and Figure 6 present the test results of the splitting tensile strengths, respectively.

Table 5 
Mean values and standard deviations of compressive strengths.

Figure 5 
Compressive strength values of cube specimens.
Table 6 
Mean values and standard deviations of splitting tensile strength values.

Figure 6 
Splitting tensile strength values of cube specimens.

From Tables 5 and 6, it has been shown that the compressive and tensile strengths of recycled concrete both have obvious size effects. In general, the mean value of strength decreases gradually with the increase of specimen size. Taking the specimens with a side length of 70 mm as the reference group, the degrees of size effect for other groups can be computed as

From Tables 5 and 6, it was found that the discreteness of data of the compressive strength is far greater than that of the splitting tensile strength. The possible reasons for this phenomenon are as follows: (1) the compressive strength of the test block is closely related to that of recycled aggregate. It is known that the compressive strengths of recycled aggregates in different specimens fluctuate greatly. This leads to the great discreteness of compressive strength data. (2) The splitting tensile strength is mainly affected by the cohesive force between cement and aggregate. At this point, there is no obvious difference for different recycled aggregates.

4. Size Effect Law Using the Standard Neutrosophic Number

4.1. The Neutrosophic Number and Its Standard Form

As stated before, the above strength values always contain some randomness due to the limitation of experimental techniques and the complexity of objective things. In order to better describe the randomness in data, the neutrosophic number will be introduced in this work to describe strength since it is a powerful tool for the expression of data with indeterminacy. Smarandache defined a neutrosophic number for the first time in neutrosophic probability [3032]. A neutrosophic number, which can be divided into a determinate part and an indeterminate part, is expressed asin which and are real numbers, is indeterminacy, such that , , and I/I = undefined. In a sense, a neutrosophic number can be treated as an interval number. For example, assume that a neutrosophic number is , where . Then, it is equivalent to an interval number. Compared with the interval number, the advantages of the neutrosophic number are as follows: (1) The neutrosophic number more highlights the determinate part, which is the common concerned point in engineering application. (2) The neutrosophic number is similar to the imaginary number in form. Thus, the operational rule of the neutrosophic number is more convenient to implement. Letting and be two neutrosophic numbers, the operational relations of neutrosophic numbers are given by Smarandache [3032] as

However, the above operations may have potential conflicts with those operations for interval numbers. For example, assume that two neutrosophic numbers are and , where . Then, they are equivalent to two interval numbers and , respectively. According to the multiplication of neutrosophic numbers, one has

On the other hand, the following result can be obtained by using the multiplication of interval numbers as

Obviously, the results in equations (4) and (5) are different. In order to eliminate such conflicts, we propose some improvement on the multiplication of neutrosophic numbers in this section. In the first place, we define the standard form of a neutrosophic number as

Accordingly, the multiplication includes the following steps. First, we transform the arbitrary neutrosophic number into its standard form , where . For example, the above two neutrosophic numbers and () can be rewrote as and , respectively. Then, one can obtain

Apparently, the same result is achieved by equations (5) and (7). Therefore, it is important to transform an arbitrary neutrosophic number into its standard form in practice. For an arbitrary neutrosophic number , , the conversion formula is given as

Similarly, the conversion formula between an arbitrary interval number and the standard neutrosophic number is expressed as

Next, we use the proposed standard neutrosophic number to describe the strength data as shown in Tables 5 and 6. As is well known, the standard deviation in Tables 5 and 6 is a commonly used measure of the degree to which a variable is dispersed around its mean value. Then, the strength data of these recycled concrete cubic specimens can be considered as a set of interval numbers and . Using equation (9), these interval numbers can be transformed into the standard neutrosophic numbers as

For example, the cubic compressive strength for the specimens with the side length of 100 mm in Table 5 can be expressed as an interval number [33.51–0.905, 33.51 + 0.905] or a standard neutrosophic number . Table 7 shows all the compressive and tensile strengths of these cubic specimens using the form of standard neutrosophic numbers.

Table 7 
Strength values expressed by the standard neutrosophic numbers (“CS” denotes the compressive strength; “TS” denotes the tensile strength).
4.2. Improved Size Effect Law

The size effect law denotes the strength-size functional relationship. In this section, the existing size effect laws have been improved in two areas: one is using a new ridge estimation method to compute the fitting coefficients of the formula for size effect law, the other is using the standard neutrosophic number to reflect the indeterminacy. For the compressive strength, the commonly used size effect law iswhere is the side length of the concrete cube block and are the two constants which can be determined by providing fits to experimental data. For the splitting tensile strength, the common formula of size effect law iswhere denotes the nominal strength when the specimen size tends to infinity and denotes the characteristic size. Theoretically, is an independent value of the specimen size. From the point of view of dimensional homogeneity, it is more reasonable to replace the side length with the side length ratio , where is the ratio of the cube specimen size to the minimum size in the experiment, that is, . That is because is a dimensionless parameter. Then, the size effect law for the compressive strength can be rewritten as

Similarly, the size effect law for the splitting tensile strength is revised as

For a particular size ratio , a unique strength value can be calculated by any one of equations (13) and (14). Generally, the least squares estimate (LSE) [36] is used to obtain the fitting coefficients in equations (13) and (14). However, the ill condition of the equation may lead to serious distortion of the fitting results. To solve this problem, a new ridge estimation method is used to compute the fitting coefficients. Taking equation (13) as an example, the following linear regression model can be obtained from equation (13) with the test data of the specimens as

As stated before, LSE is often used for solving equation (15) to obtain the fitting coefficients; that is,

As is well known, LSE is very inaccurate if the coefficient matrix of the equation is ill-conditioned. The ridge estimation (RE) [3740] method is often used to solve the ill-conditioned equation. For equation (15), the RE solution iswhere is the identity matrix and is the ridge parameter that can be determined by the L-curve method [3740]. In general, the determination process of ridge parameter requires complex calculation and it is difficult to obtain the optimal ridge parameter. Thus, a new ridge estimation (NRE) method is proposed in this section to solve the ill-posed least squares problem. The main formulas of NRE are derived as follows.

Letting denotes the th element in the matrix , one has

Assume is the maximum value in all the diagonal elements of , that is,

Then, a new regularization matrix used in NRE is designed aswhere is an adjustable parameter (), which can be adjusted according to the condition number of coefficient matrix . is used in this work. Finally, the NRE of can be obtained as

Compared with RE, the advantages of NRE lie in the following aspects. (1) The complex operation of ridge parameter selection is avoided. (2) The calculation accuracy is further improved by automatically adjusting diagonal elements as shown in equation (21). Using NRE and the data in Tables 5 and 6, the size effect laws for the compressive and tensile strengths in this experiment can be obtained by data fitting as

As stated before, the standard neutrosophic number , which consists of a determinate part and an indeterminate part (), is very suitable for expressing those parameters with indeterminacy in practice. In view of this, we further improve the above size effect laws by using the standard neutrosophic number in order to reflect the indeterminacy in data.

For the compressive strength, letting and be two neutrosophic numbers for , equation (13) can be rewritten as

For the splitting tensile strength, letting and be two neutrosophic numbers for , equation (14) can be rewritten as

In equations (25) and (26), the positive constants can be determined by the proposed NRE method. Equations (27) and (28) present the results obtained after fitting as

For comparison, Figures 7 and 8 present the fitting curves of size effect laws for the compressive and tensile strengths, respectively. In Figure 7, the black curves and the scatter points indicated by “∗” are obtained by equation (23) and the data in the fifth column of Table 5. The red curve and the green curve in Figure 7 indicate the lower boundary and the upper boundary obtained from equation (27). In Figure 8, the black curves and the scatter points indicated by “∗” are obtained by equation (24) and the data in the fifth column of Table 6. The red curve and the green curve in Figure 8 indicate the lower boundary and the upper boundary obtained from equation (28). One can see from Figures 7 and 8 that the size effect laws in the form of the standard neutrosophic number can provide a certain range of the strength value for a particular size. Obviously, the size effect law based on the standard neutrosophic number is more realistic than the existing size effect law.


Figure 7 
Fitting curves of size effect laws for compressive strength.

Figure 8 
Fitting curves of size effect laws for splitting tensile strength.

Comparing equations (12) and (11), one can find that the two size effect formulas for the compressive and tensile strengths seem to be similar. It may be valuable to propose a unified formula of the size effect. In this paper, a unified formula for size effect law is proposed aswhere denotes the physical quantity such as compressive and tensile strengths and and are the two constants which can be determined by providing fits to experimental data. is called the fractal dimension, which is mainly determined by the characteristics of the material itself. can also be obtained from a large number of test data statistics. In this work, is used for the compressive strength and is used for the splitting tensile strength. Equation (29) can be used for other types of size effect laws.

5. Conclusion

In this study, four sets of recycled concrete cube specimens with different sizes are produced in the laboratory. The experiments on compressive and tensile strengths are carried out to obtain the rules of the strength value with the change of the specimen size. According to the experimental results, it was found that the compressive and tensile strengths of recycled concrete both have obvious size effects. In general, the strength value decreases gradually with the increase of specimen size. To reflect the uncertainty in the data, a standard neutrosophic number is proposed to improve the multiplication of neutrosophic numbers to a certain degree. Subsequently, the proposed standard neutrosophic number is used for modifying the size effect law on the compressive and tensile strengths. It has been shown that the size effect law based on the neutrosophic number is more realistic than the existing size effect law. The proposed method in this paper provides a simple and effective way to handle the indeterminacy in the testing data and can be extended to other types of size effect laws, which are our future research directions.

Data Availability

The data used to support the findings of this study are included within the article and also available from the corresponding author upon request.

Conflicts of Interest

The authors declare that they have no conflicts of interest.

Acknowledgments

This work was supported by the Natural Science Foundation of China (52078081 and 52008215) and the Natural Science Foundation of Zhejiang Province, China (LQ20E080013), the major special science and technology project (2019B10076) of “Ningbo Science and Technology Innovation 2025.”