Shaking Table Test of a New Type Insulation Decorative Block Wall under Out-of-Plane Loading

In order to solve the problems of complex construction, poor weather resistance, and environmental pollution of conventional thermal insulation materials, this paper introduces a new type of insulation decorative block (IDB) filled with insulation materials. Different anchoring methods were adopted to study the influence of anchor bolts on the out-of-plane mechanical properties of IDB walls.,e test results revealed that the anchor bolts could effectively prevent the appearance and development of cracks in the specimens. With the increase of anchor bolts, the acceleration and displacement of the IDB walls decreased. Compared to rectangular arrangement, the staggered pattern of anchor bolts could reduce the relative displacement and acceleration. ,e structural calculation of IDB walls was carried out to determine the number of anchor bolts at different heights, and design suggestions were given to improve the performance of IDB walls.,e analysis and test results indicated that the IDB is suitable for application in engineering structures.


Introduction
Nowadays, one of the problems that must be solved is how to reduce the emissions by reducing the amount of energy consumed in economic development. Based on the evaluation of energy emissions in China, the building energy consumption accounts for about 30-40% of the total energy consumption, and the trend continues to rise [1]. e maintenance components of the buildings which are in contact with the outside air, such as windows, doors, floors, and walls, are the primary reason for the energy consumption of buildings. Among these maintenance components, the walls have the largest contact area with the outdoor air, thus having the greatest impact on the building energy consumption [2]. erefore, it is essential to take wall insulation measures to achieve the goal of the building energy saving and reduce the energy consumption of the external wall. ermal insulation materials are divided into organic (e.g., extruded polystyrene (XPS) and expanded polystyrene (EPS)) and inorganic materials (hydrophobic expanded perlite (HEP)). e engineering application of XPS and EPS, as organic materials, is affected by the moisture content and high temperature: (1) the heat transfer coefficient increases with the increase of water content [3][4][5]; (2) the flammability of materials threatens the safety of structures [6][7][8]. e high temperature resistance of HEP, as an inorganic material, is relatively stable, while the thermal transfer coefficient is high due to the strong water absorption capacity. ese conventional insulation materials could be used as additives in composite materials [9][10][11][12] or directly used as external thermal insulation materials of the buildings. When these insulation materials are directly used as building envelope components, structural measures and moisture control components should be proposed to improve the waterproof and fireproof properties of the materials during the construction process [13][14][15], which increases the construction cost and construction period. In order to deal with the defects of these conventional insulation materials in engineering application, the research on the building insulation materials should be strengthened.
A new type of thermal insulation blocks, which have high void ratio, is developed and used as the external walls of building [16][17][18]. e high void ratio of insulation block is helpful to reduce the dead weight and heat transfer coefficient; however, the compressive strength will be adversely affected due to the decrease of compression area. Moreover, the reinforced concrete shear walls are generally used as the external walls of high-rise buildings, indicating that it is impossible to apply the thermal insulation blocks directly. us, masonry veneer walls are gradually used in modern building construction. Masonry veneer walls, which consist of external masonry walls separated from the structural backing systems, are connected to the structural components using different types of ties to resist out-of-plane loads [19] and could provide the buildings with decoration and with barriers to moisture wind penetration but do not contribute to the structural resistance [20]. Desai et al. [21] studied the out-of-plane seismic properties of brick veneer wall systems in medium-rise buildings and developed analytical models of structural backing systems and masonry veneer walls. Reneckis et al. [22] described the out-of-plane performance of brick veneer walls on wood frame, and the installation methods, stiffness, and strength were found to significantly affect the seismic performance of veneer walls. Memari et al. [23] evaluated the influence of corrosion of conventional metal anchors on lateral forces, and the performances of corrosion resistant steel ties and conventional ties were compared. Marziale et al. [24] investigated the in-plane coupling between the veneer walls and concrete shear walls, and the optimum location of isolation joint was given to minimize the rocking behavior. ese papers provide a reference for the study of mechanical properties of masonry veneer walls; however, the out-of-plane dynamic performance of the walls made of insulation filled masonry blocks is rarely addressed.
is paper presents the results of out-of-plane shaking table test of four full-scale specimens, which are divided by the number and arrangement modes of anchor bolts between the masonry veneer walls and backup framing (reinforced concrete walls): AB0 has no anchor bolts, AB2 is strengthened by two anchor bolts per square meter, and AB4-1 and AB4-2 are strengthened by four anchor bolts per square meter with different arrangement modes. e structure of this paper is as follows: Firstly, the materials and experimental program, such as the dimension of the IDB, construction of specimens, arrangement of anchor bolts, and test setup, are introduced. Secondly, the mechanical tests are carried out, and the mechanical performance of specimens is obtained and analyzed, e.g., the failure pattern, development of cracks, frequency, acceleration, displacement of the specimens, and relative displacement between the IDB wall and shear wall. Finally, the reaction of IDB walls under wind load and seismic load is calculated, and design recommendations are proposed to improve the application of IDB in engineering.

Masonry Materials.
e block is made of shale and sawdust, in which the sawdust could produce a large amount of microporous inside the material, as shown in Figure 1. e IDB is filled with conventional composite thermal insulation materials, such as XPS, EPS, and HEP, so as to achieve insulation purposes. e dimensions of the IDB are 498 mm × 120 mm × 248 mm (length × width × height), as shown in Figure 2. e density and compressive strength of the IDB are about 500 kg/m 3 and 2.0 MPa, respectively. e content of mortar is cement, fly ash, sand, polymer emulsion powder, and water retaining agent. e mechanical and physical characteristics of mortar are shown in Table 1.
e anchor bolts are used to ensure the bond strength between the IDB wall and the external wall of buildings. e diameter of anchor bolt is 10 mm, and tensile strength is 0.5 MPa.
e length of the anchor bolt fixed into the reinforced concrete shear wall should not be less than 50 mm.

Construction of Specimens.
In this paper, four full-scale specimens are tested under out-of-plane dynamic loadings. e specimens are composed of ground beam, shear wall, mortar layer, and IDB walls, as shown in Figure 3. e ground beam is used to fix the specimen on the shaking table, and the shear wall is constructed to simulate the exterior wall of the high-rise building. Materials of leveling blanket and mortar layer are both masonry mortar. e mortar layer is used to strengthen the bond between the shear wall and IDB wall. e thickness of leveling blanket, mortar layer, and mortar joint is 1-2 mm, 10 mm, and 1 mm, respectively. e construction process of the specimens could be seen in Figure 4.

e Arrangement of Anchor Bolt.
In order to study the influence of number and distribution of anchor bolts on the out-of-plane seismic response of the specimen, the experimental program consists of four specimens, in which one specimen has no anchor bolts, one specimen has two anchor bolts per square meter, and two specimens have four anchor bolts per unit area with different arrangement modes of anchor bolts, as shown in Figure 5.
e IDB is made of sintered materials, and its brittle failure characteristics are obvious. If the anchor bolts are directly drilled on the IDB, the safety of IDB wall may be affected due to the damage caused by the drilling process.

Test Setup.
e performance parameters of the shaking table are shown in Table 2. e digital control system of shaking table (469D) consists of signal control of hydraulic servo system, sequence control of system procedure, and system security protection control, as shown in Figure 6. e experiments were carried out according to Chinese code GB 50011-2010 [25]. For the normal operation of the test, the out-of-plane loading of the specimen is performed along the x direction.
In order to obtain the displacement and acceleration of the wall during the loading process, acceleration sensor and     displacement sensor are arranged on the specimens, as shown in Figure 7. e measure range and sensitivity of the acceleration sensor are 100 g and 10 mV/g, respectively, while the measure range and sensitivity of the displacement sensor are 50 mm and 0.1 μm.

Testing Procedure.
ree earthquake records, namely, two real earthquake ground motion records (El-Centro record and Taft record) and one artificial earthquake ground motion record (Ninghe record), were applied in horizontal direction. e earthquake records were selected because the characteristic periods of the earthquake records are close to the different characteristic site periods prescribed by the Chinese seismic code [25] (Table 3). e acceleration timehistory curves of earthquake records are given in Figure 8. Table 4 shows the loading process. e natural frequencies could be obtained through white noise scanning, and the accelerogram of the earthquake record was scaled in amplitude to 0.20 g, 0.30 g, 0.40 g, 0.50 g, 0.60 g, 0.70 g, and 0.80 g to satisfy the test requirements. Considering that the Maximum acceleration (m/s 2 ) x direction: ±15 y direction: ±10 z direction: ±10 Maximum overturning moment (kN·m) 300 Maximum eccentric moment (kN·m) 800

Experimental Observation and Failure
Modes. e failure pattern of the specimens is described in Table 5. e cracks on the IDB wall and IDB wall boundaries were measured. It could be concluded that the crack usually appeared firstly at the bottom of the IDB wall, and as the PGA increased, cracks began to appear in the top corner of the specimen. e cracks mainly appeared at the joint of the IDB wall, ground beam, and shear wall, and there were basically no cracks in the interior of the IDB wall. During the loading process, there was no block crushing or block peeling from the specimen. e crack length in the top corner of the specimen reduced from 1100 mm (AB0) to 670 mm (AB4-1), and the crack width decreased with the increase of the number of anchor bolts, meaning that the anchor bolt could effectively limit the development of cracks. Since the crack width and length of AB4-1 were smaller than AB4-2, it could be inferred that the arrangement mode had an influence on the out-of-plane mechanical performance of the IDB wall.

Frequency of Specimens.
e natural frequencies of specimens can be obtained through white noise scanning, as given in Figure 9. When the PGA was not more than 0.20 g (AB0 and AB2) or 0.50 g (AB4-1 and AB4-2), the change of natural frequencies of the specimens was small. As the PGA continued to increase, the natural frequencies of the four specimens began to decrease significantly. For instance, when the PGA was 0.8 g, the decrease amplitude of the natural frequency of was 25.6% for AB0, 22.4% for AB2, 11.2% for AB4-1, and 12.3% for AB4-2. e following could be concluded: (1) e anchor bolts could effectively prevent the specimens from damage. at is for the reason that    (iii) At the end of the experiment, the length and width of the crack in the top corner of the specimen were 1150 mm and 3.0 mm, respectively. e crack at the bottom of the IDB wall, with a width of 2.5 mm, was basically a through crack. (ii) After the loading process, the length and width of the crack in the top corner of the specimen were 1000 mm and 2.5 mm, respectively, and the crack at the bottom of the IDB wall, with a width of 2.0 mm, was basically a through crack.
AB4-1 (i) Cracks appeared firstly in the top corner of the specimen and at the bottom of the IDB wall when PGA was 0.5 g.
(ii) After the loading process, the length and width of the crack in the top corner of the specimen were 670 mm and 1.0 mm, respectively, and the crack at the bottom of the IDB wall, with a width of 1.5 mm, was basically a through crack. 8 Shock and Vibration the natural frequency of the specimen was related to the degree of damage; the more serious the damage, the smaller the natural frequency. (2) Although the number of the anchor bolts was the same, the reduction amplitude of natural frequency of AB4-1 was smaller than that of AB4-2, meaning that arrangement mode of anchor bolts had an influence on preventing the structure failure.

Acceleration Response Analysis.
e acceleration at the bottom of the IDB wall was basically the same as the input acceleration, so this paper only gives the peak acceleration in the middle-upper part of the IDB wall, as shown in Figure 10.
Although the cracks appeared and developed at the bottom of the IDB wall, the acceleration in the middle of the IDB wall increased linearly (Figure 10(a)), and the magnification coefficient of the acceleration response was about 1.3. e reason for these results could be that almost no cracks appeared between the IDB wall and shear wall, and the lower part of the specimens was still subjected to the outof-plane load as a whole. However, at the top of the specimens, the cracks mainly appeared between the IDB wall and the shear wall, causing the magnification coefficient of the acceleration response to increase suddenly (Figure 10(b)).

Specimen
Test phenomenon Remarks/observations AB4-2 (i) Cracks appeared firstly in the lower part and top corner of the IDB wall when PGA was 0.5 g.
(ii) After the loading process, the length and width of the crack in the top corner of the specimen were 850 mm and 2.0 mm, respectively, and the crack at the bottom of the IDB wall, with a width of 1.8 mm, was basically a through crack.

Shock and Vibration
For instance, the acceleration at the top of AB0 increased linearly when the PGA was smaller than 0.4 g. As the earthquake load increased, the cracks between the IDB wall and shear wall began to appear and develop, and the magnification coefficient of the acceleration response increased from 6.7 to 9.1 when the PGA was 0.40 g and from 9.1 to 11.1 when the PGA was 0.50 g. It could also be concluded that when the crack width was small, it did not affect the global stress of the specimens. For instance, at the top of the AB4-1, the maximum width of crack between IDB wall and shear wall was only 1.0 mm, and the acceleration increased linearly all the time during the loading process.

Displacement Response Analysis.
In order to study the seismic performance of the IDB wall, the relative displacement and maximum displacement of the IDB walls are studied. e relative displacement is the difference between IDB wall and shear wall displacements, while the maximum displacement is the difference between the middle-upper and lower displacement of the IDB wall. e relative displacements between IDB wall and shear wall are depicted in Figure 11. Since the relative displacement at the bottom of the specimen was small, only the relative displacement of the middle-upper part of the specimen was given in Figure 11.
In the middle of the specimen, it could be observed that although the maximum relative displacement was 0.96 mm, no visible cracks appeared (Table 4). For AB0 and AB2, the relative displacement increased linearly until cracks appeared at the top of the specimens, while for AB4-1 and AB4-2, the relative displacement increased linearly all the time, which was not affected by the cracks at the top of the specimen.
At the top of the specimen, the relative displacement could directly reflect the appearance and development of the cracks. Take AB0 as example; the crack appeared firstly when the PGA was 0.4 g, after which the relative displacement increased rapidly with the development of the cracks. e maximum displacements of IDB wall under different conditions of PGA are given in Figure 12. From Figure 12, it could be concluded that the displacements of AB0 and AB2 were affected by the cracking at the bottom of the specimens. Once the crack appeared at the bottom of AB0 and AB2, the displacement of the specimens would increase rapidly. While for AB4-1 and AB4-2, the displacement was basically linearly increasing.
rough the analysis of Figures 11 and 12, it could be inferred that the displacement response of the IDB wall was closely related to the appearance and development of the cracks. is phenomenon was more obvious in AB0 and AB2; the displacement or relative displacement would increase rapidly after the appearance and development of the cracks. However, for AB4-1 and AB4-2, the displacement response was basically linear.

Structural Calculation.
Restricted by the experimental conditions, this paper only studied the out-of-plane seismic performance of IDB walls. However, in engineering practice, we should not ignore the wind load effect on the mechanical performance of brick veneer walls. erefore, wind load and seismic load should be considered simultaneously in structural calculation.

Calculation of Seismic Action.
According to Chinese code GB 50011-2010 [25], equivalent lateral-force method can be used to evaluate the seismic load caused by the gravity of nonstructural components. us, the seismic load of IDB walls could be calculated as follows: where c is the functional factor of the nonstructural components and equals 1.0; η is the type factor of the nonstructural components and equals 1.0; ζ 1 and ζ 2 are the factor of state and location and equal 1.0 and 2.0, respectively; α max is the maximum value of seismic influence coefficient and equals 0.16; and G is the gravity of nonstructural components (Table 6).

Calculation of Wind
Load. e characteristic value of wind load is shown in the following equations [26]: in which β gz is gust factor at height z, μ sl is local shape coefficient, μ z is wind pressure height coefficient, w 0 is basic wind pressure, μ f is pulsation coefficient, and α is ground roughness index. e wind load of maintenance structure for high-rise buildings is mainly wind suction, and the wind suction at the positive angle of buildings is larger than the wind suction at other locations [27]. e determination of coefficients in (2)-(5) is described in Table 7.
According to Chinese code GB 50009-2012 [26], the combination of earthquake and wind load can be expressed as Here, 1 and 2 represent wind and earthquake load, respectively; S Q 1 k is load effect value calculated by w k ; S Q 2 k is load effect value calculated by F; c Q 1 and c Q 2 are partial coefficients of load and equal 1.4 and 1.3, respectively; and ψ c is combination value coefficient and equals 0.6. e formula for calculating the number of anchor bolts per unit area can be given as where α is the reduction factor considering the connection between mortar and IDB wall and equals 0.5, c M is the anchor connection importance coefficient and equals 1.1, k is the anchorage capacity reduction coefficient under earthquake and equals 0.7, and f t is the design value of tensile bearing capacity of anchor bolts. Based on (1)- (7), the number of anchor bolts to be arranged at different heights is shown in Table 8. e results show that the number of anchor bolts in the test could meet the application requirements of IDB in high-rise buildings and has a good reference value.

Recommendations.
According to the destruction features of the specimens during the test process, cracks mainly occurred at the bottom of the IDB wall and in the top corner of the specimen. When the PGA was small (0.3-0.5 g), cracks firstly appeared and developed between the IDB wall and ground beam, which was due to the bending effect of the specimens under the out-of-plane load. Premature cracks had a negative impact on the insulation effect of the IDB wall, so the bottom of the IDB wall needs to be effectively treated.
As the PGA increased, cracks began to appear between the IDB wall and the shear wall on both sides of the top of the specimens. Besides, the IDB walls were also subjected to wind loads in engineering application, and the suction in the

12
Shock and Vibration top corner, generated by negative wind pressure, was larger than that at other positions [27]; hence, attention should be paid to the reinforcement of the top corner in the structural design. us, some recommendations are put forward in this paper, as shown in Figure 13.
(1) In order to prevent the cracks at the bottom of the IDB wall from occurring too early under the action of bending, cushion blocks with certain deformation ability, such as rubber block or wooden block, should be used to bear the dead weight of the IDB wall.
Foaming agent can be used as filling materials to improve the insulation performance of IDB wall. (2) In order to prevent cracks in the top corner of the wall from affecting the thermal insulation performance of the IDB wall, more anchor bolts should be used to strengthen the bonding between the IDB wall and shear wall at this location.

Conclusions
Shaking table tests are carried out on four specimens to investigate the out-of-plane performance of IDB walls. Failure mechanisms, frequencies, acceleration, and displacement (relative displacement) are evaluated, and the performance of anchorage mode is examined. e calculation formula of the number of anchor bolts and design suggestions are also given based on the experimental phenomena, so as to promote the application of IDB in engineering. e results obtained from the tests are briefly summarized as below: (1) Appearance and development of cracks between the IDB wall and shear wall are obviously affected by the number of the anchor bolts. e larger the number of anchor bolts, the smaller the seismic load at the time of crack appearance, the shorter the crack length, and the smaller the crack width. (2) e anchor bolts could obviously improve the outof-plane mechanical performance of IDB walls. Take AB0 and AB2 as example; when the seismic action is the same, the natural frequency of AB2 is larger, and the acceleration and displacement (relative displacement) are smaller. (3) Although the number of anchor bolts is the same, the displacement (relative displacement) and acceleration of AB4-1 are smaller than those of AB4-2, showing that the staggered pattern of the anchor bolts is a better arrangement method than rectangular arrangement. (4) e positive angle of the buildings should be strengthened to reduce the damage of IDB walls, and the calculation formula of the number of anchor bolts could be applied in the process of design.
Based on the test results (acceleration, displacement, and failure mode) and structural calculation, the acceleration and displacement requirements of different types of buildings could be satisfied through adjusting the number and arrangement of anchor bolts. erefore, the study of this paper could effectively promote the application of IDB.
Computational intelligence algorithms, such as monarch butterfly optimization (MBO) [28], neutrosophic optimization (NSO) [29], artificial bee colony (ABC) [30], and ant colony algorithm (ACA) [31], are gradually used to analyze the seismic response of the structures, so as to optimize the structural design and improve the seismic performance of structures. However, the impact of these intelligent algorithms has not been considered in the specification; thus, considering the engineering application of IDB, the structural analysis method used in this paper is specified by Chinese code GB 50011-2010 [25]. Considering the optimal design of structures, the Shock and Vibration 13 intelligent algorithms will be used to analyze the seismic performance of structures with IDB walls in subsequent studies.
Data Availability e data that support the findings of this study are available on request from the corresponding author.

Conflicts of Interest
e authors declare that they do not have any commercial or associative interest that represents conflicts of interest in connection with the work submitted.