Determining the dynamic properties of structures is important for understanding their seismic behaviour. Ambient vibration signal measurement is one of the approaches used to determine the period of structures. Advantages of this method include the possibility of taking real-time records and presenting nondestructive and rapid solutions. In this study, natural vibration periods are calculated by taking ambient vibration signal records from 40 buildings. The height of the building, infill wall effect, presence of seismic retrofit, and presence of damage are taken into consideration, and their effects on natural vibration periods are investigated. Moreover, the results are compared with the analytical methods to reveal the differences. A significant correlation between the period and height of the building is observed. It is seen that the natural vibration periods of the buildings decrease by 7% to 30% (15% on average) due to infill wall contribution. However, the efficiency of infill walls decreases as the building height increases. Another significant result is that adding shear walls substantially decreases the vibration period values by 23% to 33% with respect to the shear wall ratio. When the analytical estimates and measured building period results are compared, it is seen that analytical models have closer period estimates before infill walls are implemented. The limited data in scope of the study suggest that significant differences may present in the analytical and measured periods of the buildings due to infill wall contributions.
1. Introduction
Determination of dynamic structural parameters is a basic and indispensable procedure for a proper engineering application. As a result of increasing importance of dynamic loads on structures, it was taken into account in theoretical base in 1920s. The early literature about it was available at 1950s [1, 2]. In the following decades, experimental research data and theoretical dynamics of structures promote numerical and analytical models which help to determine the amplitude of forced vibrations and shape/frequency of fundamental vibration modes of structures. Modelling a structure accommodates many difficulties because of some assumptions, and analytical models might not reflect the cases in practice. The majority of the assumptions in the models come from some dynamic characteristics of structures, and enlightening them in practice by using experimental methods provides a better understanding. A tentative model includes vibration tests and succeeding analysis on the measured data, and this process is called modal testing. Presently, the main testing techniques are single-point and multipoint excitation. The first method excites a structure at one coordinate and measures the response at all the coordinates while the latter implies it at many points at the same time. Both methods have some advantages and disadvantages inherently.
The ambient vibration measurement (AVM) is one of the dynamic analysis techniques that works as a single-point excitation method [3]. The advantage of the method is gaining real-time records and rapid nondestructive analysis [4]. Dominant natural vibration periods of structures can be effectively determined by AVM [5]. Since natural period is among the most effective parameters for seismic demand of structures, determination of the period of a structure in the most realistic way is very important.
Ambient vibration tests of structures have been conducted for some decades. The U.S. Coast and Geodetic Survey started using ambient vibration tests to measure the fundamental periods of buildings in the 1930s [6, 7]. Later, Crawford and Ward [8, 9] showed that AVM can be used to determine the highest period and fundamental modes of vibration of full-scale structures. Trifunac [10] compared the wind- and microtremor-induced vibration test and forced vibration experiment results on the same two buildings and observed that the outcomes are consistent and comparable. Additionally, the AVM method is validated by direct comparison with small-amplitude forced vibration tests [11, 12]. Most frequent use of AVM involves identification of natural modes, mode-shapes, and equivalent viscous damping parameters of vibration of various full-scale buildings [13–16]. Besides, AVM tests have been used to enhance the parameter approximations and the overall modelling of full-scale structures [4, 17, 18].
The ambient vibration measurements (AVM) are widely used in recent studies to determine dynamic properties of structures. Foti et al. used AVM to determine dynamic characteristics of a historical tower in Italy and for updating their 3D finite element model. The authors reported a very good match between theoretical and experimental modal parameters for the tower [19]. The method is also used for a field investigation on a damaged floor slab of a reinforced concrete frame building. It was observed that there was a 25–53% drop in natural frequencies of the damaged slab compared to the undamaged slab [20]. The dynamic characteristics of the masonry vault of a historical building have been identified by using the ambient vibration test [21]. Realistic estimation of RC building periods and effect of infill walls on the dynamic characteristics were also investigated using AVM [22–25]. Both ambient and forced vibration surveys were used to investigate the dynamic properties of a six-story residential building in Istanbul, and mode shapes, modal frequencies, and damping ratios were determined [26].
As aforementioned, there are many studies using AVM methods to evaluate building dynamic characteristics in the literature. However, as the regional construction practices affect the building properties, the reported values from different regions are important to enrich the current literature [27]. Additionally, it is stated in the literature that in situ measurement of full-scale partially damaged structures is of considerable interest [3].
This study aims to evaluate present natural vibration period measurements from ambient vibration signal records from 40 buildings with different characteristics. The height of the building, infill wall effect, presence of seismic retrofit, and presence of damage are taken into consideration and their effects on natural vibration periods are investigated. Considering that the measurements related to seismically damaged buildings before and after retrofit and values before and after construction of infill walls are limited in the literature, this study provides valuable contribution to the literature.
2. Materials and Methods
The tests in scope of the study have been carried out in western Turkey, namely, in Denizli, Simav, and Kutahya towns. All these towns are subjected to the same tectonic regime which is dominated by widespread active continental extension. These sites are formed by horst-graben systems which are bounded by active normal faults [28–30] (Figure 1). All the faults in three sites lie in the northwest-southeast direction.
Location map of the tested buildings and major fault lines nearby (based on [31]).
The measurements were obtained on two orthogonal components at the same location (near the floor mass center) for minimum 30 minutes recorded by using a three-component CMG-6TD seismometer of Guralp Systems. The records were taken at the late nighttime as the noise magnitude was lesser and/or the buildings were not used so that the undesired interference was at the minimum. The measurements were repeated in each story to obtain consistent test data to calculate the vibration period of buildings properly. Required measurement duration of ambient vibrations is directly affected by environmental conditions. For example, the undesired environmental noise is much higher in studies related to determination of soil properties, so the measurement duration increases. Similarly, higher measurement durations may also be required to calculate higher mode periods with lower amplitude. However, since the study was limited to the measurement of the dominant-mode period in the long and short direction of the buildings, 30 minutes of measurement time is found to be sufficient. In a similar study by Gallipoli et al. [32], measurement duration was 10 minutes per building. Additionally, the measurements were repeated on each story and controlled to confirm the dominant-mode vibration period of the building across its height for possible inconvenience in measurements.
Geopsy software was used to evaluate the records [33]. To obtain natural vibration periods of structures, Fourier amplitude spectrum is calculated for each direction from measurement data. The highest amplitude frequency obtained from the spectrum corresponds to dominant vibration of the building in that direction.
Amplitude spectrums of the records with filtering of 0.1–20 Hz frequency were calculated by zeroing the start and the end points through a Cosine Taper Window. Attention was paid in the calculations to make sure that the measurement windows taken from records did not include the undesired peaks and noise.
The tested buildings were categorized into two groups (sets):
Nondamaged buildings
Lightly damaged and retrofitted buildings
The first group (Set 1) includes low-, medium-, and high-rise buildings that have reinforced concrete (RC) systems with infill walls. The vast majority of buildings have been constructed according to modern Turkish Earthquake Code [34]. The set includes 40 residential buildings with typical structural properties observed in the building stock of Turkey [35]. Concrete strength of examined buildings varies between 20 and 25 MPa. All buildings are constructed as RC frame without shear walls. Since the buildings are used as residential, the infill wall placement and ratios to story area have the similar trend. Construction stages of six buildings in this group are monitored; AVM tests were taken before and after the construction of infill walls. The measurements were taken as bare frame and frame with plastered infill walls.
The second group (Set 2) has four residential buildings built before the Simav earthquake dated 2011, and they were lightly damaged and retrofitted ones [36, 37]. Although the dimensions, infill wall ratios, and purpose of construction are similar to those in Set 1, construction quality is poor. Concrete compressive strength of buildings in Set 2 was determined as 7 to 10 MPa in the field investigation. In scope of this paper, lightly damage is used for the buildings that have not any structural damage but common infill wall cracks. The microtremor records were taken in this set before and after the structural retrofitting. It made possible to visualize the retrofitting effects on the natural period of these existing buildings. The buildings in Set 2 have been designed according to premodern Turkish Earthquake Code [38]. The characteristics of the buildings used in the study are shown in Table 1.
Structural characteristics of the sets.
ID
No. of stories
Design code
S1-1
2
2007
S1-2
2
1975
S1-3
3
2007
S1-4
3
2007
S1-5
3
1975
S1-6
3
1975
S1-7
4
2007
S1-8
4
2007
S1-9
4
2007
S1-10
4
2007
S1-11
4
2007
S1-12
4
2007
S1-13
4
2007
S1-14
4
1975
S1-15
4
1975
S1-16
5
2007
S1-17
5
2007
S1-18
6
2007
S1-19
6
2007
S1-20
9
2007
S1-21
9
2007
S1-22
10
2007
S1-23
10
2007
S1-24
12
2007
S1-25
13
2007
S1-26
15
2007
S1-27
17
2007
S1-28
19
2007
S1-29
22
2007
S1-30
30
2007
S1-31∗
4
2007
S1-32∗
2
2007
S1-33∗
5
2007
S1-34∗
9
2007
S1-35∗
8
2007
S1-36∗
7
2007
S2-1
5
1975
S2-2
5
1975
S2-3
5
1975
S2-4
3
1975
∗AVM taken before and after the construction of infill walls.
3. Ambient Vibration Measurement Results
Amplitude spectrum graphs of a typical record are shown in Figure 2. Peaks observed in the frequency between 4 and 6 Hz for both directions define dominant-mode vibration frequency of the building. Short and long directions describe geometrically the shorter and longer side of measured buildings, respectively.
Amplitude spectrum graphs of a typical record. (a) Short direction. (b) Long direction.
3.1. Building Height and Period Relationship
The distribution of natural vibration periods obtained for Set 1 with respect to the heights of the buildings is shown in Figure 3. As expected, building periods increase with respect to height. The height-period curve defined in many regulations [39–41] and ambient vibration signal measurements were compared to evaluate the consistency of obtained data with other results in the literature. Empirical equation derived by Euro Code 8 is given in equation (1). T defines the building period and H defines the building height in the following equation:(1)T=0.075H0.75.
Distribution of natural vibration periods obtained from measurements with respect to the building heights.
Gallipoli et al. [32] derived equation (2) by using ambient vibration signal records taken from 244 buildings located in various regions in Europe:(2)T=0.016H.
Chiauzzi et al. [42] defined the height-period relationship in equation (3) by using ambient vibration signal records taken from twelve buildings located in Canada:(3)T=0.037H0.76.
Based on the measurements in this study, a derivation of an empirical equation with respect to height-period parameters is given in(4)T=0.01815H.
When results are compared, it is observed that the data obtained from Set 1 have similar tendency with the equation proposed by Gallipoli et al. [32]. The proposed equation by Chiauzzi et al. is successful to estimate the period of low- and mid-rise buildings. But the measured period values are higher for high-rise buildings. The code height-period curve resulted in estimations much higher than expected for all ranges possibly due to omitting the contribution of infill walls. Another significant point is that buildings used in data sets are residential buildings having similar characteristics. Therefore, it can be assumed that these buildings having reinforced concrete frame systems are constructed in accordance with design codes and do not have great differences. For buildings with high amount of shear walls, lack of such a high-level relationship between height and period can be expected depending on the amount of shear walls [43]. Natural vibration period of a building is affected by various parameters such as stiffness, mass, and their distribution in the structure, as well as height. Thus, equations derived from buildings of a certain region may not represent the properties of buildings in another region. But the obtained results clearly indicate that empirical equations obtained from ambient vibration signal records are useful tools for period estimates when typical residential buildings are considered.
3.2. Infill Wall and Period Relation
Although infill walls provide high stiffness to a structure under low amplitudes, they can be easily damaged under seismic loads because of their brittle characteristics [44]. Moreover, the strength of infill wall is influenced by numerous parameters such as material and mortar properties as well as production quality. Therefore, it is reasonable that under large displacements, building periods even in elastic regions can be higher than the period values determined based on ambient vibration records. Within the scope of the present study, in order to investigate the effect of the presence of infill walls on the stiffness of the building, six residential structures in Set 1 were monitored during their construction stages and ambient vibration measurements were taken before and after construction of the infill walls. Both periods obtained from the ambient vibration measurements were compared. Periods calculated before and after implementing infill walls, as well as their variations, are shown in Table 2. Comparison of the results shows that the building periods decreased by 6.6% to 30.3% after the construction of infill walls. The average change is approximately 15%. The change of building period decreases as the building height increases as shown in Figure 4. The obtained data indicate that there is a noticeable inverse correlation between the effectiveness of infill walls and the height of the building.
Effect of the infill walls on periods.
ID
Height (m)
Short direction
Long direction
Before
After
% change
Before
After
% change
S1-31∗
11.20
0.28
0.26
8.53
0.25
0.21
15.97
S1-32∗
5.60
0.21
0.15
30.30
0.18
0.15
18.38
S1-33∗
14.00
0.39
0.32
16.83
0.39
0.32
17.78
S1-34∗
25.20
0.40
0.34
14.63
0.37
0.34
6.55
S1-35∗
22.40
0.47
0.44
6.28
0.38
0.37
3.70
S1-36∗
19.60
0.46
0.40
12.75
0.45
0.36
20.58
Change of building period with height due to contribution of infill walls.
3.3. Effect of Retrofitting on Building Period
The damage evaluation has been carried out on 144 buildings in the Simav region after 2011 Simav Earthquake [45]. In the scope of the current study, AVM of four lightly damaged buildings was taken before and after retrofitting and the results were compared. There were hairline bending cracks in beams of reinforced concrete buildings and common infill wall damage. Thus, it can be said that infill wall stiffness contributions were at limited levels in Set 2 buildings compared to those in Set 1 and some of the reinforced concrete frame members reached to their cracked cross section stiffness. Table 3 shows period values measured before and after retrofitting, the added shear wall amounts (the area of shear walls divided by story area) for both directions. The comparison of period change with retrofitting shear wall ratio is shown in Figure 5. It can be said that retrofitting using shear walls decreases natural vibration periods by 22.7% to 32.6% with respect to the shear wall ratio. Figure 5 clearly indicates a significant correlation between the ratio of shear walls and the observed decrease in the period.
Period values measured before and after retrofitting.
ID
Height (m)
Short direction
Long direction
Period before (sec)
Period after (sec)
Shear wall (%)
Decrease in period (%)
Period before (sec)
Period after (sec)
Shear wall (%)
Decrease in period (%)
S2-1
11.20
0.43
0.35
0.86
22.73
0.24
0.19
1.32
24.87
S2-2
5.60
0.43
0.34
1.62
28.96
0.31
0.25
0.90
23.72
S2-3
14.00
0.43
0.33
1.31
27.84
0.34
0.26
1.65
28.52
S2-4
25.20
0.41
0.31
1.70
32.58
0.37
0.30
0.60
23.26
Effect of shear wall ratio on the period.
3.4. Evaluation of the Building Period/Building Height Ratio
The obtained data in the current study indicate that there is a significant correlation between period values and the building height for undamaged Set 1 structures. Although buildings in Set 1 were built based on different design codes, they show similar variations. Despite that, damaged buildings in Set 2 have higher scatter depending on the damage level of structural and nonstructural members. Similarly, measurements taken from buildings without infill walls have higher variation compared to the other sets.
It is hard to investigate the period of buildings with different heights. Thus, period/height ratios may better reflect the effect of different building properties such as damage level and retrofitting on stiffness capacity of buildings. Measured periods were divided by height of buildings and compared in Table 4 and Figure 6. The highest average (0.030) period/building height ratio was calculated for buildings of Set 2 before retrofitting as expected due to its damaged structural system and infill walls. This value decreased to 0.024 with 20% change, after retrofitting. The existence of infill walls decreases period/building height ratio by 21% (the ratio changes from 0.024 to 0.019). When average values of Set 1 and preretrofitting Set 2 buildings are compared with each other, a 37% difference is observed. This difference is attributable to the observed damages in infill walls and cracked structural members of Set 2 buildings.
Comparisons of period/height ratios in average.
Set 1 before infill wall
Set 1 with infill wall
Set 2 before retrofit
Set 2 after retrofit
Average period/height ratio
0.0240
0.0190
0.0300
0.0240
Standard derivation
0.0115
0.00404
0.00843
0.00703
Decrease on period/height ratio (%)
21
20
Comparison of period/height ratios of the buildings. (a) Set 1: without infill walls. (b) Set 1: with infill walls. (c) Set 2: before retrofit. (d) Set 2: after retrofit.
The highest standard deviation was found for Set 1 buildings before infill walls were implemented (0.0115). The standard deviation was significantly lower for the buildings with infill walls (0.004). The observed difference clearly shows that the presence of infill walls is highly effective on the vibration period of buildings. The differences on structural members are more predominant for buildings without infill walls. Consequently, high ratio of scatter is observed.
Set 2 buildings exhibit relatively smaller ratio of scatter except for one measurement. Since the damage level of structural and nonstructural members and the influence on stiffness is not clearly predictable, the unexpectedly high ratio of vibration periods for some cases may be acceptable for Set 2.
3.5. Comparison of Test and Model Data
The vibration periods obtained from ambient vibration measurements were compared with the periods obtained by analytical models. Three buildings in Set 1 were modelled with and without infill walls as 3-D models using SAP 2000 software [46]. Concrete compressive strength, steel properties and size of structural members were taken from construction drawings.
The modelled buildings were reinforced concrete frame-type structures without shear walls. The stiffness contribution of the infill walls that meet the FEMA-356 [47] and TEC-2007 [34] criteria was modelled as diagonal struts. The other infill walls with openings that prevent diagonal strut formation were considered as dead loads, only. Aerated concrete block is used in the buildings as infill wall element. Compressive strength and dry density of infill walls are assumed to be 2.5 MPa and 400 kg/m3, respectively [48]. Other dead loads such as slab weight were also considered as a distributed load at the beams. Since there were no records of seismic activity in the study area after construction of buildings and measurements taken just after the completion of construction, uncracked section stiffness is considered for the analytical model to have a more reasonable comparison. Although, diagonal struts modelling according to FEMA-356 is a simplified method, in the literature, it is stated to be a sufficient method to reflect the general stiffness contribution of infill walls [49–51].
Comparison of the dominant periods is shown in Table 5, while the distribution of ratios of analytical and ambient vibration measurement results is given in Figure 7. The measurements of buildings of Set 1 were taken as soon as construction stage completed. When the results are examined, it is seen that analytical models exhibit close period estimates before infill walls implemented. Despite the variance increases between the analytical model and measurements after the infill walls implemented for some cases (especially S1-32), period estimates seem to be closer in most cases. Such differences are expected to be observed due to various assumptions made for the analytical models. The highest difference was calculated in the S1-32 building with infill wall for the short direction. The building period is measured as 0.32 s, while the building period is calculated as 0.46 s for the analytical model. The limited data in scope of the study suggest that significant differences (up to 70%) may present in analytical and measured periods of the buildings due to infill wall contributions.
Comparison of period values obtained from measurement and analytical analysis.
ID
Before infill
After infill
Analytical
Measurement
Analytical
Measurement
Short direction
Long direction
Short direction
Long direction
Short direction
Long direction
Short direction
Long direction
S1-31
0.30
0.24
0.28
0.23
0.27
0.23
0.26
0.21
S2-32
0.20
0.22
0.18
0.21
0.15
0.18
0.15
0.15
S2-33
0.39
0.42
0.39
0.39
0.46
0.40
0.32
0.32
Comparison of period ratios obtained from measurement and analytical analysis. (a) Short direction. (b) Long direction.
4. Conclusions
Realistic determination of dynamic properties of the buildings is essential for consistent estimation of building behaviour. Therefore, a study to examine the factors that may significantly affect the building period is conducted. The ambient vibration measurements (AVM) from 40 buildings are evaluated. The buildings include a set of 36 new residential buildings. Among them, the 6 residential buildings were tested before and after the construction of infill walls. AVMs from 4 buildings are taken before and after the structural retrofit. The conclusions from the study are as follows:
There is a close correlation between natural vibration periods and building height in RC frame buildings without shear walls and seismic damage.
The period distributions of lightly damaged buildings in Set 2 have more scatter compared to Set 1 buildings. Because of decreased infill wall efficiency and the presence of structural members reaching cracked cross-section stiffness due to seismic effects, the calculated natural vibration periods of Set 2 buildings is higher than those of Set 1 buildings.
Based on the measurements in this study, an empirical equation with respect to height-period parameters is derived as T = 0.0343H0.762. The obtained results revealed a similar distribution with height-period equations in the literature by using ambient vibration signal records, especially to the Gallipoli et al. [32]. However, the relationship “T = 0.075H0.75” used in Euro Code 8 and other many regulations revealed higher natural vibration period estimates than the measured periods.
Six residential buildings in Set 1 are monitored during their construction stages, and ambient vibration measurements were taken before construction of infill walls; then; they were compared with the periods measured afterward. When the results are evaluated, it is found that building periods decreased by 7% to 30% (15% on average) due to infill wall contribution. The efficiency of infill walls decreases as the building height increases.
Based on measurements carried out on lightly damaged buildings located in the Simav region, the structural retrofitting conducted with adding shear walls decreased the vibration period values by 23% to 33% with respect to the shear wall ratio. Moreover, a significant correlation is observed between shear wall ratio and the period change.
In order to investigate changes of stiffness ratios of different sets, the measured period values are normalized by heights of buildings and compared. The highest period/height ratio, as expected, was found to be 0.030 for preretrofitted damaged buildings. After retrofitting, that ratio is calculated as 0.024 that corresponds to 20% decrease. The average period/height ratio decreased by 21% to 0.019 for Set 1 buildings after construction of infill walls. When average values of preretrofitted Set 2 and Set 1 buildings were compared, a 37% difference was observed. It can be said that the 37% difference is attributable to the damages observed on infill walls of Set 2 buildings and the presence of structural members reaching their cracked cross-section stiffness.
Three buildings in the Set 1 are modelled in the computer environment; the natural vibration periods obtained from the modal analyses are compared with ambient vibration signal data. When the results are examined, it is seen that the analytical models have closer period estimates before infill walls are implemented. The limited data in scope of the study suggest that significant differences may present in analytical and measured periods of the buildings due to infill wall contributions.
Data Availability
The data used may be provided by contacting the corresponding author.
Conflicts of Interest
The authors declare that they have no conflicts of interest.
SmirnovA. F.1947Moscow, RussiaTranszheldorizdatSorokinY. S.1956Moscow, RussiaGos. Izd-vo lit-ry po stroitel'stvu, arkhitektureIvanovicS. S.TrifunacM. D.TodorovskaM. I.Ambient vibration tests of structure-a review2000374165197DemirtasB.BayraktarA.DumanogluA.Model updating effects on the seismic behavior of tall buildings under far and near-fault ground motions2016329911210.17515/resm2016.64st0719AsgarianA.McClureG.Using ambient vibration measurements to generate experimental floor response spectra and inter-story drift curves of reinforced concrete (RC) buildings2017199929710.1016/j.proeng.2017.09.1632-s2.0-85029906934CarderD. S.Vibration observations1936Washington, DC, USASpecial Publication No. 201Chapter 5HudsonD. E.WiegelR. L.Dynamic tests of full-scale structures1970Englewood Cliffs, NJ, USAPrentice-HallCrawfordR.WardH. S.Determination of the natural periods of buildings1964546A17431756WardH. S.CrawfordR.Wind induced vibrations and building modes1966564793813TrifunacM. D.Comparisons between ambient and forced vibration experiments19721213315010.1002/eqe.42900102032-s2.0-84985824436BouwkampJ. G.StephenR.Ambient and forced vibration studies of a multistory pyramid-shaped buildingProceedings of the Fifth World Conference on Earthquake EngineeringJune 1973Rome, ItalyFarrarC. R.JamesG. H.Identification of dynamic properties from ambient vibration measurementsProceedings of the Pacific Conference on Earthquake EngineeringNobember 1995Melbourne, Australia105114IvanovicS.TrifunacM. D.Ambient vibration survey of full scale structures using personal computers (with examples in kaprielian hall)1995Los Angeles, CA, USAUniversity of Southern CaliforniaRep. No. 95-05KoL.BaoZ. W.1985Hong Kong, ChinaCivil & Structural Engineering Department, Hong Kong PolytechnicVenturaC. E.FelberA. J.StiemerS. F.Determination of the dynamic characteristics of the Colquitz River bridge by full-scale testing199623253654810.1139/l96-0582-s2.0-0029667321ÇalıkI.BayraktarA.TürkerT.AyanA. O.Dynamic identification of historical Molla Siyah mosque before and after restoration20173316417510.17515/resm2016.82st0728SafakE.CelebiM.Method to estimate center of rigidity using vibration recordings19901161859710.1061/(asce)0733-9445(1990)116:1(85)2-s2.0-0024982964YangC.LluD.The effect of stiffness degradation of shear wall and floor horizontal deformation on the frame-shear wall buildingsProceedings of the Nineth World Conference on Earthquake EngineeringAugust 1988Tokyo, Japan1722FotiD.DiaferioM.GiannoccaroN. I.MongelliM.Ambient vibration testing, dynamic identification and model updating of a historic tower201247889510.1016/j.ndteint.2011.11.0092-s2.0-84855989760HashimH.IbrahimZ.RazakH. A.Dynamic characteristics and model updating of damaged slab from ambient vibration measurements20134641371137810.1016/j.measurement.2012.11.0432-s2.0-84873031663ÇalıkI.BayraktarA.TürkerT.KaradenizH.Structural dynamic identification of a damaged and restored masonry vault using ambient vibrations20145546247210.1016/j.measurement.2014.05.0302-s2.0-84903719031AsterisP. G.RepapisC. C.TsarisA. K.Di TrapaniF.CavaleriL.Parameters affecting the fundamental period of infilled RC frame structures201595999102810.12989/eas.2015.9.5.9992-s2.0-84950258001GulerK.YukselE.KocakA.Estimation of the fundamental vibration period of existing RC buildings in Turkey utilizing ambient vibration records200812sup214015010.1080/136324608020139092-s2.0-47549111532ArslanM. E.DurmusA.Finite element model updating of in-filled RC frames with low strength concrete using ambient vibration test20135111112710.12989/eas.2013.5.1.1112-s2.0-84881104954MirtaheriM.SalehiF.Ambient vibration testing of existing buildings: experimental, numerical and code provisions20181041910.1177/16878140187727182-s2.0-85046830963ArasF.Ambient and forced vibration testing with numerical identification for RC buildings201611580982210.12989/eas.2016.11.5.8092-s2.0-84995387915OzmenH. B.InelM.MeralE.Evaluation of the main parameters affecting seismic performance of the RC buildings201439210.1007/s12046-014-0235-82-s2.0-84899958750BozkurtE.Sözbi̇li̇rH.Tectonic evolution of the Gediz Graben: field evidence for an episodic, two-stage extension in western Turkey20041411637910.1017/s00167568030083792-s2.0-1842682443BilimF.Investigations into the tectonic lineaments and thermal structure of Kutahya-Denizli region, western Anatolia, from using aeromagnetic, gravity and seismological data20071653-413514610.1016/j.pepi.2007.08.0072-s2.0-36549072890HançerM.Study of the structural evolution of the Babadağ-Honaz and Pamukkale fault zones and the related earthquake risk potential of the Buldan region in SW Anatolia, east of the Mediterranean201324339740910.1007/s12583-013-0333-22-s2.0-84878658339Goggle maps, 2011, http://maps.google.com/GallipoliM. R.MucciarelliM.Šket-MotnikarB.Empirical estimates of dynamic parameters on a large set of European buildings20108359360710.1007/s10518-009-9133-62-s2.0-77952098721Geopsy project, 2017, http://www.geopsy.org/Turkish Earthquake Code-TEC (2007)2007Ankara, TurkeyMinistry of Public Works and SettlementOzmenH. B.InelM.SenelS. M.KayhanA. H.Load carrying system characteristics of existing Turkish rc building stock2015131769110.22068/IJCE.13.1.76OzmenH. B.InelM.AkyolE.CayciB. T.UnH.Evaluations on the relation of RC building damages with structural parameters after May 19, 2011 Simav (Turkey) earthquake2014711638410.1007/s11069-013-0900-y2-s2.0-84893926422InelM.OzmenH. B.AkyolE.Observations on the building damages after 19 May 2011 Simav (Turkey) earthquake201311125528310.1007/s10518-012-9414-32-s2.0-84872909982Turkish Earthquake Code-TEC (1975)1975Ankara, TurkeyMinistry of Public Works and SettlementATC1978Washington, DC, USAATCCEN Eurocode 82004Brussels, BelgiumEuropean Committee for StandardizationNBCC2005Ottawa, CanadaAssociate Committee on the National Building CodeChiauzziL.MasiA.MucciarelliM.Estimate of fundamental period of reinforced concrete buildings: code provisions vs. experimental measures in Victoria and Vancouver (BC, Canada)Proceedings of the 15th World Conference on Earthquake Engineering2012Lisbon, PortugalPaper No: 3033InelM.BilginH.OzmenH. B.Seismic capacity evaluation of school buildings in Turkey2008161314715910.1680/stbu.2008.161.3.1472-s2.0-56649109621DolsekM.FajfarP.Soft storey effects in uniformly infilled reinforced concrete frames20015111210.1080/136324601093503832-s2.0-84862931684InelM.UnH.OzmenH. B.AkyolE.CayciB. T.OzcanG.Investigation of the feasibility of retrofitting the moderately damaged buildings in Simav region and surroundings2011Denizli, TurkeyPamukkale UniversityReport for Disaster and Emergency Management PresidencyCSI2011Berkeley, CA, USAComputers and Structures Inc.FEMA-3562000Washington, DC, USAFederal Emergency Management AgencyNarayananN.RamamurthyK.Structure and properties of aerated concrete: a review200022532132910.1016/s0958-9465(00)00016-02-s2.0-0034300785CrisafulliF. J.CarrA. J.Proposed macro-model for the analysis of infilled frame structures20074026777SevilT.BaranM.CanbayE.Tuğla dolgu duvarların B/A çerçeveli yapıların davranışına etkilerinin incelenmesi; deneysel ve kurumsal çalışmalar2010223542KaushikH. B.RaiD. C.JainS. K.A rational approach to analytical modeling of masonry infills in reinforced concrete frame buildingsProceedings of the 14th World Conference on Earthquake EngineeringOctober 2008Beijing, China