Neck Moment Characterization of Restrained Child Occupant at Realistic Nontest Standard Higher Impact Speed of 32 . 2 km / h

The effects of bullet vehicle crash impact angle, child restraint system design, and restraint harness slack at side impact speed of 32.2 km/h (20mph) on moments sustained at the neck by a three-year-old child are investigated. Mathematical models are built using the response surface method based on simulation results whereby good fitness is achieved.The singular and cross interactive effect of each predictor on the neck moment are analyzed. The number of significant parameters affecting the neck moment is shown to be the largest for wide impact angles (φ ≥ 60∘) and the impact angle parameter is largely revealed to be the most sensitive. An ideal safe range for low neck moment has been established to be within φ angles 45 and 65. It is further shown that the nature of all parameters effect on the neck moment is highly dependent on the impact angle range.


Introduction
It has been shown over the last two decades that vehicle crashes have become the leading cause of death for children in many developed countries [1][2][3][4].The side impact crash mode especially is shown to be a particularly harmful mode [5,6].Many factors contribute to this scenario, one of which is the presence of shoulder harness slack [3,6,7].Another is due to the kinematics of side impact crash which depends upon both the magnitude of the impulse from the bullet vehicle and its principle direction of force (PDOF) impacting angle [8].In addition, it has been shown that the head contact with intruding door due to the bullet vehicle plays a pivotal role and has to be considered in addressing any mitigation efforts [9,10].
Although head injuries are largely reported to be prime cause of fatalities in child restraint system (CRS) restrained toddlers involved in side impact crash [3,4,10,11], there is sufficient cause for concern where the fatality may also be related to high neck loading [12].Investigation of neck moments pertaining to CRS design, misuse, and crash parameters is yet unexplored due to insufficient accident data and costly full vehicle analysis simulations.Thus, the effects and relationships between the singular and cross interactive parameters, especially for oblique side impact involving intrusion, are not studied [10].Insights obtained from such a work would serve to promote better understanding of the side impact crash event in order to achieve greater injury mitigation.
In this work, a study is undertaken to characterize the neck moment (NM) of a CRS restrained 3-year-old child occupant involved in lateral and oblique side impact, with respect to identified relevant crash parameters.A prescribed structural motion (PSM) simulation is carried out where a prevalidated Hybrid model consisting of both finite elements (FE) and multibodies (Mb) is subjected to a pulse, which represents the bullet vehicle kinematic impact load.The methodology allows for significant savings in computational cost while preserving the required accuracy.The commercially available MADYMO 7.4.1 by TASS is used for the    Livermore Software Technology Corporation is used for the FE model mesh generation.The material property is defined as polypropylene.The density (), Young's modulus (), and Poisson's ratio () are specified, respectively, as 800 kgm −3 , 0.842 GPa, and 0.3 whereas the yield and the ultimate tensile strengths are set as 8.76 MPa and 18.76 MPa, respectively [14][15][16].A foam insert comprising solid elements is also modelled as shown in Figure 1.This is placed at the side wings of the CRS to absorb head impact.A highly compressible low-density foam material model ( = 50.2kgm −3 ,  = 5.463 MPa) is used [7,16].The CRS is constrained at base anchorage points on a ECE R.44 test bench using fixed cross bars.The boundary conditions and simulations are done in MADYMO 7.4.1.
The five-point harness system of the CRS is modelled predominantly using 1 mm thick membrane elements ( = 890.6 kgm −3 ,  = 2.068 GPa, and  = 0.3).However, to reduce computation time, the FE belts are connected at both ends to the anchor point using rigid bodies.Loading and unloading data with hysteresis are provided for both belt types [7,16,17].No slack is allowed for the belt fitting [14].
An intrusion of 280 mm is considered [13,18] and this is achieved by means of introducing rigid static planar-surfaces as shown in Figure 1.The secondary intrusion plane (130 mm intrusion) has contact defined against the CRS as well as the child dummy whereas for the primary intrusion plane, only the head is allowed to contact with it.This arrangement is assumed to cater for the worst case scenario of the intrusion whereby the head is free to strike the hardest part of the intruding door, at the earliest moment of time.
A commercially available ellipsoid Hybrid III 3YO child dummy model is used in this work [17].Both dummy and CRS are subjected to gravitational loading as well as acceleration pulse to simulate lateral side impact.Dynamic simulation time is set to terminate after 125 ms.Convergence study is carried out during the trial runs and a good tradeoff between model cost and accuracy is achieved with an element count of 24,320.The entire model assembly has been previously validated and it has been shown to be both accurate and  computationally economical with each run typically taking only 20 minutes [19].

Statistical Modeling
Figure 2 illustrates the parameters selected for the sensitivity study and Table 1 shows organization of the DoE as well as the upper and lower bounds considered for each parameter adopted from standards [20,21].To further increase the sensitivity of the study, the PDOF impact angle () is divided into two groups, namely, PDOF A (60 ∘ ≤  ≤ 90 ∘ ) and PDOF B (30 ∘ ≤  ≤ 60 ∘ ).The first caters for a wide PDOF angle ( ≥ 60 ∘ ) impact approach while the latter represents a narrow impact approach ( ≤ 60 ∘ ).The ensuing NM response plots generated by MADYMO are recorded.Multinomial regression is used as a method to determine parameter sensitivity and hence a quadratic response surface method (RSM) is used to model the problem.The response data is converted to logarithmic values of base 10 and submitted for regression analysis.Table 1: DOE grouping and parameter bounds.

Results and Discussion
From the DoE tabulations, the full range of  1 values encompassing both PDOF A and B groups against the NM response is plotted as shown in Figure 3.The values seem to peak at 30 ∘ with approximately 75 Nm.A favourable low neck moment of 50 Nm and below seems to be indicated between PDOF  angles 45 ∘ and 62 ∘ .The NM severity range (approximately above 60 Nm) is indicated for PDOF impact angles to be less than 40 ∘ and greater than 66 ∘ .Table 2 shows the statistical diagnostics obtained for all four models.From the regression coefficients, good fitness is indicated for all the models where the model errors are shown to be low as given by the small RMSE values.The R 2 and R 2 adjusted (R 2 Adj.) values substantiate this conclusion and provide a good indication of the model fitness with all values approaching unity.Additionally, results from the Fisher () test reconfirm that the RSM models are statistically acceptable and this is supported by the low associated  values.
Student's -test is used to identify the major contributing single parameters and cross interaction parameters as well as assess their respective parametric significance.Figure 4 depicts the full data distribution and pattern of the  statistic values for each model in graphical form while Table 3 shows the  statistics for only the significant parameters identified.A quick glance reveals that the PDOF A groups obviously register more numbers of significant parameters than the  PDOF B groups.This shows that the NM of the restrained 3-year-old child during side impact is very much affected by the designated parameters both individually and cross interactively for wide PDOF impact angles of  ≥ 60 ∘ .A scrutiny of Table 3 and Figure 4 reveal the PDOF impact angle  ( 1 ) to be the most sensitive parameter for all cases, both singularly and cross interactively.Singularly, the significance is found to be especially pronounced for wide PDOF impact angles ( ≥ 60 ∘ ) where the  value is shown to be relatively very small ( = 7.6795,  = 2.20E − 6).It is interesting to note that, contrary to PDOF A, values for PDOF B ( ≤ 60 ∘ ) are negative indicating that increase in  1 serves only to reduce NM.The response surface line plots for  1 with respect to NM for both impact angle groups are shown in Figure 5.
Cross interactively, the parameters X 1 X 5 and X 1 X 6 register moderate significance for PDOF B although this observation is not seen to hold for wider impact angles (PDOF A).For the later impact angle group,  1 interaction is notable with  2 and  3 .No interaction with parameter  4 is seen for any of the models.The response surface plots for these significant interactions with  1 are depicted in Figure 6.
The CRS pitch angle parameter ( 2 ) is found to be sensitive only for wide PDOF impact angles ( ≥ 60 ∘ ) (Figure 5(c)).Cross interactivity of the parameter with  1 (Figure 6(a)) as well as with  5 is observed (Figure 7(a)).The CRS shell thickness parameter  3 is also found to be significant only cross interactively and that too only for wide PDOF impact angles (PDOF A).Four interactions, X 1 X 3 , X 3 X 4 , X 3 X 5 , and X 3 X 6 , are seen of which the response surface plots for the last three are given in Figures 7(b The harness coefficient of friction parameter  4 indicates the least sensitivity in this study with only a single positive cross interaction with  3 (Figure 7(c)) seen for PDOF A. The misuse parameter  5 (far side harness slack) is found to be singularly insignificant for the determination of neck moment in side impact crash.However, cross interactively, three observations (X 2 X 5 , X 3 X 5 , and X 5 X 6 ) of moderate significance are noted for PDOF A. The response surface plots are given in Figures 7(a), 7(c), and 7(e), respectively.Similar to  5 , the  6 parameter (near side harness slack) has no singular significance but retains some cross interactivity across the models.The PDOF B group has only one cross interaction parameter, X 1 X 6 (Figure 6(a)), while PDOF A reveals two observations X 3 X 6 (Figure 7(d)) and X 5 X 6 (Figure 7(e)), all of moderate significance.Note.Values of high statistical significance ( < 0.01) are bold.

Conclusions
Response surface models have been generated using LHS design and have been shown to have good fitness.Parametric behaviour affecting neck moments during side impact crash affecting restrained child, which is previously unavailable, is captured.The singular and cross interactive parameter sensitivity for neck moments in a 3-year-old child involved in realistic intrusive side impact speed of 32.2 km/h is studied and acceptable values of the  statistic and its significance  are obtained and reported.The number of significant parameters affecting the neck moment is shown to be the largest for wide impact angles ( ≥ 60 ∘ ) and the PDOF angle  1 is largely revealed to be the most sensitive parameter.An ideal safe range for low NM has been established to be within  angles 45 ∘ and 65 ∘ .It is reported that  1 has an increasing effect on NM at wide impact angles but, for narrow impact angles, the opposite holds true.The other parameters are generally found to be moderately significant only for wide PDOF impact angles.It has been shown that the harness friction coefficient ( 4 ) has relatively very little effect on NM.
The nature of all parameters effect on the NM (of weather increasing or decreasing) is shown to be highly dependent on the impact angle range.Thus, it is understood that oblique

Figure 3 :
Figure 3: Effect of impact angle parameter  1 on neck moment.

Figure 4 :
Figure 4: Qualitative analysis of neck moment response for RS models.

Figure 5 :
Figure 5: NM significant singular parameter response line plots.

Figure 6 :
Figure 6: NM significant  1 cross interactive parameter response surface plots.

5Figure 7 :
Figure 7: NM other significant cross interactive parameter response surface plots.
), 7(c), and 7(d), respectively.Except for the first interaction (Figure 6(b)), the other three are shown to have a positive effect on neck moment.

Table 2 :
Model fitness diagnostic statistics.: Only parameters having  value of less than 0.05 are included in the table. Note

Table 3 :
Student's -test and significance  of parameters for NM response.
*Only parameters having  value of less than 0.05 are included in the table.