DSR is a test for measuring the rheological stiffness and elasticity binders and bituminous mastics through the dynamic shear modulus G* and the δ phase angle [13]. It applies to high temperatures and intermediaries usually an old bitumen from “Rolling Thin Film Oven Test” (RTFOT). To input data requirements for writing prediction models studied, the DSR tests were performed at the same temperature (55˚C, 40˚C, 30˚C, 20˚C and 10˚C) and frequencies (10 Hz, 5 Hz, 1 Hz, 0.3 Hz and 0.1 Hz) than the dynamic modulus is testing.

The complex modulus tests are performed according to standard [13] entitled “Determination of the complex modulus of HMA” by using direct tension-compression equipment (TCD) on cylindrical specimens (Figure 1). E* is determined at small strains, at different frequencies and temperatures, in order to characterize the linear viscoelastic behavior of the mix. E* is a complex number which consists of two parameters, namely the dynamic modulus (|E*|), which is the standard of E*, and the phase angle (δ), which is the argument of E*. The |E*| is used for pavement design and δ can appreciate the viscoelastic behavior of the asphalt.

Figure 2 illustrates the results of a complex modulus test with the offset observed between the stress measurement and those deformations [9].

The complex modulus E* is determined by Equation (1).

E * = σ sin ( ω t + φ ) ε sin ( ω t − φ ) = | E * | cos φ + i | E * | sin φ (1)

[14].

Dynamic modulus |E*| is given by Equation (2) [4]

| E * | = σ ε = 4 P / π d 2 δ h / h (2)

[14].

The phase angle is determined by Equation (3).

φ = ω t l ∂ g (3)

(Touhara)

where E* is the complex modulus (kPa); |E*| is the dynamic modulus (kPa); φ is the phase angle (rad); σ is the total axial stress (kPa); ε is the total axial deformation (m/m); ω is the period (2∙π∙f) (rad); t is time (sec); “I” is the imaginary number; t_lag is time to shift between s and e (sec); P is the axial load (kN); d is the diameter of the test piece (m);. ∆h is the axial displacement (m); and h: height for measuring. ∆h (100 mm) (m).

The 1999 Witczak’s model is used in levels 2 and 3 of pavement design. It is given by Equation (4).

log | E * | = − 1.249937 + 0.029232 ρ 200 − 0.001767 ( ρ 200 ) 2 − 0.002841 ρ 4   − 0.058097 V a − 0.0802208 ( V b e f f V b e f f + V a )   + 3.871977 − 0.0021 ρ 4 + 0.003958 ρ 38 − 0.000017 ( ρ 38 ) 2 + 0.005470 ρ 34 1 + e ( − 0.603313 − 0.31335 log ( f ) − 0.395321 log ( η ) ) (4)

[4].

With |E*| is the dynamic modulus (105 psi); η is the viscosity of the binder (106 poise); f is the loading frequency in Hz; ρ₂₀₀ is the percentage passing through a sieve 0.075 mm (No. 200); ρ₄ cumulative percentage of the sieve 4.76 mm (No. 4); ρ₃₈ is the cumulative percentage of the sieve 9.5 mm (3/8 in); ρ₃₄ is the cumulative percentage of the sieve, 19 mm (3/4 in); V_a is the air void percentage; V_beff is effective binder content in percentage volume.

In fact in the report of NCHRP 1-37A it was developed by recalibration of the dynamic modulus of the prediction model developed by Witczak and Fonseca [10]. It was made by adding a new database to the original database. The evaluation of the reliability of the original model on the original database gave R² = 0.87 precision and Se/Sy 0.36 in basic arithmetic and assessment of its reliability on the new database is less accurate with R² = 0.73 and Se/Sy = 0.53. These observed differences assigned to differences in granularity and bitumen in the mixtures of the two databases. The results of the recalibration on the reliability of the model Witczak 1999 was satisfactory with an R² of 0.941, and Se/Sy 0.2449 [4].

However, the 1999 Witczak model poses a problem related to the fact the rigidity of the binder is characterized by a viscosity that does not take into account the effects of the charging frequency. In this model the frequency it is considered as another independent variable entered the predictive equation. However, the viscosity of the binder depends on the charging frequency. Thus changes in the load frequency induce changes of viscosity of the binder. From this point of view the scenario presented by the 1999 model where binder viscosity remains constant when the load frequency changes cannot be conceived in reality. In 2006 Bari and Witczak taking into account remarks cited above set of 7400 modulus measurements from 346 mixtures of HMA presents a new model in which the viscosity of the binder and the loading frequency considered directly in the model 1999 are replaced by the shear modulus |G*| and the phase angle. δ_b of the binder [11]. This model is described by Equation (5)

log | E * | = − 0.349 + 0.754 ( | G b ∗ | − 0.0052 ) × ( 6.65 − 0.032 ρ 200 + ( 0.0027 ρ 200 ) 2 + 0.011 ρ 4       − 0.0001 ( ρ 4 ) 2 + 0.006 ρ 38 − 0.00014 ( ρ 38 ) 2 − 0.08 V a − 0.16 ( V b e f f V a + V b e f f ) )   + 2.558 + 0.032 V a + 0.713 ( V b e f f V a + V b e f f ) + 0.0124 ρ 38 − 0.0001 ( ρ 38 ) 2 − 0.0098 ρ 34 1 + e ( − 0.7814 − 0.5785 log | G b * | + 0.8834 log δ b ) (5)

[11].

where |E*| is the dynamic modulus (psi); |G*| is the dynamic shear modulus of the binder; δ_b is the binder phase angle; ρ₂₀₀ = % of sieving 200; ρ₄ = % cumulative screen oversize 4; ρ₃₈ = % cumulative screen oversize 3/8; ρ₃₄ = % refusal cumulative ¾ screen; V_a = % air void; V_beff = effective binder content.

The 1999 and 2006 Witczak’s models are nonlinear models (polynomial) as a sigmoidal function. Their development was based on the analysis and optimization of the statistical process.

Statistical analysis was intended to reduce the prediction error by comparing the predicted values with the measured values [5].

The nonlinear optimization is to find the values of the regression coefficients or adjustment parameters used in a model so that the model equation has a minimum error when a set of predicted and measured data are compared (Bari and Witczak, 2006).

The goodness of fit indicates the degree of binding of the adjustment parameters to the prediction model. The nonlinear optimization uses as indicator the determination coefficient R² and the ratio of the standard error (Se) and standard deviation (Sy) noted Se/Sy. A good model present a high R² (close to unity) and a low Se/Sy.

Statistical quality of the correlation is given by R² and usually taken p-value of p < 0.005. It is the latter that will be used in the interpretation of our results.

The complex structure of HMA explains the choice of nonlinear optimization to study the predictive models.

The Solver Microsoft Excel is a useful and precise function chosen by most researchers to optimize the nonlinear problems. When the sum of the squared error is minimized, the solution is a biased solution.

The database used to make the calculations are presented as an appendix at the end of the article.

The analysis of the data consists of 1999 and 2006 Witczak’s model parameters i.e. |G*|, f, η, δ_b, ρ₂₀₀, ρ₄, ρ₃₈, ρ₃₄, V_a and V_beff. They are the explanatory or independent variables to predict the dependent variable log|E*| (explain). However, the values of the sieve meshes are approached P_0.08 (ρ₂₀₀), R₁₀ (ρ₃₈), R₁₄ (ρ₃₄) and R₅ (ρ₄).

NB: η values were determined from the coefficients ASTM A + VTS. This results in Equations (6) and (7) below.

log | E * | = − 1.249937 + 0.029232 P 0.08 − 0.001767 ( P 0.08 ) 2   − 0.002841 R 5 − 0.058097 V a − 0.0802208 ( V b e f f V b e f f + V a )   + 3.871977 − 0.0021 R 5 + 0.003958 R 10 − 0.000017 ( R 10 ) 2 + 0.005470 R 14 1 + e ( − 0.603313 − 0.31335 log ( f ) − 0.395321 log ( η ) ) (6)

With |E*| = dynamic modulus (105 psi); η = viscosity of the binder (106 poise); f = frequency in Hz loading; P₂₀₀ = percent passing sieve 0.08 mm; R₅ = cumulative percentage of the sieve 5 mm; R₁₀ = the percentage of cumulative screen oversize 10 mm; R₁₄ = the percentage of cumulative screen oversize 14 mm; V_a = percentage of vacuum; V_beff = Binder content effective in percentage volume.

log E * = − 0.349 + 0.754 ( | G b * | − 0.0052 ) × ( 6.65 − 0.032 P 0.08   + ( 0.0027 P 0.08 ) 2 + 0.011 R 5 − 0.0001 ( R 5 ) 2 + 0.006 R 10   − 0.00014 ( R 10 ) 2 − 0.08 V a − 0.16 ( V b e f f V a + V b e f f ) )   + 2.558 + 0.032 V a + 0.713 ( V b e f f V a + V b e f f ) + 0.0124 R 10 − 0.0001 ( R 10 ) 2 − 0.0098 R 14 1 + e ( − 0.7814 − 0.5785 log | G b * | + 0.8834 log δ b ) (7)

With |E*| = dynamic modulus (105 psi); |G*| is the dynamic shear modulus of the binder; δ_b is the phase angle of the binder P_0.08 = percent passing 0.08 mm sieve; R₅ = cumulative percentage of the sieve 5 mm; R₁₀ = the percentage of cumulative screen oversize 10 mm; R₁₄ = the percentage of cumulative screen oversize 14 mm; V_a = void percentage; V_beff = Binder content effective in percentage volume.

A correlation is performed on the values of modulus predicted by sieve mesh with the approximate 1999 Witczak’s model and the values measured in the laboratory on the mixtures designed with the basalt Diack and the quartzite Bakel by direct tensile/compression tests test on cylindrical specimens.

Figure 3 shows a fairly good estimate of the 1999 Witczak’s model with a very strong correlation of R² = 0.83 and a significant p (p = 0.00).

Table 1 shows the optimized coefficients Witczak module 1999 in comparison to the initial coefficients.

The new 1999 Witczak’s approached model and optimized is given by Equation (8) below:

log | E * | = − 0.152593542 + 0.006186186 P 0.08 − 0.003011471 ( P 0.08 ) 2   − 0.002858835 R 5 − 0.00000017 V a − 0.088945463 ( V b e f f V b e f f + V a )   + 7.698304773 − 0.00194078 R 5 + 0.003636243 R 10 − 1.72114 E − 05 ( R 10 ) 2 + 0.003804769 R 14 1 + e ( − 1.90175288 − 0.205909497 log ( f ) − 0.2849435891 log ( η ) ) (8)

With |E*| = dynamic modulus (105 psi); η = viscosity of the binder (106 poise); f = frequency in Hz; P₂₀₀ = percent passing sieve 0.08 mm; R₅ = cumulative percentage of the sieve 5 mm; R₁₀ = the percentage of cumulative screen oversize 10 mm; R₁₄ = the percentage of cumulative screen oversize 14 mm; V_a = void percentage; V_beff = Binder content effective in percentage volume.

Correlating the predicted modulus values with the new approached model values shows a good correlation with an R² = 0.9574 and p = 0.00. Figure 4 illustrate the results of the correlation.

A correlation is performed on the values of modulus predicted by sieve mesh with the approximate 2006 Witczak’s model and the values measured in the laboratory show a fairly good estimate of the model Witczak 1999 with a very strong correlation of R² = 0.71 and a significant p (p = 0.00) (Figure 5). A non-linear optimization by the MS Excel Solver may however be used to improve the correlation.

Table 2 shows the optimized coefficients of 2006 Witczak’s model in comparison to the initial coefficients. The optimization shows that the coefficient F11 is

canceled by the solver. However, in order to keep the shape intact models, a lower value of this coefficient is chosen so as not to vary the SSD significantly. The new model 2006 Witczak’s approached model optimized is given by Equation (9) below.

log E * = − 0 , 354624896 + 0.73016561 ( | G b ∗ | − 0.005481779 )   × ( 5.461922604 − 0.036114863 P 0.08 + ( 0.002060831 P 0.08 ) 2 + 0.005137335 R 5         − 0.0.000128808 ( R 5 ) 2 + 0.0.003963945 R 10 − 0.000166591 ( R 10 ) 2   − 0.0000001 V a − 0.18414392 ( V b e f f V a + V b e f f ) )   + 2.597758994 + 0.040197991 V a + 0.596946197 ( V b e f f V a + V b e f f ) + 0.00806974 R 10 − 0.000106102 ( R 10 ) 2 − 0.010347472 R 14 1 + e ( − 0.847277886 − 0.80288457 log | G b * | + 1.540388406 log δ b ) (9)

With |E*| = dynamic modulus (105 psi); |G*| est the dynamic shear modulus of the binder; δ_b is the phase angle of the binder; P_0.08 = percent passing 0.08 mm sieve; R₅ = cumulative percentage of the sieve 5 mm; R₁₀ = the percentage of cumulative screen oversize 10 mm; R₁₄ = the percentage of cumulative screen oversize 14 mm; V_a = void percentage; V_beff = Binder content effective in volume percentage.

Correlating the predicted modulus values with the new model shows a good correlation with an R² = 0.9175 and p = 0.00. Figure 6 shows the results of the correlation.