3.1 Extending the standard gumbel distribution with the orthonormal legendre polynomial

Bierens[38] proposed a new polynomial, called the orthonormal Legendre polynomial, for estimating distributions on the unit interval in a semi-nonparametric framework. In the transportation choice modeling literature, this approach has been used to test normal and log-normal distributions of random coefficients in mixed logit models[39]. As per Fosgerau and Bierlaire[39] and Bierens[38], the orthonormal Legendre polynomial may be recursively defined as: (4) (5) In Eq (5), , . The advantage of using this polynomial is that it ensures (6)

According to Gallant and Nychka[33], the prior distribution in the semi-nonparametric approach can be a distribution other than the standard normal distribution. In this paper, the orthonormal Legendre polynomial is used to construct a semi-nonparametric (SNP) probability density function that extends the standard Gumbel distribution as follows: (7) where g(x) = exp(−e^−x) ∙ exp(−x), G(x) = exp(−e^−x), δ_k are scalar parameters and K represents the total number of polynomials. Using Eq (6), it can be shown that . As f(x) is positive, it qualifies as a probability density function.

Fig 1 compares the semi-nonparametric probability densities when the number of polynomials is 1 (K = 1) and the parameter δ₁ takes a value of -2, 0, 1 or 2. When δ₁ is 0, the distribution reduces to a standard Gumbel distribution, as shown by the red curve. When δ₁ takes a value of -2, 1 or 2, the distributions are bimodal, although the secondary peak in the distribution is rather flat when δ₁ is equal to -2 or 1.

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Fig 1. Comparisons of semi-nonparametric probability densities when K = 1.

https://doi.org/10.1371/journal.pone.0186689.g001

Fig 2 compares the semi-nonparametric probability densities when the number of polynomials is 2 (K = 2) and two scalar parameters δ₁ and δ₂ are involved. With two polynomials, and where the highest power term of “G(x)” increases to 2, the SNP function represented in Eq (7) can generate a more flexible probability density distribution. It can be seen that, when δ₁ is 2 and δ₂ is -2, the distribution exhibits two modes with almost equal probability densities. When δ₁ is 0 and δ₂ is 2, the distribution shows three modes. It may further be expected that, when the number of polynomials (K) or the highest power term of “G(x)” increases, the SNP function with a flexible form can effectively represent the probability density function for a large family of distributions with multiple modes. Such flexibility allows for a better representation of the distribution of the error term in a random utility function of a choice model, and therefore provides the ability to obtain more consistent estimates of model coefficients.

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Fig 2. Comparisons of semi-nonparametric probability densities when K = 2.

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3.2 Simplifying the semi-nonparametric (SNP) probability density function (PDF)

Following Gallant and Nychka[33], it is possible to employ the SNP PDF in Eq (7) to construct random components in utility functions so that multiple modes may be accommodated in their distributions. Before the choice probability can be derived, the SNP PDF needs to be simplified first. Using Eqs (4) and (5), it is possible to write the polynomial in a general form as: (8) where c_n,k is a constant coefficient for the term “x^k” in the n^th polynomial. When k > n, c_n,k = 0. Let and . Then, L₀ = 1 and L₁ = ax + b. When n ≥ 2, as per Eq (5),

Since c_n−2,n−1 = 0, .

Then, it is possible to write: (9) (10)

When n = 0 or 1, define c_0,0 = 1, c_1,0 = b, and c_1,1 = a. For any integer “n” (n ≥ 2), the recursion equations (10) can be applied to compute the coefficients c_i,j and all of the c_i,j values form a lower triangular matrix, called the “c” matrix in this paper. Table 1 provides an example of such a “c” matrix when “n” reaches 6. With the “c” matrix, the general form of the orthonormal Legendre polynomial (given the “n” value) may be obtained. For example, when n = 4, the fourth row vector of coefficients in the “c” matrix can be extracted to write the polynomial as L₄(x) = 3x⁰ − 60x¹ + 270x² − 420x³ + 210x⁴.

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Table 1. An example of “c” matrix.

https://doi.org/10.1371/journal.pone.0186689.t001

After the “c” matrix is generated, δ₀ needs to be defined as 1 and the numerator in the SNP probability density function in Eq (7) can be rewritten as:

Define a “d” vector, where each element . Since c_k,i = 0 when k < i, (11)

Thus, . The SNP probability density function in Eq (7) may then be rewritten as: (12)

Essentially, the SNP PDF in Eq (7) has been simplified to be: (13) where ξ_m is a function with respect to parameters δ_k, and M (= 2K) is the highest power term of “G(x)” in the formula. The relationship between ξ_m and δ_k is described by Eqs (11) and (12). The cumulative distribution function (CDF) of the extended probability density function may be formulated as: (14)

3.3 Derivation of choice probabilities and likelihood function

Suppose there are “J” alternatives in the choice set and their random utility functions are U₁, U₂, …, U_J. Let the utility U_j be expressed as the sum of the systematic component V_j and the random component ε_j (i.e., U_j = V_j + ε_j). Assume that ε_j independently follows the extended distribution and its semi-nonparametric PDF and CDF are given as: (15) (16)

The subscript “j” is added to allow ε_j in various random utilities to have different SNP distributions. In addition, three Lemmas, whose proofs are furnished in S1 Appendix, are used in the subsequent derivation of choice probabilities. Based on the utility maximization principle, where “y” is a categorical choice variable indicating the specific alternative that is chosen. Then, P(y = 1) = P(ε₂ < V₁₂ + ε₁,ε₃ < V₁₃ + ε₁,…,ε_J < V_1J + ε₁), where V_ij = V_i − V_j.

According to Lemma 1 in S1 Appendix, [G(ε)]^m = G[ε − ln(m)], where m > 0. Thus,

Let the integral part in the formula be defined as "Int", i.e.,

According to Lemma 2 in S1 Appendix, ,

where . Then,

. According to Lemma 3 in S1 Appendix,

By substituting "Int" into the choice probability expression, an elegant closed-form equation for the choice probability may be obtained: (17)

The derivation above is shown for the case when y = 1, but can be generalized to the situation where y = k. Without loss of generality, (18)

The log-likelihood function over the entire sample may be formulated as: (19) where I() is an indicator function; the subscript “i” is the index for an observed choice in the sample and “N” is the sample size. The log-likelihood function can be maximized to estimate model coefficients in the systematic component V_j as well as parameters in the vector δ_j that have been incorporated into . When all M_j = 0, and the model reduces to the familiar MNL model. Thus, the proposed model may be considered a generalized multinomial logit model based on a semi-nonparametric approach.

4.1 Data and modeling procedure

Data for the empirical study is extracted from the 2000 Swiss Microcensus travel survey. A sample consisting of 2,756 commuting trips reported by residents of Aargau Canton in Switzerland is used in this study to estimate models for commute mode choice. Four major commute modes are considered and defined as auto, transit, bicycle and walk. The sample market shares for these four alternatives show that the Aargau Canton of Switzerland depicts a multimodal transportation environment, where 57.62% of commuting trips are made by private auto and the remaining 42.38% of commuting trips are made by transit or non-motorized travel modes. In particular, the transit mode share is 15.86%, the bicycle mode share is 8.31%, and the walk mode share is 18.21%. The mode shares offer a sufficient number of observations in each travel mode, thus supporting the estimation of a mode choice model with multiple alternatives. In addition, multimodal network skim (level of service) data and commuters’ demographic and socioeconomic attributes are incorporated in the mode choice model specification.

The modeling effort started with the estimation of a simple MNL mode of mode choice. Model estimation results are presented in the first part of Table 2. Both level of service (LOS) attributes and commuters’ demographic and socioeconomic attributes are included as explanatory variables in the utility functions. Travel times, including auto in-vehicle time, transit in-vehicle time, and bicycle and walk times, exhibit significantly negative coefficients in the respective utility functions. Transit service frequency takes a significantly positive coefficient, indicating that a high service frequency would increase propensity of commuters to use transit. Model coefficients associated with demographic and socioeconomic attributes show that female commuters are less likely to use auto and bicycle modes. Low-income commuters are more likely to use transit or bicycle modes, while high-income commuters are less likely to use the transit mode. Commuters with lower education level are less likely to use auto than those with high education level. Older commuters are less likely to use public transit. All of the estimation results are behaviorally intuitive and consistent with expectations. The model’s log-likelihood value at convergence is -2495.646, corresponding to an adjusted likelihood ratio index of 0.1923 for the overall goodness-of-fit measure of the model.

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Table 2. Model estimation results of MNL, SGMNL-11, SGMNL-21 and SGMNL-22.

https://doi.org/10.1371/journal.pone.0186689.t002

Next, the proposed SGMNL (semi-nonparametric generalized multinomial logit) model is estimated to relax the standard Gumbel distribution for random components in modal utility functions. First, consider the specification in which K_j is set at 1, where “K” is the number of polynomials in Eq (7) and “j” is an index for travel mode (i.e., j = 1, 2, 3 or 4). When K₁ = 1, it is found that the log-likelihood value improves from -2495.646 to -2488.037. As the current model nests the original MNL model, the likelihood ratio chi-square test may be applied to show that the improvement is statistically significant [i.e., (2495.646–2488.037) ×2 = 15.22 > 3.84, the critical chi-square value for one degree of freedom at a 95% confidence level]. This result strongly rejects the assumption of a standard Gumbel distribution for the random component in the auto utility function.

Model estimation results are presented in the second part of Table 2 and denoted as “SGMNL-11”. In this model, the signs of explanatory variable coefficients do not change from those obtained in the standard MNL model, but the magnitudes of coefficients in the auto utility function are found to differ. As expected, the alternative specific constant in the auto utility function changes substantially from -0.0919 to 0.9242 because the expectation of the new SNP distribution is very different from the expectation of the standard Gumbel distribution (Euler constant ≈ 0.577), and the alternative specific constant reflects this difference. An interesting finding is that the significance level of the single coefficient δ_1,1 (as indicated by the t-statistic) is not as strong as that implied by the χ² test for the overall model fit. However, it should be noted that the likelihood ratio test should be applied to determine whether a semi-nonparametric choice model form is more appropriate because the significance of multiple coefficients, and their contribution to overall goodness-of-fit, needs to be tested in most occasions.

After one significant coefficient δ_1,1 is found for the first utility function, K₂ in the second utility function is then set to 1 and δ_2,1 is estimated. Estimation results for this model, denoted as “SGMNL-21”, are presented in the third part of Table 2. It can be seen that, after δ_2,1 is introduced in the model specification, δ_1,1 becomes insignificant but δ_2,1 becomes highly significant as indicated by the t-statistics. The likelihood ratio test indicates that the model “SGMNL-21” with additional coefficient δ_2,1 is significantly better than the model “SGMNL-11”, which does not include parameter δ_2,1 [(2488.037–2472.741) × 2 ≈ 30.59 > 3.84]. The likelihood ratio test also shows that “SGMNL-21” is significantly better than the regular MNL model specification [(2495.646–2472.741) × 2 ≈ 45.81 > 5.99, the critical χ² value corresponding to two degrees of freedom at a 95% confidence level]. Given that both “SGMNL-11” and “SGMNL-21” performed significantly better than the regular MNL model, both δ_1,1 and δ_2,1 should be retained in the SNP model. A comparison of coefficient estimates shows considerable differences across the “SGMNL-21”, “SGMNL-11”, and “MNL” models, particularly for the transit utility functions. This is consistent with the notion that the introduction of δ_1,1 and δ_2,1 will change the expectation and standard deviation of random components; both alternative specific constants and coefficients of explanatory variables change accordingly.

When δ_3,1 or δ_4,1 for bicycle and walk modes are introduced, no significant improvement is observed. In the interest of brevity, those estimation results are not presented here. The modeling effort now moves to the second stage, where the “K” value is increased to 2 and the coefficients δ_1,2, δ_2,2, δ_3,2 and δ_4,2 are introduced into the model one by one. In this stage, it is found that only the introduction of δ_2,2 in the transit utility function significantly improves the overall model fit (χ² test value = 6.57 > 3.84) while all other δ values do not. A final model estimation effort is performed, in which the “K” value is increased to 3 and parameter δ_2,3 is introduced in the model. The maximum likelihood estimation procedure fails to converge, indicating that the sample of 2,756 choice observations may not be sufficient to support model estimation where the “K” value is increased to 3. Thus, the final best model is considered to be that which adopts a “K” value of 2 and introduces parameter δ_2,2, in addition to parameters δ_1,1 and δ_2,1 introduced in “SGMNL-21”. This final model is designated “SGMNL-22”. If its model coefficients are compared with those in “SGMNL-21”, there is no substantial difference observed, except for the alternative specific constant and the coefficient associated with the “high-income” dummy variable in the transit utility function. As this is considered the final model, all subsequent comparisons are conducted between the MNL model and the final “SGMNL-22” model.

4.2 Plotting probability density distributions of random components in the “SGMNL-22” model

Fig 3 depicts the probability density distributions of random components in the “SGMNL-22” model. Eqs (11) and (12) are used to convert the estimated δ values to ξ values and then Eq (13) is used to compute the probability densities based on ξ values. The green curve represents the standard Gumbel distribution for random components in bicycle and walk mode utility functions (i.e., e3 and e4 in Fig 3). The blue curve represents the distribution of the random component in the auto utility function. The coefficient δ_1,1 not only reduces the variance of the distribution of the random component but also shifts its mode towards the negative side by about 0.6 units. This helps explain why the alternative specific constant in the auto utility of the “SGMNL-22” model is substantially more positive than that in the MNL model. The positive alternative specific constant offsets the negative expectation of the new random component. The lower variance of the error distribution for the auto utility may be due to the existence of fewer unspecified or unobserved random factors associated with auto mode choice than with other mode choices. The distribution of the random component in the transit utility function (i.e., e2) presents an interesting pattern in the context of this study. With the inclusion of parameters δ_2,1 and δ_2,2 in the model (both of which are significant), “e2” depicts a bimodal distribution as shown by the red curve. The major mode on the right side is located near 0.6 and the minor one on the left side is near -1.2 on the coordinate axis. Based on this finding, it may be conjectured that there are two key groups of commuters mixed in the sample. One group of commuters has a positive attitude and inclination towards using transit and is associated with the major mode of the distribution. Meanwhile, a smaller group of commuters has a negative attitude towards transit and comprises the distribution near the minor mode. Although the exact source of the bimodal distribution is uncertain, the proposed SNP modeling method depicts the existence of such a phenomenon and exposes the potential limitation of using conventional MNL choice models that are based on unimodal distributional assumptions. Capturing the bimodal distribution in the choice model can help realize more consistent coefficient estimates and reliable policy sensitivities.

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Fig 3. Probability density distributions of random components in the “SGMNL-22” model.

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4.3 A comparison of aggregate marginal effects and elasticities

Coefficients in choice models usually do not directly reflect the impact of an explanatory variable on choice probabilities, particularly when the standard deviations of random components are scaled up or down, as in the transit or auto utility in the SGMNL model estimated in this study. To better understand differences in model sensitivity between MNL and SGMNL models, marginal effects and elasticities are computed and compared. In this subsection, aggregate marginal effects (AME) and aggregate elasticities (AE) with respect to level of service (LOS) variables are computed based on the following two equations: (20) (21)

In the above equations, “P” represents the choice probability expression of the MNL or SGMNL model. “x_i” represents a vector of explanatory variables except the one (i.e., z_i) whose marginal effect or elasticity is being computed. “Δ” takes a value of 0.01 in this study as it is found that such a small interval provides sufficiently accurate estimates for “AME” and “AE” in both MNL and SGMNL models. Table 3 presents a comparison of computed “AME” and “AE” values between MNL and SGMNL-22 models. Relative differences in “AME” and “AE” are found to be considerable, which validates the notion that maximum likelihood estimators are inconsistent when distributional assumptions are violated. Such differences have important policy implications for transportation planning and management. For example, suppose a transportation authority intends to shift commuters from the auto mode to the transit mode by increasing transit service frequency. In predicting the number of commute drivers who will shift from auto to transit in response to the transit improvement, the conventional MNL model underestimates the elasticity with respect to transit service frequency by 25% (-0.082 vs -0.110).

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Table 3. Comparisons of aggregate marginal effects (AME) and elasticities (AE).

https://doi.org/10.1371/journal.pone.0186689.t003

4.4 A comparison of disaggregate marginal effects and elasticities

The “AME” or “AE” presented in the previous subsection provide sample sensitivity to explanatory variables at the aggregate level and show how a level of service (LOS) variable, for example, affects market shares of alternatives based on the assumption that the sample is randomly drawn and can therefore represent the population shares well. However, aggregate measures of effects mask an important difference between MNL and SGMNL models. The MNL model has the IIA (Independence of Irrelevant Alternatives) property while the SGMNL model does not have this property. In order to illustrate this important difference between the two models, disaggregate marginal effects and elasticities are computed and compared for a specific individual commuter who is a 40 year old male with medium-level income and education level above middle school. The multimodal transportation level of service variables for this individual’s commute are as follows: auto in-vehicle time is 5 minutes; transit in-vehicle time is 8 minutes; transit service frequency is 6 times per hour; bicycle travel time is 12 minutes; and walk travel time is 35 minutes. Given these input variables for this specific commuter, both MNL and SGMNL-22 models are applied to compute choice probabilities of alternative travel modes. Results are shown in Table 4. There is a substantial difference in the choice probability of transit mode between the two models. The computations show that the MNL model returns a transit choice probability that is higher than that provided by the SGMNL-22 model by 41.8%, presumably because the model does not capture and reflect the bimodal distribution of the random component in the transit utility function.

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Table 4. Comparisons of market shares and individual choice probabilities.

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Table 4 also presents a comparison of predicted means of market shares (i.e., ) over the entire sample. An appealing property of the MNL model is that it can replicate the observed sample shares perfectly using alternative specific constants in utility functions [1]. The SGMNL model does not have this feature, but the greatest difference occurs in the transit share where the relative difference is found to be only 1.5%, which is quite reasonable and acceptable.

The IIA property, which is a key feature of the MNL model, also manifests in the form of equal cross-elasticities [40]. Formulations similar to those expressed in Eqs (20) and (21) are applied to compute disaggregate marginal effects and elasticities with respect to LOS variables. The only difference is that the equations are applied to the specific individual commuter as opposed to all of the commuters in the sample. Results of the computations are presented in Table 5.

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Table 5. Comparisons of disaggregate marginal effects and elasticities.

https://doi.org/10.1371/journal.pone.0186689.t005

It can be seen that cross-elasticities are equal in the MNL model, which reflects its IIA property. However, with unequal variances in auto and transit utilities in the SGMNL model, cross-elasticities for auto and transit choice probabilities are not equal, thus demonstrating that the SGMNL model does not possess the IIA property. However, because the random components in bicycle and walk utilities have equal variance, cross-elasticities for these two alternatives are still equal and therefore the IIA property holds for the bicycle and walk modes even in the case of the SGMNL model. This is similar to the situation where two alternatives belong to the same nest in a nested logit model.

4.5 A comparison of changes in transit choice probability in response to a service frequency improvement

To further illustrate the policy implications of alternative model forms, changes in transit choice probability predicted by the two models in response to a service frequency improvement are compared for the specific individual commuter considered previously. The result of this comparison is presented in Fig 4. Relative to the SGMNL model, the MNL model overestimates the transit choice probability when the service frequency is low (<18 per hour) but underestimates it when the service frequency is high (≥18 per hour). A service frequency of 18 transit vehicles per hour is quite high, reflecting a headway of just over three minutes. Given that most real-world transit services operate at frequencies less than 18 vehicles per hour, it appears that the MNL model is likely to overestimate the transit choice probability relative to the SGMNL model. In this particular example, when the service frequency is very low (≤4 per hour), the relative difference between the predicted transit choice probabilities computed from the MNL and SGMNL models can exceed 50%.

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Fig 4. Transit choice probability for a specific commuter in response to an improvement in service frequency.

https://doi.org/10.1371/journal.pone.0186689.g004