Route assignmentRoute assignment, route choice, or traffic assignment concerns the selection of routes (alternatively called paths) between origins and destinations in transportation networks. It is the fourth step in the conventional transportation forecasting model, following trip generation, trip distribution, and mode choice. The zonal interchange analysis of trip distribution provides origin-destination trip tables. Mode choice analysis tells which travelers will use which mode.
Médiane (statistiques)En théorie des probabilités et en statistiques, la médiane est une valeur qui sépare la moitié inférieure et la moitié supérieure des termes d’une série statistique quantitative ou d’une variable aléatoire réelle. On peut la définir aussi pour une variable ordinale. La médiane est un indicateur de tendance centrale. Par comparaison avec la moyenne, elle est insensible aux valeurs extrêmes mais son calcul est un petit peu plus complexe. En particulier, elle ne peut s’obtenir à partir des médianes de sous-groupes.
Bessel's correctionIn statistics, Bessel's correction is the use of n − 1 instead of n in the formula for the sample variance and sample standard deviation, where n is the number of observations in a sample. This method corrects the bias in the estimation of the population variance. It also partially corrects the bias in the estimation of the population standard deviation. However, the correction often increases the mean squared error in these estimations. This technique is named after Friedrich Bessel.
L-estimatorIn statistics, an L-estimator is an estimator which is a linear combination of order statistics of the measurements (which is also called an L-statistic). This can be as little as a single point, as in the median (of an odd number of values), or as many as all points, as in the mean. The main benefits of L-estimators are that they are often extremely simple, and often robust statistics: assuming sorted data, they are very easy to calculate and interpret, and are often resistant to outliers.
Sampling fractionIn sampling theory, the sampling fraction is the ratio of sample size to population size or, in the context of stratified sampling, the ratio of the sample size to the size of the stratum. The formula for the sampling fraction is where n is the sample size and N is the population size. A sampling fraction value close to 1 will occur if the sample size is relatively close to the population size. When sampling from a finite population without replacement, this may cause dependence between individual samples.
Trimmed estimatorIn statistics, a trimmed estimator is an estimator derived from another estimator by excluding some of the extreme values, a process called truncation. This is generally done to obtain a more robust statistic, and the extreme values are considered outliers. Trimmed estimators also often have higher efficiency for mixture distributions and heavy-tailed distributions than the corresponding untrimmed estimator, at the cost of lower efficiency for other distributions, such as the normal distribution.
Échantillon biaiséEn statistiques, le mot biais a un sens précis qui n'est pas tout à fait le sens habituel du mot. Un échantillon biaisé est un ensemble d'individus d'une population, censé la représenter, mais dont la sélection des individus a introduit un biais qui ne permet alors plus de conclure directement pour l'ensemble de la population. Un échantillon biaisé n'est donc pas un échantillon de personnes biaisées (bien que ça puisse être le cas) mais avant tout un échantillon sélectionné de façon biaisée.
Constructive set theoryAxiomatic constructive set theory is an approach to mathematical constructivism following the program of axiomatic set theory. The same first-order language with "" and "" of classical set theory is usually used, so this is not to be confused with a constructive types approach. On the other hand, some constructive theories are indeed motivated by their interpretability in type theories. In addition to rejecting the principle of excluded middle (), constructive set theories often require some logical quantifiers in their axioms to be set bounded, motivated by results tied to impredicativity.
Estimating equationsIn statistics, the method of estimating equations is a way of specifying how the parameters of a statistical model should be estimated. This can be thought of as a generalisation of many classical methods—the method of moments, least squares, and maximum likelihood—as well as some recent methods like M-estimators. The basis of the method is to have, or to find, a set of simultaneous equations involving both the sample data and the unknown model parameters which are to be solved in order to define the estimates of the parameters.
Axiome du choix dépendantEn mathématiques, l'axiome du choix dépendant, noté DC, est une forme faible de l'axiome du choix (AC), suffisante pour développer une majeure partie de l'analyse réelle. Il a été introduit par Bernays. L'axiome peut s'énoncer comme suit : pour tout ensemble non vide X, et pour toute relation binaire R sur X, si l'ensemble de définition de R est X tout entier (c'est-à-dire si pour tout a∈X, il existe au moins un b∈X tel que aRb) alors il existe une suite (xn) d'éléments de X telle que pour tout n∈N, xnRxn+1.
