A Fixed Point Approach to Origin-Destination Matrices Estimation Using Uncertain Data and Fuzzy Programming on Congested Networks

Abstract Origin–destination (O–D) matrix estimation methods based on traffic counts have been largely discussed and investigated. The most used methods are based on Generalised Least Square estimators (GLS) that use as input data a starting O–D matrix and a set of traffic counts. In addition to traffic counts, the analysts could know other general information about travel demand or link flows, based on their experience, or spot data, but few works deal with the matter of including effectively these sources of information. This paper proposes a Fuzzy-GLS estimation method that allows to improve the estimation performances of classic GLS estimator by including, in addition to traffic counts, uncertain information about starting O–D demand (i.e. outdated estimates, spot data, expert knowledge, etc.). The methods explicitly take into account the relevant level of uncertainty by taking as much advantage as possible from the few vague available data. The method is developed using fuzzy sets theory and fuzzy programming that seems to be a convenient theoretical framework to represent uncertainty in the available data. A solution algorithm for the proposed problem is also presented. The method has been tested by numerical applications and then compared to the classical GLS method under different sets of constraints to the problem.

[1]  Sang Nguyen,et al.  A unified framework for estimating or updating origin/destination matrices from traffic counts , 1988 .

[2]  M. Maher INFERENCES ON TRIP MATRICES FROM OBSERVATIONS ON LINK VOLUMES: A BAYESIAN STATISTICAL APPROACH , 1983 .

[3]  Lotfi A. Zadeh,et al.  Fuzzy Sets , 1996, Inf. Control..

[4]  Ennio Cascetta,et al.  Transportation Systems Engineering: Theory and Methods , 2001 .

[5]  M. Florian,et al.  A COORDINATE DESCENT METHOD FOR THE BILEVEL O-D MATRIX ADJUSTMENT PROBLEM , 1992 .

[6]  Francesco Russo,et al.  Calibrating aggregate travel demand models with traffic counts: Estimators and statistical performance , 1997 .

[7]  E. Cascetta Estimation of trip matrices from traffic counts and survey data: A generalized least squares estimator , 1984 .

[8]  Dušan Teodorović,et al.  Traffic Control and Transport Planning:: A Fuzzy Sets and Neural Networks Approach , 1998 .

[9]  Maria Nadia Postorino,et al.  Fixed Point Approaches to the Estimation of O/D Matrices Using Traffic Counts on Congested Networks , 2001, Transp. Sci..

[10]  Qiang Meng,et al.  Simultaneous Estimation of the Origin-Destination Matrices and Travel-Cost Coefficient for Congested Networks in a Stochastic User Equilibrium , 2001, Transp. Sci..

[11]  Yousef Shafahi,et al.  A new fuzzy approach to estimate the O–D matrix from link volumes , 2009 .

[12]  M. Florian,et al.  THE NONLINEAR BILEVEL PROGRAMMING PROBLEM: FORMULATIONS, REGULARITY AND OPTIMALITY CONDITIONS , 1993 .

[13]  Hai Yang,et al.  Transport bilevel programming problems: recent methodological advances , 2001 .

[14]  Michael G.H. Bell,et al.  The Estimation of an Origin-Destination Matrix from Traffic Counts , 1983 .

[15]  H. Zimmermann,et al.  Fuzzy Set Theory and Its Applications , 1993 .

[16]  H. Spiess A MAXIMUM LIKELIHOOD MODEL FOR ESTIMATING ORIGIN-DESTINATION MATRICES , 1987 .

[17]  Partha Chakroborty,et al.  Place of possibility theory in transportation analysis , 2006 .

[18]  Henk J van Zuylen,et al.  The most likely trip matrix estimated from traffic counts , 1980 .