TY - GEN
T1 - A Mathematical Model for a Realistic Course Scheduling at Universities
AU - Vidal, Nicolas
AU - Hernández, Felipe
AU - Morillo-Torres, Daniel
AU - Gatica, Gustavo
N1 - Publisher Copyright:
© The Author(s), under exclusive license to Springer Nature Switzerland AG 2025.
PY - 2025
Y1 - 2025
N2 - Timetabling is a combinatorial and challenging problem in different fields where it is required to allocate scarce resources. One of the main variants is the University Course Timetabling Problem (UCTP), where courses must take a location and the academic sessions must be distributed avoiding overlapping schedules or preference conflicts. Despite the high complexity of its solution, it is increasingly necessary to include more realistic characteristics and formulate efficient models. In this paper, new realistic features focused on the development of student’s curriculum are included and a mixed-integer linear programming model is proposed to address this problem. The model’s objective is to maximize all teacher’s preferences and reduce the overlaps between courses that can be viewed either in advance or delayed. The proposed model was validated in the timetabling in the Industrial Engineering Program at the Pontificia Universidad Javeriana Cali, Colombia. The results show an increase of 47.7% regarding the preferences of the professors, as well as a reduction of 99.37% of the time associated with the semester scheduling process and currently, the perception of students is being assessed as they progress through the semesters, with preliminary results indicating an increase in satisfaction.
AB - Timetabling is a combinatorial and challenging problem in different fields where it is required to allocate scarce resources. One of the main variants is the University Course Timetabling Problem (UCTP), where courses must take a location and the academic sessions must be distributed avoiding overlapping schedules or preference conflicts. Despite the high complexity of its solution, it is increasingly necessary to include more realistic characteristics and formulate efficient models. In this paper, new realistic features focused on the development of student’s curriculum are included and a mixed-integer linear programming model is proposed to address this problem. The model’s objective is to maximize all teacher’s preferences and reduce the overlaps between courses that can be viewed either in advance or delayed. The proposed model was validated in the timetabling in the Industrial Engineering Program at the Pontificia Universidad Javeriana Cali, Colombia. The results show an increase of 47.7% regarding the preferences of the professors, as well as a reduction of 99.37% of the time associated with the semester scheduling process and currently, the perception of students is being assessed as they progress through the semesters, with preliminary results indicating an increase in satisfaction.
KW - Mathematical Model
KW - Scheduling
KW - University Course Timetabling Problem
UR - http://www.scopus.com/inward/record.url?scp=105001307026&partnerID=8YFLogxK
U2 - 10.1007/978-3-031-83207-9_3
DO - 10.1007/978-3-031-83207-9_3
M3 - Conference contribution
AN - SCOPUS:105001307026
SN - 9783031832062
T3 - Communications in Computer and Information Science
SP - 32
EP - 47
BT - Advanced Research in Technologies, Information, Innovation and Sustainability - 4th International Conference, ARTIIS 2024, Revised Selected Papers
A2 - Guarda, Teresa
A2 - Portela, Filipe
A2 - Gatica, Gustavo
PB - Springer Science and Business Media Deutschland GmbH
T2 - 4th International Conference on Advanced Research in Technologies, Information, Innovation and Sustainability 2024, ARTIIS 2024
Y2 - 21 October 2024 through 23 October 2024
ER -