Title of article
Polynomial reduction of time–space scheduling to time scheduling Original Research Article
Author/Authors
J. Studenovsk?، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
15
From page
1364
To page
1378
Abstract
We study the University Course Timetabling Problem (UCTP). In particular we deal with the following question: is it possible to decompose UCTP into two problems, namely, (i) a time scheduling, and (ii) a space scheduling. We have arguments that it is not possible. Therefore we study UCTP with the assumption that each room belongs to exactly one type of room. A type of room is a set of rooms, which have similar properties. We prove that in this case UCTP is polynomially reducible to time scheduling. Hence we solve UCTP with the following method: at first we solve time scheduling and subsequently we solve space scheduling with a polynomial image algorithm. In this way we obtain a radical (exponential) speed-up of algorithms for UCTP. The method was applied at P.J. Šafárik University.
Keywords
Computational complexity , Polynomial reduction , Scheduling , Timetabling , University course timetabling problem
Journal title
Discrete Applied Mathematics
Serial Year
2009
Journal title
Discrete Applied Mathematics
Record number
887067
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