The Student-Project Allocation problem with lecturer preferences over Students (spa- s) involves assigning students to projects based on student preferences over projects, lecturer preferences over students, and the maximum number of students that each project and lecturer can accommodate. This classical model assumes that each project is offered by one lecturer and that preference lists are strictly ordered. Here, we study a generalisation of spa-s where ties are allowed in the preference lists of students and lecturers, which we refer to as the Student-Project Allocation problem with lecturer preferences over Students with Ties (spa-st). We investigate stable matchings under the most robust definition of stability in this context, namely ...
AbstractManlove and OʼMalley (2008) [8] proposed the Student-Project Allocation problem with Prefere...
In the Student/Project Allocation problem (spa) we seek to assign students to individual or group pr...
In this thesis, we present new algorithmic and complexity results for specific matching problems inv...
The Student-Project Allocation problem with lecturer preferences over Students ( Open image in new w...
We study a variant of the Student-Project Allocation problem with lecturer preferences over Students...
In this thesis we study the Student-Project Allocation problem (SPA), which is a matching problem ba...
The Student-Project Allocation problem with lecturer preferences over Students (SPA-S) comprises thr...
The Student-Project Allocation problem with lecturer preferences over Students (SPA-S) comprises thr...
We study the problem of allocating students to projects, where both students and lecturers have pref...
AbstractWe study the problem of allocating students to projects, where both students and lecturers h...
We study the problem of allocating students to projects, where both students and lecturers have pre...
We study the Student-Project Allocation problem (SPA), a generalisation of the classical Hospitals /...
AbstractWe study the Student-Project Allocation problem (SPA), a generalisation of the classical Hos...
The Student-Project Allocation problem with preferences over Projects (SPA-P) involves sets of stude...
We study the <i>Student-Project Allocation problem</i> (SPA), a generalisation of the cl...
AbstractManlove and OʼMalley (2008) [8] proposed the Student-Project Allocation problem with Prefere...
In the Student/Project Allocation problem (spa) we seek to assign students to individual or group pr...
In this thesis, we present new algorithmic and complexity results for specific matching problems inv...
The Student-Project Allocation problem with lecturer preferences over Students ( Open image in new w...
We study a variant of the Student-Project Allocation problem with lecturer preferences over Students...
In this thesis we study the Student-Project Allocation problem (SPA), which is a matching problem ba...
The Student-Project Allocation problem with lecturer preferences over Students (SPA-S) comprises thr...
The Student-Project Allocation problem with lecturer preferences over Students (SPA-S) comprises thr...
We study the problem of allocating students to projects, where both students and lecturers have pref...
AbstractWe study the problem of allocating students to projects, where both students and lecturers h...
We study the problem of allocating students to projects, where both students and lecturers have pre...
We study the Student-Project Allocation problem (SPA), a generalisation of the classical Hospitals /...
AbstractWe study the Student-Project Allocation problem (SPA), a generalisation of the classical Hos...
The Student-Project Allocation problem with preferences over Projects (SPA-P) involves sets of stude...
We study the <i>Student-Project Allocation problem</i> (SPA), a generalisation of the cl...
AbstractManlove and OʼMalley (2008) [8] proposed the Student-Project Allocation problem with Prefere...
In the Student/Project Allocation problem (spa) we seek to assign students to individual or group pr...
In this thesis, we present new algorithmic and complexity results for specific matching problems inv...