Counting and enumerating feasible rotating schedules by means of Gröbner bases

Creators: Falcón Ganfornina, Raúl Manuel; Barrena Algara, Eva; Canca Ortiz, José David; Laporte, Gilbert

Others:: Universidad de Sevilla. Departamento de Matemática Aplicada I; Universidad de Sevilla. Departamento de Organización Industrial y Gestión de Empresas I; Universidad de Sevilla. FQM016: Códigos, diseños, criptografía y optimización; Junta de Andalucía

Description

This paper deals with the problem of designing and analyzing rotating schedules with an algebraic computational approach. Specifically, we determine a set of Boolean polynomials whose zeros can be uniquely identified with the set of rotating schedules related to a given workload matrix subject to standard constraints. These polynomials constitute zero-dimensional radical ideals, whose reduced Gröbner bases can be computed to count and even enumerate the set of rotating schedules that satisfy the desired set of constraints. Thereby, it enables to analyze the influence of each constraint in the same.

Abstract

Junta de Andalucía P09-TEP-5022

Counting and enumerating feasible rotating schedules by means of Gröbner bases

Description

Abstract

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