This paper describes the development of finite abstractions of Max-Plus-Linear (MPL) systems using tropical operations. The idea of tropical abstraction is inspired by the fact that an MPL system is a discrete-event model updating its state with operations in the tropical algebra. The abstract model is a finite-state transition system: we show that the abstract states can be generated by operations on the tropical algebra, and that the generation of transitions can be established by tropical multiplications of matrices. The complexity of the algorithms based on tropical algebra is discussed and their performance is tested on a numerical benchmark against an existing alternative abstraction approach
Tropical circuits are circuits with Min and Plus, or Max and Plus operations as gates. Their importa...
The objective of this paper is to provide a concise introduction to the max-plus algebra and to max-...
The relation between graph theory and max-plus algebra has been well studied since the inception of ...
Max-Plus-Linear (MPL) systems are a class of discrete-event systems with a continuous state space ch...
Tropical mathematics describes both the max-plus and min-plus algebras. In the former, we understand...
Max-Plus-Linear (MPL) systems are a class of discrete-event systems with a continuous state space ch...
Tropical linear algebra is the study of classical linear algebra problems with arithmetic done over ...
The uncertain Max-Plus-Linear (uMPL) Systems are a MPL system where the element of state matrix is n...
Discrete Event System (DES) is a class of event-driven systems that are nonlinear in conventional al...
Max-Plus-Linear (MPL) systems are a class of discrete-event systems with a continuous state space ch...
An algorithm is designed solving a tropical linear system with the complexity polynomial in the size...
International audienceWe define a formal framework for the study of algebras of type Max-plus, Min-Pl...
Tropical polyhedra have been recently used to represent disjunctive invariants in static analysis. T...
AbstractThe max-Łukasiewicz semiring is defined as the unit interval [0,1] equipped with the arithme...
We describe the theory and algorithms behind non-generic tropical implicitization using geometric tr...
Tropical circuits are circuits with Min and Plus, or Max and Plus operations as gates. Their importa...
The objective of this paper is to provide a concise introduction to the max-plus algebra and to max-...
The relation between graph theory and max-plus algebra has been well studied since the inception of ...
Max-Plus-Linear (MPL) systems are a class of discrete-event systems with a continuous state space ch...
Tropical mathematics describes both the max-plus and min-plus algebras. In the former, we understand...
Max-Plus-Linear (MPL) systems are a class of discrete-event systems with a continuous state space ch...
Tropical linear algebra is the study of classical linear algebra problems with arithmetic done over ...
The uncertain Max-Plus-Linear (uMPL) Systems are a MPL system where the element of state matrix is n...
Discrete Event System (DES) is a class of event-driven systems that are nonlinear in conventional al...
Max-Plus-Linear (MPL) systems are a class of discrete-event systems with a continuous state space ch...
An algorithm is designed solving a tropical linear system with the complexity polynomial in the size...
International audienceWe define a formal framework for the study of algebras of type Max-plus, Min-Pl...
Tropical polyhedra have been recently used to represent disjunctive invariants in static analysis. T...
AbstractThe max-Łukasiewicz semiring is defined as the unit interval [0,1] equipped with the arithme...
We describe the theory and algorithms behind non-generic tropical implicitization using geometric tr...
Tropical circuits are circuits with Min and Plus, or Max and Plus operations as gates. Their importa...
The objective of this paper is to provide a concise introduction to the max-plus algebra and to max-...
The relation between graph theory and max-plus algebra has been well studied since the inception of ...