RT journal article
T1 Solving Generalized Equations with Bounded Variables and Multiple Residuated Operators
A1 Cornejo Piñero, María Eugenia
A1 Lobo Palacios, David
A1 Medina Moreno, Jesús
A2 Matemáticas
K1 join-irreducible element
K1 join-decomposable element
K1 adjoint triples
K1 multi-adjoint sup-inequalities
K1 multi-adjoint sup-equations
AB This paper studies the resolution of sup-inequalities and sup-equations with bounded variables such that the sup-composition is defined by using different residuated operators of a given distributive biresiduated multi-adjoint lattice. Specifically, this study has analytically determined the whole set of solutions of such sup-inequalities and sup-equations. Since the solvability of these equations depends on the character of the independent term, the resolution problem has been split into three parts distinguishing among the bottom element, join-irreducible elements and join-decomposable elements.
PB MDPI
SN 2227-7390
YR 2020
FD 2020-11
LK http://hdl.handle.net/10498/24198
UL http://hdl.handle.net/10498/24198
LA eng
DS Repositorio Institucional de la Universidad de Cádiz
RD 10-may-2026