Geometric Characterization of Validity of the Lyapunov Convexity Theorem in the Plane for Two Controls under a Pointwise State Constraint

dc.contributor.authorCarlota, Clara
dc.contributor.authorLopes, Mário
dc.contributor.authorOrnelas, António
dc.date.accessioned2025-12-18T17:58:17Z
dc.date.available2025-12-18T17:58:17Z
dc.date.issued2024-09
dc.description.abstractThis paper concerns control BVPs, driven by ODEs x′(t) = u(t), using controls u0(·) & u1(·) in L1((a, b),R2). We ask these two controls to satisfy a very simple restriction: at points where their first coordinates coincide, also their second coordinates must coincide; which allows one to write (u1 − u0)(·) = v(·)(1, f (·)) for some f (·). Given a relaxed non bang-bang solution \overline{x}(·) ∈ W1,1([a, b],R2), a question relevant to applications was first posed three decades ago by A. Cellina: does there exist a bang-bang solution x(·) having lower first-coordinate x1(·) ≤ \overline{x}1(·)? Being the answer always yes in dimension d = 1, hence without f (·), as proved by Amar and Cellina, for d = 2 the problem is to find out which functions f (·) “are good”, namely “allow such 1-lower bang-bang solution x(·) to exist”. The aim of this paper is to characterize “goodness of f (·)” geometrically, under “good data”. We do it so well that a simple computational app in a smartphone allows one to easily determine whether an explicitly given f (·) is good. For example: non-monotonic functions tend to be good; while, on the contrary, strictly monotonic functions are never good.por
dc.identifier.authoremailccarlota@uevora.pt
dc.identifier.authoremailmariolopes.mat17@gmail.com
dc.identifier.authoremailantonioornelas@icloud.com
dc.identifier.citationCarlota C, Lopes M, Ornelas A. Geometric Characterization of Validity of the Lyapunov Convexity Theorem in the Plane for Two Controls under a Pointwise State Constraint. Axioms. 2024; 13(9):611. https://doi.org/10.3390/axioms13090611por
dc.identifier.doi10.3390/axioms13090611por
dc.identifier.scientificarea334por
dc.identifier.urihttps://www.mdpi.com/2075-1680/13/9/611
dc.identifier.urihttp://hdl.handle.net/10174/39989
dc.language.isoengpor
dc.peerreviewedyespor
dc.publisherAxiomspor
dc.rightsopenAccesspor
dc.subjectLyapunov convexity theorempor
dc.subjectpointwise state constraintspor
dc.subjectconvexity of the range of vector measurespor
dc.subjectlinear control BVPspor
dc.subjectnonconvex linear ordinary differential inclusionspor
dc.titleGeometric Characterization of Validity of the Lyapunov Convexity Theorem in the Plane for Two Controls under a Pointwise State Constraintpor
dc.typearticlepor

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