Geometric Characterization of Validity of the Lyapunov Convexity Theorem in the Plane for Two Controls under a Pointwise State Constraint
| dc.contributor.author | Carlota, Clara | |
| dc.contributor.author | Lopes, Mário | |
| dc.contributor.author | Ornelas, António | |
| dc.date.accessioned | 2025-12-18T17:58:17Z | |
| dc.date.available | 2025-12-18T17:58:17Z | |
| dc.date.issued | 2024-09 | |
| dc.description.abstract | This 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.authoremail | ccarlota@uevora.pt | |
| dc.identifier.authoremail | mariolopes.mat17@gmail.com | |
| dc.identifier.authoremail | antonioornelas@icloud.com | |
| dc.identifier.citation | Carlota 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/axioms13090611 | por |
| dc.identifier.doi | 10.3390/axioms13090611 | por |
| dc.identifier.scientificarea | 334 | por |
| dc.identifier.uri | https://www.mdpi.com/2075-1680/13/9/611 | |
| dc.identifier.uri | http://hdl.handle.net/10174/39989 | |
| dc.language.iso | eng | por |
| dc.peerreviewed | yes | por |
| dc.publisher | Axioms | por |
| dc.rights | openAccess | por |
| dc.subject | Lyapunov convexity theorem | por |
| dc.subject | pointwise state constraints | por |
| dc.subject | convexity of the range of vector measures | por |
| dc.subject | linear control BVPs | por |
| dc.subject | nonconvex linear ordinary differential inclusions | por |
| dc.title | Geometric Characterization of Validity of the Lyapunov Convexity Theorem in the Plane for Two Controls under a Pointwise State Constraint | por |
| dc.type | article | por |