Closure of pointed cones and maximum principle in Hilbert spaces

Paolo D‘alessandro dalex@mat.uniroma3.it

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DOI:

https://doi.org/10.4067/S0719-06462011000200004

Abstract

We prove, in a Hilbert space setting, that all targets of the minimum norm optimal control problems reachable with inputs of minimum norm Ï are support points for the the set reachable by inputs with norm bounded by Ï. This amount to say that the Maximum Principle always holds in Hilbert Spaces.

Keywords

Linear Control Systems in Hilbert Spaces , Norm Optimal Control , Maximum Principle

Paolo D‘alessandro Math. Department, Third University of Rome, Italy.

Pages: 73–84
Date Published: 2011-06-01
Vol. 13 No. 2 (2011): CUBO, A Mathematical Journal

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Published

2011-06-01

How to Cite

[1]

P. D‘alessandro, “Closure of pointed cones and maximum principle in Hilbert spaces”, CUBO, vol. 13, no. 2, pp. 73–84, Jun. 2011.

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Vol. 13 No. 2 (2011): CUBO, A Mathematical Journal

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Articles

Most read articles by the same author(s)

Paolo D‘alessandro, An immediate derivation of maximum principle in Banach spaces, assuming reflexive input and state spaces , CUBO, A Mathematical Journal: Vol. 14 No. 2 (2012): CUBO, A Mathematical Journal

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Aníbal Coronel, Fernando Huancas, Esperanza Lozada, Jorge Torres, Análisis matemático de un problema inverso para un sistema de reacción-difusión originado en epidemiología , CUBO, A Mathematical Journal: Vol. 27 No. 2 (2025): Spanish Edition (40th Anniversary)
Asa Ashley, Ferhan M. Atıcı, Samuel Chang, A note on constructing sine and cosine functions in discrete fractional calculus , CUBO, A Mathematical Journal: Vol. 27 No. 3 (2025)
Qilin Xie, Lin Xu, Normalized solutions for coupled Kirchhoff equations with critical and subcritical nonlinearities , CUBO, A Mathematical Journal: Vol. 28 No. 1 (2026)
Fethi Soltani, Maher Aloui, Hausdorff operators associated with the linear canonical Sturm-Liouville transform , CUBO, A Mathematical Journal: Vol. 28 No. 1 (2026)

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You may also start an advanced similarity search for this article.