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Controllability of Bilinear Systems: Lie Theory Approach and Control Sets on Projective Spaces

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  • Oscar Raúl Condori Mamani

    (Facultad de Ciencias Naturales y Formales, Universidad Nacional de San Agustín de Arequipa, Arequipa 04001, Peru)

  • Bartolome Valero Larico

    (Facultad de Ciencias Naturales y Formales, Universidad Nacional de San Agustín de Arequipa, Arequipa 04001, Peru)

  • María Luisa Torreblanca

    (Facultad de Ciencias Naturales y Formales, Universidad Nacional de San Agustín de Arequipa, Arequipa 04001, Peru)

  • Wolfgang Kliemann

    (Department of Mathematics, Iowa State University, Ames, IA 50011, USA)

Abstract

Bilinear systems can be developed from the point of view of time-varying linear differential equations or from the symmetry of Lie theory, in particular Lie algebras, Lie groups, and Lie semigroups. For bilinear control systems with bounded control range, we analyze when a unique control set (i.e., a maximal set of approximate controllability) with nonvoid interior exists, for the induced system on projective space. We use the system semigroup by considering piecewise constant controls and use spectral properties to extend the result to bilinear systems in R d . The contribution of this paper highlights the relationship between all the existent control sets. We show that the controllability property of a bilinear system is equivalent to the existence and uniqueness of a control set of the projective system.

Suggested Citation

  • Oscar Raúl Condori Mamani & Bartolome Valero Larico & María Luisa Torreblanca & Wolfgang Kliemann, 2025. "Controllability of Bilinear Systems: Lie Theory Approach and Control Sets on Projective Spaces," Mathematics, MDPI, vol. 13(14), pages 1-15, July.
    • Handle: RePEc:gam:jmathe:v:13:y:2025:i:14:p:2273-:d:1701834
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