Title :
Infinite dimensional systems´ sliding motions
Author_Institution :
Dipt. di Mat., Univ. di Genova, Genoa, Italy
Abstract :
We show how, using differential inclusions and viability theory it is possible to define sliding modes for (feedback) controlled semilinear differential equations in Banach spaces. We then compare this definition with an extended version of the equivalent control method for infinite dimensional systems proposed by V. Utkin and Yu. Orlov. We prove that, if the sliding manifold satisfies suitable regularity hypotheses, the projected evolution found by means of the equivalent control and our sliding mode do coincide. We then apply these results to the problem of stabilization of a heat equation.
Keywords :
Banach spaces; differential equations; feedback; multidimensional systems; stability; variable structure systems; Banach space; feedback controlled semilinear differential equation; heat equation stabilization; infinite dimensional system; sliding mode; Aerospace electronics; Differential equations; Equations; Europe; Manifolds; Mathematical model; Sliding mode control; Distributed Systems; Infinite Dimensional Systems; Stabilization; Variable Structure Control;
Conference_Titel :
Control Conference (ECC), 2001 European
Conference_Location :
Porto
Print_ISBN :
978-3-9524173-6-2
