Filippov and invariance theorems for mutational inclusions of tubes
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Publication:1321605
DOI10.1007/BF01027639zbMath0813.49021MaRDI QIDQ1321605
Publication date: 6 June 1995
Published in: Set-Valued Analysis (Search for Journal in Brave)
invariance theoremFilippov theoremmutational calculusmutational inclusions of tubestransitions calculus
Nonsmooth analysis (49J52) Set-valued maps in general topology (54C60) Optimization of shapes other than minimal surfaces (49Q10) General theory for ordinary differential equations (34A99)
Related Items (12)
Differential equations for closed sets in a Banach space, survey and extension ⋮ Mutational equations in metrics spaces ⋮ Mutational equations for shapes and vision-based control ⋮ Mutational equations of the morphological dilation tubes ⋮ A calculus for set-valued maps and set-valued evolution equations ⋮ Evolutions of tubes under operability constraints ⋮ A viability theorem for set-valued states in a Hilbert space ⋮ Invariance of sets under mutational inclusions on metric spaces ⋮ Filippov’s Theorem for mutational inclusions in a metric space ⋮ Shape evolutions under state constraints: A viability theorem ⋮ Infinitesimal calculus in metric spaces ⋮ Generalizing mutational equations for uniqueness of some nonlocal first-order geometric evolutions
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