On strongly monotone flows
Tom 66 / 1997
Annales Polonici Mathematici 66 (1997), 269-274
DOI: 10.4064/ap-66-1-269-274
Streszczenie
M. Hirsch's famous theorem on strongly monotone flows generated by autonomous systems u'(t) = f(u(t)) is generalized to the case where f depends also on t, satisfies Carathéodory hypotheses and is only locally Lipschitz continuous in u. The main result is a corresponding Comparison Theorem, where f(t,u) is quasimonotone increasing in u; it describes precisely for which components equality or strict inequality holds.