Florentine Fleißner
Published 2017-11-20Version 1
Generalized Lambda-semiflows are an abstraction of semiflows with non-periodic solutions, for which there may be more than one solution corresponding to given initial data. A select class of solutions to generalized Lambda-semiflows is introduced. It is proved that such minimal solutions are unique corresponding to given ranges and generate all other solutions by time reparametrization. Special qualities of minimal solutions are shown. The concept of minimal solutions is applied to gradient flows in metric spaces and generalized semiflows. Generalized semiflows have been introduced by Ball.
Transformation of $p$-gradient flows to $p'$-gradient flows in metric spaces
Variational convergence of gradient flows and rate-independent evolutions in metric spaces
Kurdyka-Łojasiewicz-Simon inequality for gradient flows in metric spaces
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