This work establishes the existence and uniqueness of solutions to the initial-value problem for the geometric transport equation [Formula presented] in the class of k-dimensional integral or normal currents Tt (t being the time variable) under the natural assumption of Lipschitz regularity of the driving vector field b. Our argument relies crucially on the notion of decomposability bundle introduced recently by Alberti and Marchese. In the particular case of 0-currents, this also yields a new proof of the uniqueness for the continuity equation in the class of signed measures.
Existence and uniqueness for the transport of currents by Lipschitz vector fields
Del Nin, Giacomo;
2024-01-01
Abstract
This work establishes the existence and uniqueness of solutions to the initial-value problem for the geometric transport equation [Formula presented] in the class of k-dimensional integral or normal currents Tt (t being the time variable) under the natural assumption of Lipschitz regularity of the driving vector field b. Our argument relies crucially on the notion of decomposability bundle introduced recently by Alberti and Marchese. In the particular case of 0-currents, this also yields a new proof of the uniqueness for the continuity equation in the class of signed measures.File in questo prodotto:
Non ci sono file associati a questo prodotto.
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
