Beschreibung
Produktdetails
Einband
Taschenbuch
Erscheinungsdatum
08.06.2024
Verlag
TreditionSeitenzahl
172
Maße (L/B/H)
23.4/15.5/1.3 cm
Gewicht
301 g
Sprache
Englisch
ISBN
978-3-384-25467-2
Studying bilinear forms by studying the energy has a major advantage. While bilinear forms are always associated with linear operators, subgradients of arbitrary, not necessarily quadratic, energies are not. This approach led to a new way of investigating a large class of nonlinear problems. In the 60s and 70s Brezis, Crandall, Pazy and others developed a theory of nonlinear accretive operators and nonlinear semigroups, first on Hilbert spaces [Lio69, BP72, Kat67, Bre73] and later on also on Banach spaces [CL71, CP72]. Surprisingly this theory closely resembles the linear theory sketched previously. Among other results, they showed that a proper, convex and lower semicontinuous map E : H → (−∞, ∞] on a Hilbert space H admits a m-accretive subgradient ∂E, which in turn generates a semigroup R of Lipschitz continuous contractions such that t → Rtu0 is the unique mild solution of the abstract Cauchy problem
∂tu + ∂Eu =0,
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