| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 1815204 | Physica B: Condensed Matter | 2008 | 4 Pages |
In this paper, we consider a play-like hysteresis operator defined by an nnth order rate-independent differential system. We investigate the properties of the operator for n=1n=1 and 2. We show that the operator for n=2n=2 satisfies a one-step wiping out property. This result can be extended to show that the nnth order operator satisfies an (n-1)(n-1)-th step wiping out property. Thus the new family of operators fall between the first-order differential equation models that do not satisfy any wiping-out properties and the Preisach-type operator that can show, in general, a countably infinite-step wiping out property. We will show that the “backlash-like” operator defined by Su, Stepanenko, Svoboda and Leung (SSSL) is a special case of our operator for n=1n=1.
