http://www.cds.caltech.edu/~murray/wiki/index.php?title=Pre-orders_for_Reasoning_about_Stability_Properties_with_respect_to_Input_of_Hybrid_Systems&feed=atom&action=historyPre-orders for Reasoning about Stability Properties with respect to Input of Hybrid Systems - Revision history2020-08-08T03:50:18ZRevision history for this page on the wikiMediaWiki 1.23.12http://www.cds.caltech.edu/~murray/wiki/index.php?title=Pre-orders_for_Reasoning_about_Stability_Properties_with_respect_to_Input_of_Hybrid_Systems&diff=19684&oldid=prevMurray: htdb2wiki: creating page for 2013r_plm13-emsoft.html2016-05-15T06:14:58Z<p>htdb2wiki: creating page for 2013r_plm13-emsoft.html</p>
<p><b>New page</b></p><div>{{HTDB paper<br />
| authors = Pavithra Prabhakar, Jun Liu, Richard M. Murray<br />
| title = Pre-orders for Reasoning about Stability Properties with respect to Input of Hybrid Systems<br />
| source = International Conference on Embedded Software (EMSOFT)<br />
| year = 2013<br />
| type = Conference Paper<br />
| funding = CMI<br />
| url = http://www.cds.caltech.edu/~murray/preprints/plm13-emsoft_s.pdf<br />
| abstract = <br />
Pre-orders on systems are the basis for abstraction based verification of systems. In this paper, we investigate pre-orders for reasoning about stability with respect to inputs of hybrid systems. First, we present a superposition type theorem which gives a characterization of the classical incremental input-to-state stability of continuous systems in terms of the traditional epsilon/delta-definition of stability. We use this as the basis for defining a notion of incremental input- to-state stability of hybrid systems. Next, we present a pre-order on hybrid systems which preserves incremental input- to-state stability, by extending the classical definitions of bisimulation relations on systems with input, with uniform continuity constraints. We show that the uniform continuity is a necessary requirement by exhibiting counter-examples to show that weaker notions of input bisimulation with just continuity requirements do not suce to preserve stability. Finally, we demonstrate that the definitions are useful, by exhibiting concrete abstraction functions which satisfy the definitions of pre-orders.<br />
| flags = <br />
| filetype = PDF<br />
| filesize = 10.2M<br />
| tag = plm13-emsoft<br />
| id = 2013r<br />
}}</div>Murray