{ "id": "1207.6375", "version": "v2", "published": "2012-07-26T19:13:14.000Z", "updated": "2012-07-30T19:22:25.000Z", "title": "Vector analysis on fractals and applications", "authors": [ "Michael Hinz", "Alexander Teplyaev" ], "categories": [ "math.AP", "math-ph", "math.MP", "math.OA" ], "abstract": "The paper surveys some recent results concerning vector analysis on fractals. We start with a local regular Dirichlet form and use the framework of 1-forms and derivations introduced by Cipriani and Sauvageot to set up some elements of a related vector analysis in weak and non-local formulation. This allows to study various scalar and vector valued linear and non-linear partial differential equations on fractals that had not been accessible before. Subsequently a stronger (localized, pointwise or fiberwise) version of this vector analysis can be developed, which is related to previous work of Kusuoka, Kigami, Eberle, Strichartz, Hino, Ionescu, Rogers, R\\\"ockner, and the authors.", "revisions": [ { "version": "v2", "updated": "2012-07-30T19:22:25.000Z" } ], "analyses": { "subjects": [ "28A80", "31E05", "53C23", "60J25", "60J35", "81Q35", "35A01", "35Q30" ], "keywords": [ "applications", "local regular dirichlet form", "non-linear partial differential equations", "results concerning vector analysis", "related vector analysis" ], "note": { "typesetting": "TeX", "pages": 0, "language": "en", "license": "arXiv", "status": "editable", "adsabs": "2012arXiv1207.6375H" } } }