TY  - RPRT
A1  - Höfner, Peter
A1  - Möller, Bernhard
T1  - Non-smooth and zeno trajectories for hybrid system algebra
N2  - Hybrid systems are heterogeneous systems characterised by the interaction of discrete and continuous dynamics. In this paper we
compare a slightly extended version of our earlier algebraic approach
to hybrid systems with other approaches. We show that hybrid automata,
which are probably the standard tool for describing hybrid systems, can
conveniently be embedded into our algebra. But we allow general transition functions, not only smooth ones. Moreover we embed other models and point out some important advantages of the algebraic approach. In particular, we show how to easily handle Zeno effects, which are excluded by most other authors. The development of the theory is illustrated by a running example and a larger case study.
T3  - Reports / Technische Berichte der Fakultät für Angewandte Informatik der Universität Augsburg - 2006-07 
Y1  - 2022
UR  - https://opus.bibliothek.uni-augsburg.de/opus4/frontdoor/index/index/docId/92431
UR  - https://nbn-resolving.org/urn:nbn:de:bvb:384-opus4-924314
PB  - Institut für Informatik, Universität Augsburg
CY  - Augsburg
ER  -