Abstract
A WFMS(workflow management system) contains two basic elements: the workflow model and the workflow engine. It is important to verify workflow models before they are put to execution. Traditional workflow models mainly describe workflows either from the control perspective or from the data perspective. In fact, the control flow and the data flow are two important aspects for workflow modeling and they are not independent from each other. A new workflow modeling technique, named Dual Workflow Nets (DWF-nets), is proposed to explicitly model the control flow and data flow of workflow processes. Besides, the control/data flow interactions can be captured in DWF-nets. Moreover, the control/data inconsistency, which is neglected by traditional modeling techniques, can be detected by verification of DWF-nets.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
van der Aalst, W.M.P., ter Hofstede, A.H.M., Weske, M.: Business Process Management: A Survey. International Conference on Business Process Management (BPM 2003) (2003)
Yu, j., Buyya,: A taxonomy of scientific workflow systems for grid computing. In: Special Issue on Scientific Workflows, SIGMOD Record. 34(3), pp. 44–49. ACM Press, New York (2005)
Liu, D., Wang, j., Chan, S.C.F., Sun, J., et al.: Modeling workflow processes with colored Petri nets. Computer in Industry 49, 267–281 (2002)
van der Aalst, W.M.P.: Three Good Reasons for Using a Petri Net-Based Workflow Management System. In: Proceedings of the International Working Conference on Information and Process Integration in Enterprises (IPIC 1996) (1996)
Sadiq, W., Orlowska, M.E.: Analyzing Process Models using Graph Reduction Techniques. Information systems 25(2), 117–134 (2000)
Bastos, R.M., Ruiz, D.D.A.: Extending UML Activity Diagram for Workflow Modeling in Production Systems. In: Proceedings of the 35th Hawaii International Conference on System Sciences (2000)
Ellis, C.A., Nutt, G.J.: Modelling and Enactment of Workflow Systems. In: Ajmone Marsan, M. (ed.) Application and Theory of Petri Nets 1993. LNCS, vol. 691, Springer, Heidelberg (1993)
Russell, N., ter Hofstede, A.H.M., Edmond, D., van der Aalst, W.M.P.: Workflow data patterns. QUT Technical report, Queensland University of Technology (2004)
Sadiq, S., Orlowska, M., Sadiq, W., Foulger, C.: Data Flow and Validation in Workflow Modelling. In: Proceedings of the 15th Australasian database conference (2004)
Varea, M., Al-Hashimi, B.M., Corte´s, L.A., Eles, P., Peng, Z.: Dual Flow Nets: Modeling the Control/Data-Flow Relation in Embedded Systems. ACM Transactions on Embedded Computing Systems 5(1), 54–81 (2006)
van der Aalst, W.M.P.: The Application of Petri nets to Workflow Management. The Journal of Circuits, Systems and Computers (1998)
Ling, S., Schmidt, H.: Time Petri nets for Workflow Modeling and Analysis. In: Proceedings of IEEE International Conference on Systems, Man, and Cybernetics (2000)
van der Aalst, W.M.P., Moldt, D., Wienberg, F.: Enacting Interorganizational Work using nets in nets. In: Proceedings of the 1999 Workflow Management Conference (1999)
Lee, J., Wyner, G.M.: Defining specialization for dataflow diagrams. Information Systems 28(6), 651–671 (2003)
Author information
Authors and Affiliations
Editor information
Rights and permissions
Copyright information
© 2007 Springer-Verlag Berlin Heidelberg
About this paper
Cite this paper
Fan, S., Dou, W., Chen, J. (2007). Dual Workflow Nets: Mixed Control/Data-Flow Representation for Workflow Modeling and Verification. In: Chang, K.CC., et al. Advances in Web and Network Technologies, and Information Management. APWeb WAIM 2007 2007. Lecture Notes in Computer Science, vol 4537. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-540-72909-9_46
Download citation
DOI: https://doi.org/10.1007/978-3-540-72909-9_46
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-72908-2
Online ISBN: 978-3-540-72909-9
eBook Packages: Computer ScienceComputer Science (R0)