| Article ID: | iaor1989162 |
| Country: | Switzerland |
| Volume: | 20 |
| Start Page Number: | 97 |
| End Page Number: | 110 |
| Publication Date: | Aug 1989 |
| Journal: | Annals of Operations Research |
| Authors: | Charnes A., Gong L., Sun L. |
| Keywords: | networks, networks: scheduling |
M. Kress proved for a special case of Location-Scale probability distributions there always exists a probability level for which the Chance Constrained Critical Path (CCCP) remains unchanged for all probabilities greater than or equal to that value. His chance constrained problem has zero-order decision rules and individual chance constraints. This paper extends his results to most of the common probability distributions.