Copyright © Philip M. Parker, INSEAD. Terms of Use.
| Domain | Definition |
Mathematics | Assume that we can observe sequentially random variables y1, y2, . . . having a known joint distribution. Suppose that we must stop the observation process at some point, and that if we stop at the nth stage, we receive a "reward" xn, a known function of y1, y2, . . . . yn. An optimum stopping rule is one which maximises the expected reward. Source: European Union. (references) |
Source: compiled by the editor from various references; see credits. | |
| Language | Translations for "OPTIMAL STOPPING RULE"; alternative meanings/domain in parentheses. | ||||||||||||||||||||||
Danish | optimal stoppe-regel. (various references) | ||||||||||||||||||||||
Dutch | optimale stopregel. (various references) | ||||||||||||||||||||||
Finnish | optimaalinen pysäyttämissääntö. (various references) | ||||||||||||||||||||||
German | optimale Stoppregel. (various references) | ||||||||||||||||||||||
Greek | κανόνας βέλτιστης διακοπής. (various references) | ||||||||||||||||||||||
Italian | regola ottimale di interruzione. (various references) | ||||||||||||||||||||||
Pig Latin | optimalay oppingstay uleray regra óptima de interrupção. (various references) regla de parada óptima. (various references) optimal stoppregel. (various references) | ||||||||||||||||||||||
Scrabble® Enable2K-Verified Anagrams | |
| Words within the letters "a-e-g-i-i-l-l-m-n-o-o-p-p-p-r-s-t-t-u" | |
-5 letters: lognormalities. | |
| Source: compiled by the editor from various references; see credits. SCRABBLE® is a registered trademark. All intellectual property rights in and to the game are owned in the U.S.A and Canada by Hasbro Inc., and throughout the rest of the world by J.W. Spear & Sons Limited of Maidenhead, Berkshire, England, a subsidiary of Mattel Inc. Mattel and Spear are not affiliated with Hasbro. | |
| 1. Translations: Modern 2. Anagrams 3. Bibliography |
Copyright © Philip M. Parker, INSEAD. Terms of Use.
