List of available XMCDA web services

All
A C D E F G I L M N O P R S T U W X

randomAlternatives Version: 1.0 Provider: PyXMCDA

Description: This web service allows to create a simple list of alternative by simply providing the desired number of alternatives, or a list of alternatives names.


randomAlternativesRanks Version: 1.0 Provider: RXMCDA

Description: Generates random (uniformly distributed) ranks of alternatives.


randomCriteria Version: 1.1 Provider: PyXMCDA

Description: This web service allows to create a simple list of criteria by providing the desired number of criteria. Now, it is not taking into account creation of thresholds.


randomCriteriaWeights Version: 1.0 Provider: RXMCDA

Description: Generates random (uniformly distributed) and normalized (sum = 1) weights of criteria.


randomNormalizedPerformanceTable Version: 1.0 Provider: RXMCDA

Description: Generates a performance table with numeric values in the real unit interval, from a uniform distribution.


randomPerformanceTable Version: 1.1 Provider: PyXMCDA

Description: This web service allows to create a simple performance table by providing a list of alternatives and a list of criteria.


rankAlternativesValues Version: 1.1 Provider: RXMCDA

Description: Calculates the rank of alternatives via their overall values. A parameter named maxMin allows to determine if the best value is the highest or the lowest one (by default, the lowest value is ranke ...


RORUTA-ExtremeRanks Version: 1.0 Provider: PUT

Description: Finds the best and worst possible positions of alternatives in the final ranking taking into consideration all value functions that are compatible with the preference information.


RORUTA-ExtremeRanksHierarchical Version: 1.0 Provider: PUT

Description: Finds the best and worst possible positions of alternatives in the final ranking taking into consideration all value functions that are compatible with the preference information. Function support ...


RORUTA-NecessaryAndPossiblePreferenceRelations Version: 1.0 Provider: PUT

Description: Finds all possible and necessary weak preference relations on the set of alternatives.