Browsing Interface : Welcome guest : log in 		Home |  Graph |  LogLearn |  Editor |  ]  KB:  Language: 
  Formal Language: 

KB Term:  Term intersection
English Word: 

Sigma KEE - RoomInventory
RoomInventory(room inventory)

appearance as argument number 1
-------------------------


(subclass RoomInventory CollectionOfObjects) Hotel.kif 138-138 Room inventory is a subclass of collection
(documentation RoomInventory EnglishLanguage "RoomInventory is the Collection of HotelUnit that a TravelerAccommodation has in one PropertyFn") Hotel.kif 139-140 Room inventory is a subclass of collection

appearance as argument number 2
-------------------------


(termFormat EnglishLanguage RoomInventory "room inventory") Hotel.kif 141-141

appearance as argument number 3
-------------------------


(domain allRoomsPhysicalAmenity 1 RoomInventory) Hotel.kif 168-168 The number 1 argument of physical amenity in all rooms is an instance of room inventory
(domain someRoomsPhysicalAmenity 1 RoomInventory) Hotel.kif 184-184 The number 1 argument of physical amenity in some rooms is an instance of room inventory
(domain someRoomsServiceAmenity 1 RoomInventory) Hotel.kif 200-200 The number 1 argument of service amenity in some rooms is an instance of room inventory
(domain allRoomsServiceAmenity 1 RoomInventory) Hotel.kif 215-215 The number 1 argument of service amenity in all rooms is an instance of room inventory
(domain allRoomsPolicy 1 RoomInventory) Hotel.kif 230-230 The number 1 argument of room policy in all rooms is an instance of room inventory
(domain someRoomsPolicy 1 RoomInventory) Hotel.kif 245-245 The number 1 argument of room policy in all rooms is an instance of room inventory
(domain someRoomsAttribute 1 RoomInventory) Hotel.kif 260-260 The number 1 argument of some rooms attribute is an instance of room inventory

antecedent
-------------------------


(=>
    (instance ?X RoomInventory)
    (memberType ?X HotelUnit))		 Hotel.kif 143-145 If X is an instance of room inventory, then hotel unit is a member type of X
(=>
    (and
        (element ?X
            (PropertyFn ?HOTEL))
        (instance ?X RoomInventory))
    (forall (?Y)
        (=>
            (member ?Y ?X)
            (element ?Y
                (PropertyFn ?HOTEL)))))		 Hotel.kif 147-154 If X is an element of belongings of Y and X is an instance of room inventory, then For all Physical Z: if Z is a member of X, then Z is an element of belongings of Y


Show full definition with tree view
Show simplified definition (without tree view)
Show simplified definition (with tree view)


Sigma web home      Suggested Upper Merged Ontology (SUMO) web home
Sigma version 3.0.0-ac69cf7a (2026-05-13) is open source software produced by Articulate Software and its partners