And. Joins two sumti into one sumti. The referents of the resulting sumti are the referents of both sumti considered jointly. More than two sumti may be joined into one sumti by chaining up additional { jo'u SUMTI }.
Vague connective. Joins two sumti into one sumti. The referent of the resulting sumti is some function of the referents of both sumti. More than two sumti may be joined into one sumti by chaining up additional { ju'e SUMTI }.
Respectively. Joins two sumti into one sumti. The referents of the resulting sumti are the referents of both sumti considered jointly and distributively in correspondence with another term.
Non-distributive group. Joins two sumti into one sumti. The referents of the resulting sumti are the referents of both sumti considered jointly and non-distributively. More than two sumti may be joined into one sumti by chaining up additional { joi SUMTI }.
Joins two sumti into one sumti. The referent of the resulting sumti is the set whose members are the referents of both sumti considered jointly. More than two sumti may be joined into one sumti by chaining up additional { ce SUMTI }. Thus, {X ce Y ce Z} creates one single set containing X, Y and Z.
Joins two sumti into one sumti. The referent of the resulting sumti is the sequence whose members are the referents of both sumti considered jointly. More than two sumti may be joined into one sumti by chaining up additional { ce'o SUMTI }.
Union of sets. Joins two sumti into one sumti. The referent of the resulting sumti is the set which is the union of the sets referred to by each sumti. More than two sumti may be joined into one sumti by chaining up additional { jo'e SUMTI }.
Intersection of sets. Joins two sumti into one sumti. The referent of the resulting sumti is the set which is the intersection of the sets referred to by each sumti. More than two sumti may be joined into one sumti by chaining up additional { ku'a SUMTI }.
Cross product of sets. Joins two sumti into one sumti. The referent of the resulting sumti is the set which is the cross product of the sets referred to by each sumti.
{BOX()}
X ju'e Y | = lo co'e be X bei Y |
X jo'u Y | = lo suzmei noi ge X .e Y me ke'a gi ro me ke'a cu me X gi'a me Y |
X joi Y | = lo gunma be X .e Y |
X ce Y | = lo se cmima be X .e Y .e no drata be X .e Y |
X ce'o Y | = lo porsi be fi X jo'u Y be'o noi X lidne Y ke'a |
X jo'e Y | = lo selcmi noi ro cmima be ke'a cu cmima X .a Y |
X ku'a Y | = lo selcmi noi ro cmima be ke'a cu cmima X .e Y |
X pi'u Y | = lo selcmipi'i be X bei Y |
sumti1 fa'u sumti2 sumti3 fa'u sumti4 selbri == sumti1 sumti3 selbri .i sumti2 sumti4 selbri | |