We can think of the “extension” of an n-ary quantifier or sentential connective C on a domain D as a function from n-tuples of sets of assignments (of values from D to the language's variables) to sets of assignments. ❋ MacFarlane, John (2009)
If one thinks of a structure as a kind of ordered n-tuple of sets etc., then a class Mod (T) becomes an n-ary relation, and Pasch's account agrees with ours. ❋ Hodges, Wilfrid (2009)
And we interpret each n-ary operation symbol f as the n-ary operation that takes any n terms t1, ❋ Pratt, Vaughan (2007)
In algebraic geometry varieties transform via regular n-ary functions f: An ❋ Pratt, Vaughan (2007)
Thus, the class of n-ary relations of elements of U (for any given n), the class of n-ary relations among relations of elements of ❋ Gómez-Torrente, Mario (2006)
Dn and range included in D, a permutation of the class of n-ary relations among relations of elements of D, etc. ❋ Gómez-Torrente, Mario (2006)
θ on the carrier A of A that satisfies for every n-ary connective — L the following compatibility property: for every a1, ❋ Jansana, Ramon (2006)
(A1, ¦, An) is the type of n-ary relations over objects of respective types ❋ Coquand, Thierry (2006)
A standard interpretation is given by a non-empty domain M and for each n-ary predicate P by a n-ary fuzzy relation on M, i.e., a mapping assigning to each n-tuple of elements of ❋ Hajek, Petr (2006)
P of a domain of individuals D induces a permutation of the class of n-ary relations of elements of D, a permutation of the class of functions with n arguments with domain ❋ Gómez-Torrente, Mario (2006)
You can use a context menu to change the location of the limits for both integrals and n-ary operators as on the PC. ❋ MurrayS (2010)
Sn are nonempty sets, then a fuzzy subset of n-ary L-relation. ❋ Unknown (2009)
Simple - a general lack of understanding of binary and n-ary relationships. ❋ D Nickull (2009)
Formally, a Drawing is an n-ary tree consisting of drawing Contexts and sub - drawings. ❋ Unknown (2009)
I associates every n-ary predicate name r with an n-ary L-relation I (r): Dn ❋ Unknown (2009)
Sn are nonempty sets, then a fuzzy subset of n-ary fuzzy relation. ❋ Unknown (2009)