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Line 1: {{About\|general properties of symmetric functions\|the ring of symmetric functions in algebraic combinatorics\|ring of symmetric functions}} {{technical\|date=March 2013}} In [[mathematics]], a '''symmetric function of ''n'' variables''' is one whose value given n [[argument of a function\|arguments]] is the same no matter the order of the arguments. SoFor example, if ~~e.g.~~ <math>f~~(\bold{x})~~=f(x_1,x_2~~,x_3~~)</math>, ~~the~~is ~~function can be~~a symmetric ~~on all its variables~~function, ~~or just on~~then <math>f(x_1,x_2)=f(x_2,x_1)</math>, for all pairs <math>(~~x_2~~x_1,~~x_3~~x_2)</math>, orin the ___domain of <math>~~(x_1,x_3)~~f</math>. While this notion can apply to any type of function whose ''n'' arguments have the same ___domain set, it is most often used for [[polynomial function]]s, in which case these are the functions given by [[symmetric polynomials]]. There is very little systematic theory of symmetric non-polynomial functions of ''n'' variables, so this sense is little-used, except as a general definition. == Symmetrization ==

Symmetric function: Difference between revisions