Symbols:Set Theory/Symmetric Difference

Symmetric Difference

$\symdif$

The symmetric difference between two sets $S$ and $T$ is denoted $S \symdif T$ and consists of all the elements in either set, but not in both.

$S \symdif T := \paren {S \setminus T} \cup \paren {T \setminus S}$

The $\LaTeX$ code for $\symdif$ is \symdif .

There is no standard symbol for symmetric difference. The one used here, and in general on $\mathsf{Pr} \infty \mathsf{fWiki}$:

$S \symdif T$

The following are often found for $S \symdif T$:

$S * T$

$S \oplus T$

$S + T$

$S \mathop \triangle T$

$S \mathop \Theta T$

$S \mathop \triangledown T$

are also variants for denoting this concept.