Burnside's lemma, sometimes also called Burnside's counting theorem, Pólya's formula, the Cauchy-Frobenius lemma or the orbit-counting theorem, is a result in group theory which is often useful in taking account of symmetry when counting mathematical objects. Its various eponyms include William Burnside, George Pólya, Augustin Louis Cauchy, and Ferdinand Georg Frobenius. Note that this result is certainly not due to Burnside himself, who merely quotes it in his book 'On the Theory of Groups of Finite Order'.

In the following, let G be a finite group that acts on a set X. For each g in G let X^g denote the set of elements in X that are fixed by g. Burnside's lemma asserts the following formula for the number of orbits, denoted |X/G|:

$|X/G|\; =\; \backslash frac\{1\}\{|G|\}\backslash sum\_\{g\; \backslash in\; G\}|X^g|.$

Thus the number of orbits (a natural number or infinity) is equal to the average number of points fixed by an element of G (which consequently is also a natural number or infinity).

Example application

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The number of rotationally distinct colourings of the faces of a cube using three colours can be determined from this formula as follows.

Let X be the set of 3⁶ fixed coloured cubes, and let the rotation group G of the cube act on X in the natural manner. Then two elements of X belong to the same orbit precisely when one is simply a rotation of the other. The number of rotationally distinct colourings is thus the same as the number of orbits and can be found by counting the sizes of the fixed sets for the 24 elements of G.

• one identity element fixing all 3⁶ elements of X
• six 90-degree face rotations fixing 3³ elements of X
• three 180-degree face rotations fixing 3⁴ elements of X
• eight 120-degree vertex rotations fixing 3² elements of X
• six 180-degree edge rotations fixing 3³ elements of X

A detailed examination of these automorphisms may be found _face_permutations_of_a_cube.

The average fix size is thus

$\backslash frac\{1\}\{24\}\backslash left(3^6+6\backslash times\; 3^3\; +\; 3\; \backslash times\; 3^4\; +\; 8\; \backslash times\; 3^2\; +\; 6\; \backslash times\; 3^3\; \backslash right)\; =\; 57.$

Hence there are 57 rotationally distinct colourings of the faces of a cube in three colours.

Proof

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The proof uses the orbit-stabilizer theorem and the fact that X is the disjoint union of the orbits:

$\backslash sum\_\{g\; \backslash in\; G\}|X^g|\; =\; |\backslash \{(g,x)\backslash in\; G\backslash times\; X\; \backslash mid\; g.x\; =\; x\backslash \}|\; =\; \backslash sum\_\{x\; \backslash in\; X\}\; |G\_x|$

$=\; \backslash sum\_\{x\; \backslash in\; X\}\; \backslash frac\{|G|\}\{|Gx|\}\; =\; |G|\; \backslash sum\_\{x\; \backslash in\; X\}\backslash frac\{1\}\{|Gx|\}\; =\; |G|\backslash sum\_\{A\backslash in\; X/G\}\backslash sum\_\{x\backslash in\; A\}\; \backslash frac\{1\}\{|A|\}$

$=\; |G|\; \backslash sum\_\{A\backslash in\; X/G\}\; 1\; =\; |G|\; \backslash cdot\; |X/G|.$

History

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William Burnside wrote in 1900 about this formula, but mathematical historians have pointed out that he was not the first to discover it; Cauchy in 1845 and Frobenius in 1887 also knew of this formula.

Lemmas | Group theory