Källén function

The function is given by a quadratic polynomial in three variables

${\displaystyle \lambda (x,y,z)\equiv x^{2}+y^{2}+z^{2}-2xy-2yz-2zx.}$

In geometry the function describes the area ${\displaystyle A}$ of a triangle with side lengths ${\displaystyle a,b,c}$:

${\displaystyle A={\frac {1}{4}}{\sqrt {-\lambda (a^{2},b^{2},c^{2})}}.}$

See also Heron's formula.

The function appears naturally in the Kinematics of relativistic particles, e.g. when expressing the energy and momentum components in the center of mass frame by Mandelstam variables.[2]

The function is (obviously) symmetric in permutations of its arguments, as well as independent of a common sign flip of its arguments:

${\displaystyle \lambda (-x,-y,-z)=\lambda (x,y,z).}$

If ${\displaystyle y,z>0}$ the polynomial factorizes into two factors

${\displaystyle \lambda (x,y,z)=(x-({\sqrt {y}}+{\sqrt {z}})^{2})(x-({\sqrt {y}}-{\sqrt {z}})^{2}).}$

If ${\displaystyle x,y,z>0}$ the polynomial factorizes into four factors

${\displaystyle \lambda (x,y,z)=-({\sqrt {x}}+{\sqrt {y}}+{\sqrt {z}})(-{\sqrt {x}}+{\sqrt {y}}+{\sqrt {z}})({\sqrt {x}}-{\sqrt {y}}+{\sqrt {z}})({\sqrt {x}}+{\sqrt {y}}-{\sqrt {z}}).}$

Its most condensed form is

${\displaystyle \lambda (x,y,z)=(x-y-z)^{2}-4yz.}$