In mathematics, Cayley's é process, introduced by , is a relatively invariant differential operator on the general linear group, that is used to construct invariants of a group action.
As a partial differential operator acting on functions of n<sup>2</sup> variables x<sub>ij</sub>, the omega operator is given by the determinant
For binary forms f in x<sub>1</sub>, y<sub>1</sub> and g in x<sub>2</sub>, y<sub>2</sub> the é operator is . The r-fold é process é<sup>r</sup>(f, g) on two forms f and g in the variables x and y is then
The result of the r-fold é process é<sup>r</sup>(f, g) on the two forms f and g is also called the r-th transvectant and is commonly written (f, g)<sup>r</sup>.
Cayley's é process appears in Capelli's identity, which used to find generators for the invariants of various classical groups acting on natural polynomial algebras.
used Cayley's é process in his proof of finite generation of rings of invariants of the general linear group. His use of the é process gives an explicit formula for the Reynolds operator of the special linear group.
Cayley's é process is used to define transvectants.