Most physical systems possess natural symmetries (or invariance), i.e. there exist transformations (e.g. rotations, translations, scalings) that leave the system unchanged. From mathematical and engineering viewpoints, it makes sense that a filter well-designed for the system being considered should preserve the same invariance properties.

Consider ${\displaystyle G}$  a Lie group, and (local) transformation groups ${\displaystyle \varphi _{g},\psi _{g},\rho _{g}}$ , where ${\displaystyle g\in G}$ .

The nonlinear system

${\displaystyle {\begin{aligned}{\dot {x}}&=f(x,u)\\y&=h(x,u)\end{aligned}}}$ 

is said to be invariant if it is left unchanged by the action of ${\displaystyle \varphi _{g},\psi _{g},\rho _{g}}$ , i.e.

${\displaystyle {\begin{aligned}{\dot {X}}&=f(X,U)\\Y&=h(X,U),\end{aligned}}}$ 

where ${\displaystyle (X,U,Y)=(\varphi _{g}(x),\psi _{g}(u),\rho _{g}(y))}$ .

The system ${\displaystyle {\dot {\hat {x}}}=F({\hat {x}},u,y)}$  is then an invariant filter if

• ${\displaystyle F(x,u,h(x,u))=f(x,u)}$ , i.e. that it can be witten ${\displaystyle {\dot {\hat {x}}}=f({\hat {x}},u)+C}$ , where the correction term ${\displaystyle C}$  is equal to ${\displaystyle 0}$  when ${\displaystyle {\hat {y}}=y}$ 
• ${\displaystyle {\dot {\hat {X}}}=F({\hat {X}},U,Y)}$ , i.e. it is left unchanged by the transformation group.

It has been proved ^[1] that every invariant observer reads

${\displaystyle {\dot {\hat {x}}}=f({\hat {x}},u)+W({\hat {x}})L{\Bigl (}I({\hat {x}},u),E({\hat {x}},u,y){\Bigr )}E({\hat {x}},u,y),}$ 

where

• ${\displaystyle E({\hat {x}},u,y)}$  is an invariant output error, which is different from the usual output error ${\displaystyle {\hat {y}}-y}$ 
• ${\displaystyle W({\hat {x}})={\bigl (}w_{1}({\hat {x}}),..,w_{n}({\hat {x}}){\bigr )}}$  is an invariant frame
• ${\displaystyle I({\hat {x}},u)}$  is an invariant vector
• ${\displaystyle L(I,E)}$  is a freely chosen gain matrix.

Given the system and the associated transformation group being considered, there exists a constructive method to determine ${\displaystyle E({\hat {x}},u,y),W({\hat {x}}),I({\hat {x}},u)}$ , based on the moving frame method.

To analyze the error convergence, an invariant state error ${\displaystyle \eta ({\hat {x}},x)}$  is defined, which is different from the standard output error ${\displaystyle {\hat {x}}-x}$ , since the standard output error usually does not preserve the symmetries of the system. One of the main benefits of symmetry-preserving filters is that the error system is "autonomous", but for the free known invariant vector ${\displaystyle I({\hat {x}},u)}$ , i.e. ${\displaystyle {\dot {\eta }}=\Upsilon {\bigl (}\eta ,I({\hat {x}},u){\bigr )}}$ . This important property allows the estimator to have a very large domain of convergence, and to be easy to tune.^[3][4]

To choose the gain matrix ${\displaystyle L(I,E)}$ , there are two possibilities:

• a deterministic approach, that leads to the construction of truly nonlinear symmetry-preserving filters (similar to Luenberger-like observers)
• a stochastic approach, that leads to Invariant Extended Kalman Filters (similar to Kalman-like observers).

There has been numerous applications that use such invariant observers to estimate the state of the considered system. The application areas include

• attitude and heading reference systems with ^[3] or without ^[4] position/velocity sensor (e.g. GPS)
• ground vehicle localization systems
• chemical reactors^[1]
• oceanography