Symmetry of a distribution

A symmetry of a distribution $D$ is a diffeomorphism $\phi: M\rightarrow M$ such that preserves $D$, i.e., $\phi_*(D)=D$.

It can be shown (exercise 3.10 in [Vitagliano 2017]) that:


Infinitesimal symmetries

An infinitesimal symmetry is a vector field $X$ such that its flow is made of symmetries. They are denoted by $\mbox{Sym}(D)$.

By abuse of language they are also called "symmetries". It can be shown (exercise 3.11 [Vitagliano 2017] or [Lychagin 1991] theorem 1) that they can be characterized in two other ways:

Suppose $\mathcal{Z}$ is a distribution:

$$ [X,Z_i]=\sum_{k=1}^r c_i^k Z_k \text{, } i=1, \ldots,r. $$

$$ L_X(\omega)\in \mathcal{Z}^*. $$

In this case the vector field $X$ is a symmetry of a Pfaffian system.


Transitive symmetry algebra

(see [Doubrov 2016] page 42)

A Lie subalgebra $\mathfrak{g} \subseteq \mbox{Sym}(D)$ is called a transitive symmetry algebra of $D$ if

$$ \mathfrak{g} + D_p =T_p M $$

being $\mathfrak{g}(p)=\{X_p \in T_p M: X \in \mathfrak{g} \}.$

Also, it is called a simply transitive symmetry algebra if additionally for any $X\in \mathfrak{g}$ it is satisfied that $X_p \in D_p$ if and only if $X\in \Gamma(D)$.

Given any Lie subalgebra $\mathfrak{g} \subseteq \mbox{Sym}(D)$, the associated local group of transformations $G$ maps integral submanifolds into integral submanifolds (see above). If we call $\mathcal{M}$ to the set of integral submanifolds, the Lie algebra is transitive if and only if the action of $G$ on $\mathcal{M}$ is locally transitive.


Characteristic symmetries

A characteristic symmetry (also called trivial symmetry) is an infinitesimal symmetry $X$ which is inside $D$, i.e., $X\in \Gamma(D)$. They are denoted by $\mbox{Char}(D)\subseteq \Gamma(D)$.

If every $X\in \Gamma(D)$ is a characteristic symmetry, we have an involutive distribution. If none of them is a characteristic symmetry then we have a completely non-integrable distribution.

The characteristic symmetries form an ideal of the Lie algebra of infinitesimal symmetries.

They correspond to the Cauchy characteristic vector fields of the Pfaffian system associated to the distribution.

Shuffling symmetries

[Lychagin 1991]

Elements of the quotient algebra

$$ \mbox{Shuf}(D)=\frac{\mbox{Sym}(D)}{\mbox{Char}(D)} $$

are called shuffling symmetries. The flows of two different representative of a class shuffle the set of maximal integral manifolds of $P$ in the same way.

We have a natural mapping for every $x\in M$

$$ \pi_x:\mbox{Shuf}(D) \rightarrow T_x M/D_x $$

A related idea is that of a transversal algebra of symmetries.


More ideas

Por otra parte, las symmetry of a distribution se pueden generalizar a cinf-symmetry of distribution.

Al aplicar este concepto a la distribución asociada a una ODE tenemos la noción de generalized symmetry of an ODE.

Si "encadenamos" varias aparecen las solvable structure para la distribución $\mathcal{Z}$.

ESQUEMA GENERAL (xournal 095)

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Author of the notes: Antonio J. Pan-Collantes

antonio.pan@uca.es


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