Pfaffian equation
An equation of the form
 | (1) |
where 
, 
is a differential 
-form (cf. Differential form), and the functions 
, 
, are real-valued. Let 
and suppose that the vector field 
does not have critical points in the domain 
.
A manifold 
of dimension 
and of class 
is called an integral manifold of the Pfaffian equation (1) if 
on 
. The Pfaffian equation is said to be completely integrable if there is one and only one integral manifold of maximum possible dimension 
through each point of the domain 
.
Frobenius' theorem: A necessary and sufficient condition for the Pfaffian equation (1) to be completely integrable is
 | (2) |
Here 
is the differential form of degree 2 obtained from 
by exterior differentiation, and 
is the exterior product. In this case the integration of the Pfaffian equation reduces to the integration of a system of ordinary differential equations.
In three-dimensional Euclidean space a Pfaffian equation has the form
 | (3) |
where 
, 
and 
are functions of 
, 
and 
and condition (2) for complete integrability is
 | (4) |
or
 |
In this case there exist smooth functions 
, 
(
) such that
 |
and the integral surfaces of the Pfaffian equation (3) are given by the equations 
. If 
is a certain force field, then the field 
has 
as a potential function. If the Pfaffian equation (3) is not completely integrable, then it does not have integral surfaces but can have integral curves. If arbitrary functions 
, 
are given, then (3) will be an ordinary differential equation in 
and the curve 
, 
, 
will be an integral curve.
It was J. Pfaff [1] who posed the problem of studying equation (1) for arbitrary 
and of reducing the differential 
-form 
to a canonical form. Condition (4) was first obtained by L. Euler in 1755 (see [2]).
By a smooth change of variables any Pfaffian equation can locally be brought to the form
 | (5) |
where 
are the new independent variables (
, 
). The number 
is called the class of the Pfaffian equation; here 
is the largest number such that the differential form 
of degree 
is not identically zero. When 
the Pfaffian equation is completely integrable. The functions 
are called the first integrals of the Pfaffian equation (5) and the integral manifolds of maximum possible dimension 
are given by the equations
 |
A Pfaffian system is a system of equations of the form
 | (6) |
where 
and 
are differential 
-forms:
 |
The rank 
of the matrix 
is the rank of the Pfaffian system at the point 
. A Pfaffian system is said to be completely integrable if there is one and only one integral manifold of maximum possible dimension 
through each point 
.
Frobenius' theorem: A necessary and sufficient condition for a Pfaffian system (6) of rank 
to be completely integrable is
 |
The problem of integrating any finite non-linear system of partial differential equations is equivalent to the problem of integrating a certain Pfaffian system (see [6]).
A number of results has been obtained on the analytic theory of Pfaffian systems. A completely-integrable Pfaffian system
 |
of 
equations has been considered, where 
and 
are positive integers and the vector functions 
, 
are holomorphic at the point 
, 
, 
; sufficient conditions have been given for the existence of a holomorphic solution at the origin (see [7]); generalizations to a larger number of independent variables have also been given.
References
| [1] | J.F. Pfaff, Berl. Abh. (1814–1815) pp. 76–135 |
| [2] | L. Euler, "Institutiones calculi differentialis" G. Kowalewski (ed.) , Opera Omnia Ser. 1; opera mat. , 10 , Teubner (1980) pp. Chapt. IX ((in Latin)) |
| [3] | I.G. Petrovskii, "Ordinary differential equations" , Prentice-Hall (1966) (Translated from Russian) |
| [4] | Yu.S. Bogdanov, "Lectures on differential equations" , Minsk (1977) (In Russian) |
| [5] | E. Cartan, "Sur la théorie des systèmes en involution et ses applications à la relativité" Bull. Soc. Math. France , 59 (1931) pp. 88–118 |
| [6] | P.K. Rashevskii, "Geometric theory of partial differential equations" , Moscow-Leningrad (1947) (In Russian) |
| [7] | R. Gérard (ed.) J.-R. Ramis (ed.) , Equations différentielles et systèmes de Pfaff dans le champ complexe 1–2 , Lect. notes in math. , 712; 1015 , Springer (1979) |
Comments
The article above describes the local situation. Let 
be an 
-dimensional manifold, 
(part of) a coordinate chart. A differential 
-form on 
that is nowhere zero defines on the one hand a Pfaffian equation on 
and on the other hand a one-dimensional subbundle of the cotangent bundle 
over 
. This leads to the modern global definition of a Pfaffian equation on 
as a vector subbundle of rank 1 of 
, cf. also Pfaffian structure.
The statement embodied in formula (5) of the article above is known as Darboux's theorem on Pfaffian equations. There is a subtlety involved here. The Pfaffian form defining a Pfaffian equation of class 
may be either of class 
or class 
. Thus, Darboux's theorem (in its modern form) comes in two steps: i) let 
be a Pfaffian equation of constant class 
on a manifold 
; then everywhere locally there exists a Pfaffian form of class 
defining that equation; and ii) a canonical form statement for Pfaffian forms of class 
, cf. Pfaffian form.
Here the class of a Pfaffian equation 
at 
is defined by: let any differential form 
define 
near 
; then the class of the equation is 
if and only if 
, 
. Cf. [a1] for more details on all this.
References
| [a1] | P. Libermann, C.-M. Marle, "Symplectic geometry and analytical mechanics" , Reidel (1987) pp. Chapt. V (Translated from French) |
Pfaffian equation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Pfaffian_equation&oldid=48172