Difference between revisions of "Connex"
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''Clebsch connex'' | ''Clebsch connex'' | ||
A connection between the points and lines of the plane expressible by the equation | A connection between the points and lines of the plane expressible by the equation | ||
| − | + | $$ \tag{1 } | |
| + | f ( x ^ {1} , x ^ {2} , x ^ {3} , u _ {1} ,\ | ||
| + | u _ {2} , u _ {3} ) = 0 , | ||
| + | $$ | ||
| − | where | + | where $ x ^ {i} $ |
| + | and $ u _ {i} $ | ||
| + | are homogeneous coordinates of points and lines, respectively. For example, the equation | ||
| − | + | $$ \tag{2 } | |
| + | u _ {1} x ^ {1} + u _ {2} x ^ {2} + u _ {3} x ^ {3} = 0 | ||
| + | $$ | ||
| − | defines the so-called principal connex, expressing the incidence of the point | + | defines the so-called principal connex, expressing the incidence of the point $ x $ |
| + | and the line $ u $. | ||
| + | What two connexes have in common is called a coincidence. The notion of a connex was introduced by A. Clebsch in 1871 for a uniform formulation of differential equations. | ||
Thus, the equation | Thus, the equation | ||
| − | + | $$ \tag{3 } | |
| + | F \left ( | ||
| + | x , y , | ||
| + | \frac{dy}{dx} | ||
| + | |||
| + | \right ) = 0 | ||
| + | $$ | ||
| − | is defined by the coincidence of connexes (1) and (2), and the problem of integrating equation (3) consists in composing curves from the points | + | is defined by the coincidence of connexes (1) and (2), and the problem of integrating equation (3) consists in composing curves from the points $ x $ |
| + | and lines $ u $ | ||
| + | thus defined, such that $ x $ | ||
| + | and $ u $ | ||
| + | are, respectively, the points of the integral curve and the tangents to it. The introduction of this projective point of view (the coordinates $ x $ | ||
| + | and $ u $ | ||
| + | have equal status) also provides a principle of classifying differential equations. | ||
Similar constructions can be carried out for partial differential equations, not necessarily of the first order. | Similar constructions can be carried out for partial differential equations, not necessarily of the first order. | ||
Latest revision as of 17:46, 4 June 2020
Clebsch connex
A connection between the points and lines of the plane expressible by the equation
$$ \tag{1 } f ( x ^ {1} , x ^ {2} , x ^ {3} , u _ {1} ,\ u _ {2} , u _ {3} ) = 0 , $$
where $ x ^ {i} $ and $ u _ {i} $ are homogeneous coordinates of points and lines, respectively. For example, the equation
$$ \tag{2 } u _ {1} x ^ {1} + u _ {2} x ^ {2} + u _ {3} x ^ {3} = 0 $$
defines the so-called principal connex, expressing the incidence of the point $ x $ and the line $ u $. What two connexes have in common is called a coincidence. The notion of a connex was introduced by A. Clebsch in 1871 for a uniform formulation of differential equations.
Thus, the equation
$$ \tag{3 } F \left ( x , y , \frac{dy}{dx} \right ) = 0 $$
is defined by the coincidence of connexes (1) and (2), and the problem of integrating equation (3) consists in composing curves from the points $ x $ and lines $ u $ thus defined, such that $ x $ and $ u $ are, respectively, the points of the integral curve and the tangents to it. The introduction of this projective point of view (the coordinates $ x $ and $ u $ have equal status) also provides a principle of classifying differential equations.
Similar constructions can be carried out for partial differential equations, not necessarily of the first order.
References
| [1] | F. Klein, "Vorlesungen über höhere Geometrie" , Springer (1926) |
Connex. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Connex&oldid=46479