Difference between revisions of "Egorov system of surfaces"
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+ | A tri-orthogonal system $ \Sigma $ | ||
+ | consisting of so-called potential surfaces (cf. [[Potential net|Potential net]]), named after D.F. Egorov, who in 1901 (see [[#References|[1]]]) considered their general theory in detail (under the name of potential systems) and gave numerous examples of systems of this type. An Egorov system $ \Sigma $ | ||
+ | can be defined as a system admitting a (one-parameter) group of transformations taking $ \Sigma $ | ||
+ | into itself in such a way that the normals at corresponding points of $ \Sigma $ | ||
+ | remain parallel. The stationary flow of a fluid with a velocity potential and carrying the surfaces of an Egorov system provides a mechanical interpretation of this group. | ||
Let | Let | ||
− | + | $$ | |
+ | u ^ {i} ( x , y , z) = \textrm{ const } ,\ i = 1 , 2 , 3, | ||
+ | $$ | ||
+ | |||
+ | be the equations of the surfaces forming an Egorov system $ \Sigma $; | ||
+ | let $ H _ {i} $ | ||
+ | be the [[Lamé coefficients|Lamé coefficients]] appearing in the expression for the square of the line element of the space in the curvilinear coordinates $ \{ u ^ {i} \} $: | ||
− | + | $$ | |
+ | ds ^ {2} = \sum _ { i= } 1 ^ { 3 } H _ {1} ^ {2} ( du ^ {i} ) ^ {2} , | ||
+ | $$ | ||
− | + | let $ P _ {i} $ | |
+ | be the distance between the origin and the three tangent planes to $ \Sigma $, | ||
+ | let $ R _ {ik} $ | ||
+ | be the principal radii of curvature of the surfaces $ u ^ {i} = \textrm{ const } $, | ||
+ | corresponding to the principal direction $ H _ {k} du ^ {k} $, | ||
+ | and let $ \beta _ {ik} = - H _ {k} / R _ {ik} $ | ||
+ | be the quantities appearing in the expression for the line elements $ d \sigma _ {i} $ | ||
+ | of the spherical images (cf. [[Spherical map|Spherical map]]) of the surfaces: | ||
− | + | $$ | |
+ | ( d \sigma _ {i} ) ^ {2} = \beta _ {ik} ^ {2} ( du ^ {k} ) ^ {2} + | ||
+ | \beta _ {il} ^ {2} ( du ^ {l} ) ^ {2} ,\ i \neq k \neq l . | ||
+ | $$ | ||
− | + | The functions $ P _ {i} $ | |
+ | and $ H _ {i} $ | ||
+ | satisfy the same system of equations: | ||
− | + | $$ | |
− | + | \frac{\partial \theta _ {i} }{\partial u ^ {k} } | |
+ | = \beta _ {ik} \theta _ {k} . | ||
+ | $$ | ||
− | The solutions of these equations define two other Egorov systems, | + | The solutions of these equations define two other Egorov systems, $ \Sigma _ {1} $ |
+ | and $ \Sigma _ {-} 1 $, | ||
+ | with the same spherical images, for which | ||
− | + | $$ | |
+ | P _ {i} ^ {(} 1) = H _ {i} ,\ H _ {i} ^ {(-} 1) = P _ {i} . | ||
+ | $$ | ||
Continuing this transformation in both directions gives a series of Egorov systems (the Egorov series) | Continuing this transformation in both directions gives a series of Egorov systems (the Egorov series) | ||
− | + | $$ | |
+ | {} \dots, \Sigma _ {-} 2 , \Sigma _ {-} 1 , \Sigma , \Sigma _ {1} , \Sigma _ {2} ,\dots | ||
+ | $$ | ||
− | with the same spherical image, in which each | + | with the same spherical image, in which each $ \Sigma _ {k+} 1 $ |
+ | is obtained from the previous $ \Sigma _ {k} $ | ||
+ | by the formula | ||
− | + | $$ | |
+ | P _ {i} ^ {(} k+ 1) = H _ {i} ^ {(} k) . | ||
+ | $$ | ||
− | In general, the search for the spherical image of an Egorov system | + | In general, the search for the spherical image of an Egorov system $ \Sigma $ |
+ | reduces to the investigation of a potential system on the sphere: Any such system may be taken as the spherical image of one of the three families forming $ \Sigma $. | ||
− | An Egorov system | + | An Egorov system $ \Sigma $ |
+ | is characterized by the fact that | ||
− | + | $$ | |
+ | H _ {i} ^ {2} = | ||
+ | \frac{\partial \omega }{\partial u ^ {i} } | ||
+ | , | ||
+ | $$ | ||
− | where | + | where $ \omega $ |
+ | is a function having the meaning of velocity potential for the corresponding flow, that is, $ u ^ {i} = \textrm{ const } $ | ||
+ | are the potential surfaces. Thus, for any potential surface $ S $, | ||
+ | there is an Egorov system $ \Sigma $ | ||
+ | containing $ S $. | ||
+ | The tangent to the line of intersection of any surface $ \omega = \textrm{ const } $ | ||
+ | with the surface $ u ^ {i} = \textrm{ const } $ | ||
+ | at any point is parallel to the ray $ l ^ {i} $ | ||
+ | joining the centres of geodesic curvature of the lines of curvature of the surface $ u ^ {i} = \textrm{ const } $; | ||
+ | at each point of space the three rays $ l ^ {1} , l ^ {2} , l ^ {3} $ | ||
+ | are parallel to a common plane — the tangent plane to the surface $ \omega = \textrm{ const } $, | ||
+ | and the osculating planes of the coordinate lines pass through a common straight line. The quantities $ \beta _ {ik} $ | ||
+ | and $ R _ {ik} $ | ||
+ | for an Egorov system satisfy the relations: | ||
− | + | $$ | |
+ | R _ {12} R _ {23} R _ {31} = R _ {13} R _ {32} R _ {21} ,\ \beta _ {ik} = \beta _ {ki} $$ | ||
− | (the symmetry of | + | (the symmetry of $ \beta _ {ik} $ |
+ | is also a necessary and sufficient condition for a tri-orthogonal system to be an Egorov system). | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> D.F. Egorov, "Papers in differential geometry" , Moscow (1970) (In Russian)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> D.F. Egorov, "Papers in differential geometry" , Moscow (1970) (In Russian)</TD></TR></table> |
Revision as of 19:37, 5 June 2020
A tri-orthogonal system $ \Sigma $
consisting of so-called potential surfaces (cf. Potential net), named after D.F. Egorov, who in 1901 (see [1]) considered their general theory in detail (under the name of potential systems) and gave numerous examples of systems of this type. An Egorov system $ \Sigma $
can be defined as a system admitting a (one-parameter) group of transformations taking $ \Sigma $
into itself in such a way that the normals at corresponding points of $ \Sigma $
remain parallel. The stationary flow of a fluid with a velocity potential and carrying the surfaces of an Egorov system provides a mechanical interpretation of this group.
Let
$$ u ^ {i} ( x , y , z) = \textrm{ const } ,\ i = 1 , 2 , 3, $$
be the equations of the surfaces forming an Egorov system $ \Sigma $; let $ H _ {i} $ be the Lamé coefficients appearing in the expression for the square of the line element of the space in the curvilinear coordinates $ \{ u ^ {i} \} $:
$$ ds ^ {2} = \sum _ { i= } 1 ^ { 3 } H _ {1} ^ {2} ( du ^ {i} ) ^ {2} , $$
let $ P _ {i} $ be the distance between the origin and the three tangent planes to $ \Sigma $, let $ R _ {ik} $ be the principal radii of curvature of the surfaces $ u ^ {i} = \textrm{ const } $, corresponding to the principal direction $ H _ {k} du ^ {k} $, and let $ \beta _ {ik} = - H _ {k} / R _ {ik} $ be the quantities appearing in the expression for the line elements $ d \sigma _ {i} $ of the spherical images (cf. Spherical map) of the surfaces:
$$ ( d \sigma _ {i} ) ^ {2} = \beta _ {ik} ^ {2} ( du ^ {k} ) ^ {2} + \beta _ {il} ^ {2} ( du ^ {l} ) ^ {2} ,\ i \neq k \neq l . $$
The functions $ P _ {i} $ and $ H _ {i} $ satisfy the same system of equations:
$$ \frac{\partial \theta _ {i} }{\partial u ^ {k} } = \beta _ {ik} \theta _ {k} . $$
The solutions of these equations define two other Egorov systems, $ \Sigma _ {1} $ and $ \Sigma _ {-} 1 $, with the same spherical images, for which
$$ P _ {i} ^ {(} 1) = H _ {i} ,\ H _ {i} ^ {(-} 1) = P _ {i} . $$
Continuing this transformation in both directions gives a series of Egorov systems (the Egorov series)
$$ {} \dots, \Sigma _ {-} 2 , \Sigma _ {-} 1 , \Sigma , \Sigma _ {1} , \Sigma _ {2} ,\dots $$
with the same spherical image, in which each $ \Sigma _ {k+} 1 $ is obtained from the previous $ \Sigma _ {k} $ by the formula
$$ P _ {i} ^ {(} k+ 1) = H _ {i} ^ {(} k) . $$
In general, the search for the spherical image of an Egorov system $ \Sigma $ reduces to the investigation of a potential system on the sphere: Any such system may be taken as the spherical image of one of the three families forming $ \Sigma $.
An Egorov system $ \Sigma $ is characterized by the fact that
$$ H _ {i} ^ {2} = \frac{\partial \omega }{\partial u ^ {i} } , $$
where $ \omega $ is a function having the meaning of velocity potential for the corresponding flow, that is, $ u ^ {i} = \textrm{ const } $ are the potential surfaces. Thus, for any potential surface $ S $, there is an Egorov system $ \Sigma $ containing $ S $. The tangent to the line of intersection of any surface $ \omega = \textrm{ const } $ with the surface $ u ^ {i} = \textrm{ const } $ at any point is parallel to the ray $ l ^ {i} $ joining the centres of geodesic curvature of the lines of curvature of the surface $ u ^ {i} = \textrm{ const } $; at each point of space the three rays $ l ^ {1} , l ^ {2} , l ^ {3} $ are parallel to a common plane — the tangent plane to the surface $ \omega = \textrm{ const } $, and the osculating planes of the coordinate lines pass through a common straight line. The quantities $ \beta _ {ik} $ and $ R _ {ik} $ for an Egorov system satisfy the relations:
$$ R _ {12} R _ {23} R _ {31} = R _ {13} R _ {32} R _ {21} ,\ \beta _ {ik} = \beta _ {ki} $$
(the symmetry of $ \beta _ {ik} $ is also a necessary and sufficient condition for a tri-orthogonal system to be an Egorov system).
References
[1] | D.F. Egorov, "Papers in differential geometry" , Moscow (1970) (In Russian) |
Egorov system of surfaces. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Egorov_system_of_surfaces&oldid=15662