主题
坐标是以 x 轴为对称轴的共焦双曲柱面的渐近角。坐标是以原点为中心的共焦椭圆柱面。
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(1)
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(2)
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(3)
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其中 
, 
, 和 
。它们与笛卡尔坐标的关系为
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(4)
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(5)
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比例因子是
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(6)
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(7)
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(8)
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(9)
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(10)
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(11)
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(12)
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按照 Misner et al. (1973) 的定义,第二类克里斯托费尔符号矩阵由下式给出
 |  | ![[0 0 0; (sqrt(2)sin(2v))/(a[cosh(2u)-cos(2v)]^(3/2)) -(sqrt(2)sinh(2u))/(a[cosh(2u)-cos(2v)]^(3/2)) 0; 0 0 0]](/images/equations/EllipticCylindricalCoordinates/Inline44.svg) |
(13)
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 |  | ![[-(sqrt(2)sin(2v))/(a[cosh(2u)-cos(2v)]^(3/2)) (sqrt(2)sinh(2u))/(a[cosh(2u)-cos(2v)]^(3/2)) 0; 0 0 0; 0 0 0]](/images/equations/EllipticCylindricalCoordinates/Inline47.svg) |
(14)
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 |  | ![[0 0 0; 0 0 0; 0 0 0].](/images/equations/EllipticCylindricalCoordinates/Inline50.svg) |
(15)
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![|(partial(x,y,z))/(partial(u,v,z))|=1/2a^2[cosh(2u)-cos(2v)].](/images/equations/EllipticCylindricalCoordinates/NumberedEquation1.svg) |
(16)
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(17)
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设
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(18)
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(19)
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(20)
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那么新的比例因子是
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(21)
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(22)
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(23)
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, 
, 
)." §2.7 in Mathematical Methods for Physicists, 2nd ed. Orlando, FL: Academic Press, pp. 95-97, 1970.Misner, C. W.; Thorne, K. S.; and Wheeler, J. A. Gravitation. San Francisco: W. H. Freeman, 1973.Moon, P. and Spencer, D. E. "椭圆柱坐标 
." Table 1.03 in Field Theory Handbook, Including Coordinate Systems, Differential Equations, and Their Solutions, 2nd ed. New York: Springer-Verlag, pp. 17-20, 1988.Morse, P. M. and Feshbach, H. Methods of Theoretical Physics, Part I. New York: McGraw-Hill, p. 657, 1953.Weisstein, Eric W. "椭圆柱坐标。" 来自 MathWorld--Wolfram Web 资源。 https://mathworld.net.cn/EllipticCylindricalCoordinates.html
