| 21. | The stationary points of the Lagrangian are found by solving the eigenvalue problem resulting from Eq . ( 4 ), that is,
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| 22. | The behavior of the system near a stationary point is related to the eigenvalues of, the Jacobian of at the stationary point.
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| 23. | If more than one eigenvalue is negative, then the stationary point is a more complex one, and is usually of little interest.
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| 24. | That is, Fej�r only used the " interior " extrema of the Chebyshev polynomials, i . e . the true stationary points.
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| 25. | The behavior of the system near a stationary point is related to the eigenvalues of, the Jacobian of at the stationary point.
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| 26. | If it moves perpendicularly to the direction of the galaxy's movement, it moves at an intermediate speed relative to a stationary point.
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| 27. | If one eigenvalue is negative ( i . e ., an imaginary frequency ), then the stationary point is a transition structure.
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| 28. | Ben-Israel and Mond provided a simple proof that a function is invex if and only if every stationary point is a global minimum.
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| 29. | By frame of reference i mean your position with respect to the object in motion ( like the train and the stationary point ).
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| 30. | :I would suggest just adding to the article at stationary point, and creating appropriate talk ) 16 : 51, 28 July 2005 ( UTC)
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