Last geometric statement of Jacobi

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In differential geometry, the last geometric statement of Jacobi is a conjecture named after Carl Gustav Jacob Jacobi, which states:

Every caustic from any point p on an ellipsoid other than umbilical points has exactly four cusps.[1]

Numerical experiments had indicated the statement is true[2] before it was proven rigorously in 2004 by Itoh and Kiyohara.[3] It has since been extended to a wider class of surfaces beyond the ellipsoid.[4]

See also

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References

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