In geometry, Hesse's principle of transfer (German: Übertragungsprinzip) states that if the points of the projective line P¹ are depicted by a rational normal curve in Pⁿ, then the group of the projective transformations of Pⁿ that preserve the curve is isomorphic to the group of the projective transformations of P¹ (this is a generalization of the original Hesse's principle, in a form suggested by Wilhelm Franz Meyer).^[1][2] It was originally introduced by Otto Hesse in 1866, in a more restricted form. It influenced Felix Klein in the development of the Erlangen program.^[3][4][5] Since its original conception, it was generalized by many mathematicians, including Klein, Fano, and Cartan.^[6]

• Rational normal curve

• Hawkins, Thomas (1988). "Hesses's principle of transfer and the representation of lie algebras", Archive for History of Exact Sciences, 39(1), pp. 41–73.