Mathematician:Frank Lauren Hitchcock
(Redirected from Mathematician:Frank L. Hitchcock)
Jump to navigation
Jump to search
Mathematician
American mathematician and physicist known for his formulation of the transportation problem in $1941$.
Nationality
American
History
- Born: March 6, 1875 in New York, United States
- Died: May 31, 1957 in Los Angeles, United States
Publications
- 1910: Vector Functions of a Point
- 1915: A Classification of Quadratic Vectors Functions (Proc. Natl. Acad. Sci. U.S.A. Vol. 1: pp. 177 – 183) www.jstor.org/stable/83496
- 1917: On the simultaneous formulation of two linear vector functions (Proceedings of the Royal Irish Academy Section A Vol. 34: pp. 1 – 10) www.jstor.org/stable/20490641
- 1920: A study of the vector product $V \varphi \alpha \theta \beta$ (Proceedings of the Royal Irish Academy Section A Vol. 35: pp. 30 – 37) www.jstor.org/stable/20490651
- 1920: A Thermodynamic Study of Electrolytic Solutions (Proc. Natl. Acad. Sci. U.S.A. Vol. 6: pp. 186 – 197) www.jstor.org/stable/84376
- 1920: An Identical Relation Connecting Seven Vectors
- 1921: The Axes of a Quadratic Vector (Proceedings of the American Academy of Arts and Sciences Vol. 56: pp. 331 – 351) www.jstor.org/stable/20025860
- 1922: A New Vector Method in Integral Equations (Journal of Mathematics and Physics Vol. 1: pp. 1 – 20) (with Norbert Wiener)
- 1922: A Solution of the Linear Matrix Equation by Double Multiplication
- 1923: On Double Polyadics, with Application to the Linear Matrix Equation (Proceedings of the American Academy of Arts and Sciences Vol. 58: pp. 355 – 395) www.jstor.org/stable/20026007
- 1923: Identities Satisfied by Algebraic Point Functions in N-space (Proceedings of the American Academy of Arts and Sciences Vol. 58: pp. 399 – 421) www.jstor.org/stable/20026011
- 1923: Differential Equations in Applied Chemistry (with Clark S. Robinson)
- 1923: A Method for the Numerical Solution of Integral Equations
- 1924: The Coincident Points of Two Algebraic Transformations
- 1941: The Distribution of a Product from Several Sources to Numerous Localities (Journal of Mathematics and Physics Vol. 20: pp. 224 – 230)