Henry Taber

Henry Taber (1860–1936) was an American mathematician.

Biography
Taber studied mechanical engineering at Sheffield Scientific School from 1877 to 1882. Then, he went to Baltimore to study mathematics at Johns Hopkins University, under Charles Sanders Peirce and William Edward Story. He was awarded a doctorate in 1888, with a dissertation most likely tutored by Story.

The following year he was assistant professor at Johns Hopkins, but in 1889, on Clark University's foundation hiring his teacher and friend, Story, he went also to Clark. Both remained at Clark as mathematics professors until retirement in 1921.

His brother, Robert Taber, was a well known Broadway theatre actor.

Taber popularized linear algebra as expressed with matrices, in particular the symmetric matrix, skew-symmetric matrix, and orthogonal matrix.

Works
The papers by Henry Taber have been listed by Bibliographica Hopkinsiensis
 * 1890: On the Theory of Matrices, American Journal of Mathematics 12: 337 via Hathi Trust
 * 1891: "On certain Identities in the Theory of Matrices", American Journal of Mathematics 13
 * 1891: "On the application to matrices of any order of the quaternion symbols S and V", Proceedings of the London Mathematical Society 22
 * 1891: "On certain properties of symmetric, skew-symmetric and orthogonal matrices", Proceedings of the London Mathematical Society 22
 * 1891: "On the matrical equation φ Ω = Ω φ", Proceedings of the American Academy of Arts and Sciences 18
 * 1891: "On a theorem of Sylvester's relating to non-degenerate matrices", Proceedings of the American Academy of Arts and Science 19
 * 1892: "Note on representation of orthogonal matrices", Proceedings of the American Academy of Arts and Science 19
 * 1893: "On real orthogonal substitution", Proceedings of the American Academy of Arts and Science 20
 * 1893: "On the linear transformations between two quadrics", Journal of the London Mathematical Society 24
 * 1894: "On orthogonal substitutions that can be expressed as a function of a single alternate (or skew-symmetric) substitution", American Journal of Mathematics 16