# Lie, Harius Sophus

**LIE, HARIUS SOPHUS** (1842-1899), Norwegian mathematician, was born at Nordfjordeif, near Bergen, on the tyth of December 1842, and was
educated at the university of Christiania, where he took his doctor's degree in 1868 and became extraordinary professor of mathematics (a chair created
specially for him) four years later. In 1886 he was chosen to succeed Felix Klein in the chair of geometry at Leipzig, but as his fame grew a special post was
arranged for him in Christiania. But his health was broken down by too assiduous study, and he died at Christiania on the 18th of February 1899, six months
after his return. Lie's work exercised a great influence on the progress of mathematical science during the later decades of the 19th century. His primary aim
has been declared to be the advancement and elaboration of the theory of differential equations, and it was with this end in view that he developed his theory
of transformation groups, set forth in his Theorie der TransJormalionsgruppen (3 vols., Leipzig, 1888-1893), a work of wide range and great originality, by
which probably his name is best known. A special application of his theory of continuous groups was to the general problem of non-Euclidean geometry. The latter
part of the book above mentioned was devoted to a study of the foundations of geometry, considered from the standpoint of B. Riemann and H. von Helmholtz; and
he intended to publish a systematic exposition of his geometrical investigations, in conjunction with Dr G. Scheffers, but only one volume made its appearance
(Geometric der Beriihrungstransformationen, Leipzig, 1896). Lie was a foreign member of the Royal Society, as well as an honorary member of the Cambridge
Philosophical Society and the London Mathematical Society, and his geometrical inquiries gained him the muchcoveted honour of the Lobatchewsky prize.

An analysis of Lie's works is given in the BMiotheca Mathematica (Leipzig, 1900).

*Note - this article incorporates content from Encyclopaedia Britannica, Eleventh Edition, (1910-1911)*