Thiele made notable contributions to the statistical study of random time series and introduced the
cumulants and
likelihood functions, and was considered to be one of the greatest statisticians of all time by
Ronald Fisher.[2] In the early 1900s he also developed and proposed a generalisation of
approval voting to multiple winner elections called
sequential proportional approval voting,[3] which was briefly used for party lists in
Sweden when proportional representation was introduced in 1909.
^Jerzy Neyman, “Note on an Article by Sir Ronald Fisher,” Journal of the Royal Statistical Society, Series B (Methodological), 18, 2 (July 1956): 288–294,
doi:
10.1111/j.2517-6161.1956.tb00236.x.
^Reuterskiöld, C. A.; Phragmén, E.; Svensén, Emil; Huss, E. G.; Fahlbeck, Pontus E.; Alin, Oscar (1899).
"1899 Vol. 2 no. 2". Statsvetenskaplig Tidskrift. 2. Archived from
the original on 2015-06-18.
2. On the application of the method of
least squares to some cases, in which a combination of certain types of inhomogeneous random sources of errors gives these a 'systematic' character, T. N. Thiele
3.
Time series analysis in 1880: a discussion of contributions made by T. N. Thiele, S. L. Lauritzen
4. The general theory of observations: calculus of probability and the method of
least squares, T. N. Thiele
5. T. N. Thiele's contributions to statistics,
A. Hald
6. On the halfinvariants in the theory of observations, T. N. Thiele
Anders Hald. "T. N. Thiele's contributions to statistics" International Statistical Review volume 49, (1981), number 1: 1—20.
Anders Hald. "The early history of the cumulants and the Gram–Charlier series" International Statistical Review volume 68 (2000), number 2,´: 137—153.
Steffen L. Lauritzen. "Time series analysis in 1880. A discussion of contributions made by T.N. Thiele". International Statistical Review 49, 1981, 319–333.