-
Fundamenta nova
theoriae functionum ellipticarum (from Latin: New
Foundations of the
Theory of
Elliptic Functions) is a
treatise on
elliptic functions...
-
developed in his
great treatise Fundamenta nova
theoriae functionum ellipticarum (1829), and in
later papers in Crelle's Journal.
Theta functions are...
-
introduced by Jacobi (1829) in his work
Fundamenta Nova
Theoriae Functionum Ellipticarum. The
Jacobi triple product identity is the
Macdonald identity for the...
- Jacobi's most
important works is
Fundamenta nova
theoriae functionum ellipticarum which was
published 1829. The
addition theorem Euler found was posed...
- Van
Diemen by
Robert Brown. 1830.
Fundamenta nova
theoriae functionum ellipticarum by Carl
Gustav Jacob Jacobi. 1840.
Flora Brasiliensis by Carl Friedrich...
- Carl
Gustav Jacob Jacobi published Fundamenta nova
theoriae functionum ellipticarum with his
elliptic theta functions.
Matrix notation would be more fully...
- functions,
whose 1829
published book
Fundamenta nova
theoriae functionum ellipticarum became the
standard work on
elliptic functions. Abel's
starting point...
- 10: 23–40, 1833 "Aequationes
modulares pro
transformatione functionum ellipticarum undecimi et
decimi tertii et
decimi septimi ordinis",
Journal für die...
- 1910) Jacobi, C. G. J. (1829),
Fundamenta nova
theoriae functionum ellipticarum (in Latin), Königsberg, ISBN 978-1-108-05200-9,
Reprinted by Cambridge...
- Jacobi, Carl
Gustav Jacob (1829).
Fundamenta nova
theoriae functionum ellipticarum (in Latin). p. 42 Borwein,
Jonathan M.; Borwein,
Peter B. (1987). Pi...
