Nome (mathematics)

In mathematics, specifically the theory of elliptic functions, the nome is a special function and is given by

$q =e^{-\frac{\pi K'}{K}} =e^{\frac{{\rm{i}}\pi\omega_2}{\omega_1}} =e^{{\rm{i}} \pi \tau} \,$

where $K \,$ and ${\rm{i}}K' \,$ are the quarter periods, and $\omega_1 \,$ and $\omega_2 \,$ are the fundamental pair of periods. Notationally, the quarter periods $K \,$ and ${\rm{i}}K' \,$ are usually used only in the context of the Jacobian elliptic functions, whereas the half-periods $\omega_1 \,$ and $\omega_2 \,$ are usually used only in the context of Weierstrass elliptic functions. Some authors, notably Apostol, use $\omega_1 \,$ and $\omega_2 \,$ to denote whole periods rather than half-periods.

The nome is frequently used as a value with which elliptic functions and modular forms can be described; on the other hand, it can also be thought of as function, because the quarter periods are functions of the elliptic modulus. This ambiguity occurs because for real values of the elliptic modulus, the quarter periods and thus the nome are uniquely determined.

The function $\tau=\frac{{\rm{i}}K'}{K}=\frac{\omega_2}{\omega_1}\,$ is sometimes called the half-period ratio because it is the ratio of the two half-periods $\omega_1 \,$ and $\omega_2 \,$ of an elliptic function.

The complementary nome $q_1\,$ is given by

$q_1=e^{-\frac{\pi K}{K'}}. \,$

See the articles on quarter period and elliptic integrals for additional definitions and relations on the nome.

References

Milton Abramowitz and Irene A. Stegun, Handbook of Mathematical Functions, (1964) Dover Publications, New York. OCLC 1097832 . See sections 16.27.4 and 17.3.17. 1972 edition: ISBN 0486612724
Tom M. Apostol, Modular Functions and Dirichlet Series in Number Theory, Second Edition (1990), Springer, New York ISBN 0-387-97127-0

Categories:

Elliptic functions

Wikimedia Foundation. 2010.

Игры ⚽ Нужна курсовая?

Look at other dictionaries:

Nome — may refer to: A country subdivision Nome (Egypt) an administrative division within ancient Egypt. Nome (Greece), the administrative division immediately below the peripheries of Greece (Greek: νομός, nomós; pl. νομοί, nomoí) Places Nome, Norway… … Wikipedia
List of mathematics articles (N) — NOTOC N N body problem N category N category number N connected space N dimensional sequential move puzzles N dimensional space N huge cardinal N jet N Mahlo cardinal N monoid N player game N set N skeleton N sphere N! conjecture Nabla symbol… … Wikipedia
Métrique de Poincaré — En mathématiques, et plus précisément en géométrie différentielle, la métrique de Poincaré, due à Henri Poincaré, est le tenseur métrique décrivant une surface de courbure négative constante. C est la métrique naturelle utilisée pour des calculs… … Wikipédia en Français
J-invariant — nome q on the unit diskIn mathematics, Klein s j invariant, regarded as a function of a complex variable tau;, is a modular function defined on the upper half plane of complex numbers. We can express it in terms of Jacobi s theta functions, in… … Wikipedia
Francisco de Borja Garção Stockler — Francisco de Borja Garção Stockler, 1st Baron of Vila da Praia, (September 25, 1759 – March 6, 1829) was a lieutenant general and the eighth Captain General of the Azores, politician, and mathematician. He was one of the pioneers in differential… … Wikipedia
Egypt — • Provides information on history, religion, and literature Catholic Encyclopedia. Kevin Knight. 2006. Egypt Egypt † … Catholic encyclopedia
Imiaslavie — Schema monk Illarion. Imiaslavie (Russian: Имяславие) or Imiabozhie (Имябожие), also spelled imyaslavie and imyabozhie, and also referred to as onomatodoxy, is a dogmatic movement which was condemned by the Russian Orthodox Church, but that is… … Wikipedia
Jacobi's elliptic functions — In mathematics, the Jacobi elliptic functions are a set of basic elliptic functions, and auxiliary theta functions, that have historical importance with also many features that show up important structure, and have direct relevance to some… … Wikipedia
Egypt, ancient — Introduction civilization in northeastern Africa dating from the 3rd millennium BC. Its many achievements, preserved in its art and monuments, hold a fascination that continues to grow as archaeological finds expose its secrets. This article… … Universalium
Nephthys — was normally portrayed as a young woman, wearing a headdress in the shape of a house and basket Goddess of Lamentation Name in hieroglyphs … Wikipedia

Academic Dictionaries and Encyclopedias

Nome (mathematics)

References

Look at other dictionaries:

Share the article and excerpts

Academic Dictionaries and Encyclopedias

Wikipedia

Nome (mathematics)

References

Look at other dictionaries:

Share the article and excerpts

Direct link