Modular unit
In today's world, Modular unit has become increasingly relevant. Whether in the personal, professional or social sphere, Modular unit has become a central element that sets the tone in various areas of our lives. Over time, the importance of Modular unit has increased, generating debates, controversies and significant transformations. In this article, we will explore in depth the impact of Modular unit on contemporary society, analyzing its implications, challenges and opportunities. Additionally, we will examine how Modular unit has evolved over time, as well as its influence on multiple aspects of modern life.
In mathematics, modular units are certain units of rings of integers of fields of modular functions, introduced by Kubert and Lang (1975). They are functions whose zeroes and poles are confined to the cusps (images of infinity).
See also
References
- Kubert, Daniel S.; Lang, Serge (1981), Modular units, Grundlehren der Mathematischen Wissenschaften , vol. 244, Berlin, New York: Springer-Verlag, ISBN 978-0-387-90517-4, MR 0648603, Zbl 0492.12002
- Kubert, Daniel S.; Lang, Serge (1975), "Units in the modular function field. I", Mathematische Annalen, 218 (1): 67–96, doi:10.1007/BF01350068, ISSN 0025-5831, MR 0437496, Zbl 0311.14005
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