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Quantitative height bounds under splitti...

Fili, Paul...

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Quantitative height bounds under splitting conditions by Fili, Paul ( Author )

Content Provider	Lemonjar Open Access
Publisher	N.A
Publication Date	06-08-2015
Summary	In an earlier work, the first author and Petsche used potential theoretic techniques to establish a lower bound for the height of algebraic numbers that satisfy splitting conditions, such as being totally real or p-adic, improving on earlier work of Bombieri and Zannier in the totally p-adic case. These bounds applied as the degree of the algebraic number over the rationals tended towards infinity. In this paper, we use discrete energy approximation techniques on the Berkovich projective line to make the dependence on the degree in these bounds explicit, and we establish lower bounds for algebraic numbers which depend only on local properties of the numbers.
ISBN	-
Item Type	Article
File Type	pdf
File Size	36.88 KB
Language	English
Subjects	-
Unlimited	MYR 0.00
Total read	-
URL	https://arxiv.org/abs/1508.01498

Citation

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AMA 11th EditionReferences

Fili, Paul. Quantitative height bounds under splitting conditions. N.A. August 06, 2015. Accessed August 15, 2025. https://online.provdatabase.com/cite/11268

APA 7th EditionReferences

Fili, Paul. (2015). Quantitative height bounds under splitting conditions. N.A. https://online.provdatabase.com/cite/11268

Chicago 17th EditionReferences

Fili, Paul. Quantitative height bounds under splitting conditions. N.A. 2015. https://online.provdatabase.com/cite/11268

HarvardReferences

Fili, Paul. (2015). Quantitative height bounds under splitting conditions. [Online]. N.A. Available from: https://online.provdatabase.com/cite/11268. (Accessed 15 August 2025).

Harvard AustraliaReferences

Fili, Paul, 2015, Quantitative height bounds under splitting conditions, N.A, viewed 15 August 2025, <https://online.provdatabase.com/cite/11268>

MLA 9th EditionWorks Cited

Fili, Paul. Quantitative height bounds under splitting conditions. N.A, 2015. PROV Database, https://online.provdatabase.com/cite/11268.

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