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==history==
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==abstract==
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For a (Laurent) polynomial with complex coefficients, we can define a quantity called the Mahler measure. It was originally studied in attempts to find large primes. And later its multivariate version was introduced as a tool in transcendental number theory. In more recent times it has become an active area of research due to its mysterious connections with many other subjects. For example, there are many conjectural formulas relating Mahler measures to special values of L-functions of elliptic curves and they also show up in hyperbolic geometry. In this talk, I will give an introductory survey on this topic.
  
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==topics==
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* finding large primes
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* Lehmer's Question
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* Mahler's multivariate generalization
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* [[Smyth formula for Mahler measures]]
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* [[Mahler measure and L-values of elliptic curves]]
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* [[Mahler measure, hyperbolic geometry and dilogarithm]]
  
==why do we care?==
 
  
 
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==related items==
==some conjectures==
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* [[Mahler measure]]
 
 
 
 
 
 
 
 
==references==
 
* Bertin, Marie-José, and MATILDE LALÍN. [http://www.dms.umontreal.ca/~mlalin/surveyMahlerfinal-revised.pdf Mahler Measure of Multivariable Polynomials] Women in Numbers 2: Research Directions in Number Theory 606 (2013): 125.
 
* Smyth, Chris. 2008. “The Mahler Measure of Algebraic Numbers: a Survey.” In Number Theory and Polynomials, 352:322–349. London Math. Soc. Lecture Note Ser. Cambridge: Cambridge Univ. Press. http://www.maths.ed.ac.uk/~chris/Smyth240707.pdf
 
* Lalin [http://www.math.ualberta.ca/%7Emlalin/ubc.pdf Mahler measures as values of regulators] 2006
 
* Finch, [http://www.people.fas.harvard.edu/~sfinch/csolve/frs.pdf Modular Forms on $SL_2(\mathbb{Z})$] 2005
 
* [http://www.birs.ca/workshops/2003/03w5035/ The many aspects of Mahler's measure], Banff workshop, 2003
 
** [http://www.birs.ca/workshops/2003/03w5035/report03w5035.pdf final report]
 
* Lalin [http://www.dms.umontreal.ca/~mlalin/uba.pdf Introduction to Mahler measure], 2003
 
* Boyd, [http://www.math.ca/notes/v34/n2/Notesv34n2.pdf Mahler's measure, hyperbolic geometry and the dilogarithm] 2002
 
  
  
  
 
[[분류:talks and lecture notes]]
 
[[분류:talks and lecture notes]]
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2020년 11월 13일 (금) 03:04 기준 최신판

abstract

For a (Laurent) polynomial with complex coefficients, we can define a quantity called the Mahler measure. It was originally studied in attempts to find large primes. And later its multivariate version was introduced as a tool in transcendental number theory. In more recent times it has become an active area of research due to its mysterious connections with many other subjects. For example, there are many conjectural formulas relating Mahler measures to special values of L-functions of elliptic curves and they also show up in hyperbolic geometry. In this talk, I will give an introductory survey on this topic.

topics


related items

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