Difference between revisions of "NTS ABSTRACTFall2021"

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In 2017, B. Mazur and K. Rubin introduced the notion of diophantine stability for a variety defined over a number field. Given an  
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In 2017, B. Mazur and K. Rubin introduced the notion of diophantine stability for a variety defined over a number field. Given an elliptic curve E defined over the rationals and a prime number p, E is said to be diophantine stable at p if there are abundantly many p-cyclic extensions $L/\mathbb{Q}$ such that $E(L)=E(\mathbb{Q})$. In particular, this means that given any integer $n>0$, there are infinitely many cyclic extensions with Galois group $\mathbb{Z}/p^n\mathbb{Z}$, such that $E(L)=E(\mathbb{Q})$. It follows from more general results of Mazur-Rubin that $E$ is diophantine stable at a positive density set of primes p. In this talk, I will discuss diophantine stability of average for pairs $(E,p)$, where $E$ is a non-CM elliptic curve and $p\geq 11$ is a prime number at which $E$ has good ordinary reduction. First, I will fix the elliptic curve and vary the prime. In this context, diophantine stability is a consequence of certain properties of Selmer groups studied in Iwasawa theory. Statistics for Iwasawa invariants were studied recently in joint work with Debanjana Kundu. As an application, one shows that if the Mordell Weil rank of E is zero, then, $E$ is diophantine stable at $100\%$ of primes $p$. One also shows that standard conjectures (like rank distribution) imply that for any prime $p\geq 11$, a positive density set of elliptic curves (ordered by height) is diophantine stable at $p$. I will also talk about related results for stability and growth of the p-primary part of the Tate-Shafarevich group in cyclic p-extensions.
elliptic curve E defined over the rationals and a prime number p, E is said  
 
to be diophantine stable at p if there are abundantly many p-cyclic  
 
extensions $L/\mathbb{Q}$ such that $E(L)=E(\mathbb{Q})$. In particular,  
 
this means that given any integer $n>0$, there are infinitely many cyclic  
 
extensions with Galois group $\mathbb{Z}/p^n\mathbb{Z}$, such that  
 
$E(L)=E(\mathbb{Q})$. It follows from more general results of Mazur-Rubin  
 
that $E$ is diophantine stable at a positive density set of primes p. In  
 
this talk, I will discuss diophantine stability of average for pairs  
 
$(E,p)$, where $E$ is a non-CM elliptic curve and $p\geq 11$ is a prime  
 
number at which $E$ has good ordinary reduction. First, I will fix the  
 
elliptic curve and vary the prime. In this context, diophantine stability  
 
is a consequence of certain properties of Selmer groups studied in Iwasawa  
 
theory. Statistics for Iwasawa invariants were studied recently in joint  
 
work with Debanjana Kundu. As an application, one shows that if the Mordell  
 
Weil rank of E is zero, then, $E$ is diophantine stable at $100\%$ of  
 
primes $p$. One also shows that standard conjectures (like rank  
 
distribution) imply that for any prime $p\geq 11$, a positive density set  
 
of elliptic curves (ordered by height) is diophantine stable at $p$. I will  
 
also talk about related results for stability and growth of the p-primary  
 
part of the Tate-Shafarevich group in cyclic p-extensions.
 
 
 
 
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Revision as of 21:23, 1 September 2021

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Sep 9

Anwesh Ray
Arithmetic statistics and diophantine stability for elliptic curves

In 2017, B. Mazur and K. Rubin introduced the notion of diophantine stability for a variety defined over a number field. Given an elliptic curve E defined over the rationals and a prime number p, E is said to be diophantine stable at p if there are abundantly many p-cyclic extensions $L/\mathbb{Q}$ such that $E(L)=E(\mathbb{Q})$. In particular, this means that given any integer $n>0$, there are infinitely many cyclic extensions with Galois group $\mathbb{Z}/p^n\mathbb{Z}$, such that $E(L)=E(\mathbb{Q})$. It follows from more general results of Mazur-Rubin that $E$ is diophantine stable at a positive density set of primes p. In this talk, I will discuss diophantine stability of average for pairs $(E,p)$, where $E$ is a non-CM elliptic curve and $p\geq 11$ is a prime number at which $E$ has good ordinary reduction. First, I will fix the elliptic curve and vary the prime. In this context, diophantine stability is a consequence of certain properties of Selmer groups studied in Iwasawa theory. Statistics for Iwasawa invariants were studied recently in joint work with Debanjana Kundu. As an application, one shows that if the Mordell Weil rank of E is zero, then, $E$ is diophantine stable at $100\%$ of primes $p$. One also shows that standard conjectures (like rank distribution) imply that for any prime $p\geq 11$, a positive density set of elliptic curves (ordered by height) is diophantine stable at $p$. I will also talk about related results for stability and growth of the p-primary part of the Tate-Shafarevich group in cyclic p-extensions.