Doubly isogenous curves of genus two with a rational action of $D_6
Let $C$ and $C'$ be curves over a finite field $K$, provided with embeddings $\iota$ and $\iota'$ into their Jacobian varieties. Let $D\to C$ and $D'\to C'$ be the pullbacks (via these embeddings) of the multiplication-by-$2$ maps on the Jacobians. We say that $(C,\iota)$ and $(C...
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| creator | Booher, Jeremy Howe, Everett W Sutherland, Andrew V Voloch, José Felipe |
| description | Let $C$ and $C'$ be curves over a finite field $K$, provided with embeddings
$\iota$ and $\iota'$ into their Jacobian varieties. Let $D\to C$ and $D'\to C'$
be the pullbacks (via these embeddings) of the multiplication-by-$2$ maps on
the Jacobians. We say that $(C,\iota)$ and $(C',\iota')$ are \emph{doubly
isogenous} if $\mathrm{Jac}(C)$ and $\mathrm{Jac}(C')$ are isogenous over $K$
and $\mathrm{Jac}(D)$ and $\mathrm{Jac}(D')$ are isogenous over~$K$. When we
restrict attention to the case where $C$ and $C'$ are curves of genus $2$ whose
groups of $K$-rational automorphisms are isomorphic to the dihedral group $D_6$
of order $12$, we find many more doubly isogenous pairs than one would expect
from reasonable heuristics.
Our analysis of this overabundance of doubly isogenous curves over finite
fields leads to the construction of a pair of doubly isogenous curves over a
number field. That such a global example exists seems extremely surprising. We
show that the Zilber--Pink conjecture implies that there can only be finitely
many such examples. When we exclude reductions of this pair of global curves in
our counts, we find that the data for the remaining curves is consistent with
our original heuristic.
Computationally, we find that doubly isogenous curves in our family of $D_6$
curves can be distinguished from one another by considering the isogeny classes
of the Prym varieties of certain unramified covers of exponent $3$ and $4$.
We discuss how our family of curves can be potentially be used to obtain a
deterministic polynomial-time algorithm to factor univariate polynomials over
finite fields via an argument of Kayal and Poonen. |
| doi_str_mv | 10.48550/arxiv.2402.08853 |
| format | Article |
| fullrecord | <record><control><sourceid>arxiv_GOX</sourceid><recordid>TN_cdi_arxiv_primary_2402_08853</recordid><sourceformat>XML</sourceformat><sourcesystem>PC</sourcesystem><sourcerecordid>2402_08853</sourcerecordid><originalsourceid>FETCH-LOGICAL-a673-d55a3cd94d232f07b14207c9b4b4787390d1e46906622dee6368abb242197c293</originalsourceid><addsrcrecordid>eNotjztPwzAUhb0woMIPYMIDa4Jz_R5Rykuq1KV7dP0IWAo1cpKW_nuawnQeOjrSR8hdw2phpGSPWH7SoQbBoGbGSH5N2nWe3XCiacwfcZ_nkfq5HOJIc0_PxTlPx0yPafqkSAtOKe9xoOgXs2we1p26IVc9DmO8_dcV2b0879q3arN9fW-fNhUqzasgJXIfrAjAoWfaNQKY9tYJJ7TR3LLQRKEsUwogxKi4MugcCGis9mD5itz_3V4ouu-SvrCcuoWmu9DwX3thQzg</addsrcrecordid><sourcetype>Open Access Repository</sourcetype><iscdi>true</iscdi><recordtype>article</recordtype></control><display><type>article</type><title>Doubly isogenous curves of genus two with a rational action of $D_6</title><source>arXiv.org</source><creator>Booher, Jeremy ; Howe, Everett W ; Sutherland, Andrew V ; Voloch, José Felipe</creator><creatorcontrib>Booher, Jeremy ; Howe, Everett W ; Sutherland, Andrew V ; Voloch, José Felipe</creatorcontrib><description>Let $C$ and $C'$ be curves over a finite field $K$, provided with embeddings
$\iota$ and $\iota'$ into their Jacobian varieties. Let $D\to C$ and $D'\to C'$
be the pullbacks (via these embeddings) of the multiplication-by-$2$ maps on
the Jacobians. We say that $(C,\iota)$ and $(C',\iota')$ are \emph{doubly
isogenous} if $\mathrm{Jac}(C)$ and $\mathrm{Jac}(C')$ are isogenous over $K$
and $\mathrm{Jac}(D)$ and $\mathrm{Jac}(D')$ are isogenous over~$K$. When we
restrict attention to the case where $C$ and $C'$ are curves of genus $2$ whose
groups of $K$-rational automorphisms are isomorphic to the dihedral group $D_6$
of order $12$, we find many more doubly isogenous pairs than one would expect
from reasonable heuristics.
Our analysis of this overabundance of doubly isogenous curves over finite
fields leads to the construction of a pair of doubly isogenous curves over a
number field. That such a global example exists seems extremely surprising. We
show that the Zilber--Pink conjecture implies that there can only be finitely
many such examples. When we exclude reductions of this pair of global curves in
our counts, we find that the data for the remaining curves is consistent with
our original heuristic.
Computationally, we find that doubly isogenous curves in our family of $D_6$
curves can be distinguished from one another by considering the isogeny classes
of the Prym varieties of certain unramified covers of exponent $3$ and $4$.
We discuss how our family of curves can be potentially be used to obtain a
deterministic polynomial-time algorithm to factor univariate polynomials over
finite fields via an argument of Kayal and Poonen.</description><identifier>DOI: 10.48550/arxiv.2402.08853</identifier><language>eng</language><subject>Mathematics - Algebraic Geometry ; Mathematics - Number Theory</subject><creationdate>2024-02</creationdate><rights>http://arxiv.org/licenses/nonexclusive-distrib/1.0</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>228,230,780,885</link.rule.ids><linktorsrc>$$Uhttps://arxiv.org/abs/2402.08853$$EView_record_in_Cornell_University$$FView_record_in_$$GCornell_University$$Hfree_for_read</linktorsrc><backlink>$$Uhttps://doi.org/10.48550/arXiv.2402.08853$$DView paper in arXiv$$Hfree_for_read</backlink></links><search><creatorcontrib>Booher, Jeremy</creatorcontrib><creatorcontrib>Howe, Everett W</creatorcontrib><creatorcontrib>Sutherland, Andrew V</creatorcontrib><creatorcontrib>Voloch, José Felipe</creatorcontrib><title>Doubly isogenous curves of genus two with a rational action of $D_6</title><description>Let $C$ and $C'$ be curves over a finite field $K$, provided with embeddings
$\iota$ and $\iota'$ into their Jacobian varieties. Let $D\to C$ and $D'\to C'$
be the pullbacks (via these embeddings) of the multiplication-by-$2$ maps on
the Jacobians. We say that $(C,\iota)$ and $(C',\iota')$ are \emph{doubly
isogenous} if $\mathrm{Jac}(C)$ and $\mathrm{Jac}(C')$ are isogenous over $K$
and $\mathrm{Jac}(D)$ and $\mathrm{Jac}(D')$ are isogenous over~$K$. When we
restrict attention to the case where $C$ and $C'$ are curves of genus $2$ whose
groups of $K$-rational automorphisms are isomorphic to the dihedral group $D_6$
of order $12$, we find many more doubly isogenous pairs than one would expect
from reasonable heuristics.
Our analysis of this overabundance of doubly isogenous curves over finite
fields leads to the construction of a pair of doubly isogenous curves over a
number field. That such a global example exists seems extremely surprising. We
show that the Zilber--Pink conjecture implies that there can only be finitely
many such examples. When we exclude reductions of this pair of global curves in
our counts, we find that the data for the remaining curves is consistent with
our original heuristic.
Computationally, we find that doubly isogenous curves in our family of $D_6$
curves can be distinguished from one another by considering the isogeny classes
of the Prym varieties of certain unramified covers of exponent $3$ and $4$.
We discuss how our family of curves can be potentially be used to obtain a
deterministic polynomial-time algorithm to factor univariate polynomials over
finite fields via an argument of Kayal and Poonen.</description><subject>Mathematics - Algebraic Geometry</subject><subject>Mathematics - Number Theory</subject><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2024</creationdate><recordtype>article</recordtype><sourceid>GOX</sourceid><recordid>eNotjztPwzAUhb0woMIPYMIDa4Jz_R5Rykuq1KV7dP0IWAo1cpKW_nuawnQeOjrSR8hdw2phpGSPWH7SoQbBoGbGSH5N2nWe3XCiacwfcZ_nkfq5HOJIc0_PxTlPx0yPafqkSAtOKe9xoOgXs2we1p26IVc9DmO8_dcV2b0879q3arN9fW-fNhUqzasgJXIfrAjAoWfaNQKY9tYJJ7TR3LLQRKEsUwogxKi4MugcCGis9mD5itz_3V4ouu-SvrCcuoWmu9DwX3thQzg</recordid><startdate>20240213</startdate><enddate>20240213</enddate><creator>Booher, Jeremy</creator><creator>Howe, Everett W</creator><creator>Sutherland, Andrew V</creator><creator>Voloch, José Felipe</creator><scope>AKZ</scope><scope>GOX</scope></search><sort><creationdate>20240213</creationdate><title>Doubly isogenous curves of genus two with a rational action of $D_6</title><author>Booher, Jeremy ; Howe, Everett W ; Sutherland, Andrew V ; Voloch, José Felipe</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-a673-d55a3cd94d232f07b14207c9b4b4787390d1e46906622dee6368abb242197c293</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2024</creationdate><topic>Mathematics - Algebraic Geometry</topic><topic>Mathematics - Number Theory</topic><toplevel>online_resources</toplevel><creatorcontrib>Booher, Jeremy</creatorcontrib><creatorcontrib>Howe, Everett W</creatorcontrib><creatorcontrib>Sutherland, Andrew V</creatorcontrib><creatorcontrib>Voloch, José Felipe</creatorcontrib><collection>arXiv Mathematics</collection><collection>arXiv.org</collection></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext_linktorsrc</fulltext></delivery><addata><au>Booher, Jeremy</au><au>Howe, Everett W</au><au>Sutherland, Andrew V</au><au>Voloch, José Felipe</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Doubly isogenous curves of genus two with a rational action of $D_6</atitle><date>2024-02-13</date><risdate>2024</risdate><abstract>Let $C$ and $C'$ be curves over a finite field $K$, provided with embeddings
$\iota$ and $\iota'$ into their Jacobian varieties. Let $D\to C$ and $D'\to C'$
be the pullbacks (via these embeddings) of the multiplication-by-$2$ maps on
the Jacobians. We say that $(C,\iota)$ and $(C',\iota')$ are \emph{doubly
isogenous} if $\mathrm{Jac}(C)$ and $\mathrm{Jac}(C')$ are isogenous over $K$
and $\mathrm{Jac}(D)$ and $\mathrm{Jac}(D')$ are isogenous over~$K$. When we
restrict attention to the case where $C$ and $C'$ are curves of genus $2$ whose
groups of $K$-rational automorphisms are isomorphic to the dihedral group $D_6$
of order $12$, we find many more doubly isogenous pairs than one would expect
from reasonable heuristics.
Our analysis of this overabundance of doubly isogenous curves over finite
fields leads to the construction of a pair of doubly isogenous curves over a
number field. That such a global example exists seems extremely surprising. We
show that the Zilber--Pink conjecture implies that there can only be finitely
many such examples. When we exclude reductions of this pair of global curves in
our counts, we find that the data for the remaining curves is consistent with
our original heuristic.
Computationally, we find that doubly isogenous curves in our family of $D_6$
curves can be distinguished from one another by considering the isogeny classes
of the Prym varieties of certain unramified covers of exponent $3$ and $4$.
We discuss how our family of curves can be potentially be used to obtain a
deterministic polynomial-time algorithm to factor univariate polynomials over
finite fields via an argument of Kayal and Poonen.</abstract><doi>10.48550/arxiv.2402.08853</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Algebraic Geometry Mathematics - Number Theory |
| title | Doubly isogenous curves of genus two with a rational action of $D_6 |
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