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Aging properties of the voter model with long-range interactions
We investigate the aging properties of the one-dimensional voter model with long-range interactions in its ordering kinetics. In this system, an agent, S i = ± 1 , positioned at a lattice vertex i , copies the state of another one located at a distance r , selected randomly with a probability P ( r...
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| Published in: | Journal of statistical mechanics 2024-05, Vol.2024 (5), p.53204 |
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| creator | Corberi, Federico Smaldone, Luca |
| description | We investigate the aging properties of the one-dimensional voter model with long-range interactions in its ordering kinetics. In this system, an agent,
S
i
=
±
1
, positioned at a lattice vertex
i
, copies the state of another one located at a distance
r
, selected randomly with a probability
P
(
r
)
∝
r
−
α
. Employing both analytical and numerical methods, we compute the two-time correlation function
G
(
r
;
t
,
s
)
(
t
⩾
s
) between the state of a variable
S
i
at time
s
and that of another one, at distance
r
, at time
t
. At time
t
, the memory of an agent of its former state at time
s
, expressed by the
autocorrelation function
A
(
t
,
s
)
=
G
(
r
=
0
;
t
,
s
)
, decays algebraically for
α
> 1 as
[
L
(
t
)
/
L
(
s
)
]
−
λ
, where
L
is a time-increasing coherence length and
λ
is the Fisher–Huse exponent. We find
λ
= 1 for
α
> 2, and
λ
=
1
/
(
α
−
1
)
for
1
<
α
⩽
2
. For
α
⩽
1
, instead, there is an exponential decay, as in the mean field. Then, in contrast with what is known for the related Ising model, here we find that
λ
increases upon decreasing
α
. The space-dependent correlation
G
(
r
;
t
,
s
)
obeys a scaling symmetry
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
s
)
;
L
(
t
)
/
L
(
s
)
]
for
α
> 2. Similarly, for
1
<
α
⩽
2
, one has
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
t
)
;
L
(
t
)
/
L
(
s
)
]
, where the length
L
regulating two-time correlations now differs from the coherence length as
L
∝
L
δ
, with
δ
=
1
+
2
(
2
−
α
)
. |
| doi_str_mv | 10.1088/1742-5468/ad41db |
| format | article |
| fullrecord | <record><control><sourceid>iop_cross</sourceid><recordid>TN_cdi_crossref_primary_10_1088_1742_5468_ad41db</recordid><sourceformat>XML</sourceformat><sourcesystem>PC</sourcesystem><sourcerecordid>jstatad41db</sourcerecordid><originalsourceid>FETCH-LOGICAL-c275t-30a3fdc30bc6c0cd143a8e8fd9d9a6cdf262ef57a7eadc5a29f931edad3fc6ef3</originalsourceid><addsrcrecordid>eNp1UMtOwzAQtBBIlMKdoz-AUD_ycG5UFS-pEhc4W669Tl2ldmQbEH9PoiDEhdOOdndGM4PQNSW3lAixok3JiqqsxUqZkprdCVr8rk7_4HN0kdKBEM5IKRbobt053-EhhgFidpBwsDjvAX-EDBEfg4Eef7q8x33wXRGV7wA7P96Uzi74dInOrOoTXP3MJXp7uH_dPBXbl8fnzXpbaNZUueBEcWs0Jztda6INLbkSIKxpTatqbSyrGdiqUQ0ooyvFWttyCkYZbnUNli8RmXV1DClFsHKI7qjil6RETg3IKaKcIsq5gZFyM1NcGOQhvEc_Gvz__RuTzl-N</addsrcrecordid><sourcetype>Aggregation Database</sourcetype><iscdi>true</iscdi><recordtype>article</recordtype></control><display><type>article</type><title>Aging properties of the voter model with long-range interactions</title><source>Institute of Physics:Jisc Collections:IOP Publishing Read and Publish 2024-2025 (Reading List)</source><creator>Corberi, Federico ; Smaldone, Luca</creator><creatorcontrib>Corberi, Federico ; Smaldone, Luca</creatorcontrib><description>We investigate the aging properties of the one-dimensional voter model with long-range interactions in its ordering kinetics. In this system, an agent,
S
i
=
±
1
, positioned at a lattice vertex
i
, copies the state of another one located at a distance
r
, selected randomly with a probability
P
(
r
)
∝
r
−
α
. Employing both analytical and numerical methods, we compute the two-time correlation function
G
(
r
;
t
,
s
)
(
t
⩾
s
) between the state of a variable
S
i
at time
s
and that of another one, at distance
r
, at time
t
. At time
t
, the memory of an agent of its former state at time
s
, expressed by the
autocorrelation function
A
(
t
,
s
)
=
G
(
r
=
0
;
t
,
s
)
, decays algebraically for
α
> 1 as
[
L
(
t
)
/
L
(
s
)
]
−
λ
, where
L
is a time-increasing coherence length and
λ
is the Fisher–Huse exponent. We find
λ
= 1 for
α
> 2, and
λ
=
1
/
(
α
−
1
)
for
1
<
α
⩽
2
. For
α
⩽
1
, instead, there is an exponential decay, as in the mean field. Then, in contrast with what is known for the related Ising model, here we find that
λ
increases upon decreasing
α
. The space-dependent correlation
G
(
r
;
t
,
s
)
obeys a scaling symmetry
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
s
)
;
L
(
t
)
/
L
(
s
)
]
for
α
> 2. Similarly, for
1
<
α
⩽
2
, one has
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
t
)
;
L
(
t
)
/
L
(
s
)
]
, where the length
L
regulating two-time correlations now differs from the coherence length as
L
∝
L
δ
, with
δ
=
1
+
2
(
2
−
α
)
.</description><identifier>ISSN: 1742-5468</identifier><identifier>EISSN: 1742-5468</identifier><identifier>DOI: 10.1088/1742-5468/ad41db</identifier><language>eng</language><publisher>IOP Publishing</publisher><subject>agent-based models ; coarsening processes ; exact results ; long-range interactions</subject><ispartof>Journal of statistical mechanics, 2024-05, Vol.2024 (5), p.53204</ispartof><rights>2024 The Author(s). Published on behalf of SISSA Medialab srl by IOP Publishing Ltd</rights><lds50>peer_reviewed</lds50><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed><cites>FETCH-LOGICAL-c275t-30a3fdc30bc6c0cd143a8e8fd9d9a6cdf262ef57a7eadc5a29f931edad3fc6ef3</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>314,780,784,27924,27925</link.rule.ids></links><search><creatorcontrib>Corberi, Federico</creatorcontrib><creatorcontrib>Smaldone, Luca</creatorcontrib><title>Aging properties of the voter model with long-range interactions</title><title>Journal of statistical mechanics</title><addtitle>JSTAT</addtitle><addtitle>J. Stat. Mech</addtitle><description>We investigate the aging properties of the one-dimensional voter model with long-range interactions in its ordering kinetics. In this system, an agent,
S
i
=
±
1
, positioned at a lattice vertex
i
, copies the state of another one located at a distance
r
, selected randomly with a probability
P
(
r
)
∝
r
−
α
. Employing both analytical and numerical methods, we compute the two-time correlation function
G
(
r
;
t
,
s
)
(
t
⩾
s
) between the state of a variable
S
i
at time
s
and that of another one, at distance
r
, at time
t
. At time
t
, the memory of an agent of its former state at time
s
, expressed by the
autocorrelation function
A
(
t
,
s
)
=
G
(
r
=
0
;
t
,
s
)
, decays algebraically for
α
> 1 as
[
L
(
t
)
/
L
(
s
)
]
−
λ
, where
L
is a time-increasing coherence length and
λ
is the Fisher–Huse exponent. We find
λ
= 1 for
α
> 2, and
λ
=
1
/
(
α
−
1
)
for
1
<
α
⩽
2
. For
α
⩽
1
, instead, there is an exponential decay, as in the mean field. Then, in contrast with what is known for the related Ising model, here we find that
λ
increases upon decreasing
α
. The space-dependent correlation
G
(
r
;
t
,
s
)
obeys a scaling symmetry
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
s
)
;
L
(
t
)
/
L
(
s
)
]
for
α
> 2. Similarly, for
1
<
α
⩽
2
, one has
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
t
)
;
L
(
t
)
/
L
(
s
)
]
, where the length
L
regulating two-time correlations now differs from the coherence length as
L
∝
L
δ
, with
δ
=
1
+
2
(
2
−
α
)
.</description><subject>agent-based models</subject><subject>coarsening processes</subject><subject>exact results</subject><subject>long-range interactions</subject><issn>1742-5468</issn><issn>1742-5468</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2024</creationdate><recordtype>article</recordtype><recordid>eNp1UMtOwzAQtBBIlMKdoz-AUD_ycG5UFS-pEhc4W669Tl2ldmQbEH9PoiDEhdOOdndGM4PQNSW3lAixok3JiqqsxUqZkprdCVr8rk7_4HN0kdKBEM5IKRbobt053-EhhgFidpBwsDjvAX-EDBEfg4Eef7q8x33wXRGV7wA7P96Uzi74dInOrOoTXP3MJXp7uH_dPBXbl8fnzXpbaNZUueBEcWs0Jztda6INLbkSIKxpTatqbSyrGdiqUQ0ooyvFWttyCkYZbnUNli8RmXV1DClFsHKI7qjil6RETg3IKaKcIsq5gZFyM1NcGOQhvEc_Gvz__RuTzl-N</recordid><startdate>20240530</startdate><enddate>20240530</enddate><creator>Corberi, Federico</creator><creator>Smaldone, Luca</creator><general>IOP Publishing</general><scope>O3W</scope><scope>TSCCA</scope><scope>AAYXX</scope><scope>CITATION</scope></search><sort><creationdate>20240530</creationdate><title>Aging properties of the voter model with long-range interactions</title><author>Corberi, Federico ; Smaldone, Luca</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c275t-30a3fdc30bc6c0cd143a8e8fd9d9a6cdf262ef57a7eadc5a29f931edad3fc6ef3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2024</creationdate><topic>agent-based models</topic><topic>coarsening processes</topic><topic>exact results</topic><topic>long-range interactions</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Corberi, Federico</creatorcontrib><creatorcontrib>Smaldone, Luca</creatorcontrib><collection>Open Access: IOP Publishing Free Content</collection><collection>IOPscience (Open Access)</collection><collection>CrossRef</collection><jtitle>Journal of statistical mechanics</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Corberi, Federico</au><au>Smaldone, Luca</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Aging properties of the voter model with long-range interactions</atitle><jtitle>Journal of statistical mechanics</jtitle><stitle>JSTAT</stitle><addtitle>J. Stat. Mech</addtitle><date>2024-05-30</date><risdate>2024</risdate><volume>2024</volume><issue>5</issue><spage>53204</spage><pages>53204-</pages><issn>1742-5468</issn><eissn>1742-5468</eissn><abstract>We investigate the aging properties of the one-dimensional voter model with long-range interactions in its ordering kinetics. In this system, an agent,
S
i
=
±
1
, positioned at a lattice vertex
i
, copies the state of another one located at a distance
r
, selected randomly with a probability
P
(
r
)
∝
r
−
α
. Employing both analytical and numerical methods, we compute the two-time correlation function
G
(
r
;
t
,
s
)
(
t
⩾
s
) between the state of a variable
S
i
at time
s
and that of another one, at distance
r
, at time
t
. At time
t
, the memory of an agent of its former state at time
s
, expressed by the
autocorrelation function
A
(
t
,
s
)
=
G
(
r
=
0
;
t
,
s
)
, decays algebraically for
α
> 1 as
[
L
(
t
)
/
L
(
s
)
]
−
λ
, where
L
is a time-increasing coherence length and
λ
is the Fisher–Huse exponent. We find
λ
= 1 for
α
> 2, and
λ
=
1
/
(
α
−
1
)
for
1
<
α
⩽
2
. For
α
⩽
1
, instead, there is an exponential decay, as in the mean field. Then, in contrast with what is known for the related Ising model, here we find that
λ
increases upon decreasing
α
. The space-dependent correlation
G
(
r
;
t
,
s
)
obeys a scaling symmetry
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
s
)
;
L
(
t
)
/
L
(
s
)
]
for
α
> 2. Similarly, for
1
<
α
⩽
2
, one has
G
(
r
;
t
,
s
)
=
g
[
r
/
L
(
t
)
;
L
(
t
)
/
L
(
s
)
]
, where the length
L
regulating two-time correlations now differs from the coherence length as
L
∝
L
δ
, with
δ
=
1
+
2
(
2
−
α
)
.</abstract><pub>IOP Publishing</pub><doi>10.1088/1742-5468/ad41db</doi><tpages>22</tpages><oa>free_for_read</oa></addata></record> |
| fulltext | fulltext |
| identifier | ISSN: 1742-5468 |
| ispartof | Journal of statistical mechanics, 2024-05, Vol.2024 (5), p.53204 |
| issn | 1742-5468 1742-5468 |
| language | eng |
| recordid | cdi_crossref_primary_10_1088_1742_5468_ad41db |
| source | Institute of Physics:Jisc Collections:IOP Publishing Read and Publish 2024-2025 (Reading List) |
| subjects | agent-based models coarsening processes exact results long-range interactions |
| title | Aging properties of the voter model with long-range interactions |
| url | http://sfxeu10.hosted.exlibrisgroup.com/loughborough?ctx_ver=Z39.88-2004&ctx_enc=info:ofi/enc:UTF-8&ctx_tim=2024-12-27T13%3A53%3A23IST&url_ver=Z39.88-2004&url_ctx_fmt=infofi/fmt:kev:mtx:ctx&rfr_id=info:sid/primo.exlibrisgroup.com:primo3-Article-iop_cross&rft_val_fmt=info:ofi/fmt:kev:mtx:journal&rft.genre=article&rft.atitle=Aging%20properties%20of%20the%20voter%20model%20with%20long-range%20interactions&rft.jtitle=Journal%20of%20statistical%20mechanics&rft.au=Corberi,%20Federico&rft.date=2024-05-30&rft.volume=2024&rft.issue=5&rft.spage=53204&rft.pages=53204-&rft.issn=1742-5468&rft.eissn=1742-5468&rft_id=info:doi/10.1088/1742-5468/ad41db&rft_dat=%3Ciop_cross%3Ejstatad41db%3C/iop_cross%3E%3Cgrp_id%3Ecdi_FETCH-LOGICAL-c275t-30a3fdc30bc6c0cd143a8e8fd9d9a6cdf262ef57a7eadc5a29f931edad3fc6ef3%3C/grp_id%3E%3Coa%3E%3C/oa%3E%3Curl%3E%3C/url%3E&rft_id=info:oai/&rft_id=info:pmid/&rfr_iscdi=true |