Loading…
Automorphisms of Kronrod–Reeb graphs of Morse functions on compact surfaces
Let M be a connected orientable compact surface, f : M → R be a Morse function, and be the group of diffeomorphisms of M isotopic to the identity. Denote by the subgroup of consisting of diffeomorphisms “preserving” f , i.e., the stabilizer of f with respect to the right action of on the space of sm...
Saved in:
| Published in: | European journal of mathematics 2020-03, Vol.6 (1), p.114-131 |
|---|---|
| Main Authors: | , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| cited_by | cdi_FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523 |
|---|---|
| cites | cdi_FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523 |
| container_end_page | 131 |
| container_issue | 1 |
| container_start_page | 114 |
| container_title | European journal of mathematics |
| container_volume | 6 |
| creator | Kravchenko, Anna Maksymenko, Sergiy |
| description | Let
M
be a connected orientable compact surface,
f
:
M
→
R
be a Morse function, and
be the group of diffeomorphisms of
M
isotopic to the identity. Denote by
the subgroup of
consisting of diffeomorphisms “preserving”
f
, i.e., the stabilizer of
f
with respect to the right action of
on the space
of smooth functions on
M
. Let also
G
(
f
)
be the group of automorphisms of the Kronrod–Reeb graph of
f
induced by diffeomorphisms belonging to
. This group is an important ingredient in determining the homotopy type of the orbit of
f
with respect to the above action of
and it is trivial if
f
is “generic”, i.e., has at most one critical point at each level set
f
-
1
(
c
)
,
c
∈
R
. For the case when
M
is distinct from 2-sphere and 2-torus we present a precise description of the family
G
(
M
,
R
)
of isomorphism classes of groups
G
(
f
)
, where
f
runs over all Morse functions on
M
, and of its subfamily
G
smp
(
M
,
R
)
⊂
G
(
M
,
R
)
consisting of groups corresponding to simple Morse functions, i.e., functions having at most one critical point at each connected component of each level set. In fact,
G
(
M
,
R
)
(respectively,
G
smp
(
M
,
R
)
) coincides with the minimal family of isomorphism classes of groups containing the trivial group and closed with respect to direct products and also with respect to wreath products “from the top” with arbitrary finite cyclic groups (respectively, with the group
Z
2
only). |
| doi_str_mv | 10.1007/s40879-019-00379-8 |
| format | article |
| fullrecord | <record><control><sourceid>proquest_cross</sourceid><recordid>TN_cdi_proquest_journals_2369918514</recordid><sourceformat>XML</sourceformat><sourcesystem>PC</sourcesystem><sourcerecordid>2369918514</sourcerecordid><originalsourceid>FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523</originalsourceid><addsrcrecordid>eNp9kM9KxDAQxoMouKz7Ap4KnqtJps2f47L4D3cRZA_eQpomuxXb1KQ9ePMdfEOfxGhFbx6GGWa-7xv4IXRK8DnBmF_EAgsuc0xSYUiTOEAzSqTMGWfi8HcuH4_RIsamwkAoAyDFDG2W4-BbH_p9E9uYeZfdBd8FX3-8vT9YW2W7oPv992HjQ7SZGzszNL5Lqy4zvu21GbI4BqeNjSfoyOnnaBc_fY62V5fb1U2-vr--XS3XuQEih5zV4CyhACClISXwUgrutMBgHTaMMV4VJauwEBIKzYFUwvKK2rqUui4pzNHZFNsH_zLaOKgnP4YufVQUmJRElKRIKjqpTPAxButUH5pWh1dFsPoCpyZwKoFT3-CUSCaYTDGJu50Nf9H_uD4Bj6hxRg</addsrcrecordid><sourcetype>Aggregation Database</sourcetype><iscdi>true</iscdi><recordtype>article</recordtype><pqid>2369918514</pqid></control><display><type>article</type><title>Automorphisms of Kronrod–Reeb graphs of Morse functions on compact surfaces</title><source>Springer Nature</source><creator>Kravchenko, Anna ; Maksymenko, Sergiy</creator><creatorcontrib>Kravchenko, Anna ; Maksymenko, Sergiy</creatorcontrib><description>Let
M
be a connected orientable compact surface,
f
:
M
→
R
be a Morse function, and
be the group of diffeomorphisms of
M
isotopic to the identity. Denote by
the subgroup of
consisting of diffeomorphisms “preserving”
f
, i.e., the stabilizer of
f
with respect to the right action of
on the space
of smooth functions on
M
. Let also
G
(
f
)
be the group of automorphisms of the Kronrod–Reeb graph of
f
induced by diffeomorphisms belonging to
. This group is an important ingredient in determining the homotopy type of the orbit of
f
with respect to the above action of
and it is trivial if
f
is “generic”, i.e., has at most one critical point at each level set
f
-
1
(
c
)
,
c
∈
R
. For the case when
M
is distinct from 2-sphere and 2-torus we present a precise description of the family
G
(
M
,
R
)
of isomorphism classes of groups
G
(
f
)
, where
f
runs over all Morse functions on
M
, and of its subfamily
G
smp
(
M
,
R
)
⊂
G
(
M
,
R
)
consisting of groups corresponding to simple Morse functions, i.e., functions having at most one critical point at each connected component of each level set. In fact,
G
(
M
,
R
)
(respectively,
G
smp
(
M
,
R
)
) coincides with the minimal family of isomorphism classes of groups containing the trivial group and closed with respect to direct products and also with respect to wreath products “from the top” with arbitrary finite cyclic groups (respectively, with the group
Z
2
only).</description><identifier>ISSN: 2199-675X</identifier><identifier>EISSN: 2199-6768</identifier><identifier>DOI: 10.1007/s40879-019-00379-8</identifier><language>eng</language><publisher>Cham: Springer International Publishing</publisher><subject>Algebraic Geometry ; Automorphisms ; Critical point ; Isomorphism ; Mathematics ; Mathematics and Statistics ; Research Article ; Subgroups ; Toruses</subject><ispartof>European journal of mathematics, 2020-03, Vol.6 (1), p.114-131</ispartof><rights>Springer Nature Switzerland AG 2019</rights><rights>2019© Springer Nature Switzerland AG 2019</rights><woscitedreferencessubscribed>false</woscitedreferencessubscribed><citedby>FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523</citedby><cites>FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523</cites><orcidid>0000-0002-0062-5188</orcidid></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>Kravchenko, Anna</creatorcontrib><creatorcontrib>Maksymenko, Sergiy</creatorcontrib><title>Automorphisms of Kronrod–Reeb graphs of Morse functions on compact surfaces</title><title>European journal of mathematics</title><addtitle>European Journal of Mathematics</addtitle><description>Let
M
be a connected orientable compact surface,
f
:
M
→
R
be a Morse function, and
be the group of diffeomorphisms of
M
isotopic to the identity. Denote by
the subgroup of
consisting of diffeomorphisms “preserving”
f
, i.e., the stabilizer of
f
with respect to the right action of
on the space
of smooth functions on
M
. Let also
G
(
f
)
be the group of automorphisms of the Kronrod–Reeb graph of
f
induced by diffeomorphisms belonging to
. This group is an important ingredient in determining the homotopy type of the orbit of
f
with respect to the above action of
and it is trivial if
f
is “generic”, i.e., has at most one critical point at each level set
f
-
1
(
c
)
,
c
∈
R
. For the case when
M
is distinct from 2-sphere and 2-torus we present a precise description of the family
G
(
M
,
R
)
of isomorphism classes of groups
G
(
f
)
, where
f
runs over all Morse functions on
M
, and of its subfamily
G
smp
(
M
,
R
)
⊂
G
(
M
,
R
)
consisting of groups corresponding to simple Morse functions, i.e., functions having at most one critical point at each connected component of each level set. In fact,
G
(
M
,
R
)
(respectively,
G
smp
(
M
,
R
)
) coincides with the minimal family of isomorphism classes of groups containing the trivial group and closed with respect to direct products and also with respect to wreath products “from the top” with arbitrary finite cyclic groups (respectively, with the group
Z
2
only).</description><subject>Algebraic Geometry</subject><subject>Automorphisms</subject><subject>Critical point</subject><subject>Isomorphism</subject><subject>Mathematics</subject><subject>Mathematics and Statistics</subject><subject>Research Article</subject><subject>Subgroups</subject><subject>Toruses</subject><issn>2199-675X</issn><issn>2199-6768</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2020</creationdate><recordtype>article</recordtype><recordid>eNp9kM9KxDAQxoMouKz7Ap4KnqtJps2f47L4D3cRZA_eQpomuxXb1KQ9ePMdfEOfxGhFbx6GGWa-7xv4IXRK8DnBmF_EAgsuc0xSYUiTOEAzSqTMGWfi8HcuH4_RIsamwkAoAyDFDG2W4-BbH_p9E9uYeZfdBd8FX3-8vT9YW2W7oPv992HjQ7SZGzszNL5Lqy4zvu21GbI4BqeNjSfoyOnnaBc_fY62V5fb1U2-vr--XS3XuQEih5zV4CyhACClISXwUgrutMBgHTaMMV4VJauwEBIKzYFUwvKK2rqUui4pzNHZFNsH_zLaOKgnP4YufVQUmJRElKRIKjqpTPAxButUH5pWh1dFsPoCpyZwKoFT3-CUSCaYTDGJu50Nf9H_uD4Bj6hxRg</recordid><startdate>20200301</startdate><enddate>20200301</enddate><creator>Kravchenko, Anna</creator><creator>Maksymenko, Sergiy</creator><general>Springer International Publishing</general><general>Springer Nature B.V</general><scope>AAYXX</scope><scope>CITATION</scope><orcidid>https://orcid.org/0000-0002-0062-5188</orcidid></search><sort><creationdate>20200301</creationdate><title>Automorphisms of Kronrod–Reeb graphs of Morse functions on compact surfaces</title><author>Kravchenko, Anna ; Maksymenko, Sergiy</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2020</creationdate><topic>Algebraic Geometry</topic><topic>Automorphisms</topic><topic>Critical point</topic><topic>Isomorphism</topic><topic>Mathematics</topic><topic>Mathematics and Statistics</topic><topic>Research Article</topic><topic>Subgroups</topic><topic>Toruses</topic><toplevel>online_resources</toplevel><creatorcontrib>Kravchenko, Anna</creatorcontrib><creatorcontrib>Maksymenko, Sergiy</creatorcontrib><collection>CrossRef</collection><jtitle>European journal of mathematics</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Kravchenko, Anna</au><au>Maksymenko, Sergiy</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Automorphisms of Kronrod–Reeb graphs of Morse functions on compact surfaces</atitle><jtitle>European journal of mathematics</jtitle><stitle>European Journal of Mathematics</stitle><date>2020-03-01</date><risdate>2020</risdate><volume>6</volume><issue>1</issue><spage>114</spage><epage>131</epage><pages>114-131</pages><issn>2199-675X</issn><eissn>2199-6768</eissn><abstract>Let
M
be a connected orientable compact surface,
f
:
M
→
R
be a Morse function, and
be the group of diffeomorphisms of
M
isotopic to the identity. Denote by
the subgroup of
consisting of diffeomorphisms “preserving”
f
, i.e., the stabilizer of
f
with respect to the right action of
on the space
of smooth functions on
M
. Let also
G
(
f
)
be the group of automorphisms of the Kronrod–Reeb graph of
f
induced by diffeomorphisms belonging to
. This group is an important ingredient in determining the homotopy type of the orbit of
f
with respect to the above action of
and it is trivial if
f
is “generic”, i.e., has at most one critical point at each level set
f
-
1
(
c
)
,
c
∈
R
. For the case when
M
is distinct from 2-sphere and 2-torus we present a precise description of the family
G
(
M
,
R
)
of isomorphism classes of groups
G
(
f
)
, where
f
runs over all Morse functions on
M
, and of its subfamily
G
smp
(
M
,
R
)
⊂
G
(
M
,
R
)
consisting of groups corresponding to simple Morse functions, i.e., functions having at most one critical point at each connected component of each level set. In fact,
G
(
M
,
R
)
(respectively,
G
smp
(
M
,
R
)
) coincides with the minimal family of isomorphism classes of groups containing the trivial group and closed with respect to direct products and also with respect to wreath products “from the top” with arbitrary finite cyclic groups (respectively, with the group
Z
2
only).</abstract><cop>Cham</cop><pub>Springer International Publishing</pub><doi>10.1007/s40879-019-00379-8</doi><tpages>18</tpages><orcidid>https://orcid.org/0000-0002-0062-5188</orcidid></addata></record> |
| fulltext | fulltext |
| identifier | ISSN: 2199-675X |
| ispartof | European journal of mathematics, 2020-03, Vol.6 (1), p.114-131 |
| issn | 2199-675X 2199-6768 |
| language | eng |
| recordid | cdi_proquest_journals_2369918514 |
| source | Springer Nature |
| subjects | Algebraic Geometry Automorphisms Critical point Isomorphism Mathematics Mathematics and Statistics Research Article Subgroups Toruses |
| title | Automorphisms of Kronrod–Reeb graphs of Morse functions on compact surfaces |
| url | http://sfxeu10.hosted.exlibrisgroup.com/loughborough?ctx_ver=Z39.88-2004&ctx_enc=info:ofi/enc:UTF-8&ctx_tim=2025-01-01T05%3A19%3A41IST&url_ver=Z39.88-2004&url_ctx_fmt=infofi/fmt:kev:mtx:ctx&rfr_id=info:sid/primo.exlibrisgroup.com:primo3-Article-proquest_cross&rft_val_fmt=info:ofi/fmt:kev:mtx:journal&rft.genre=article&rft.atitle=Automorphisms%20of%20Kronrod%E2%80%93Reeb%20graphs%20of%20Morse%20functions%20on%20compact%20surfaces&rft.jtitle=European%20journal%20of%20mathematics&rft.au=Kravchenko,%20Anna&rft.date=2020-03-01&rft.volume=6&rft.issue=1&rft.spage=114&rft.epage=131&rft.pages=114-131&rft.issn=2199-675X&rft.eissn=2199-6768&rft_id=info:doi/10.1007/s40879-019-00379-8&rft_dat=%3Cproquest_cross%3E2369918514%3C/proquest_cross%3E%3Cgrp_id%3Ecdi_FETCH-LOGICAL-c319t-6d3fe1233399c15375987fa803ef0c6667b456b088934a731b8e7b2ed59ad523%3C/grp_id%3E%3Coa%3E%3C/oa%3E%3Curl%3E%3C/url%3E&rft_id=info:oai/&rft_pqid=2369918514&rft_id=info:pmid/&rfr_iscdi=true |