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On generalized spread bent partitions
Generalized semifield spreads are partitions Γ = { U , A 1 , … , A p k } of F p m × F p m obtained from (pre)semifields with a certain additional property, which generalize semifield spreads. In particular, a generalized semifield spread is a bent partition, i.e., every function f : F p m × F p m →...
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| Published in: | Cryptography and communications 2023-12, Vol.15 (6), p.1217-1234 |
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| cites | cdi_FETCH-LOGICAL-c319t-5654bf4209a498f6d45e0df956783949b7dc796bea04019cfc52f6ca4d18cb7f3 |
| container_end_page | 1234 |
| container_issue | 6 |
| container_start_page | 1217 |
| container_title | Cryptography and communications |
| container_volume | 15 |
| creator | Anbar, Nurdagül Kalaycı, Tekgül Meidl, Wilfried |
| description | Generalized semifield spreads are partitions
Γ
=
{
U
,
A
1
,
…
,
A
p
k
}
of
F
p
m
×
F
p
m
obtained from (pre)semifields with a certain additional property, which generalize semifield spreads. In particular, a generalized semifield spread is a bent partition, i.e., every function
f
:
F
p
m
×
F
p
m
→
F
p
, which is constant on every set of
Γ
, such that every
c
∈
F
p
has the same number
p
k
-
1
of
A
i
in the preimage set, is a bent function. We show that from generalized semifield spreads one obtains not only
p
-ary and vectorial bent functions, but also bent functions
f
:
F
p
m
×
F
p
m
→
B
for any abelian group of order
p
s
,
s
≤
k
. We investigate the effect of (pre)semifield isotopisms on generalized semifield spreads. We observe that isotopisms can destroy the bent partition property, and derive conditions on an isotopism between two (pre)semifields such that the corresponding partitions are equivalent bent partitions. Most notably, we show that with some other class of isotopisms, one can obtain inequivalent bent partitions, hence different classes of bent functions. This is in contrast to the situation for classical semifield spreads. The spreads of two isotopic (pre)semifields are always equivalent. Employing the 2-rank of Boolean functions we confirm that generalizations of the Desarguesian spread bent functions, which we call generalized PS
ap
functions, are in general not in the Maiorana-McFarland class. The generalized PS
ap
class contains functions which are not Maiorana-McFarland nor partial spread bent functions for any partial spread. Explicitly we determine the 2-rank of some Maiorana-McFarland functions in the generalized PS
ap
class in terms of Fibonacci numbers. |
| doi_str_mv | 10.1007/s12095-023-00670-2 |
| format | article |
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Γ
=
{
U
,
A
1
,
…
,
A
p
k
}
of
F
p
m
×
F
p
m
obtained from (pre)semifields with a certain additional property, which generalize semifield spreads. In particular, a generalized semifield spread is a bent partition, i.e., every function
f
:
F
p
m
×
F
p
m
→
F
p
, which is constant on every set of
Γ
, such that every
c
∈
F
p
has the same number
p
k
-
1
of
A
i
in the preimage set, is a bent function. We show that from generalized semifield spreads one obtains not only
p
-ary and vectorial bent functions, but also bent functions
f
:
F
p
m
×
F
p
m
→
B
for any abelian group of order
p
s
,
s
≤
k
. We investigate the effect of (pre)semifield isotopisms on generalized semifield spreads. We observe that isotopisms can destroy the bent partition property, and derive conditions on an isotopism between two (pre)semifields such that the corresponding partitions are equivalent bent partitions. Most notably, we show that with some other class of isotopisms, one can obtain inequivalent bent partitions, hence different classes of bent functions. This is in contrast to the situation for classical semifield spreads. The spreads of two isotopic (pre)semifields are always equivalent. Employing the 2-rank of Boolean functions we confirm that generalizations of the Desarguesian spread bent functions, which we call generalized PS
ap
functions, are in general not in the Maiorana-McFarland class. The generalized PS
ap
class contains functions which are not Maiorana-McFarland nor partial spread bent functions for any partial spread. Explicitly we determine the 2-rank of some Maiorana-McFarland functions in the generalized PS
ap
class in terms of Fibonacci numbers.</description><identifier>ISSN: 1936-2447</identifier><identifier>EISSN: 1936-2455</identifier><identifier>DOI: 10.1007/s12095-023-00670-2</identifier><language>eng</language><publisher>New York: Springer US</publisher><subject>Boolean functions ; Boolean Functions and Their Applications VII ; Circuits ; Coding and Information Theory ; Communications Engineering ; Computer Science ; Data Structures and Information Theory ; Equivalence ; Fibonacci numbers ; Group theory ; Information and Communication ; Mathematics of Computing ; Networks</subject><ispartof>Cryptography and communications, 2023-12, Vol.15 (6), p.1217-1234</ispartof><rights>The Author(s), under exclusive licence to Springer Science+Business Media, LLC, part of Springer Nature 2023. Springer Nature or its licensor (e.g. a society or other partner) holds exclusive rights to this article under a publishing agreement with the author(s) or other rightsholder(s); author self-archiving of the accepted manuscript version of this article is solely governed by the terms of such publishing agreement and applicable law.</rights><lds50>peer_reviewed</lds50><woscitedreferencessubscribed>false</woscitedreferencessubscribed><citedby>FETCH-LOGICAL-c319t-5654bf4209a498f6d45e0df956783949b7dc796bea04019cfc52f6ca4d18cb7f3</citedby><cites>FETCH-LOGICAL-c319t-5654bf4209a498f6d45e0df956783949b7dc796bea04019cfc52f6ca4d18cb7f3</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>314,776,780,27901,27902</link.rule.ids></links><search><creatorcontrib>Anbar, Nurdagül</creatorcontrib><creatorcontrib>Kalaycı, Tekgül</creatorcontrib><creatorcontrib>Meidl, Wilfried</creatorcontrib><title>On generalized spread bent partitions</title><title>Cryptography and communications</title><addtitle>Cryptogr. Commun</addtitle><description>Generalized semifield spreads are partitions
Γ
=
{
U
,
A
1
,
…
,
A
p
k
}
of
F
p
m
×
F
p
m
obtained from (pre)semifields with a certain additional property, which generalize semifield spreads. In particular, a generalized semifield spread is a bent partition, i.e., every function
f
:
F
p
m
×
F
p
m
→
F
p
, which is constant on every set of
Γ
, such that every
c
∈
F
p
has the same number
p
k
-
1
of
A
i
in the preimage set, is a bent function. We show that from generalized semifield spreads one obtains not only
p
-ary and vectorial bent functions, but also bent functions
f
:
F
p
m
×
F
p
m
→
B
for any abelian group of order
p
s
,
s
≤
k
. We investigate the effect of (pre)semifield isotopisms on generalized semifield spreads. We observe that isotopisms can destroy the bent partition property, and derive conditions on an isotopism between two (pre)semifields such that the corresponding partitions are equivalent bent partitions. Most notably, we show that with some other class of isotopisms, one can obtain inequivalent bent partitions, hence different classes of bent functions. This is in contrast to the situation for classical semifield spreads. The spreads of two isotopic (pre)semifields are always equivalent. Employing the 2-rank of Boolean functions we confirm that generalizations of the Desarguesian spread bent functions, which we call generalized PS
ap
functions, are in general not in the Maiorana-McFarland class. The generalized PS
ap
class contains functions which are not Maiorana-McFarland nor partial spread bent functions for any partial spread. Explicitly we determine the 2-rank of some Maiorana-McFarland functions in the generalized PS
ap
class in terms of Fibonacci numbers.</description><subject>Boolean functions</subject><subject>Boolean Functions and Their Applications VII</subject><subject>Circuits</subject><subject>Coding and Information Theory</subject><subject>Communications Engineering</subject><subject>Computer Science</subject><subject>Data Structures and Information Theory</subject><subject>Equivalence</subject><subject>Fibonacci numbers</subject><subject>Group theory</subject><subject>Information and Communication</subject><subject>Mathematics of Computing</subject><subject>Networks</subject><issn>1936-2447</issn><issn>1936-2455</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2023</creationdate><recordtype>article</recordtype><recordid>eNp9kDlPxDAQhS0EEsvxB6giIUrD-I5LtOKSVtoGasvxscpqcYKdLeDXYwiCjmqmeO_NvA-hCwLXBEDdFEJBCwyUYQCpANMDtCCaSUy5EIe_O1fH6KSUbRUJytkCXa1TswkpZLvrP4JvypiD9U0X0tSMNk_91A-pnKGjaHclnP_MU_Ryf_e8fMSr9cPT8naFHSN6wkIK3kVeX7Fct1F6LgL4qIVULdNcd8o7pWUXLHAg2kUnaJTOck9a16nITtHlnDvm4W0fymS2wz6netLQthWacMpJVdFZ5fJQSg7RjLl_tfndEDBfOMyMw1Qc5huHodXEZlNt2KdNyH_R_7g-AcuZYRU</recordid><startdate>20231201</startdate><enddate>20231201</enddate><creator>Anbar, Nurdagül</creator><creator>Kalaycı, Tekgül</creator><creator>Meidl, Wilfried</creator><general>Springer US</general><general>Springer Nature B.V</general><scope>AAYXX</scope><scope>CITATION</scope></search><sort><creationdate>20231201</creationdate><title>On generalized spread bent partitions</title><author>Anbar, Nurdagül ; Kalaycı, Tekgül ; Meidl, Wilfried</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c319t-5654bf4209a498f6d45e0df956783949b7dc796bea04019cfc52f6ca4d18cb7f3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2023</creationdate><topic>Boolean functions</topic><topic>Boolean Functions and Their Applications VII</topic><topic>Circuits</topic><topic>Coding and Information Theory</topic><topic>Communications Engineering</topic><topic>Computer Science</topic><topic>Data Structures and Information Theory</topic><topic>Equivalence</topic><topic>Fibonacci numbers</topic><topic>Group theory</topic><topic>Information and Communication</topic><topic>Mathematics of Computing</topic><topic>Networks</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Anbar, Nurdagül</creatorcontrib><creatorcontrib>Kalaycı, Tekgül</creatorcontrib><creatorcontrib>Meidl, Wilfried</creatorcontrib><collection>CrossRef</collection><jtitle>Cryptography and communications</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Anbar, Nurdagül</au><au>Kalaycı, Tekgül</au><au>Meidl, Wilfried</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>On generalized spread bent partitions</atitle><jtitle>Cryptography and communications</jtitle><stitle>Cryptogr. Commun</stitle><date>2023-12-01</date><risdate>2023</risdate><volume>15</volume><issue>6</issue><spage>1217</spage><epage>1234</epage><pages>1217-1234</pages><issn>1936-2447</issn><eissn>1936-2455</eissn><abstract>Generalized semifield spreads are partitions
Γ
=
{
U
,
A
1
,
…
,
A
p
k
}
of
F
p
m
×
F
p
m
obtained from (pre)semifields with a certain additional property, which generalize semifield spreads. In particular, a generalized semifield spread is a bent partition, i.e., every function
f
:
F
p
m
×
F
p
m
→
F
p
, which is constant on every set of
Γ
, such that every
c
∈
F
p
has the same number
p
k
-
1
of
A
i
in the preimage set, is a bent function. We show that from generalized semifield spreads one obtains not only
p
-ary and vectorial bent functions, but also bent functions
f
:
F
p
m
×
F
p
m
→
B
for any abelian group of order
p
s
,
s
≤
k
. We investigate the effect of (pre)semifield isotopisms on generalized semifield spreads. We observe that isotopisms can destroy the bent partition property, and derive conditions on an isotopism between two (pre)semifields such that the corresponding partitions are equivalent bent partitions. Most notably, we show that with some other class of isotopisms, one can obtain inequivalent bent partitions, hence different classes of bent functions. This is in contrast to the situation for classical semifield spreads. The spreads of two isotopic (pre)semifields are always equivalent. Employing the 2-rank of Boolean functions we confirm that generalizations of the Desarguesian spread bent functions, which we call generalized PS
ap
functions, are in general not in the Maiorana-McFarland class. The generalized PS
ap
class contains functions which are not Maiorana-McFarland nor partial spread bent functions for any partial spread. Explicitly we determine the 2-rank of some Maiorana-McFarland functions in the generalized PS
ap
class in terms of Fibonacci numbers.</abstract><cop>New York</cop><pub>Springer US</pub><doi>10.1007/s12095-023-00670-2</doi><tpages>18</tpages></addata></record> |
| fulltext | fulltext |
| identifier | ISSN: 1936-2447 |
| ispartof | Cryptography and communications, 2023-12, Vol.15 (6), p.1217-1234 |
| issn | 1936-2447 1936-2455 |
| language | eng |
| recordid | cdi_proquest_journals_2885914241 |
| source | Springer Nature:Jisc Collections:Springer Nature Read and Publish 2023-2025: Springer Reading List |
| subjects | Boolean functions Boolean Functions and Their Applications VII Circuits Coding and Information Theory Communications Engineering Computer Science Data Structures and Information Theory Equivalence Fibonacci numbers Group theory Information and Communication Mathematics of Computing Networks |
| title | On generalized spread bent partitions |
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