On the inducibility of cycles

Dan Hefetz; Mykhaylo Tyomkyn

doi:10.1016/j.jctb.2018.04.008

On the inducibility of cycles

Dan Hefetz, Mykhaylo Tyomkyn

אוניברסיטת אריאל

פרסום מחקרי: פרסום בכתב עת › מאמר › ביקורת עמיתים

11 ציטוטים ‏(Scopus)

תקציר

In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)^k induced k-cycles. This bound is larger by a multiplicative factor of 2e than the simple lower bound obtained by a blow-up construction. Pippenger and Golumbic conjectured that the latter lower bound is essentially tight. In the present paper we establish a better upper bound of (128e/81)⋅(n/k)^k. This constitutes the first progress towards proving the aforementioned conjecture since it was posed.

שפה מקורית	אנגלית
עמודים (מ-עד)	243-258
מספר עמודים	16
כתב עת	Journal of Combinatorial Theory. Series B
כרך	133
מזהי עצם דיגיטלי (DOIs)	https://doi.org/10.1016/j.jctb.2018.04.008
סטטוס פרסום	פורסם - נוב׳ 2018

גישה למסמך

10.1016/j.jctb.2018.04.008

קבצים וקישורים אחרים

Link to publication in Scopus

פורמט ציטוט ביבליוגרפי

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title = "On the inducibility of cycles",

abstract = "In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k-cycles. This bound is larger by a multiplicative factor of 2e than the simple lower bound obtained by a blow-up construction. Pippenger and Golumbic conjectured that the latter lower bound is essentially tight. In the present paper we establish a better upper bound of (128e/81)⋅(n/k)k. This constitutes the first progress towards proving the aforementioned conjecture since it was posed.",

keywords = "Cycles, Enumeration, Inducibility, Large graphs",

author = "Dan Hefetz and Mykhaylo Tyomkyn",

note = "Publisher Copyright: {\textcopyright} 2018 Elsevier Inc.",

year = "2018",

month = nov,

doi = "10.1016/j.jctb.2018.04.008",

language = "אנגלית",

volume = "133",

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journal = "Journal of Combinatorial Theory. Series B",

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T1 - On the inducibility of cycles

AU - Hefetz, Dan

AU - Tyomkyn, Mykhaylo

PY - 2018/11

Y1 - 2018/11

N2 - In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k-cycles. This bound is larger by a multiplicative factor of 2e than the simple lower bound obtained by a blow-up construction. Pippenger and Golumbic conjectured that the latter lower bound is essentially tight. In the present paper we establish a better upper bound of (128e/81)⋅(n/k)k. This constitutes the first progress towards proving the aforementioned conjecture since it was posed.

AB - In 1975 Pippenger and Golumbic proved that any graph on n vertices admits at most 2e(n/k)k induced k-cycles. This bound is larger by a multiplicative factor of 2e than the simple lower bound obtained by a blow-up construction. Pippenger and Golumbic conjectured that the latter lower bound is essentially tight. In the present paper we establish a better upper bound of (128e/81)⋅(n/k)k. This constitutes the first progress towards proving the aforementioned conjecture since it was posed.

KW - Cycles

KW - Enumeration

KW - Inducibility

KW - Large graphs

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AN - SCOPUS:85046831025

SN - 0095-8956

VL - 133

SP - 243

EP - 258

JO - Journal of Combinatorial Theory. Series B

JF - Journal of Combinatorial Theory. Series B

ER -

On the inducibility of cycles

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