Let a, b, r be nonnegative integers with 1 ≤ a ≤ b and r ≥ 2. Let G be a graph of order n with n 〉(a+2 b)(r(a+b)-2)/b.In this paper, we prove that G is fractional ID-[a, b]-factor-critical if δ(G)≥bn/a...Let a, b, r be nonnegative integers with 1 ≤ a ≤ b and r ≥ 2. Let G be a graph of order n with n 〉(a+2 b)(r(a+b)-2)/b.In this paper, we prove that G is fractional ID-[a, b]-factor-critical if δ(G)≥bn/a+2 b+a(r-1)and |NG(x1) ∪ NG(x2) ∪…∪ NG(xr)| ≥(a+b)n/(a+2 b) for any independent subset {x1,x2,…,xr} in G. It is a generalization of Zhou et al.'s previous result [Discussiones Mathematicae Graph Theory, 36: 409-418(2016)]in which r = 2 is discussed. Furthermore, we show that this result is best possible in some sense.展开更多
Let G be a graph and k≥2 a positive integer. Let h : E(G)→[0, 1] be a function. If e∑eЭxh(e) = k holds for each x∈V(G), then we call G[Fh ] a fractional k-factor of G with indicator function h where Fh ={e...Let G be a graph and k≥2 a positive integer. Let h : E(G)→[0, 1] be a function. If e∑eЭxh(e) = k holds for each x∈V(G), then we call G[Fh ] a fractional k-factor of G with indicator function h where Fh ={e∈E(G) : h(e) 〉 0}. A graph G is fractional independent-set-deletable k-factor-critical(in short, fractional ID-k-factor-critical), if G-I has a fractional k-factor for every independent set I of G. In this paper, we prove that if n≥9 k-14 and for any subset X?V(G) we have NG(X) = V(G) if |X| ≥ kn/(3k-1); or |NG(X)3 k-1/k| ≥|X|if|X|〈 kn/(3k-1),then G is fractional ID-k-factor-critical.展开更多
Let G be a graph, and k a positive integer. A graph G is fractional independent-set-deletable k-factor-critical(in short, fractional ID-k-factor-critical) if G-I has a fractional k-factor for every independent set I o...Let G be a graph, and k a positive integer. A graph G is fractional independent-set-deletable k-factor-critical(in short, fractional ID-k-factor-critical) if G-I has a fractional k-factor for every independent set I of G. In this paper, we present a sufficient condition for a graph to be fractional ID-k-factor-critical,depending on the minimum degree and the neighborhoods of independent sets. Furthermore, it is shown that this result in this paper is best possible in some sense.展开更多
This work investigates synchronization of two fractional unified hyperchaotic systems via impulsive control.The stable theory about impulsive fractional equation is studied based on the stable theory about fractional ...This work investigates synchronization of two fractional unified hyperchaotic systems via impulsive control.The stable theory about impulsive fractional equation is studied based on the stable theory about fractional linear system.Then according to the theorem proposed the sufficient condition on feedback strength and impulsive interval are established to guarantee the synchronization.Numerical simulations show the effectiveness of the theorem.展开更多
LetG be a graph,and k≥2 be a positive integer.A graph G is fractional independentset-deletable k-factor-critical(in short,fractional ID-k-factor-critical),if G I has a fractional k-factor for every independent set ...LetG be a graph,and k≥2 be a positive integer.A graph G is fractional independentset-deletable k-factor-critical(in short,fractional ID-k-factor-critical),if G I has a fractional k-factor for every independent set I of G.The binding number bind(G)of a graph G is defined as bind(G)=min|NG(X)||X|:=X V(G),NG(X)=V(G).In this paper,it is proved that a graph G is fractional ID-k-factor-critical if n≥6k 9 and bind(G)〉(3k 1)(n 1)kn 2k+2.展开更多
基金supported by the National Natural Science Foundation of China(Nos.11371052,11731002)the Fundamental Research Funds for the Central Universities(Nos.2016JBM071,2016JBZ012)the 111 Project of China(B16002)
文摘Let a, b, r be nonnegative integers with 1 ≤ a ≤ b and r ≥ 2. Let G be a graph of order n with n 〉(a+2 b)(r(a+b)-2)/b.In this paper, we prove that G is fractional ID-[a, b]-factor-critical if δ(G)≥bn/a+2 b+a(r-1)and |NG(x1) ∪ NG(x2) ∪…∪ NG(xr)| ≥(a+b)n/(a+2 b) for any independent subset {x1,x2,…,xr} in G. It is a generalization of Zhou et al.'s previous result [Discussiones Mathematicae Graph Theory, 36: 409-418(2016)]in which r = 2 is discussed. Furthermore, we show that this result is best possible in some sense.
基金sponsored by the National Natural Science Foundation of China(Grant No.11371009,11501256,61503160)the National Social Science Foundation of China(Grant No.11BGL039)+1 种基金Six Big Talent Peak of Jiangsu Province(Grant No.JY–022)333 Project of Jiangsu Province
文摘Let G be a graph and k≥2 a positive integer. Let h : E(G)→[0, 1] be a function. If e∑eЭxh(e) = k holds for each x∈V(G), then we call G[Fh ] a fractional k-factor of G with indicator function h where Fh ={e∈E(G) : h(e) 〉 0}. A graph G is fractional independent-set-deletable k-factor-critical(in short, fractional ID-k-factor-critical), if G-I has a fractional k-factor for every independent set I of G. In this paper, we prove that if n≥9 k-14 and for any subset X?V(G) we have NG(X) = V(G) if |X| ≥ kn/(3k-1); or |NG(X)3 k-1/k| ≥|X|if|X|〈 kn/(3k-1),then G is fractional ID-k-factor-critical.
基金supported by the National Natural Science Foundation of China(Grant No.11371009,11501256,61503160)Six Big Talent Peak of Jiangsu Province(Grant No.JY–022)+3 种基金333 Project of Jiangsu Provincethe National Social Science Foundation of China(Grant No.14AGL001)the Natural Science Foundation of Xinjiang Province of China(Grant No.2015211A003)the Natural Science Foundation of the Higher Education Institutions of Jiangsu Province(Grant No.14KJD110002)
文摘Let G be a graph, and k a positive integer. A graph G is fractional independent-set-deletable k-factor-critical(in short, fractional ID-k-factor-critical) if G-I has a fractional k-factor for every independent set I of G. In this paper, we present a sufficient condition for a graph to be fractional ID-k-factor-critical,depending on the minimum degree and the neighborhoods of independent sets. Furthermore, it is shown that this result in this paper is best possible in some sense.
基金Key Creative Project of Shanghai Education Community,China(No.13ZZ050)Key Basic Research Project of Shanghai,China(No.12JC1400400)
文摘This work investigates synchronization of two fractional unified hyperchaotic systems via impulsive control.The stable theory about impulsive fractional equation is studied based on the stable theory about fractional linear system.Then according to the theorem proposed the sufficient condition on feedback strength and impulsive interval are established to guarantee the synchronization.Numerical simulations show the effectiveness of the theorem.
基金Supported by Natural Science Foundation of the Higher Education Institutions of Jiangsu Province(Grant No.10KJB110003)Jiangsu University of Science and Technology(Grant No.2010SL101J)+1 种基金National Natural Science Foundation of China(Grant No.71271119)National Social Science Foundation of China(Grant No.11BGL039)
文摘LetG be a graph,and k≥2 be a positive integer.A graph G is fractional independentset-deletable k-factor-critical(in short,fractional ID-k-factor-critical),if G I has a fractional k-factor for every independent set I of G.The binding number bind(G)of a graph G is defined as bind(G)=min|NG(X)||X|:=X V(G),NG(X)=V(G).In this paper,it is proved that a graph G is fractional ID-k-factor-critical if n≥6k 9 and bind(G)〉(3k 1)(n 1)kn 2k+2.
