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14 results on '"Liu, Xizhi"'

1. On the boundedness of degenerate hypergraphs

Author

Hou, Jianfeng, Hu, Caiyun, Li, Heng, Liu, Xizhi, Yang, Caihong, and Zhang, Yixiao

Subjects
Mathematics - Combinatorics
Abstract

We investigate the impact of a high-degree vertex in Tur\'{a}n problems for degenerate hypergraphs (including graphs). We say an $r$-graph $F$ is bounded if there exist constants $\alpha, \beta>0$ such that for large $n$, every $n$-vertex $F$-free $r$-graph with a vertex of degree at least $\alpha \binom{n-1}{r-1}$ has fewer than $(1-\beta) \cdot \mathrm{ex}(n,F)$ edges. The boundedness property is crucial for recent works~\cite{HHLLYZ23a,DHLY24} that aim to extend the classical Hajnal--Szemer\'{e}di Theorem and the anti-Ramsey theorems of Erd\H{o}s--Simonovits--S\'{o}s. We show that many well-studied degenerate hypergraphs, such as all even cycles, most complete bipartite graphs, and the expansion of most complete bipartite graphs, are bounded. In addition, to prove the boundedness of the expansion of complete bipartite graphs, we introduce and solve a Zarankiewicz-type problem for $3$-graphs, strengthening a theorem by Kostochka--Mubayi--Verstra\"{e}te~\cite{KMV15}., Comment: comments are welcome

Published
2024

2. Nondegenerate Tur\'{a}n problems under $(t,p)$-norms

Author

Chen, Wanfang, Iľkovič, Daniel, León, Jared, Liu, Xizhi, and Pikhurko, Oleg

Subjects
Mathematics - Combinatorics
Abstract

Given integers $r > t \ge 1$ and a real number $p > 0$, the $(t,p)$-norm $\left\lVert \mathcal{H} \right\rVert_{t,p}$ of an $r$-graph $\mathcal{H}$ is the sum of the $p$-th power of the degrees $d_{\mathcal{H}}(T)$ over all $t$-subsets $T \subset V(\mathcal{H})$. We conduct a systematic study of the Tur\'{a}n-type problem of determining $\mathrm{ex}_{t,p}(n,\mathcal{F})$, which is the maximum of $\left\lVert \mathcal{H} \right\rVert_{t,p}$ over all $n$-vertex $\mathcal{F}$-free $r$-graphs $\mathcal{H}$. We establish several basic properties for the $(t,p)$-norm of $r$-graphs, enabling us to derive general theorems from the recently established framework in~\cite{CL24} that are useful for determining $\mathrm{ex}_{t,p}(n,\mathcal{F})$ and proving the corresponding stability. We determine the asymptotic value of $\mathrm{ex}_{t,p}(n,H_{F}^{r})$ for all feasible combinations of $(r,t,p)$ and for every graph $F$ with chromatic number greater than $r$, where $H_{F}^{r}$ represents the expansion of $F$. In the case where $F$ is edge-critical and $p \ge 1$, we establish strong stability and determine the exact value of $\mathrm{ex}_{t,p}(n,H_{F}^{r})$ for all sufficiently large $n$. These results extend the seminal theorems of Erd\H{o}s--Stone--Simonovits, Andr\'{a}sfai--Erd\H{o}s--S\'{o}s, Erd\H{o}s--Simonovits, and a classical theorem of Mubayi. For the $3$-uniform generalized triangle $F_5$, we determine the exact value of $\mathrm{ex}_{2,p}(n,F_5)$ for all $p \ge 1$ and its asymptotic value for all $p \in [1/2, 1]\cup \{k^{-1} \colon k \in 6\mathbb{N}^{+}+\{0,2\}\}$. This extends old theorems of Bollob\'{a}s, Frankl--F\"{u}redi, and a recent result of Balogh--Clemen--Lidick\'{y}. Our proofs utilize results on the graph inducibility problem, Steiner triple systems, and the feasible region problem introduced by Liu--Mubayi., Comment: comments are welcome

Published
2024

3. Tight bounds for rainbow partial $F$-tiling in edge-colored complete hypergraphs

Author

Deng, Jinghua, Hou, Jianfeng, Liu, Xizhi, and Yang, Caihong

Subjects
Mathematics - Combinatorics
Abstract

For an $r$-graph $F$ and integers $n,t$ satisfying $t \le n/v(F)$, let $\mathrm{ar}(n,tF)$ denote the minimum integer $N$ such that every edge-coloring of $K_{n}^{r}$ using $N$ colors contains a rainbow copy of $tF$, where $tF$ is the $r$-graphs consisting of $t$ vertex-disjoint copies of $F$. The case $t=1$ is the classical anti-Ramsey problem proposed by Erd\H{o}s--Simonovits--S\'{o}s~\cite{ESS75}. When $F$ is a single edge, this becomes the rainbow matching problem introduced by Schiermeyer~\cite{Sch04} and \"{O}zkahya--Young~\cite{OY13}. We conduct a systematic study of $\mathrm{ar}(n,tF)$ for the case where $t$ is much smaller than $\mathrm{ex}(n,F)/n^{r-1}$. Our first main result provides a reduction of $\mathrm{ar}(n,tF)$ to $\mathrm{ar}(n,2F)$ when $F$ is bounded and smooth, two properties satisfied by most previously studied hypergraphs. Complementing the first result, the second main result, which utilizes gaps between Tur\'{a}n numbers, determines $\mathrm{ar}(n,tF)$ for relatively smaller $t$. Together, these two results determine $\mathrm{ar}(n,tF)$ for a large class of hypergraphs. Additionally, the latter result has the advantage of being applicable to hypergraphs with unknown Tur\'{a}n densities, such as the famous tetrahedron $K_{4}^{3}$., Comment: 19 pages, 1 figues, comments are welcome

Published
2024

4. Strong stability from vertex-extendability and applications in generalized Tur\'{a}n problems

Author

Chen, Wanfang and Liu, Xizhi

Subjects
Mathematics - Combinatorics
Abstract

Extending the work of Liu--Mubayi--Reiher~\cite{LMR23unif} on hypergraph Tur\'{a}n problems, we introduce the notion of vertex-extendability for general extremal problems on hypergraphs and develop an axiomatized framework for proving strong stability for extremal problems satisfying certain properties. This framework simplifies the typically complex and tedious process of obtaining stability and exact results for extremal problems into a much simpler task of verifying their vertex-extendability. We present several applications of this method in generalized Tur\'{a}n problems including the Erd\H{o}s Pentagon Problem, hypergraph Tur\'{a}n-goodness, and generalized Tur\'{a}n problems of hypergraphs whose shadow is complete multipartite. These results significantly strengthen and extend previous results of Erd\H{o}s~\cite{Erdos62}, Gy\H{o}ri--J\'{a}nos--Simonovits~\cite{GPS91}, Grzesik~\cite{Gre12}, Hatami--Hladk\'{y}--Kr\'{a}\v{l}--Norine--Razborov~\cite{HHKNR13}, Morrison--Nir--Norin--Rz\k{a}\.{z}ewski--Wesolek~\cite{MNNRPW23}, Gerbner--Palmer~\cite{GP22}, and others., Comment: comments are welcome

Published
2024

5. A generalized Tur\'{a}n extension of the Deza--Erd\H{o}s--Frankl Theorem

Author

Helliar, Charlotte and Liu, Xizhi

Subjects
Mathematics - Combinatorics
Abstract

For an integer $r \ge 3$ and a subset $L \subset [0,r-1]$, a graph $G$ is $(K_{r}, L)$-intersecting if the number of vertices in the intersection of every pair of $K_r$ in $G$ belongs to $L$. We study the maximum number of $K_r$ in an $n$-vertex $(K_{r}, L)$-intersecting graphs. The celebrated Ruzsa--Szemer\'{e}di Theorem corresponds to the case $r=3$ and $L = \{0,1\}$. For general $L$ with $2 \le |L| \le r-1$, we establish the upper bound $\left(1-\frac{1}{3r}\right) \prod_{\ell \in L}\frac{n-\ell}{r- \ell}$ for large $n$, which improves the bound provided by the celebrated Deza--Erd\H{o}s--Frankl Theorem by a factor of $1-\frac{1}{3r}$. In the special case where $L = \{t, t+1, \ldots, r-1\}$, we derive the tight upper bound for large $n$ and establish a corresponding stability result. This is an extension of the seminal Erd\H{o}s--Ko--Rado Theorem on $t$-intersecting systems to the generalized Tur\'{a}n setting. Our proof for the Deza--Erd\H{o}s--Frankl part involves an interesting combination of the $\Delta$-system method and Tur\'{a}n's theorem. Meanwhile, for the Erd\H{o}s--Ko--Rado part, we employ the stability method, which relies on a theorem of Frankl regarding $t$-intersecting systems., Comment: University of Warwick MMath student R-project

Published
2024

6. A criterion for Andr\'{a}sfai--Erd\H{o}s--S\'{o}s type theorems and applications

Author

Hou, Jianfeng, Liu, Xizhi, and Zhao, Hongbin

Subjects
Mathematics - Combinatorics, Computer Science - Computational Complexity
Abstract

The classical Andr\'{a}sfai--Erd\H{o}s--S\'{o}s Theorem states that for $\ell\ge 2$, every $n$-vertex $K_{\ell+1}$-free graph with minimum degree greater than $\frac{3\ell-4}{3\ell-1}n$ must be $\ell$-partite. We establish a simple criterion for $r$-graphs, $r \geq 2$, to exhibit an Andr\'{a}sfai--Erd\H{o}s--S\'{o}s type property, also known as degree-stability. This leads to a classification of most previously studied hypergraph families with this property. An immediate application of this result, combined with a general theorem by Keevash--Lenz--Mubayi, solves the spectral Tur\'{a}n problems for a large class of hypergraphs. For every $r$-graph $F$ with degree-stability, there is a simple algorithm to decide the $F$-freeness of an $n$-vertex $r$-graph with minimum degree greater than $(\pi(F) - \varepsilon_F)\binom{n}{r-1}$ in time $O(n^r)$, where $\varepsilon_F >0$ is a constant. In particular, for the complete graph $K_{\ell+1}$, we can take $\varepsilon_{K_{\ell+1}} = (3\ell^2-\ell)^{-1}$, and this bound is tight up to some multiplicative constant factor unless $\mathbf{W[1]} = \mathbf{FPT}$. Based on a result by Chen--Huang--Kanj--Xia, we further show that for every fixed $C > 0$, this problem cannot be solved in time $n^{o(\ell)}$ if we replace $\varepsilon_{K_{\ell+1}}$ with $(C\ell)^{-1}$ unless $\mathbf{ETH}$ fails. Furthermore, we apply the degree-stability of $K_{\ell+1}$ to decide the $K_{\ell+1}$-freeness of graphs whose size is close to the Tur\'{a}n bound in time $(\ell+1)n^2$, partially improving a recent result by Fomin--Golovach--Sagunov--Simonov. As an intermediate step, we show that for a specific class of $r$-graphs $F$, the (surjective) $F$-coloring problem can be solved in time $O(n^r)$, provided the input $r$-graph has $n$ vertices and a large minimum degree, refining several previous results., Comment: fixed some typos, changed the title, reorganized to enhance readability for combinatorial readers, comments are welcome

Published
2024

14. Exploration of Pharmacological Mechanisms of Dapagliflozin against Type 2 Diabetes Mellitus through PI3K-Akt Signaling Pathway based on Network Pharmacology Analysis and Deep Learning Technology.

Author

Wu J, Chen Y, Shi S, Liu J, Zhang F, Li X, Liu X, Hu G, and Dong Y

Abstract

Background: Dapagliflozin is commonly used to treat type 2 diabetes mellitus (T2DM). However, research into the specific anti-T2DM mechanisms of dapagliflozin remains scarce., Objective: This study aimed to explore the underlying mechanisms of dapagliflozin against T2DM., Methods: Dapagliflozin-associated targets were acquired from CTD, SwissTargetPrediction, and SuperPred. T2DM-associated targets were obtained from GeneCards and DigSee. VennDiagram was used to obtain the overlapping targets of dapagliflozin and T2DM. GO and KEGG analyses were performed using clusterProfiler. A PPI network was built by STRING database and Cytoscape, and the top 30 targets were screened using the degree, maximal clique centrality (MCC), and edge percolated component (EPC) algorithms of CytoHubba. The top 30 targets screened by the three algorithms were intersected with the core pathway-related targets to obtain the key targets. DeepPurpose was used to evaluate the binding affinity of dapagliflozin with the key targets., Results: In total, 155 overlapping targets of dapagliflozin and T2DM were obtained. GO and KEGG analyses revealed that the targets were primarily enriched in response to peptide, membrane microdomain, protein serine/threonine/tyrosine kinase activity, PI3K-Akt signaling pathway, MAPK signaling pathway, and AGE-RAGE signaling pathway in diabetic complications. AKT1, PIK3CA, NOS3, EGFR, MAPK1, MAPK3, HSP90AA1, MTOR, RELA, NFKB1, IKBKB, ITGB1, and TP53 were the key targets, mainly related to oxidative stress, endothelial function, and autophagy. Through the DeepPurpose algorithm, AKT1, HSP90AA1, RELA, ITGB1, and TP53 were identified as the top 5 anti-targets of dapagliflozin., Conclusion: Dapagliflozin might treat T2DM mainly by targeting AKT1, HSP90AA1, RELA, ITGB1, and TP53 through PI3K-Akt signaling., (Copyright© Bentham Science Publishers; For any queries, please email at epub@benthamscience.net.)

Published
2024
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