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51. A proof of Frankl's conjecture on cross-union families

Author

Cambie, Stijn, Kim, Jaehoon, Liu, Hong, and Tran, Tuan

Subjects
Mathematics - Combinatorics, 05D05
Abstract

The families $\mathcal F_0,\ldots,\mathcal F_s$ of $k$-element subsets of $[n]:=\{1,2,\ldots,n\}$ are called cross-union if there is no choice of $F_0\in \mathcal F_0, \ldots, F_s\in \mathcal F_s$ such that $F_0\cup\ldots\cup F_s=[n]$. A natural generalization of the celebrated Erd\H{o}s--Ko--Rado theorem, due to Frankl and Tokushige, states that for $n\le (s+1)k$ the geometric mean of $\lvert \mathcal F_i\rvert$ is at most $\binom{n-1}{k}$. Frankl conjectured that the same should hold for the arithmetic mean under some mild conditions. We prove Frankl's conjecture in a strong form by showing that the unique (up to isomorphism) maximizer for the arithmetic mean of cross-union families is the natural one $\mathcal F_0=\ldots=\mathcal F_s={[n-1]\choose k}$., Comment: 14 pages, 1 figure Accepted at Combinatorial Theory

Published
2022

52. Exponential decay of intersection volume with applications on list-decodability and Gilbert-Varshamov type bound

Author

Kim, Jaehoon, Liu, Hong, and Tran, Tuan

Subjects
Mathematics - Combinatorics, Computer Science - Information Theory, Mathematics - Metric Geometry, Mathematics - Probability
Abstract

We give some natural sufficient conditions for balls in a metric space to have small intersection. Roughly speaking, this happens when the metric space is (i) expanding and (ii) well-spread, and (iii) a certain random variable on the boundary of a ball has a small tail. As applications, we show that the volume of intersection of balls in Hamming, Johnson spaces and symmetric groups decay exponentially as their centers drift apart. To verify condition (iii), we prove some large deviation inequalities `on a slice' for functions with Lipschitz conditions. We then use these estimates on intersection volumes to $\bullet$ obtain a sharp lower bound on list-decodability of random $q$-ary codes, confirming a conjecture of Li and Wootters; and $\bullet$ improve the classical bound of Levenshtein from 1971 on constant weight codes by a factor linear in dimension, resolving a problem raised by Jiang and Vardy. Our probabilistic point of view also offers a unified framework to obtain improvements on other Gilbert--Varshamov type bounds, giving conceptually simple and calculation-free proofs for $q$-ary codes, permutation codes, and spherical codes. Another consequence is a counting result on the number of codes, showing ampleness of large codes., Comment: 25 pages

Published
2021

53. Ramsey numbers of cycles versus general graphs

Author

Haslegrave, John, Hyde, Joseph, Kim, Jaehoon, and Liu, Hong

Subjects
Mathematics - Combinatorics, 05C55 (Primary) 05C38, 05C48 (Secondary)
Abstract

The Ramsey number $R(F,H)$ is the minimum number $N$ such that any $N$-vertex graph either contains a copy of $F$ or its complement contains $H$. Burr in 1981 proved a pleasingly general result that for any graph $H$, provided $n$ is sufficiently large, a natural lower bound construction gives the correct Ramsey number involving cycles: $R(C_n,H)=(n-1)(\chi(H)-1)+\sigma(H)$, where $\sigma(H)$ is the minimum possible size of a colour class in a $\chi(H)$-colouring of $H$. Allen, Brightwell and Skokan conjectured that the same should be true already when $n\geq |H|\chi(H)$. We improve this 40-year-old result of Burr by giving quantitative bounds of the form $n\geq C|H|\log^4\chi(H)$, which is optimal up to the logarithmic factor. In particular, this proves a strengthening of the Allen-Brightwell-Skokan conjecture for all graphs $H$ with large chromatic number., Comment: 20 pages, 3 figures. Final version to appear in Forum of Mathematics, Sigma

Published
2021
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58. Bibliographic and Text Analysis of Research on Implementation of the Internet of Things to Support Education

Author

Desai, Roopa Ramesh and Kim, Jaehoon

Abstract

The Internet of Things (IoT) has pervaded practically all aspects of our lives. In this exploratory study, we survey its applications in the field of education. It is evident that technology in general, and, in particular IoT, has been increasingly altering the educational landscape. The goal of this paper is to review the academic literature on IoT applications in education to provide an understanding of the transformation that is underway. Using topic modeling and keyword co-occurrence analysis techniques, we identified five dominant clusters of research. Our findings demonstrate that IoT research in education has mainly focused on the technical aspects; however, the social aspects remain largely unexplored. In addition to providing an overview of IoT research on education, this paper offers suggestions for future research.

Published
2023

59. Embedding clique-factors in graphs with low $\ell$-independence number

Author

Chang, Fan, Han, Jie, Kim, Jaehoon, Wang, Guanghui, and Yang, Donglei

Subjects
Mathematics - Combinatorics
Abstract

The following question was proposed by Nenadov and Pehova and reiterated by Knierim and Su: Given integers $\ell,r$ and $n$ with $n\in r\mathbb{N}$, is it true that every $n$-vertex graph $G$ with $\delta(G) \ge \max \{ \frac{1}{2},\frac{r - \ell}{r} \}n + o(n)$ and $\alpha_{\ell}(G) = o(n) $ contains a $K_{r}$-factor? We give a negative answer for the case when $\ell\ge \frac{3r}{4}$ by giving a family of constructions using the so-called cover thresholds and show that the minimum degree condition given by our construction is asymptotically best possible. That is, for all integers $r,\ell$ with $r > \ell \ge \frac{3}{4}r$ and $\mu >0$, there exist $\alpha > 0$ and $N$ such that for every $n\in r\mathbb{N}$ with $n>N$, every $n$-vertex graph $G$ with $\delta(G) \ge \left( \frac{1}{2-\varrho_{\ell}(r-1)} + \mu \right)n $ and $\alpha_{\ell}(G) \le \alpha n$ contains a $K_{r}$-factor. Here $\varrho_{\ell}(r-1)$ is the Ramsey--Tur\'an density for $K_{r-1}$ under the $\ell$-independence number condition., Comment: 23 pages,2 figures

Published
2021

60. New lower bounds on kissing numbers and spherical codes in high dimensions

Author

Fernández, Irene Gil, Kim, Jaehoon, Liu, Hong, and Pikhurko, Oleg

Subjects
Mathematics - Combinatorics, 05B40, 52C17
Abstract

Let the kissing number $K(d)$ be the maximum number of non-overlapping unit balls in $\mathbb R^d$ that can touch a given unit ball. Determining or estimating the number $K(d)$ has a long history, with the value of $K(3)$ being the subject of a famous discussion between Gregory and Newton in 1694. We prove that, as the dimension $d$ goes to infinity, $$ K(d)\ge (1+o(1)){\frac{\sqrt{3\pi}}{4\sqrt2}}\,\log\frac{3}{2}\cdot d^{3/2}\cdot \Big(\frac{2}{\sqrt{3}}\Big)^{d}, $$ thus improving the previously best known bound of Jenssen, Joos and Perkins by a factor of $\log(3/2)/\log(9/8)+o(1)=3.442...$. Our proof is based on the novel approach from Jenssen, Joos and Perkins that uses the hard core sphere model of an appropriate fugacity. Similar constant-factor improvements in lower bounds are also obtained for general spherical codes, as well as for the expected density of random sphere packings in the Euclidean space $\mathbb R^d$., Comment: 20 pages

Published
2021

61. On 1-subdivisions of transitive tournaments

Author

Kim, Jaehoon, Lee, Hyunwoo, and Seo, Jaehyeon

Subjects
Mathematics - Combinatorics
Abstract

The oriented Ramsey number $\vec{r}(H)$ for an acyclic digraph $H$ is the minimum integer $n$ such that any $n$-vertex tournament contains a copy of $H$ as a subgraph. We prove that the $1$-subdivision of the $k$-vertex transitive tournament $H_k$ satisfies $\vec{r}(H_k)= O(k^2\log\log k)$. This is tight up to multiplicative $\log\log k$-term. We also show that if $T$ is an $n$-vertex tournament with $\Delta^+(T)-\delta^+(T)= O(n/k) - k^2$, then $T$ contains a $1$-subdivision of $\vec{K}_k$, a complete $k$-vertex digraph with all possible $k(k-1)$ arcs. This is also tight up to multiplicative constant.

Published
2021
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62. Hypergraph regularity and random sampling

Author

Joos, Felix, Kim, Jaehoon, Kühn, Daniela, and Osthus, Deryk

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

Suppose a $k$-uniform hypergraph $H$ that satisfies a certain regularity instance (that is, there is a partition of $H$ given by the hypergraph regularity lemma into a bounded number of quasirandom subhypergraphs of prescribed densities). We prove that with high probability a large enough uniform random sample of the vertex set of $H$ also admits the same regularity instance. Here the crucial feature is that the error term measuring the quasirandomness of the subhypergraphs requires only an arbitrarily small additive correction. This has applications to combinatorial property testing. The graph case of the sampling result was proved by Alon, Fischer, Newman and Shapira., Comment: 49 pages; we split our paper arXiv:1707.03303 into two, this one and the new version of arXiv:1707.03303. Final version, to appear in Random Structures and Algorithms

Published
2021

63. $2$-complexes with unique embeddings in 3-space

Author

Georgakopoulos, Agelos and Kim, Jaehoon

Subjects
Mathematics - Combinatorics, Mathematics - Geometric Topology
Abstract

A well-known theorem of Whitney states that a 3-connected planar graph admits an essentially unique embedding into the 2-sphere. We prove a 3-dimensional analogue: a simply-connected $2$-complex every link graph of which is 3-connected admits an essentially unique locally flat embedding into the 3-sphere, if it admits one at all. This can be thought of as a generalisation of the 3-dimensional Schoenflies theorem.

Published
2021

69. MLL-AF4 cooperates with PAF1 and FACT to drive high-density enhancer interactions in leukemia

Author

Crump, Nicholas T., Smith, Alastair L., Godfrey, Laura, Dopico-Fernandez, Ana M., Denny, Nicholas, Harman, Joe R., Hamley, Joseph C., Jackson, Nicole E., Chahrour, Catherine, Riva, Simone, Rice, Siobhan, Kim, Jaehoon, Basrur, Venkatesha, Fermin, Damian, Elenitoba-Johnson, Kojo, Roeder, Robert G., Allis, C. David, Roberts, Irene, Roy, Anindita, Geng, Huimin, Davies, James O. J., and Milne, Thomas A.

Published
2023
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70. Mitochondrial matrix protein LETMD1 maintains thermogenic capacity of brown adipose tissue in male mice

Author

Park, Anna, Kim, Kwang-eun, Park, Isaac, Lee, Sang Heon, Park, Kun-Young, Jung, Minkyo, Li, Xiaoxu, Sleiman, Maroun Bou, Lee, Su Jeong, Kim, Dae-Soo, Kim, Jaehoon, Lim, Dae-Sik, Woo, Eui-Jeon, Lee, Eun Woo, Han, Baek Soo, Oh, Kyoung-Jin, Lee, Sang Chul, Auwerx, Johan, Mun, Ji Young, Rhee, Hyun-Woo, Kim, Won Kon, Bae, Kwang-Hee, and Suh, Jae Myoung

Published
2023
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72. Well-mixing vertices and almost expanders

Author

Chakraborti, Debsoumya, Kim, Jaehoon, Kim, Jinha, Kim, Minki, and Liu, Hong

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

We study regular graphs in which the random walks starting from a positive fraction of vertices have small mixing time. We prove that any such graph is virtually an expander and has no small separator. This answers a question of Pak [SODA, 2002]. As a corollary, it shows that sparse (constant degree) regular graphs with many well-mixing vertices have a long cycle, improving a result of Pak. Furthermore, such cycle can be found in polynomial time. Secondly, we show that if the random walks from a positive fraction of vertices are well-mixing, then the random walks from almost all vertices are well-mixing (with a slightly worse mixing time)., Comment: accepted in PAMS

Published
2021
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73. Fractional Helly theorem for Cartesian products of convex sets

Author

Chakraborti, Debsoumya, Kim, Jaehoon, Kim, Jinha, Kim, Minki, and Liu, Hong

Subjects
Mathematics - Combinatorics, 05E45, 52A35
Abstract

Helly's theorem and its variants show that for a family of convex sets in Euclidean space, local intersection patterns influence global intersection patterns. A classical result of Eckhoff in 1988 provided an optimal fractional Helly theorem for axis-aligned boxes, which are Cartesian products of line segments. Answering a question raised by B\'ar\'any and Kalai, and independently Lew, we generalize Eckhoff's result to Cartesian products of convex sets in all dimensions. In particular, we prove that given $\alpha \in (1-\frac{1}{t^d},1]$ and a finite family $\mathcal{F}$ of Cartesian products of convex sets $\prod_{i\in[t]}A_i$ in $\mathbb{R}^{td}$ with $A_i\subset \mathbb{R}^d$ if at least $\alpha$-fraction of the $(d+1)$-tuples in $\mathcal{F}$ are intersecting then at least $(1-(t^d(1-\alpha))^{1/(d+1)})$-fraction of sets in $\mathcal{F}$ are intersecting. This is a special case of a more general result on intersections of $d$-Leray complexes. We also provide a construction showing that our result on $d$-Leray complexes is optimal. Interestingly the extremal example is representable as a family of cartesian products of convex sets, implying the bound $\alpha>1-\frac{1}{t^d}$ and the fraction $(1-(t^d(1-\alpha))^{1/(d+1)})$ above are also best possible. The well-known optimal construction for fractional Helly theorem for convex sets in $\mathbb{R}^d$ does not have $(p,d+1)$-condition for sublinear $p$. Inspired by this we give constructions showing that, somewhat surprisingly, imposing additional $(p,d+1)$-condition has negligible effect on improving the quantitative bounds in neither the fractional Helly theorem for convex sets nor Cartesian products of convex sets. Our constructions offer a rich family of distinct extremal configurations for fractional Helly theorem, implying in a sense that the optimal bound is stable., Comment: 17 pages, 2 figures

Published
2021
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74. Crux and long cycles in graphs

Author

Haslegrave, John, Hu, Jie, Kim, Jaehoon, Liu, Hong, Luan, Bingyu, and Wang, Guanghui

Subjects
Mathematics - Combinatorics
Abstract

We introduce a notion of the \emph{crux} of a graph $G$, measuring the order of a smallest dense subgraph in $G$. This simple-looking notion leads to some generalisations of known results about cycles, offering an interesting paradigm of `replacing average degree by crux'. In particular, we prove that \emph{every} graph contains a cycle of length linear in its crux. Long proved that every subgraph of a hypercube $Q^m$ (resp. discrete torus $C_3^m$) with average degree $d$ contains a path of length $2^{d/2}$ (resp. $2^{d/4}$), and conjectured that there should be a path of length $2^{d}-1$ (resp. $3^{d/2}-1$). As a corollary of our result, together with isoperimetric inequalities, we close these exponential gaps giving asymptotically optimal bounds on long paths in hypercubes, discrete tori, and more generally Hamming graphs. We also consider random subgraphs of $C_4$-free graphs and hypercubes, proving near optimal bounds on lengths of long cycles., Comment: 16 pages, 1 figure. Minor changes. Accepted by SIAM Journal on Discrete Mathematics

Published
2021
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78. Nested cycles with no geometric crossings

Author

Fernández, Irene Gil, Kim, Jaehoon, Kim, Younjin, and Liu, Hong

Subjects
Mathematics - Combinatorics, 05C38, 05C35, 05C48
Abstract

In 1975, Erd\H{o}s asked the following question: what is the smallest function $f(n)$ for which all graphs with $n$ vertices and $f(n)$ edges contain two edge-disjoint cycles $C_1$ and $C_2$, such that the vertex set of $C_2$ is a subset of the vertex set of $C_1$ and their cyclic orderings of the vertices respect each other? We prove the optimal linear bound $f(n)=O(n)$ using sublinear expanders., Comment: 10 pages, 2 figures

Published
2021

79. Extremal density for sparse minors and subdivisions

Author

Haslegrave, John, Kim, Jaehoon, and Liu, Hong

Subjects
Mathematics - Combinatorics, 05C83, 05C35
Abstract

We prove an asymptotically tight bound on the extremal density guaranteeing subdivisions of bounded-degree bipartite graphs with a mild separability condition. As corollaries, we answer several questions of Reed and Wood on embedding sparse minors. Among others, $\bullet$ $(1+o(1))t^2$ average degree is sufficient to force the $t\times t$ grid as a topological minor; $\bullet$ $(3/2+o(1))t$ average degree forces every $t$-vertex planar graph as a minor, and the constant $3/2$ is optimal, furthermore, surprisingly, the value is the same for $t$-vertex graphs embeddable on any fixed surface; $\bullet$ a universal bound of $(2+o(1))t$ on average degree forcing every $t$-vertex graph in any nontrivial minor-closed family as a minor, and the constant 2 is best possible by considering graphs with given treewidth., Comment: 33 pages, 6 figures

Published
2020
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80. Self-supervised Learning for Predicting Invisible Enemy Information in StarCraft II

Author

Baek, Insung, Bae, Jinsoo, Jeong, Keewon, Lee, Young Jae, Jo, Uk, Kim, Jaehoon, Kim, Seoung Bum, Kacprzyk, Janusz, Series Editor, Gomide, Fernando, Advisory Editor, Kaynak, Okyay, Advisory Editor, Liu, Derong, Advisory Editor, Pedrycz, Witold, Advisory Editor, Polycarpou, Marios M., Advisory Editor, Rudas, Imre J., Advisory Editor, Wang, Jun, Advisory Editor, and Arai, Kohei, editor

Published
2023
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81. Self-supervised Contrastive Learning for Predicting Game Strategies

Author

Lee, Young Jae, Baek, Insung, Jo, Uk, Kim, Jaehoon, Bae, Jinsoo, Jeong, Keewon, Kim, Seoung Bum, Kacprzyk, Janusz, Series Editor, Gomide, Fernando, Advisory Editor, Kaynak, Okyay, Advisory Editor, Liu, Derong, Advisory Editor, Pedrycz, Witold, Advisory Editor, Polycarpou, Marios M., Advisory Editor, Rudas, Imre J., Advisory Editor, Wang, Jun, Advisory Editor, and Arai, Kohei, editor

Published
2023
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87. $K_{r+1}$-saturated graphs with small spectral radius

Author

Kim, Jaehoon, Kim, Seog-Jin, Kostochka, Alexandr V., and O, Suil

Subjects
Mathematics - Combinatorics, 05C35, 05C50
Abstract

For a graph $H$, a graph $G$ is $H$-saturated if $G$ does not contain $H$ as a subgraph but for any $e \in E(\overline{G})$, $G+e$ contains $H$. In this note, we prove a sharp lower bound for the number of paths and walks on length $2$ in $n$-vertex $K_{r+1}$-saturated graphs. We then use this bound to give a lower bound on the spectral radii of such graphs which is asymptotically tight for each fixed $r$ and $n\to\infty$.

Published
2020

88. Fragile minor-monotone parameters under random edge perturbation

Author

Kang, Dong Yeap, Kang, Mihyun, Kim, Jaehoon, and Oum, Sang-il

Subjects
Mathematics - Combinatorics
Abstract

We conduct a quantitative analysis on the number of random edges required to be added to a base graph~$H$ to significantly increase natural minor-monotone graph parameters in the resulting graph~$R$. Specifically, we show that if $R$ is obtained from a connected graph $H$ by adding only a few random edges, the tree-width, genus, and Hadwiger number of $R$ become very large, irrespective of the structure of~$H$., Comment: 20 pages

Published
2020

89. The Erd\H{o}s-Hajnal property for graphs with no fixed cycle as a pivot-minor

Author

Kim, Jaehoon and Oum, Sang-il

Subjects
Mathematics - Combinatorics
Abstract

We prove that for every integer $k$, there exists $\varepsilon > 0$ such that for every n-vertex graph $G$ with no pivot-minor isomorphic to $C_k$, there exist disjoint sets $A,B \subseteq V(G)$ such that $|A|,|B| \geq \varepsilon n$, and $A$ is either complete or anticomplete to $B$. This proves the analog of the Erd\H{o}s-Hajnal conjecture for the class of graphs with no pivot-minor isomorphic to $C_k$., Comment: 13 pages, 4 figures

Published
2020
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90. Software for the frontiers of quantum chemistry: An overview of developments in the Q-Chem 5 package

Author

Epifanovsky, Evgeny, Gilbert, Andrew TB, Feng, Xintian, Lee, Joonho, Mao, Yuezhi, Mardirossian, Narbe, Pokhilko, Pavel, White, Alec F, Coons, Marc P, Dempwolff, Adrian L, Gan, Zhengting, Hait, Diptarka, Horn, Paul R, Jacobson, Leif D, Kaliman, Ilya, Kussmann, Jörg, Lange, Adrian W, Lao, Ka Un, Levine, Daniel S, Liu, Jie, McKenzie, Simon C, Morrison, Adrian F, Nanda, Kaushik D, Plasser, Felix, Rehn, Dirk R, Vidal, Marta L, You, Zhi-Qiang, Zhu, Ying, Alam, Bushra, Albrecht, Benjamin J, Aldossary, Abdulrahman, Alguire, Ethan, Andersen, Josefine H, Athavale, Vishikh, Barton, Dennis, Begam, Khadiza, Behn, Andrew, Bellonzi, Nicole, Bernard, Yves A, Berquist, Eric J, Burton, Hugh GA, Carreras, Abel, Carter-Fenk, Kevin, Chakraborty, Romit, Chien, Alan D, Closser, Kristina D, Cofer-Shabica, Vale, Dasgupta, Saswata, de Wergifosse, Marc, Deng, Jia, Diedenhofen, Michael, Do, Hainam, Ehlert, Sebastian, Fang, Po-Tung, Fatehi, Shervin, Feng, Qingguo, Friedhoff, Triet, Gayvert, James, Ge, Qinghui, Gidofalvi, Gergely, Goldey, Matthew, Gomes, Joe, González-Espinoza, Cristina E, Gulania, Sahil, Gunina, Anastasia O, Hanson-Heine, Magnus WD, Harbach, Phillip HP, Hauser, Andreas, Herbst, Michael F, Vera, Mario Hernández, Hodecker, Manuel, Holden, Zachary C, Houck, Shannon, Huang, Xunkun, Hui, Kerwin, Huynh, Bang C, Ivanov, Maxim, Jász, Ádám, Ji, Hyunjun, Jiang, Hanjie, Kaduk, Benjamin, Kähler, Sven, Khistyaev, Kirill, Kim, Jaehoon, Kis, Gergely, Klunzinger, Phil, Koczor-Benda, Zsuzsanna, Koh, Joong Hoon, Kosenkov, Dimitri, Koulias, Laura, Kowalczyk, Tim, Krauter, Caroline M, Kue, Karl, Kunitsa, Alexander, Kus, Thomas, Ladjánszki, István, Landau, Arie, Lawler, Keith V, Lefrancois, Daniel, and Lehtola, Susi

Subjects
Physical Sciences, Chemical Sciences, Atomic, Molecular and Optical Physics, Physical Chemistry, Engineering, Chemical Physics, Chemical sciences, Physical sciences
Abstract

This article summarizes technical advances contained in the fifth major release of the Q-Chem quantum chemistry program package, covering developments since 2015. A comprehensive library of exchange-correlation functionals, along with a suite of correlated many-body methods, continues to be a hallmark of the Q-Chem software. The many-body methods include novel variants of both coupled-cluster and configuration-interaction approaches along with methods based on the algebraic diagrammatic construction and variational reduced density-matrix methods. Methods highlighted in Q-Chem 5 include a suite of tools for modeling core-level spectroscopy, methods for describing metastable resonances, methods for computing vibronic spectra, the nuclear-electronic orbital method, and several different energy decomposition analysis techniques. High-performance capabilities including multithreaded parallelism and support for calculations on graphics processing units are described. Q-Chem boasts a community of well over 100 active academic developers, and the continuing evolution of the software is supported by an "open teamware" model and an increasingly modular design.

Published
2021

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