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1. Integro-differential rings on species and derived structures

Author

Gao, Xing, Guo, Li, Rosenkranz, Markus, Zhang, Huhu, and Zhang, Shilong

Subjects
Mathematics - Combinatorics, Mathematics - Classical Analysis and ODEs, Mathematics - Rings and Algebras, 18M30, 17B38, 45J05, 47G20, 12H05, 34M15
Abstract

In the theory of species, differential as well as integral operators are known to arise in a natural way. In this paper, we shall prove that they precisely fit together in the algebraic framework of integro-differential rings, which are themselves an abstraction of classical calculus (incorporating its Fundamental Theorem). The results comprise (set) species as well as linear species. Localization of (set) species leads to the more general structure of modified integro-differential rings, previously employed in the algebraic treatment of Volterra integral equations. Furthermore, the ring homomorphism from species to power series via taking generating series is shown to be a (modified) integro-differential ring homomorphism. As an application, a topology and further algebraic operations are imported to virtual species from the general theory of integro-differential rings., Comment: 27 pages. Comments welcome

Published
2025

2. Averaging groups

Author

Zhang, Huhu and Gao, Xing

Subjects
Mathematics - Rings and Algebras, Mathematics - Group Theory, 22E60, 08B20, 20D45, 17B40
Abstract

Rota-Baxter operators on groups were studied quite recently. Motivated mainly by the fact that weight zero Rota-Baxter operators and averaging operators are Koszul dual to each other, we propose the concepts of averaging group and averaging Hopf algebra, and study relationships among them and the existing averaging Lie algebras. We also show that an averaging group induces a disemigroup and a rack, respectively. As the free object is one of the most significant objects in a category, we also construct explicitly the free averaging group on a set., Comment: 23 pages

Published
2024

4. Weighted differential ($q$-tri)dendriform algebras

Author

Zhang, Yuanyuan, Zhang, Huhu, Wu, Tingzeng, and Gao, Xing

Subjects
Mathematics - Rings and Algebras, 16W99, 16S10, 13P10, 08B20
Abstract

In this paper, we first introduce a weighted derivation on algebras over an operad $\cal P$, and prove that for the free $\cal P$-algebra, its weighted derivation is determined by the restriction on the generators. As applications, we propose the concept of weighted differential ($q$-tri)dendriform algebras and study some basic properties of them. Then Novikov-(tri)dendriform algebras are initiated, which can be induced from differential ($q$-tri) dendriform of weight zero. Finally, the corresponding free objects are constructed, in both the commutative and noncommutative contexts., Comment: 26 pages. arXiv admin note: substantial text overlap with arXiv:2305.19609

Published
2024

5. Some new operated Lie polynomial identities and Gr\'obner-Shirshov bases

Author

Zhang, Huhu, Gao, Xing, Wu, Tingzeng, and Feng, Xinyang

Subjects
Mathematics - Rings and Algebras, 18M70, 05A05, 16W99
Abstract

We give an affirmative answer to the open question posed in [34]: are the operated Lie polynomial identities corresponding to new operators on associative algebras in [7] Grobner-Shirshov, respectively?, Comment: 18 pages

Published
2024

6. Compatible structures of operads by polarization, their Koszul duality and Manin products

Author

Zhang, Huhu, Gao, Xing, and Guo, Li

Subjects
Mathematics - Category Theory, Mathematics - Quantum Algebra, Mathematics - Rings and Algebras, 18M70, 14L24, 05C05, 37K10, 17B37, 35R60
Abstract

Algebraic structures with multiple copies of a given type of operations interrelated by various compatibility conditions have long being studied in mathematics and mathematical physics. They are broadly referred as linearly compatible, matching, and totally compatible structures. This paper gives a unified approach to these structures in the context of operads. We first generalize the process of polarization for polynomials in invariant theory to the one for operads, leading to the general notion of linearly compatible operads. Refining the polarization by partitioning it into foliations, we obtain a notion of matching operads consolidating those appeared recently from applications of regularity structures, and Volterra integral equations. Distinguished among them is the leveled matching compatibility, which is unique with respect to a fix ordering of the vertices in tree monomials. Equating all matching compatibilities of a given operad leads to the totally compatible operad of this operad. For unary/binary quadratic operads, the linear compatibility and the total compatibility are in Koszul dual to each other, and there is a Koszul self-duality among the matching compatibilities. In particular, the leveled matching compatibility is Koszul self-dual. For binary quadratic operads, these three compatible operads can also be obtained by taking Manin black and white products. For some finitely generated binary quadratic operad, Koszulity is preserved under taking the compatibilities., Comment: 29 pages

Published
2023

10. Free weighted differential ($q$-tri)dendriform algebras

Author

Zhang, Yuanyuan, Zhang, Huhu, Wu, Tingzeng, and Gao, Xing

Subjects
Mathematics - Rings and Algebras, 16W99, 16S10, 13P10, 08B20
Abstract

In the present paper, we propose the concepts of weighted differential ($q$-tri)dendriform algebras and give some basic properties of them. The corresponding free objects are constructed, in both the commutative and noncommutative contexts., Comment: This paper is just the old version of the arXiv:2406.12871. Sorry I forget I have uploaded it before. So it would be great to turn arXiv:2305.19609 to version 1 of the newest arXiv:2406.12871

Published
2023

13. Free $\Omega$-Rota-Baxter systems and Gr\'obner-Shirshov bases

Author

Zhang, Yuanyuan, Zhang, Huhu, and Gao, Xing

Subjects
Mathematics - Rings and Algebras, 2010: 16W99, 16S10, 13P10, 08B20
Abstract

In this paper, we propose the concept of an $\Omega$-Rota-Baxter system, which is a generalization of a Rota-Baxter system and an $\Omega$-Rota-Baxter algebra of weight zero. In the framework of operated algebras, we obtain a linear basis of a free $\Omega$-Rota-Baxter system for an extended diassociative semigroup $\Omega$, in terms of bracketed words and the method of Gr\"obner-Shirshov bases. As applications, we introduce the concepts of Rota-Baxter system family algebras and matching Rota-Baxter systems as special cases of $\Omega$-Rota-Baxter systems, and construct their free objects. Meanwhile, free $\Omega$-Rota-Baxter algebras of weight zero, free Rota-Baxter systems, free Rota-Baxter family algebras and free matching Rota-Baxter algebras are reconstructed via new method., Comment: 18 pages

Published
2022

14. Operator identities on Lie algebras, rewriting systems and Gr\'obner-Shirshov bases

Author

Zhang, Huhu, Gao, Xing, and Guo, Li

Subjects
Mathematics - Quantum Algebra, Mathematics - Rings and Algebras, 17B40, 17B38, 05A05, 16Z10, 17A61, 16S10, 13P10
Abstract

Motivated by the pivotal role played by linear operators, many years ago Rota proposed to determine algebraic operator identities satisfied by linear operators on associative algebras, later called Rota's program on algebraic operators. Recent progresses on this program have been achieved in the contexts of operated algebra, rewriting systems and Groebner-Shirshov bases. These developments also suggest that Rota's insight can be applied to determine operator identities on Lie algebras, and thus to put the various linear operators on Lie algebras in a uniform perspective. This paper carries out this approach, utilizing operated polynomial Lie algebras spanned by non-associative Lyndon-Shirshov bracketed words. The Lie algebra analog of Rota's program was formulated in terms convergent rewriting systems and equivalently in terms of Groebner-Shirshov bases. This Lie algebra analog is shown to be compatible with Rota's program for associative algebras. As applications, a classification of differential type operators and Rota-Baxter operators are presented., Comment: 29 pages. arXiv admin note: substantial text overlap with arXiv:2108.11823; text overlap with arXiv:2103.13046 by other authors

Published
2022

15. UBA3 promotes the occurrence and metastasis of intrahepatic cholangiocarcinoma through MAPK signaling pathway

Author

Zhang Huhu, Yang Jiahua, Song Qinghang, Ding Xiaoyan, Sun Fulin, and Yang Lina

Subjects
intrahepatic cholangiocarcinoma, UBA3, ANXA2, bufalin, prognosis, proliferation, migration, Biochemistry, QD415-436, Genetics, QH426-470
Abstract

Intrahepatic cholangiocarcinoma (ICC) accounts for approximately 15% of primary liver cancers, and the incidence rate has been increasing in recent years. Surgical resection is the best treatment for ICC, but the 5-year survival rate is less than 30%. ICC signature genes are crucial for the early diagnosis of ICC, so it is especially important to identify signature genes. The aim of this study is to screen the signature genes of ICC and find the potential target for the treatment of ICC. We find that UBA3 is highly expressed in ICC, and knockdown of UBA3 inhibits ICC proliferation, invasion and migration. Mechanistic experiments show that UBA3 promotes ICC proliferation, invasion and migration by affecting ANXA2 through the MAPK signaling pathway. UBA3 is a target of bufalin, and bufalin targeting UBA3 inhibits ICC development and progression through the MAPK signaling pathway. In conclusion, our study shows that bufalin inhibits ICC by targeting UBA3, which has emerged as a new biomarker and potential therapeutic target for ICC.

Published
2024
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17. Rota's program on algebraic operators, rewriting systems and Gr\'obner-Shirshov bases

Author

Gao, Xing, Guo, Li, and Zhang, Huhu

Subjects
Mathematics - Rings and Algebras, Mathematics - Quantum Algebra, 16W99, 16S15, 16Z10, 05C05, 17B40, 18M60, 68Q42
Abstract

Many years ago, Rota proposed a program on determining algebraic identities that can be satisfied by linear operators. After an extended period of dormant, progress on this program picked up speed in recent years, thanks to perspectives from operated algebras and Gr\"obner-Shirshov bases. These advances were achieved in a series of papers from special cases to more general situations. These perspectives also indicate that Rota's insight can be manifested very broadly, for other algebraic structures such as Lie algebras, and further in the context of operads. This paper gives a survey on the motivation, early developments and recent advances on Rota's program, for linear operators on associative algebras and Lie algebras. Emphasis will be given to the applications of rewriting systems and Gr\"obner-Shirshov bases. Problems, old and new, are proposed throughout the paper to prompt further developments on Rota's program., Comment: 29 pages

Published
2021

18. Free weighted (modified) differential algebras, free (modified) Rota-Baxter algebras and Gr\'{o}bner-Shirshov bases

Author

Zhu, Zhicheng, Zhang, Huhu, and Gao, Xing

Subjects
Mathematics - Rings and Algebras, 16W99, 16S10, 13P10, 12H05, 08B20, 16T30
Abstract

In this paper, we obtain respectively some new linear bases of free unitary (modified) weighted differential algebras and free nonunitary (modified) Rota-Baxter algebras, in terms of the method of Gr\"{o}bner-Shirshov bases.

Published
2021

19. Compatible structures on unary binary nonsymmetric operads with quadratic and cubic relations

Author

Gao, Xing, Guo, Li, and Zhang, Huhu

Subjects
Mathematics - Category Theory, Mathematics - Combinatorics, Mathematics - Rings and Algebras, 18D50, 05C05, 05A05, 16W99
Abstract

Various compatibility conditions among replicated copies of operations in a given algebraic structure have appeared in broad contexts in recent years. Taking an uniform approach, this paper gives an operadic study of compatibility conditions for nonsymmetric operads with unary and binary operations, and homogeneous quadratic and cubic relations. This generalizes the previous studies for binary quadratic operads. We consider three compatibility conditions, namely the linear compatibility, matching compatibility and total compatibility, with increasingly strict restraints among the replicated copies. The linear compatibility is in Koszul dual to the total compatibility, while the matching compatibility is self dual. Further, each compatibility can be expressed in terms of either one or both of the two Manin square products., Comment: 26 pages

Published
2021

24. Free Ω-Rota–Baxter systems and Gröbner–Shirshov bases.

Author

Zhang, Yuanyuan, Zhang, Huhu, and Gao, Xing

Subjects
*ALGEBRA, *GENERALIZATION, *YANG-Baxter equation, *FAMILIES
Abstract

In this paper, we propose the concept of an Ω -Rota–Baxter system, which is a generalization of a Rota–Baxter system and an Ω -Rota–Baxter algebra of weight zero. In the framework of operated algebras, we obtain a linear basis of a free Ω -Rota–Baxter system for an extended diassociative semigroup Ω , in terms of bracketed words and the method of Gröbner–Shirshov bases. As applications, we introduce the concepts of Rota–Baxter system family algebras and matching Rota–Baxter systems as special cases of Ω -Rota–Baxter systems, and construct their free objects. Meanwhile, free Ω -Rota–Baxter algebras of weight zero, free Rota–Baxter systems, free Rota–Baxter family algebras and free matching Rota–Baxter algebras are reconstructed via new method. [ABSTRACT FROM AUTHOR]

Published
2025
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27. New Insights into Mitochondria in Health and Diseases.

Author

Li, Ya, Zhang, Huhu, Yu, Chunjuan, Dong, Xiaolei, Yang, Fanghao, Wang, Mengjun, Wen, Ziyuan, Su, Mohan, Li, Bing, and Yang, Lina

Subjects
*KREBS cycle, *CELL physiology, *CELL survival, *AMINO acid synthesis, *PARKINSON'S disease
Abstract

Mitochondria are a unique type of semi-autonomous organelle within the cell that carry out essential functions crucial for the cell's survival and well-being. They are the location where eukaryotic cells carry out energy metabolism. Aside from producing the majority of ATP through oxidative phosphorylation, which provides essential energy for cellular functions, mitochondria also participate in other metabolic processes within the cell, such as the electron transport chain, citric acid cycle, and β-oxidation of fatty acids. Furthermore, mitochondria regulate the production and elimination of ROS, the synthesis of nucleotides and amino acids, the balance of calcium ions, and the process of cell death. Therefore, it is widely accepted that mitochondrial dysfunction is a factor that causes or contributes to the development and advancement of various diseases. These include common systemic diseases, such as aging, diabetes, Parkinson's disease, and cancer, as well as rare metabolic disorders, like Kearns–Sayre syndrome, Leigh disease, and mitochondrial myopathy. This overview outlines the various mechanisms by which mitochondria are involved in numerous illnesses and cellular physiological activities. Additionally, it provides new discoveries regarding the involvement of mitochondria in both disorders and the maintenance of good health. [ABSTRACT FROM AUTHOR]

Published
2024
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28. Weighted differential (q-tri)dendriform algebras.

Author

Zhang, Yuanyuan, Zhang, Huhu, Wu, Tingzeng, and Gao, Xing

Subjects
*ALGEBRA
Abstract

In this paper, we first introduce a weighted derivation on algebras over an operad 풫, and prove that for the free 풫-algebra, its weighted derivation is determined by the restriction on the generators. As applications, we propose the concept of weighted differential (q-tri)dendriform algebras and study some basic properties of them. Then Novikov-(tri)dendriform algebras are initiated, which can be induced from differential (q-tri)dendriform of weight zero. Finally, the corresponding free objects are constructed, in both the commutative and noncommutative contexts. [ABSTRACT FROM AUTHOR]

Published
2024
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32. Strategy Analysis of an Evolutionary Spectrum Sensing Game

Author

Ding, Dongsheng, Zhang, Guoyue, Qi, Donglian, Zhang, Huhu, Junqueira Barbosa, Simone Diniz, Series editor, Chen, Phoebe, Series editor, Cuzzocrea, Alfredo, Series editor, Du, Xiaoyong, Series editor, Filipe, Joaquim, Series editor, Kara, Orhun, Series editor, Kotenko, Igor, Series editor, Sivalingam, Krishna M., Series editor, Ślęzak, Dominik, Series editor, Washio, Takashi, Series editor, Yang, Xiaokang, Series editor, Fei, Minrui, editor, Peng, Chen, editor, Su, Zhou, editor, Song, Yang, editor, and Han, Qinglong, editor

Published
2014
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33. Annexin A protein family: Focusing on the occurrence, progression and treatment of cancer

Author

Zhang, Huhu, primary, Zhang, Zhe, additional, Guo, Tingting, additional, Chen, Guang, additional, Liu, Guoxiang, additional, Song, Qinghang, additional, Li, Guichun, additional, Xu, Fenghua, additional, Dong, Xiaolei, additional, Yang, Fanghao, additional, Cao, Can, additional, Zhong, Di, additional, Li, Shuang, additional, Li, Ya, additional, Wang, Mengjun, additional, Li, Bing, additional, and Yang, Lina, additional

Published
2023
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34. C-Phycocyanin Ameliorates the Senescence of Mesenchymal Stem Cells through ZDHHC5-Mediated Autophagy via PI3K/AKT/mTOR Pathway

Author

Liu, Guoxiang, primary, Li, Xiaoxia, primary, Yang, Fanghao, primary, Qi, Jingyu, primary, Shang, Lipeng, primary, Zhang, Huhu, primary, Li, Shuang, primary, Xu, Fenghua, primary, Li, Lingne, primary, Yu, Huaxin, primary, Li, Yang, primary, Dong, Xiaolei, primary, Song, Qinghang, primary, Zhu, Feng, primary, Chen, Guang, primary, Cao, Can, primary, Jiang, Liangqian, primary, Su, Junzhe, primary, Yang, Lina, primary, Xu, Xiaohui, primary, Zhang, Zhe, primary, Zhao, Robert Chunhua, primary, and Li, Bing, primary

Published
2023
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35. Research progress in protein microarrays: Focussing on cancer research

Author

Chen, Guang, primary, Yang, Lina, additional, Liu, Guoxiang, additional, Zhu, Yunfan, additional, Yang, Fanghao, additional, Dong, Xiaolei, additional, Xu, Fenghua, additional, Zhu, Feng, additional, Cao, Can, additional, Zhong, Di, additional, Li, Shuang, additional, Zhang, Huhu, additional, and Li, Bing, additional

Published
2022
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37. USP32 facilitates non-small cell lung cancer progression via deubiquitinating BAG3 and activating RAF-MEK-ERK signaling pathway.

Author

Li S, Yang L, Ding X, Sun H, Dong X, Yang F, Wang M, Zhang H, Li Y, Li B, and Liu C

Abstract

The regulatory significance of ubiquitin-specific peptidase 32 (USP32) in tumor is significant, nevertheless, the biological roles and regulatory mechanisms of USP32 in non-small cell lung cancer (NSCLC) remain unclear. According to our research, USP32 was strongly expressed in NSCLC cell lines and tissues and was linked to a bad prognosis for NSCLC patients. Interference with USP32 resulted in a significant inhibition of NSCLC cell proliferation, migration potential, and EMT development; on the other hand, USP32 overexpression had the opposite effect. To further elucidate the mechanism of action of USP32 in NSCLC, we screened H1299 cells for interacting proteins and found that USP32 interacts with BAG3 (Bcl2-associated athanogene 3) and deubiquitinates and stabilizes BAG3 in a deubiquitinating activity-dependent manner. Functionally, restoration of BAG3 expression abrogated the antitumor effects of USP32 silencing. Furthermore, USP32 increased the phosphorylation level of the RAF/MEK/ERK signaling pathway in NSCLC cells by stabilizing BAG3. In summary, these findings imply that USP32 is critical to the development of NSCLC and could offer a theoretical framework for the clinical diagnosis and management of NSCLC patients in the future., (© 2024. The Author(s).)

Published
2024
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38. Research progress in protein microarrays: Focussing on cancer research.

Author

Chen G, Yang L, Liu G, Zhu Y, Yang F, Dong X, Xu F, Zhu F, Cao C, Zhong D, Li S, Zhang H, and Li B

Subjects
Microarray Analysis methods, Proteome, Lectins, Protein Array Analysis methods, Neoplasms
Abstract

Although several effective treatment modalities have been developed for cancers, the morbidity and mortality associated with cancer continues to increase every year. As one of the most exciting emerging technologies, protein microarrays represent a powerful tool in the field of cancer research because of their advantages such as high throughput, small sample usage, more flexibility, high sensitivity and direct readout of results. In this review, we focus on the research progress in four types of protein microarrays (proteome microarray, antibody microarray, lectin microarray and reversed protein array) with emphasis on their application in cancer research. Finally, we discuss the current challenges faced by protein microarrays and directions for future developments. We firmly believe that this novel systems biology research tool holds immense potential in cancer research and will become an irreplaceable tool in this field., (© 2022 Wiley-VCH GmbH.)

Published
2023
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