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RELATIVE ENTROPY DIMENSION FOR COUNTABLE AMENABLE GROUP ACTIONS
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作者 肖祖彪 殷正宇 《Acta Mathematica Scientia》 SCIE CSCD 2023年第6期2430-2448,共19页
We study the topological complexities of relative entropy zero extensions acted upon by countable-infinite amenable groups.First,for a given Følner sequence,we define the relative entropy dimensions and the dimen... We study the topological complexities of relative entropy zero extensions acted upon by countable-infinite amenable groups.First,for a given Følner sequence,we define the relative entropy dimensions and the dimensions of the relative entropy generating sets to characterize the sub-exponential growth of the relative topological complexity.we also investigate the relations among these.Second,we introduce the notion of a relative dimension set.Moreover,using the method,we discuss the disjointness between the relative entropy zero extensions via the relative dimension sets of two extensions,which says that if the relative dimension sets of two extensions are different,then the extensions are disjoint. 展开更多
关键词 amenable groups relative entropy dimensions relative dimension sets
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Relative Ding Projective Modules over Formal Triangular Matrix Rings
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作者 Hongyan Fan Xi Tang 《Journal of Applied Mathematics and Physics》 2023年第6期1598-1614,共17页
Let U be a (B, A)-bimodule, A and B be rings, and be a formal triangular matrix ring. In this paper, we characterize the structure of relative Ding projective modules over T under some conditions. Furthermore, using t... Let U be a (B, A)-bimodule, A and B be rings, and be a formal triangular matrix ring. In this paper, we characterize the structure of relative Ding projective modules over T under some conditions. Furthermore, using the left global relative Ding projective dimensions of A and B, we estimate the relative Ding projective dimension of a left T-module. 展开更多
关键词 Formal Triangular Matrix Ring Relative Ding Projective Module Relative Ding Projective Dimension
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On Proper and Exact Relative Homological Dimensions 被引量:1
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作者 Driss Bennis J.R.Garcia Rozas +1 位作者 Lixin Mao Luis Oyonarte 《Algebra Colloquium》 SCIE CSCD 2020年第3期621-642,共22页
In Enochs'relative homological dimension theory occur the(co)resolvent and(co)proper dimensions,which are defined by proper and coproper resolutions constructed by precovers and preenvelopes,respectively.Recently,... In Enochs'relative homological dimension theory occur the(co)resolvent and(co)proper dimensions,which are defined by proper and coproper resolutions constructed by precovers and preenvelopes,respectively.Recently,some authors have been interested in relative homological dimensions defined by just exact sequences.In this paper,we contribute to the investigation of these relative homological dimensions.First we study the relation between these two kinds of relative homological dimensions and establish some transfer results under adjoint pairs.Then relative global dimensions are studied,which lead to nice characterizations of some properties of particular cases of self-orthogonal subcategories.At the end of this paper,relative derived functors are studied and generalizations of some known results of balance for relative homology are established. 展开更多
关键词 self-orthogonal subcategory resolvent dimension exact dimension relative homological dimension relative group(co)homology balanced pair
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Homological Dimensions Relative to Special Subcategories 被引量:1
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作者 Weiling Song Tiwei Zhao Zhaoyong Huang 《Algebra Colloquium》 SCIE CSCD 2021年第1期131-142,共12页
Let A be an abelian category,C an additive,full and self-orthogonal subcategory of A closed under direct summands,rG(C)the right Gorenstein subcategory of A relative to C,and⊥C the left orthogonal class of C.For an o... Let A be an abelian category,C an additive,full and self-orthogonal subcategory of A closed under direct summands,rG(C)the right Gorenstein subcategory of A relative to C,and⊥C the left orthogonal class of C.For an object A in A,we prove that if A is in the right 1-orthogonal class of rG(C),then the C-projective and rG(C)-projective dimensions of A are identical;if the rG(C)-projective dimension of A is finite,then the rG(C)-projective and⊥C-projective dimensions of A are identical.We also prove that the supremum of the C-projective dimensions of objects with finite C-projective dimension and that of the rG(C)-projective dimensions of objects with finite rG(C)-projective dimension coincide.Then we apply these results to the category of modules. 展开更多
关键词 relative homological dimensions right Gorenstein subcategories left Gorenstein subcategories self-orthogonal subcategories
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Relative Derived Equivalences and Relative Homological Dimensions
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作者 Sheng Yong PAN 《Acta Mathematica Sinica,English Series》 SCIE CSCD 2016年第4期439-456,共18页
Let A be a small abelian category.For a closed subbifunctor F of Ext_A^1(-,-),Buan has generalized the construction of Verdier’s quotient category to get a relative derived category,where he localized with respect ... Let A be a small abelian category.For a closed subbifunctor F of Ext_A^1(-,-),Buan has generalized the construction of Verdier’s quotient category to get a relative derived category,where he localized with respect to F-acyclic complexes.In this paper,the homological properties of relative derived categories are discussed,and the relation with derived categories is given.For Artin algebras,using relative derived categories,we give a relative version on derived equivalences induced by F-tilting complexes.We discuss the relationships between relative homological dimensions and relative derived equivalences. 展开更多
关键词 Relative derived category F-tilting complex relative derived equivalence relative homological dimension
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Resolving Subcategories of Triangulated Categories and Relative Homological Dimension 被引量:2
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作者 Xin MA Ti Wei ZHAO Zhao Yong HUANG 《Acta Mathematica Sinica,English Series》 SCIE CSCD 2017年第11期1513-1535,共23页
We introduce and study (pre)resolving subcategories of a triangulated category and the homological dimension relative to these subcategories. We apply the obtained properties to relative Gorenstein categories.
关键词 (Pre)resolving subcategories triangulated categories relative homological dimension Gorenstein categories
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Applications of balanced pairs 被引量:3
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作者 LI HuanHuan WANG JunFu HUANG ZhaoYong 《Science China Mathematics》 SCIE CSCD 2016年第5期861-874,共14页
Let(X, Y) be a balanced pair in an abelian category. We first introduce the notion of cotorsion pairs relative to(X, Y), and then give some equivalent characterizations when a relative cotorsion pair is hereditary or ... Let(X, Y) be a balanced pair in an abelian category. We first introduce the notion of cotorsion pairs relative to(X, Y), and then give some equivalent characterizations when a relative cotorsion pair is hereditary or perfect. We prove that if the X-resolution dimension of Y(resp. Y-coresolution dimension of X)is finite, then the bounded homotopy category of Y(resp. X) is contained in that of X(resp. Y). As a consequence, we get that the right X-singularity category coincides with the left Y-singularity category if the X-resolution dimension of Y and the Y-coresolution dimension of X are finite. 展开更多
关键词 balanced pairs relative cotorsion pairs relative derived categories relative singularity categories relative(co)resolution dimension
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