The KMS condition for the homoclinic equivalence relation and Gibbs probabilities

AbstractWe introduce a new approach to find the Tomita–Takesaki modular flow for multi-component regions in general chiral conformal field theory. Our method is based on locality and analyticity of primary fields as well as the so-called Kubo–Martin–Schwinger (KMS) condition. These features can be used to transform the problem to a Riemann–Hilbert problem on a covering of the complex plane cut along the regions, which is equivalent to an integral equation for the matrix elements of the modular Hamiltonian. Examples are considered.

Fundamental relations and identities of fuzzy hyperalgebras

Journal of Intelligent & Fuzzy Systems ◽

10.3233/jifs-210994 ◽

2021 ◽

pp. 1-10

Author(s):

Narjes Firouzkouhi ◽

Abbas Amini ◽

Chun Cheng ◽

Mehdi Soleymani ◽

Bijan Davvaz

Keyword(s):

Universal Algebra ◽

Equivalence Relation ◽

Polynomial Function ◽

Equivalence Relations ◽

Fundamental Relation ◽

Term Function ◽

Biological Phenomena ◽

Definition Of

Inspired by fuzzy hyperalgebras and fuzzy polynomial function (term function), some homomorphism properties of fundamental relation on fuzzy hyperalgebras are conveyed. The obtained relations of fuzzy hyperalgebra are utilized for certain applications, i.e., biological phenomena and genetics along with some elucidatory examples presenting various aspects of fuzzy hyperalgebras. Then, by considering the definition of identities (weak and strong) as a class of fuzzy polynomial function, the smallest equivalence relation (fundamental relation) is obtained which is an important tool for fuzzy hyperalgebraic systems. Through the characterization of these equivalence relations of a fuzzy hyperalgebra, we assign the smallest equivalence relation α i 1 i 2 ∗ on a fuzzy hyperalgebra via identities where the factor hyperalgebra is a universal algebra. We extend and improve the identities on fuzzy hyperalgebras and characterize the smallest equivalence relation α J ∗ on the set of strong identities.

On Polish groups admitting non-essentially countable actions

Ergodic Theory and Dynamical Systems ◽

10.1017/etds.2020.133 ◽

2020 ◽

pp. 1-15

Author(s):

ALEXANDER S. KECHRIS ◽

MACIEJ MALICKI ◽

ARISTOTELIS PANAGIOTOPOULOS ◽

JOSEPH ZIELINSKI

Keyword(s):

Equivalence Relation ◽

Isometry Group ◽

Alternative Proof ◽

Orbit Equivalence ◽

Locally Compact ◽

Continuous Action ◽

Polish Groups ◽

Infinite Dimensional ◽

Open Question ◽

New Criterion

Abstract It is a long-standing open question whether every Polish group that is not locally compact admits a Borel action on a standard Borel space whose associated orbit equivalence relation is not essentially countable. We answer this question positively for the class of all Polish groups that embed in the isometry group of a locally compact metric space. This class contains all non-archimedean Polish groups, for which we provide an alternative proof based on a new criterion for non-essential countability. Finally, we provide the following variant of a theorem of Solecki: every infinite-dimensional Banach space has a continuous action whose orbit equivalence relation is Borel but not essentially countable.

Multiple Granulation Rough Set Approach to Interval-Valued Intuitionistic Fuzzy Ordered Information Systems

Symmetry ◽

10.3390/sym13060949 ◽

2021 ◽

Vol 13 (6) ◽

pp. 949

Author(s):

Zhen Li ◽

Xiaoyan Zhang

Keyword(s):

Information Theory ◽

Pattern Recognition ◽

Information System ◽

Information Systems ◽

Rough Set ◽

Fuzzy Set ◽

Equivalence Relation ◽

Target Concept ◽

Actual Case ◽

Interval Valued

As a further extension of the fuzzy set and the intuitive fuzzy set, the interval-valued intuitive fuzzy set (IIFS) is a more effective tool to deal with uncertain problems. However, the classical rough set is based on the equivalence relation, which do not apply to the IIFS. In this paper, we combine the IIFS with the ordered information system to obtain the interval-valued intuitive fuzzy ordered information system (IIFOIS). On this basis, three types of multiple granulation rough set models based on the dominance relation are established to effectively overcome the limitation mentioned above, which belongs to the interdisciplinary subject of information theory in mathematics and pattern recognition. First, for an IIFOIS, we put forward a multiple granulation rough set (MGRS) model from two completely symmetry positions, which are optimistic and pessimistic, respectively. Furthermore, we discuss the approximation representation and a few essential characteristics for the target concept, besides several significant rough measures about two kinds of MGRS symmetry models are discussed. Furthermore, a more general MGRS model named the generalized MGRS (GMGRS) model is proposed in an IIFOIS, and some important properties and rough measures are also investigated. Finally, the relationships and differences between the single granulation rough set and the three types of MGRS are discussed carefully by comparing the rough measures between them in an IIFOIS. In order to better utilize the theory to realistic problems, an actual case shows the methods of MGRS models in an IIFOIS is given in this paper.

Parametric Matroid of Rough Set

International Journal of Uncertainty Fuzziness and Knowledge-Based Systems ◽

10.1142/s0218488515500403 ◽

2015 ◽

Vol 23 (06) ◽

pp. 893-908 ◽

Cited By ~ 5

Author(s):

Yanfang Liu ◽

Hong Zhao ◽

William Zhu

Keyword(s):

Rough Set ◽

Equivalence Relation ◽

Rough Sets ◽

Rough Set Theory ◽

Attribute Reduction ◽

Independent Set ◽

Approximation Operator ◽

Approximation Number ◽

Lower Approximation ◽

The One

Rough set is mainly concerned with the approximations of objects through an equivalence relation on a universe. Matroid is a generalization of linear algebra and graph theory. Recently, a matroidal structure of rough sets is established and applied to the problem of attribute reduction which is an important application of rough set theory. In this paper, we propose a new matroidal structure of rough sets and call it a parametric matroid. On the one hand, for an equivalence relation on a universe, a parametric set family, with any subset of the universe as its parameter, is defined through the lower approximation operator. This parametric set family is proved to satisfy the independent set axiom of matroids, therefore a matroid is generated, and we call it a parametric matroid of the rough set. Through the lower approximation operator, three equivalent representations of the parametric set family are obtained. Moreover, the parametric matroid of the rough set is proved to be the direct sum of a partition-circuit matroid and a free matroid. On the other hand, partition-circuit matroids are well studied through the lower approximation number, and then we use it to investigate the parametric matroid of the rough set. Several characteristics of the parametric matroid of the rough set, such as independent sets, bases, circuits, the rank function and the closure operator, are expressed by the lower approximation number.

An étale equivalence relation on a tiling space arising from a two-sided subshift and associated C*-algebras

Dynamical Systems ◽

10.1080/14689367.2021.1928605 ◽

2021 ◽

pp. 1-38

Author(s):

Kengo Matsumoto

Keyword(s):

Equivalence Relation ◽

C Algebras ◽

Tiling Space

Aggregation of Indistinguishability Fuzzy Relations Revisited

Mathematics ◽

10.3390/math9121441 ◽

2021 ◽

Vol 9 (12) ◽

pp. 1441

Author(s):

Juan-De-Dios González-Hedström ◽

Juan-José Miñana ◽

Oscar Valero

Keyword(s):

Equivalence Relation ◽

Fuzzy Relations ◽

Measure Of Similarity ◽

Dual Notion ◽

The Relationship

Indistinguishability fuzzy relations were introduced with the aim of providing a fuzzy notion of equivalence relation. Many works have explored their relation to metrics, since they can be interpreted as a kind of measure of similarity and this is, in fact, a dual notion to dissimilarity. Moreover, the problem of how to construct new indistinguishability fuzzy relations by means of aggregation has been explored in the literature. In this paper, we provide new characterizations of those functions that allow us to merge a collection of indistinguishability fuzzy relations into a new one in terms of triangular triplets and, in addition, we explore the relationship between such functions and those that aggregate extended pseudo-metrics, which are the natural distances associated to indistinguishability fuzzy relations. Our new results extend some already known characterizations which involve only bounded pseudo-metrics. In addition, we provide a completely new description of those indistinguishability fuzzy relations that separate points, and we show that both differ a lot.

Resolving modular flow: a toolkit for free fermions

Journal of High Energy Physics ◽

10.1007/jhep12(2020)126 ◽

2020 ◽

Vol 2020 (12) ◽

Author(s):

Johanna Erdmenger ◽

Pascal Fries ◽

Ignacio A. Reyes ◽

Christian P. Simon

Keyword(s):

Complex Analysis ◽

Conformal Symmetry ◽

Standard Technique ◽

Analytic Structure ◽

Point Function ◽

Free Fermions ◽

Modular Evolution ◽

Non Local ◽

Kms Condition ◽

New Formula

Abstract Modular flow is a symmetry of the algebra of observables associated to space-time regions. Being closely related to entanglement, it has played a key role in recent connections between information theory, QFT and gravity. However, little is known about its action beyond highly symmetric cases. The key idea of this work is to introduce a new formula for modular flows for free chiral fermions in 1 + 1 dimensions, working directly from the resolvent, a standard technique in complex analysis. We present novel results — not fixed by conformal symmetry — for disjoint regions on the plane, cylinder and torus. Depending on temperature and boundary conditions, these display different behaviour ranging from purely local to non-local in relation to the mixing of operators at spacelike separation. We find the modular two-point function, whose analytic structure is in precise agreement with the KMS condition that governs modular evolution. Our ready-to-use formulae may provide new ingredients to explore the connection between spacetime and entanglement.

A Generalization of “Concordance of PL-Homeomorphisms of Sp × Sq

Canadian Journal of Mathematics ◽

10.4153/cjm-1972-035-6 ◽

1972 ◽

Vol 24 (3) ◽

pp. 426-431 ◽

Cited By ~ 1

Author(s):

J. P. E. Hodgson

Keyword(s):

Equivalence Relation ◽

Cohomology Ring

Let Mm be a closed PL manifold of dimension m. Then a concordance between two PL-homeomorphisms h0, h1:M → M is a PL-homeomorphismH: M × I → M × I such that H|M × 0 = h0 and H|M × 1 = h. Concordance is an equivalence relation and in his paper [2], M. Kato classifies PL-homeomorphisms of Sp × Sq up to concordance. To do this he treats first the problem of classifying those homeomorphisms that induce the identity in homology, and then describes the automorphisms of the cohomology ring that can arise from homeomorphisms of Sp × Sq. In this paper we show that for sufficiently connected PL-manifolds that embed in codimension 1, one can extend Kato's classification of the homeomorphisms that induce the identity in homology.