Your search keyword '"geometry_topology"' showing total 58 results

1. On an Indefinite Metric on a 4-Dimensional Riemannian Manifold

Author

Dimitar Razpopov, Georgi Dzhelepov, and Iva Rumenova Dokuzova

Subjects

geometry_topology

Abstract

Our research is in the tangent space of a point on a 4-dimensional Riemannian manifold. Besides the positive definite metric, the manifold is endowed with a tensor structure of type (1,1), whose fourth power is minus the identity. Both structures are compatible and they define an indefinite metric on the manifold. With the help of the indefinite metric we determine a circle in different 2-planes in the tangent space on the manifold, we also calculate the length and area of the circle. On a smooth closed curve such as a circle, we define a vector force field. Further, we obtain the circulation done by the vector force field along the curve, as well as the flux of the curl of this vector force field across the curve. Finally, we find a relation between these two values, which is an analogue of the well known Green’s formula in the Euclidean space.

Published

2023

2. SL(2,C) Scheme Processing of Singularities in Quantum Computing and Genetics

Author

Michel Planat, Marcelo M. Amaral, David Chester, and Klee Irwin

Subjects

geometry_topology, Algebra and Number Theory, Logic, Geometry and Topology, finitely generated group, ++++S<%2Fmml%3Ami>+L<%2Fmml%3Ami>+%28<%2Fmml%3Amo>+2<%2Fmml%3Amn>+%2C<%2Fmml%3Amo>+C<%2Fmml%3Ami>+%29<%2Fmml%3Amo>+<%2Fmml%3Amrow>+<%2Fmml%3Asemantics>+<%2Fmml%3Amath>+<%2Finline-formula><%2Fnamed-content>+character+variety%22"> S L ( 2 , C ) character variety, algebraic surfaces, schemes, exotic R4, topological quantum computing, microRNAs, Mathematical Physics, Analysis

Abstract

Revealing the time structure of physical or biological objects is usually performed thanks to the tools of signal processing such as the fast Fourier transform, Ramanujan sum signal processing, and many other techniques. For space-time topological objects in physics and biology, we propose a type of algebraic processing based on schemes in which the discrimination of singularities within objects is based on the space-time-spin group SL(2,C). Such topological objects possess an homotopy structure encoded in their fundamental group, and the related SL(2,C) multivariate polynomial character variety contains a plethora of singularities somehow analogous to the frequency spectrum in time structures. Our approach is applied to a model of quantum computing based on an Akbulut cork in exotic R4, to an hyperbolic model of topological quantum computing based on magic states and to microRNAs in genetics. Such diverse topics reveal the manifold of possibilities of using the concept of a scheme spectrum.

Published

2023

3. An Integral Expression for Pi Obtained by Virtue of Ramanujan’s Approximation in Conoidal Areas: Applications of the Resultant Figure in Engineering

Author

Joseph Cabeza Lainez

Subjects

geometry_topology

Abstract

unlike the volume, the expression for the surface area of a regular conoid has not yet been obtained by means of direct integration or a differential geometry procedure. As this non-developable form is relatively used in engineering, the difficulty to determine its surface, represents a serious shortcoming for several problems which arise in radiative transfer, lighting and construction, to cite just a few. In order to solve the problem, I conceived the surface as a set of linearly dwindling ellipses which remain parallel to a circular directrix, a typical problem appears when searching the length of such ellipses. I employed a new procedure which, in principle, consists in dividing the surface into infinitesimal elliptic strips to which we have successively applied Ramanujan’s second approximation for the longitude of the ellipse. In this manner, we can obtain the perimeter of any transversal curve pertaining to the said form as a function of the radius of the directrix and the position of the ellipse’s center on the X-axis. Integrating the so-found perimeters of the differential strips for the whole span of the conoid, an unexpected solution emerges through the newly found number psi (ψ) which seems like a refined approximation to the third decimal of Pi but derived from a definite integral equation. As the strips are in truth slanted in the symmetry axis, their width is not uniform and we need to perform some adjustments in order to complete the problem with sufficient precision, but this is discussed separately in the annexes. Relevant implications for mathematical symmetry applied to multifarious architectural and engineering forms can be derived from this finding

Published

2023

4. WEA: A Node Importance Algorithm in Weighted Networks

Author

Na Zhao, Linjie Chen, Jie Li, Zhen Long, Ming Jing, and Jian Wang

Subjects

geometry_topology

Abstract

The heterogeneous structure implies that a few nodes may be crucial in maintaining network structural and functional properties. Identifying these crucial nodes correctly and quickly is a primary issue as contemporarily may face the mushrooming of large-scale datasets. Besides, the ‘weight issue’ is always ignored in this field which edge weight may play a positive/negative role in contributing to the node importance in different weighted networks. This paper provides a novel algorithm, Weighted Expectation Algorithm (WEA), which aims to ensure accuracy and speed of computation by taking advantage of dynamic programming to better handle the task of large-scale networks. Additionally, the weight issue that edge weights may contribute differently is addressed by a simply quantitative definition. Two standard experiments show WEA can maintain the network structure in connectivity well (by the lowest average robustness 0.192) and identify the node importance better in the spreading function test of spreading dynamics (by the highest average Kendall’s tau-b 0.678). In addition, the time complexities of different algo-rithms are evaluated, and their time-consuming are tested, proving that WEA consumes a rela-tively short time.

Published

2023

5. Modeling of (n, m) Type Minkowski Pythagorean Hodograph Curves with Hopf Map and Applications

Author

Aziz Yazla and Muhammed Talat Sarıaydın

Subjects

geometry_topology

Abstract

In present paper, spatial Minkowski Pythagorean Hodograph (MPH) curves are characterized with Rational Rotation Minimizing Frames (RRMFs). We define Euler-Rodrigues Frame (ERF) for MPH curves and by means of this concept, we reach the definition of MPH curves of type (n, m). Expressing the conditions provided by these curves in the form of Minkowski-Hopf map that we define, it is aimed to establish a connection with the Lorentz force which occurs during the process of Computer Numerical Control (CNC) type sinker Electronic Discharge Machines (EDMs). This approach is reinforced by split quaternion polynomials. Finally, we give conditons satisfied by MPH curves of low degree to be type (n, m) and construct illustrative examples.

Published

2023

6. Volumes and surfaces of $n$-simplices, $n$-orthoplices, $n$-cubes, and $n$-balls are holomorphic functions of $n$, which makes those objects omnidimensional

Author

Szymon Łukaszyk

Subjects

geometry_topology

Abstract

The study shows that the volumes and surfaces of the $n$-simplices, $n$-orthoplices, $n$-cubes, and $n$-balls are holomorphic functions of $n$, which makes those objects omnidimensional. Furthermore, the volume of an $n$-simplex is shown to be a bivalued function of $n$, and thus the surfaces of $n$-simplices and $n$-orthoplices are also bivalued functions of $n$. Applications of these formulas to the omnidimensional polytopes inscribed in and circumscribed about $n$-balls reveal previously unknown properties of these geometric objects in negative dimensions. In particular, for $0 < n < 1$, the volumes of the omnidimensional polytopes are larger than those of circumscribing $n$-balls, while their volumes and surfaces are smaller than the volumes of inscribed $n$-balls. Reflection relations around $n = 0$ for volumes and surfaces of these polytopes inscribed in and circumscribed about $n$-balls are disclosed. Specific products and quotients of volumes and surfaces of the omnidimensional polytopes and $n$-balls are shown to be independent of the gamma function.

Published

2022

7. Esakia Duality for Heyting Small Spaces

Author

Artur Piękosz

Subjects

geometry_topology, Physics and Astronomy (miscellaneous), Chemistry (miscellaneous), General Mathematics, Computer Science (miscellaneous), Esakia Duality, small space, spectral space, Heyting algebra, tame topology

Abstract

We continue our research plan of developing the theory of small and locally small spaces, proposing this theory as a realisation of Grothendieck’s idea of tame topology on the level of general topology. In this paper, we develop the theory of Heyting small spaces and prove a new version of Esakia Duality for such spaces. To do this, we notice that spectral spaces may be seen as sober small spaces with all smops compact and introduce the method of the standard spectralification. This helps to understand open continuous definable mappings between definable spaces over o-minimal structures.

Published

2022

8. Fricke Topological Qubits

Author

Michel Planat, David Chester, Marcelo M. Amaral, and Klee Irwin

Subjects

geometry_topology, Physics and Astronomy (miscellaneous), Astronomy and Astrophysics, Statistical and Nonlinear Physics, topological quantum computing, SL(2,ℂ) character variety, knot theory, Atomic and Molecular Physics, and Optics

Abstract

We recently proposed that topological quantum computing might be based on $SL(2,\mathbb{C})$ representations of the fundamental group $\pi_1(S^3\setminus K)$ for the complement of a link $K$ in the $3$-sphere. The restriction to links whose associated $SL(2,\mathbb{C})$ character variety $\mathcal{V}$ contains a Fricke surface $\kappa_d=xyz -x^2-y^2-z^2+d$ is desirable due to the connection of Fricke spaces to elementary topology. Taking $K$ as the Hopf link $L2a1$, one of the three arithmetic two-bridge links [the Whitehead link $5_1^2$, the Berge link $6_2^2$, the double-eight link $6_3^2$] or the link $7_3^2$, the $\mathcal{V}$ for those links contains the reducible component $\kappa_4$, the so-called Cayley cubic. In addition, the $\mathcal{V}$ for the later two links contains the irreducible component $\kappa_3$, or $\kappa_2$, respectively. Taking $\rho$ to be a representation with character $\kappa_d$ ($d

Published

2022

9. On the Basic Convex Polytopes and n-Balls in Complex Dimensions

Author

Szymon Łukaszyk

Subjects

geometry_topology

Abstract

This paper extends the findings of the prior research concerning n-balls, regular n-simplices, and n-orthoplices in real dimensions using recurrence relations that removed the indefiniteness present in known formulas. The main result of this paper is a proof that these recurrence relations are continuous for complex n, wherein the volume of an n-simplex is a multivalued function for n < 0, and thus the surfaces of n-simplices and n-orthoplices are also multivalued functions for n < 1. Applications of these formulas to n-simplices, n-orthoplices, and n-cubes inscribed in and circumscribed about n-balls reveal previously unknown properties of these geometric objects in negative, real dimensions. In particular, it is shown that the volume and surface of a regular n-simplex inscribed in an n-ball are complex for −1 < n < 0, imaginary for n < −1, and divergent with decreasing n; the volume and surface of a regular n-simplex circumscribed about an n-ball is complex for n < 0 and left-handedly respectively convergent to zero or divergent towards infinity; and the volume and surface of an n-orthoplex circumscribed about an n-ball is complex for n < 0 and oscillatory divergent towards infinity with decreasing n.

Published

2022

10. Some Tightness-Type Properties of the Space of Permutation Degree

Author

Anvar Sadullaev, Ljubisa Kocinac, and Farkhod Mukhamadiev

Subjects

geometry_topology

Abstract

In this paper we prove that if the product $X^{n}$ of a space $X$ has some tightness-type properties, then the space of permutation degree ${\sf SP^{n}}X$ also has these properties. It is proved that the set tightness (resp. $T$-tightness) of the space of permutation degree ${\sf SP^{n}}X$ is equal to the set tightness (resp. $T$-tightness) of the product $X^{n}$.

Published

2022

11. Novel Recurrence Relations for Volumes and Surfaces of N-Balls, Regular N-Simplices, and N-Orthoplices in Real Dimensions

Author

Szymon Łukaszyk

Subjects

geometry_topology, General Mathematics, regular convex polytopes, negative dimensions, fractal dimensions, complex dimensions, Computer Science (miscellaneous), Engineering (miscellaneous)

Abstract

This study examines n-balls, n-simplices, and n-orthoplices in real dimensions using novel recurrence relations that remove the indefiniteness present in known formulas. They show that in the negative, integer dimensions, the volumes of n-balls are zero if n is even, positive if n = −4k − 1, and negative if n = −4k − 3, for natural k. The volumes and surfaces of n-cubes inscribed in n-balls in negative dimensions are complex, wherein for negative, integer dimensions they are associated with integral powers of the imaginary unit. The relations are continuous for n ∈ ℝ and show that the constant of π is absent for 0 ≤ n < 2. For n < −1, self-dual n-simplices are undefined in the negative, integer dimensions, and their volumes and surfaces are imaginary in the negative, fractional ones and divergent with decreasing n. In the negative, integer dimensions, n-orthoplices reduce to the empty set, and their real volumes and imaginary surfaces are divergent in negative, fractional ones with decreasing n. Out of three regular, convex polytopes present in all natural dimensions, only n-orthoplices and n-cubes (and n-balls) are defined in the negative, integer dimensions.

Published

2022

12. Novel recurrence relations for volumes and surfaces of n-balls, regular n-simplices, and n-orthoplices in integer dimensions

Author

Szymon Łukaszyk

Subjects

geometry_topology

Abstract

New recurrence relations for n-balls, regular n-simplices, and n-orthoplices in integer dimensions are submitted. They remove indefiniteness present in known formulas. In negative, integer dimensions volumes of n-balls are zero if n is even, positive if n = -4k - 1, and negative if n = -4k - 3, for natural k. Volumes and surfaces of n-cubes inscribed in n-balls in negative dimensions are complex, wherein for negative, integer dimensions they are associated with integral powers of the imaginary unit. The relations are continuous for n Î ℝ and show that the constant of π is absent for 0 ≤ n < 2. For n < -1 self-dual n-simplices are undefined in negative, integer dimensions and their volumes and surfaces are imaginary in negative, fractional ones, and divergent with decreasing n. In negative, integer dimensions n-orthoplices reduce to the empty set, and their real volumes and imaginary surfaces are divergent in negative, fractional ones with decreasing n. Out of three regular, convex polytopes present in all non-negative dimensions, only n-orthoplices, n-cubes (and n-balls) are defined in negative, integer dimensions.

Published

2022

13. Character Varieties and Algebraic Surfaces for the Topology of Quantum Computing

Author

Michel Planat, Marcelo M. Amaral, Fang Fang, David Chester, Raymond Aschheim, and Klee Irwin

Subjects

geometry_topology, Quantum Physics, Physics and Astronomy (miscellaneous), Chemistry (miscellaneous), General Mathematics, Computer Science (miscellaneous), FOS: Physical sciences, Quantum Physics (quant-ph), SL2(ℂ) character varieties, algebraic surfaces, magic state quantum computing, topological quantum computing, aperiodicity

Abstract

It is shown that the representation theory of some finitely presented groups thanks to their $SL_2(\mathbb{C})$ character variety is related to algebraic surfaces. We make use of the Enriques-Kodaira classification of algebraic surfaces and the related topological tools to make such surfaces explicit. We study the connection of $SL_2(\mathbb{C})$ character varieties to topological quantum computing (TQC) as an alternative to the concept of anyons. The Hopf link $H$, whose character variety is a Del Pezzo surface $f_H$ (the trace of the commutator), is the kernel of our view of TQC. Qutrit and two-qubit magic state computing, derived from the trefoil knot in our previous work, may be seen as TQC from the Hopf link. The character variety of some two-generator Bianchi groups as well as that of the fundamental group for the singular fibers $\tilde{E}_6$ and $\tilde{D}_4$ contain $f_H$. A surface birationally equivalent to a $K_3$ surface is another compound of their character varieties., Comment: 12 pages

Published

2022

14. Omnidimensional Convex Polytopes

Author

Szymon Łukaszyk and Andrzej Tomski

Subjects

geometry_topology, regular basic convex polytopes, circumscribed and inscribed polytopes, negative dimensions, fractal dimensions, complex dimensions, emergent dimensionality, mathematical physics, Physics and Astronomy (miscellaneous), Chemistry (miscellaneous), General Mathematics, Computer Science (miscellaneous)

Abstract

The study shows that the volumes and surfaces of $n$-balls, $n$-simplices, and $n$-orthoplices are holomorphic functions of $n$, which makes those objects omnidimensional, that is well defined in any complex dimension. Applications of these formulas to the omnidimensional polytopes inscribed in and circumscribed about $n$-balls reveal previously unknown properties of these geometric objects. In particular, for $0 < n < 1$, the volumes of the omnidimensional polytopes are larger than those of circumscribing $n$-balls, and both their volumes and surfaces are smaller than those of inscribed $n$-balls. The surface of an $n$-simplex circumscribing unit diameter $n$-ball is spirally convergent to zero with real $n$ approaching negative infinity but first has a local maximum at $n=-3.5$. The surface of an $n$-orthoplex circumscribing unit diameter $n$-ball is spirally divergent with real $n$ approaching negative infinity but first has a local minimum at $n=-1.5$, where its real and imaginary parts are equal to each other; similarly, as its volume, where the similar local minimum occurs at $n=-3.5$. Reflection functions for volumes and surfaces of these polytopes inscribed in and circumscribed about $n$-balls are proposed. symmetries of products and quotients of volumes in complex dimensions $n$ and $-n$ and of surfaces in complex dimensions $n$ and $2-n$ are shown to be independent of the metric factor and the gamma function. Specific symmetries also hold between volumes and surfaces in dimensions $n = -1/2$ and $n = 1/2$.

Published

2023

15. On the Omnidimensional Convex Polytopes and n-Balls in Negative, Fractional, and Complex Dimensions

Author

Szymon Łukaszyk

Subjects

geometry_topology

Abstract

The study shows that the recurrence relations defining volumes and surfaces of omnidimensional convex polytopes and n-balls are continuous and defined for complex n, whereas in the indefinite points their values are given in the sense of a limit of a function. The volume of an n-simplex is a bivalued function for n < 0, and thus the surfaces of n-simplices and n-orthoplices are also bivalued functions for n < 1. Applications of these formulas to the omnidimensional polytopes inscribed in and circumscribed about n-balls reveal previously unknown properties of these geometric objects in negative, real dimensions. In particular for 0 < n < 1 the volumes of the omnidimensional polytopes are larger than the volumes of circumscribing n-balls, while their volumes and surfaces are smaller than the volumes of inscribed n-balls. Specific products and quotients of volumes and surfaces of the omnidimensional polytopes and n-balls are shown to be independent of the gamma function.

Published

2022

16. GeoSPARQL 1.1: An Almost Decadal Update to the Most Important Geospatial LOD Standard

Author

Timo Homburg and Nicholas John Car

Subjects

geometry_topology, Information retrieval, Geospatial analysis, Computer science, computer.file_format, GeoSPARQL, RDF, Ontology (information science), computer.software_genre, computer, Semantic Web

Abstract

In 2012 the Open Geospatial Consortium published GeoSPARQL defining “an RDF/OWL ontology for [spatial] information”, “SPARQL extension functions” for performing spatial operations on RDF data and “RIF rules” defining entailments to be drawn from graph pattern matching. In the 8+ years since its publication, GeoSPARQL has become the most important spatial Semantic Web standard, as judged by references to it in other Semantic Web standards and its wide use for Semantic Web data. An update to GeoSPARQL was proposed in 2019 to deliver a version 1.1 with a charter to: handle outstanding change requests and source new ones from the user community and to “better present” the standard, that is to better link all the standard’s parts and better document & exemplify elements. Expected updates included new geometry representations, alignments to other ontologies, handling of new spatial referencing systems, and new artifact presentation. In this paper, we describe motivating change requests and actual resultant updates in the candidate version 1.1 of the standard alongside reference implementations and usage examples. We also describe the theory behind particular updates, initial implementations of many parts of the standard, and our expectations for GeoSPARQL 1.1’s use.

Published

2021

17. A Formalization of the Concept of a Numeral System

Author

Boris Averbukh

Subjects

geometry_topology, Algebra, Numeral system, Computer science, Topological monoid, Computer Science::Formal Languages and Automata Theory

Abstract

We consider finite and unconditionally convergent infinite expansions of elements of a given topological monoid G in some base B c G as words of the alphabet B, identify insignificantly different words and define a multiplication and a topology on the set of classes of these words. Classical numeral systems are particular cases of this construction. Then we study algebraic and topological properties of the obtained monoid and, for some cases, find conditions under which it is canonically topologically isomorphic to the initial one.

Published

2021

18. Function Representation for Basic Processes Modeling in 3D Bioprinting

Author

Katherine Alex Pakhomova, Alexander Pasko, and Iskander Shaukatovich Akhatov

Subjects

geometry_topology, Modeling and simulation, 3D bioprinting, Implicit function, law, Computer science, Function representation, Topology, Geometry and topology, law.invention, Cellular necrosis

Abstract

We propose a non-invasive approach to control the quality of spheroids and their fusion into a complex bioconstruct. The proposed method is based on the union of the nutrient concentration change calculated using Fick's law and the "reaction-diffusion" equations, taking into account absorption coefficient with specifying the exact fusion geometry using implicit Function Repre-sentation (FRep) functions. The proposed approach allows us to analyze the viability of cells within the spheroid, predict the fusion of spheroids, and accurately model complex heteroge-neous biostructures as a future task for our research. These results will significantly accelerate the development of such a promising field of additive biotechnologies as 3D bioprinting.

Published

2021

19. B-Lift Curves in Euclidean 3-space

Author

Mustafa Çalışkan and Anıl Altınkaya

Subjects

Lift (force), geometry_topology, Quantitative Biology::Biomolecules, Euclidean geometry, Mathematical analysis, Mathematics::Differential Geometry, Space (mathematics), algebra_number_theory, Mathematics

Abstract

In this study, we introduce a new type curve in 3-dimensional space which called B-lift curve and we obtain the Frenet operators of the B-lift curve. Moreover, we consider the correpondence of Frenet operators between the Blift curve and the natural lift curve. Finally, we investigate the B-lift curve according to the main curve is slant helix or darboux helix.

Published

2021

20. Calculating the Segmented Helix Formed by Repetitions of Identical Subunits thereby Generating a Zoo of Platonic Helices

Author

Robert Read

Subjects

geometry_topology, Quantitative Biology::Biomolecules, General Mathematics, Computer Science (miscellaneous), solid geometry, helix, Chasles’ theorem, platonic helix, tetrahelix, linear algebra, computer graphics, Engineering (miscellaneous)

Abstract

Eric Lord has observed: “In nature, helical structures arise when identical structural subunits combine sequentially, the orientational and translational relation between each unit and its predecessor remaining constant.” This paper proves Lord’s Observation. Constant-time algorithms are given for the segmented helix generated from the intrinsic properties of a stacked object and its conjoining rule. Standard results from screw theory and previous work are combined with corollaries of Lord’s observation to allow calculations of segmented helices from either transformation matrices or four known consecutive points. The construction of these from the intrinsic properties of the rule for conjoining repeated subunits of arbitrary shape is provided, allowing the complete parameters describing the unique segmented helix generated by arbitrary stackings to be easily calculated. Free-libre open-source interactive software and a website is provided which performs this computation for arbitrary prisms along with interactive 3D visualization . We prove that any subunit can produce a toroid-like helix or a maximally-extended helix, forming a continuous spectrum based on joint-face normal twist. This software, website and paper, taken together, compute, render, and catalog an exhaustive “zoo” of 28 uniquely-shaped platonic helices, such as the Boerdijk-Coxeter tetrahelix and various species of helices formed from dodecahedra.

Published

2022

21. A Spatially Bounded Airspace Axiom

Author

Peter Szabó, Miroslava Ferencová, and Monika Blišťanová

Subjects

geometry_topology, Algebra and Number Theory, Logic, ComputerApplications_COMPUTERSINOTHERSYSTEMS, Geometry and Topology, airspace axiom, simple airspace polygon, free route airspace, Earth-centered Earth-fixed, Mathematical Physics, Analysis

Abstract

Free Route Airspace (FRA), a new concept implemented across European airspace, is designed to eliminate the adverse effects of air traffic, reduce fuel consumption, simplify and expand flight planning. In our research, we model FRA system by using graph theory and we use networks and convex analysis to study it. We work with 2-dimensional space defined by latitude a longitude. We know that the basic mathematical properties of a scientific discipline can be expressed using mathematical axioms. Therefore, in our work, we sought to answer the question, what are the basic mathematical properties of airspace? We found a mathematical object that can describe airspace in general. Using this object, we uttered an axiom describing airspace. Our axiom is given by means of practical, significant entry and entry-exit points in the airspace.

Published

2022

22. Theory of g-Tg-Derived and g-Tg-Coderived Operators: Definitions, Essential Properties, Iterations, and Ranks

Author

KHODABOCUS, Mohammad Irshad and SOOKIA, Noor-Ul-Hacq

Subjects

geometry_topology

Abstract

In a generalized topological space Tg = (Ω, Tg) (Tg-space), the g-topology Tg : P (Ω) −→ P (Ω) can be characterized in the generalized sense by specifying the generalized open, generalized closed sets (g-Tg-open, g-Tg-closed sets), generalized interior, generalized closure operators g-Intg, g-Clg : P (Ω) −→ P (Ω) (g-Tg-interior, g-Tg-closure operators), or generalized derived, generalized coderived operators g-Derg, g-Codg : P (Ω) −→ P (Ω) (g-Tg-derived, g-Tg-coderived operators), respectively. For very many Tg-spaces, the δth-iterates g-Derg(δ), g-Codg(δ) : P (Ω) −→ P (Ω) of g-Derg, g-Codg : P (Ω) −→ P (Ω), respectively, defined by transfinite recursion on the class of successor ordinals are also themselves g-Tg-derived, g-Tg-coderived operators for new g-topologies in the generalized sense on Ω. Thus, the use of novel definitions of g-Tg-derived, g-Tg-coderived operators g-Derg, g-Codg : P (Ω) −→ P (Ω), respectively, based on a very clever construction, together with their δth-iterates g-Tg-operators g-Derg(δ), g-Codg(δ) : P (Ω) −→ P (Ω), defined by transfinite recursion on the class of successor ordinals, will give rise to novel generalized g-topologies on Ω. The present authors have been actively engaged in the study of g-Tg-operators in Tg-spaces. The study of the essential properties and the commutativity of novel definitions of g-Tg-interior and g-Tg-closure operators g-Intg, g-Clg : P (Ω) −→ P (Ω), respectively, in Tg has formed the first part, and the study of the essential properties and sets of consistent, independent axioms of novel definitions of g-Tg-exterior and g-Tg-frontier operators g-Extg, g-Frg : P (Ω) −→ P (Ω), respectively, has formed the second part. In this work, which forms the last part on the theory of g-Tg-operators in Tg-spaces, the present authors propose to present novel definitions and the study of the essential properties of g-Tg-derived and g-Tg-coderived operators g-Derg, g-Codg : P (Ω) −→ P (Ω), respectively, and their δth-iterates, and the notions of g-Tg-open and g-Tg-closed sets of ranks δ in Tg-spaces.

Published

2020

23. Four-Dimensional Almost Einstein Manifolds with Skew-Circulant Structres

Author

Dimitar Razpopov and Iva Dokuzova

Subjects

geometry_topology, Pure mathematics, Skew, Lie group, Einstein manifold, Riemannian manifold, Mathematics::Geometric Topology, symbols.namesake, symbols, Mathematics::Differential Geometry, Einstein, Mathematics::Symplectic Geometry, Circulant matrix, Ricci curvature, Mathematics

Abstract

We consider a four-dimensional Riemannian manifold M equipped with an additional tensor structure S, whose fourth power is minus identity and the second power is an almost complex structure. In a local coordinate system the components of the metric g and the structure S form skew-circulant matrices. Both structures S and g are compatible, such that an isometry is induced in every tangent space of M. By a special identity for the curvature tensor, generated by the Riemannian connection of g, we determine classes of an Einstein manifolds and an almost Einstein manifolds. For such manifolds we obtain propositions for the sectional curvatures of some special 2-planes in a tangent space of M. We consider an almost Hermitian manifold associated with the studied manifold and find conditions for g, under which it is a Kähler manifold. We construct some examples of the considered manifolds on Lie groups.

Published

2020

24. Theory of g-Tg-Exterior and g-Tg-Frontier Operators: Definitions, Essential Properties and, Consistent, Independent Axioms

Author

Noor-Ul-Hacq Sookia and Mohammad Irshad Khodabocus

Subjects

geometry_topology, Pure mathematics, Frontier, Axiom, Mathematics

Abstract

In a generalized topological space Tg = (Ω, Tg), generalized interior and generalized closure operators g-Intg, g-Clg : P (Ω) −→ P (Ω), respectively, are merely two of a number of generalized primitive operators which may be employed to topologize the underlying set Ω in the generalized sense. Generalized exterior and generalized frontier operators g-Extg, g-Frg : P (Ω) −→ P (Ω), respectively, are other generalized primitive operators by means of which characterizations of generalized operations under g-Intg, g-Clg : P (Ω) −→ P (Ω) can be given without even realizing generalized interior and generalized closure operations first in order to topologize Ω in the generalized sense. In a recent work, the present authors have defined novel types of generalized interior and generalized closure operators g-Intg, g-Clg : P (Ω) −→ P (Ω), respectively, in Tg and studied their essential properties and commutativity. In this work, they propose to present novel definitions of generalized exterior and generalized frontier operators g-Extg, g-Frg : P (Ω) −→ P (Ω), respectively, a set of consistent, independent axioms after studying their essential properties, and established further characterizations of generalized operations under g-Intg, g-Clg : P (Ω) −→ P (Ω) in Tg.

Published

2020

25. Complexes of Tournaments, Directionality Filtrations and Persistent Homology

Author

Ran Levi, Dejan Govc, and Jason P. Smith

Subjects

geometry_topology, 0301 basic medicine, Persistent homology, Digital reconstruction, Graph dynamics, Digraph, Computational biology, Biology, Algebraic topology, Computer Science::Digital Libraries, Combinatorics, 03 medical and health sciences, 030104 developmental biology, 0302 clinical medicine, Computer Science::Mathematical Software, FOS: Mathematics, Graph (abstract data type), Directionality, Algebraic Topology (math.AT), 55U10, Mathematics - Algebraic Topology, 030217 neurology & neurosurgery, Mathematics, Flag (geometry)

Abstract

Complete digraphs are referred to in the combinatorics literature as tournaments. We consider a family of semi-simplicial complexes, that we refer to as "tournaplexes", whose simplices are tournaments. In particular, given a digraph $\mathcal{G}$, we associate with it a "flag tournaplex" which is a tournaplex containing the directed flag complex of $\mathcal{G}$, but also the geometric realisation of cliques that are not directed. We define several types of filtrations on tournaplexes, and exploiting persistent homology, we observe that flag tournaplexes provide finer means of distinguishing graph dynamics than the directed flag complex. We then demonstrate the power of these ideas by applying them to graph data arising from the Blue Brain Project's digital reconstruction of a rat's neocortex., 22 pages, 9 figures

Published

2020

26. Some Applications of Clifford Algebra in Geometry

Author

Gu, Ying-Qiu

Subjects

geometry_topology, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION

Abstract

In this paper, we provide some enlightening examples of the application of Clifford algebra in geometry, which show the concise representation, simple calculation and profound insight of this algebra. The definition of Clifford algebra implies geometric concepts such as vector, length, angle, area and volume, and unifies the calculus of scalar, spinor, vector and tensor, so that it is able to naturally describe all variables and calculus in geometry and physics. Clifford algebra unifies and generalizes real number, complex, quaternion and vector algebra, converts complicated relations and operations into intuitive matrix algebra independent of coordinate systems. By localizing the basis or frame of space-time and introducing differential and connection operators, Clifford algebra also contains Riemann geometry. Clifford algebra provides a unified, standard, elegant and open language and tools for numerous complicated mathematical and physical theories. Clifford algebra calculus is an arithmetic-like operation that can be well understood by everyone. This feature is very useful for teaching purposes, and popularizing Clifford algebra in high schools and universities will greatly improve the efficiency of students to learn fundamental knowledge of mathematics and physics. So Clifford algebra can be expected to complete a new big synthesis of scientific knowledge.

Published

2020

27. A Topological Approach to Infinity in Physics

Author

Arturo Tozzi and James F. Peters

Subjects

geometry_topology, Physics, Theoretical physics, media_common.quotation_subject, Physical geometry, Infinity, media_common

Abstract

Physical measurements might display range values extending towards infinite. The occurrence of infinity in physical equations, such as the black hole singularities, is a troublesome issue that causes many theories to break down when assessing extreme events. Different methods, such as re-normalization, have been proposed to avoid detrimental infinity. Here a novel technique is proposed, based on physical geometrical considerations and the Alexander Horned sphere, that permits to undermine infinity in physical equations. In this unconventional approach, a continuous monodimensional line becomes an assembly of countless bidimensional lines that superimpose in quantifiable knots and bifurcations.

Published

2020

28. Almost Hypercomplex Manifolds with Hermitian-Norden Metrics and 4-dimensional Indecomposable Real Lie Algebras Depending on One Parameter

Author

Hristo Manev

Subjects

geometry_topology, Pure mathematics, Hypercomplex number, 010102 general mathematics, 0211 other engineering and technologies, Structure (category theory), Lie group, 02 engineering and technology, 01 natural sciences, Hermitian matrix, Lie algebra, Hermitian manifold, Geometry and Topology, Mathematics::Differential Geometry, 0101 mathematics, Indecomposable module, 021101 geological & geomatics engineering, Mathematics

Abstract

We study almost hypercomplex structure with Hermitian-Norden metrics on 4-dimensional Lie groups considered as smooth manifolds. All the basic classes of a classification of 4-dimensional indecomposable real Lie algebras depending on one parameter are investigated. There are studied some geometrical characteristics of the respective almost hypercomplex manifolds with Hermitian-Norden metrics.

Published

2020

29. Quantum Computation and Measurements from an Exotic Space-Time R4

Author

Raymond Aschheim, Marcelo M. Amaral, Klee Irwin, Michel Planat, Franche-Comté Électronique Mécanique, Thermique et Optique - Sciences et Technologies (UMR 6174) (FEMTO-ST), Université de Technologie de Belfort-Montbeliard (UTBM)-Ecole Nationale Supérieure de Mécanique et des Microtechniques (ENSMM)-Centre National de la Recherche Scientifique (CNRS)-Université de Franche-Comté (UFC), Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC), Quantum Gravity Research (Quantum Gravity Research), Université de Technologie de Belfort-Montbeliard (UTBM)-Ecole Nationale Supérieure de Mécanique et des Microtechniques (ENSMM)-Université de Franche-Comté (UFC), and Université Bourgogne Franche-Comté [COMUE] (UBFC)-Université Bourgogne Franche-Comté [COMUE] (UBFC)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Fundamental group, Pure mathematics, Physics and Astronomy (miscellaneous), General Mathematics, [PHYS.MPHY]Physics [physics]/Mathematical Physics [math-ph], FOS: Physical sciences, 02 engineering and technology, 01 natural sciences, Topological quantum computer, topological quantum computing, fundamental group, [SPI.MAT]Engineering Sciences [physics]/Materials, Mathematics - Geometric Topology, Mathematics::Group Theory, 81P68, 57R65, 57M05, 32Q55, 57M25, 14H30, Grassmannian, 4-manifolds, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Finite geometry, FOS: Mathematics, Cayley–Dickson algebras, akbulut cork, [SPI.NANO]Engineering Sciences [physics]/Micro and nanotechnologies/Microelectronics, Quantum computer, Physics, geometry_topology, [SPI.ACOU]Engineering Sciences [physics]/Acoustics [physics.class-ph], Quantum Physics, 010308 nuclear & particles physics, lcsh:Mathematics, Geometric Topology (math.GT), lcsh:QA1-939, Chemistry (miscellaneous), finite geometry, Free group, Coset, Quantum gravity, 020201 artificial intelligence & image processing, Quantum Physics (quant-ph), exotic R4

Abstract

The authors previously found a model of universal quantum computation by making use of the coset structure of subgroups of a free group G with relations. A valid subgroup H of index d in G leads to a &lsquo, magic&rsquo, state &psi, in d-dimensional Hilbert space that encodes a minimal informationally complete quantum measurement (or MIC), possibly carrying a finite &lsquo, contextual&rsquo, geometry. In the present work, we choose G as the fundamental group &pi, 1 ( V ) of an exotic 4-manifold V, more precisely a &lsquo, small exotic&rsquo, (space-time) R 4 (that is homeomorphic and isometric, but not diffeomorphic to the Euclidean R 4 ). Our selected example, due to S. Akbulut and R. E. Gompf, has two remarkable properties: (a) it shows the occurrence of standard contextual geometries such as the Fano plane (at index 7), Mermin&rsquo, s pentagram (at index 10), the two-qubit commutation picture G Q ( 2 , 2 ) (at index 15), and the combinatorial Grassmannian Gr ( 2 , 8 ) (at index 28), and (b) it allows the interpretation of MICs measurements as arising from such exotic (space-time) R 4 s. Our new picture relating a topological quantum computing and exotic space-time is also intended to become an approach of &lsquo, quantum gravity&rsquo

Published

2020

30. Completeness in quasi-pseudometric spaces

Author

Cobzas, Ştefan

Subjects

geometry_topology, General Mathematics (math.GM), FOS: Mathematics, 46S99 54E15 54E25 54E50, Mathematics - General Mathematics

Abstract

The aim of this paper is to discus the relations between various notions of sequential completeness and the corresponding notions of completeness by nets or by filters in the setting of quasi-metric spaces. We propose a new definition of right $K$-Cauchy net in a quasi-metric space for which the corresponding completeness is equivalent to the sequential completeness. In this way we complete some results of R.~A. Stoltenberg, Proc. London Math. Soc. \textbf{17} (1967), 226--240, and V.~Gregori and J.~Ferrer, Proc. Lond. Math. Soc., III Ser., \textbf{49} (1984), 36., Comment: 19 p, entirely revised, a new notion of Cauchy net proposed

Published

2020

31. Separation Axioms Interval-Valued Fuzzy Soft Topology via Quasi-Neighbourhood Structure

Author

Mabruka Ali, Adem Kilicman, and Azadeh Zahedi Khameneh

Subjects

geometry_topology, Structure (category theory), Topology, Fuzzy logic, Neighbourhood (mathematics), Interval valued, Topology (chemistry), Mathematics, Separation axiom

Abstract

In this study, we present the concept of interval-valued fuzzy soft point and then introduce the notions of neighborhood and quasi-neighbourhood of it in interval-valued fuzzy soft topological spaces. Separation axioms in interval-valued fuzzy soft topology, so-called $q$-$T_{i}$ for $ i=0,1,2,3,4 ,$ is introduced and some of its basic properties are also studied.

Published

2019

32. Theory of g-Tg-Interior and g-Tg-Closure Operators: Definitions, Essential Properties, and Commutativity

Author

Noor-Ul-Hacq Sookia and Mohammad Irshad Khodabocus

Subjects

geometry_topology, Pure mathematics, Closure (topology), Commutative property, Mathematics

Abstract

In a generalized topological space Tg = (Ω, Tg), ordinary interior and ordinary closure operators intg, clg : P (Ω) −→ P (Ω), respectively, are defined in terms of ordinary sets. In order to let these operators be as general and unified a manner as possible, and so to prove as many generalized forms of some of the most important theorems in generalized topological spaces as possible, thereby attaining desirable and interesting results, the present au- thors have defined the notions of generalized interior and generalized closure operators g-Intg, g-Clg : P (Ω) −→ P (Ω), respectively, in terms of a new class of generalized sets which they studied earlier and studied their essen- tial properties and commutativity. The outstanding result to which the study has led to is: g-Intg : P (Ω) −→ P (Ω) is finer (or, larger, stronger) than intg : P (Ω) −→ P (Ω) and g-Clg : P (Ω) −→ P (Ω) is coarser (or, smal ler, weaker) than clg : P (Ω) −→ P (Ω). The elements supporting this fact are reported therein as a source of inspiration for more generalized operations.

Published

2019

33. On the Characteristic Properties of Geodesic Sub-$ (\alpha,b,s )$-Preinvex

Author

Wedad Saleh and Adem Kilicman

Subjects

Physics, geometry_topology, Geodesic, Alpha (ethology), Mathematics::Differential Geometry, Mathematical physics

Abstract

In the present work we study the properties of geodesic sub-$ (\alpha,b,s) $-preinvex functions on Hadamard manifolds and establish some basic properties in both general and differential cases. Further, we study sufficient conditions of optimality and proved some new inequalities under geodesic sub-($ \alpha,b,s $)-preinvexity.

Published

2019

34. Infinitesimal Transformations of Locally Conformal Kähler Manifolds

Author

Volodymyr Berezovski, Yevhen Cherevko, Dana Smetanová, and Irena Hinterleitner

Subjects

geometry_topology, Pure mathematics, Group (mathematics), Infinitesimal, Order (group theory), Hermitian manifold, Lie derivative, Conformal map, Mathematics::Differential Geometry, Diffeomorphism, Mathematics, Homothetic transformation

Abstract

The article is devoted to infinitesimal transformations. We have obtained that LCK-manifolds do not admit nontrivial infinitesimal projective transformations. Then we study infinitesimal conformal transformations of LCK-manifolds. We have found the expression for the Lie derivative of a Lee form. Also we have obtained the system of partial differential equations for the transformations, and explored its integrability conditions. Hence we have got the necessary and sufficient conditions in order that the an LCK-manifold admits a group of conformal motions. Also we have calculated the number of parameters which the group depends on. We have proved that a group of conformal motions admitted by an LCK-manifold is isomorphic to a homothetic group admitted by corresponding K\"{a}hlerian metric. We also established that an isometric group of an LCK-manifold is isomorphic to a some subgroup of homothetic group of the coresponding local K\"{a}hlerian metric.

Published

2019

35. A Soft Embedding Lemma for Soft Topological Spaces

Author

Nordo, Giorgio

Subjects

geometry_topology, 54A40, Astrophysics::High Energy Astrophysical Phenomena, General Topology (math.GN), FOS: Mathematics, Mathematics - General Topology

Abstract

In 1999, Molodtsov initiated the theory of soft sets as a new mathematical tool for dealing with uncertainties in many fields of applied sciences. In 2011, Shabir and Naz introduced and studied the notion of soft topological spaces, also defining and investigating many new soft properties as generalization of the classical ones. In this paper, we introduce the notions of soft separation between soft points and soft closed sets in order to obtain a generalization of the well-known Embedding Lemma to the class of soft topological spaces., 23 pages. arXiv admin note: substantial text overlap with arXiv:1904.01481, arXiv:1905.12331

Published

2019

36. Theory of g-Tg-Compactness

Author

Mohammad Irshad Khodabocus and Noor-Ul-Hacq Sookia

Subjects

geometry_topology, Physics, Pure mathematics, Compact space

Abstract

Several specific types of generalized compactness of generalized topological spaces have been defined, investigated and related to compactness in ordinary topological spaces from time to time in the literature of topological spaces. Our recent research in the field of a new class of generalized compactness in a generalized topological space is reported herein as a starting point for more generalized classes.

Published

2019

37. Convexity and Toeplitz Quantization: Kostant's Theorem for the symplectomorphism group of the sphere

Author

Hadrami Bouleryah Ml

Subjects

geometry_topology, Pure mathematics, Group (mathematics), Quantization (signal processing), Majorization, Symplectomorphism, Mathematics::Representation Theory, Hermitian matrix, Spectral measure, Toeplitz matrix, Convexity, Mathematics

Abstract

In this paper we use Toeplitz quantization to extend in a very natural way Kostant's theorem for the group $SU(m)$ to the group of symplectomorphisms of the unit sphere and we also give another proof of the infinite dimensional version of Schur and Horn theorem for the sphere based on Schur and Horn theorem for Hermitian matrices.

Published

2019

38. Univalent Functions Defined by a Generalized Multipler Differential Operator

Author

Alamoush, Adnan Ghazy

Subjects

geometry_topology

Abstract

In this paper, we investigate a new subclass of univalent functions defined by a generalized differential operator, and obtain some interesting properties of functions belonging to the class Rm λµ ( α, β, γ, υ ).

Published

2019

39. The Line Element Approach for the Geometry of Poincare Disk

Author

Jong Ryul Kim

Subjects

Physics, geometry_topology, symbols.namesake, Line element, Poincaré disk model, symbols, Holomorphic function, Cross-ratio, Geometry

Abstract

The geometry of Poincare disk itself is interpreted without any mapping to dierent spaces. Our approach might be one of the shortest and is intended for educational contribution.

Published

2019

40. Classification Theorems in Minkowski 3-space

Author

Miekyung Choi and Young Ho Kim

Subjects

geometry_topology, Ruled surface, Minkowski space, Space (mathematics), Mathematics, Mathematical physics

Abstract

By generalizing the notion of pointwise 1-type Gauss map, the generalized 1-type Gauss map has been recently introduced. Without any assumption, we classified all possible ruled surfaces with generalized 1-type Gauss map in a 3-dimensional Minkowski space. In particular, null scrolls do not have the proper generalized 1-type Gauss map. In fact, it is harmonic.

Published

2018

41. Theory of g-Tg-Connectedness

Author

Mohammad Irshad Khodabocus and Noor-Ul-Hacq Sookia

Subjects

Discrete mathematics, geometry_topology, Social connectedness, Mathematics

Abstract

Several specific types of ordinary and generalized connectednessin a generalized topological space have been defined and investigated for variouspurposes from time to time in the literature of topological spaces. Ourrecent research in the field of a new type of generalized connectedness in ageneralized topological space is reported herein as a starting point for moregeneralized types.

Published

2018

42. Cut-and-Project Schemes for Pisot Family Substitution Tilings

Author

Yasushi Nagai, Shigeki Akiyama, and Jeong-Yup Lee

Subjects

geometry_topology, Pisot substitution tilings, Physics and Astronomy (miscellaneous), General Mathematics, Substitution tiling, lcsh:Mathematics, 010102 general mathematics, Spectrum (functional analysis), algebraic coincidence, Substitution (algebra), pure point spectrum, Abstract space, regular model set, lcsh:QA1-939, 01 natural sciences, Connection (mathematics), 010101 applied mathematics, Combinatorics, Unimodular matrix, Integer, Chemistry (miscellaneous), Computer Science (miscellaneous), Point (geometry), 0101 mathematics, Mathematics

Abstract

We consider Pisot family substitution tilings in R d whose dynamical spectrum is pure point. There are two cut-and-project schemes (CPSs) which arise naturally: one from the Pisot family property and the other from the pure point spectrum. The first CPS has an internal space R m for some integer m &isin, N defined from the Pisot family property, and the second CPS has an internal space H that is an abstract space defined from the condition of the pure point spectrum. However, it is not known how these two CPSs are related. Here we provide a sufficient condition to make a connection between the two CPSs. For Pisot unimodular substitution tiling in R , the two CPSs turn out to be same due to the remark by Barge-Kwapisz.

Published

2018

43. The Role of Spin(9) in Octonionic Geometry

Author

Paolo Piccinni and Maurizio Parton

Subjects

Mathematics - Differential Geometry, Clifford structure, Logic, symmetric spaces, Primary 53C26, 53C27, 53C35, 57R25, Geometry, 01 natural sciences, vector fields on spheres, 0103 physical sciences, FOS: Mathematics, Clifford system, 0101 mathematics, Mathematical Physics, Mathematics, Spin-½, Physics, geometry_topology, Algebra and Number Theory, Series (mathematics), 010308 nuclear & particles physics, lcsh:Mathematics, 010102 general mathematics, Hopf fibration, Vector fields on spheres, lcsh:QA1-939, octonions, Differential Geometry (math.DG), Torsion (algebra), Geometry and Topology, Spin(9), locally conformally parallel, Analysis

Abstract

Starting from the 2001 Thomas Friedrich's work on Spin(9), we review some interactions between Spin(9) and geometries related to octonions. Several topics are discussed in this respect: explicit descriptions of the Spin(9) canonical 8-form and its analogies with quaternionic geometry as well as the role of Spin(9) both in the classical problems of vector fields on spheres and in the geometry of the octonionic Hopf fibration. Next, we deal with locally conformally parallel Spin(9) manifolds in the framework of intrinsic torsion. Finally, we discuss applications of Clifford systems and Clifford structures to Cayley-Rosenfeld planes and to three series of Grassmannians., 25 pages

Published

2018

44. Extension of eigenvalue problems on Gauss map of ruled surfaces

Author

Miekyung Choi and Young Ho Kim

Subjects

Helicoid, Gauss map, Physics and Astronomy (miscellaneous), General Mathematics, 02 engineering and technology, 01 natural sciences, pointwise 1-type Gauss map, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), Immersion (mathematics), conical surface of G-type, Mathematics, Pointwise, geometry_topology, generalized 1-type Gauss map, Ruled surface, 010308 nuclear & particles physics, Euclidean space, Plane (geometry), lcsh:Mathematics, Mathematical analysis, ruled surface, lcsh:QA1-939, Cone (topology), Chemistry (miscellaneous), 020201 artificial intelligence & image processing, Mathematics::Differential Geometry

Abstract

A finite-type immersion or smooth map is a nice tool to classify submanifolds of Euclidean space, which comes from eigenvalue problem of immersion. The notion of generalized 1-type is a natural generalization of those of 1-type in the usual sense and pointwise 1-type. We classify ruled surfaces with generalized 1-type Gauss map as part of a plane, a circular cylinder, a cylinder over a base curve of an infinite type, a helicoid, a right cone and a conical surface of $G$-type.

Published

2018

45. A Symmetry Motivated Link Table

Author

Mariel Vazquez, Michelle Flanner, and Shawn Witte

Subjects

0301 basic medicine, link table, Physics and Astronomy (miscellaneous), Computer science, General Mathematics, chirality, knot table, Symmetry group, Type (model theory), Prime (order theory), 03 medical and health sciences, symbols.namesake, Knot (unit), writhe, Computer Science (miscellaneous), link symmetries, Link (knot theory), lattice polygons, Writhe, geometry_topology, Discrete mathematics, lcsh:Mathematics, Linking number, lcsh:QA1-939, DNA topology, 030104 developmental biology, Chemistry (miscellaneous), symbols, nomenclature, Symmetry (geometry)

Abstract

Proper identification of oriented knots and 2-component links requires a precise link nomenclature. Motivated by questions arising in DNA topology, this study aims to produce a nomenclature unambiguous with respect to link symmetries. For knots, this involves distinguishing a knot type from its mirror image. In the case of 2-component links, there are up to sixteen possible symmetry types for each link type. The study revisits the methods previously used to disambiguate chiral knots and extends them to oriented 2-component links with up to nine crossings. Monte Carlo simulations are used to report on writhe, a geometric indicator of chirality. There are ninety-two prime 2-component links with up to nine crossings. Guided by geometrical data, linking number, and the symmetry groups of 2-component links, canonical link diagrams for all but five link types (9 5 2, 9 34 2, 9 35 2, 9 39 2, and 9 41 2) are proposed. We include complete tables for prime knots with up to ten crossings and prime links with up to nine crossings. We also prove a result on the behavior of the writhe under local lattice moves.

Published

2018

46. Theory of g-Tg-Separation Axioms

Author

Noor-Ul-Hacq Sookia and Mohammad Irshad Khodabocus

Subjects

geometry_topology, Pure mathematics, Mathematics, Separation axiom

Abstract

Several specific types of ordinary and generalized separation axioms of a generalized topological space have been defined and investigated for various purposes from time to time in the literature of topological spaces. Our recent research in the field of a new class of generalized separation axioms of a generalized topological space is reported herein as a starting point for more generalized classes.

Published

2018

47. Helicoidal Hypersurfaces of Dini-Type with Spacelike Axis in Minkowski 4-Space

Author

Erhan Güler and Ömer Kişi

Subjects

Physics, geometry_topology, Gauss map, Minkowski space, Mathematics::Differential Geometry, Type (model theory), Space (mathematics), Mathematical physics

Abstract

In this paper, we define Ulisse Dini-type helicoidal hypersurface with spacelike axis in Minkowski 4-space E 1 4 . We compute the Gaussian and the mean curvature of the hypersurface. Moreover, we obtain some special symmetry to the curvatures when they are flat and maximal.

Published

2018

48. Theory of g-Tg-Maps

Author

Khodabocus, Mohammad Irshad and Sookia, Noor-Ul-Hacq

Subjects

geometry_topology

Abstract

Several specific types of generalized maps of a generalized topological space have been defined and investigated for various purposes from time to time in the literature of topological spaces. Our recent research in the field of a new class of generalized maps of a generalized topological space is reported herein as a starting point for more generalized classes.

Published

2018

49. The Third Laplace-Beltrami Operator of the Rotational Hypersurface in 4-Space

Author

Güler E

Subjects

geometry_topology, Mean curvature, Mathematics::Complex Variables, Mathematical analysis, Mathematics::Spectral Theory, Space (mathematics), symbols.namesake, Hypersurface, Mathematics::Algebraic Geometry, Laplace–Beltrami operator, Gaussian curvature, symbols, Mathematics::Differential Geometry, Mathematics

Abstract

We consider rotational hypersurface in the four dimensional Euclidean space. We calculate the mean curvature and the Gaussian curvature, and some relations of the rotational hypersurface. Moreover, we define the third Laplace-Beltrami operator and apply it to the rotational hypersurface.

Published

2018

50. Theory of g-Tg-Sets

Author

Khodabocus, Mohammad Irshad and Sookia, Noor-Ul-Hacq

Subjects

geometry_topology

Abstract

Several specific types of generalized sets of a generalized topological space have been defined and investigated for various purposes from time to time in the literature of topological spaces. Our recent research in the field of a new class of generalized sets of a generalized topological space is reported herein as a starting point for more generalized classes.

Published

2018