Showing total 2,277 results

1. On a paper of Hasse concerning the Eisenstein reciprocity law

Author

G. K. Pak, Sergei V. Vostokov, and M. A. Ivanov

Subjects

Statistics and Probability, Eisenstein reciprocity, Generalization, Mathematics::Number Theory, Applied Mathematics, General Mathematics, Law, Bibliography, Cyclotomic field, Mathematics

Abstract

In the present paper, necessary and sufficient conditions are given for the equality of the power rezidue symbols $$ {\left( {\frac{\alpha }{a}} \right)_n} $$ and $$ {\left( {\frac{\alpha }{a}} \right)_n} $$ in the cyclotomic field ℚ(ζ n ), 2 ∤ n, for a ∈ ℤ, (a, n) = 1. This result is a generalization of the classical Eisenstein reciprocity law and its continuation in a Hasse’s paper. Bibliography: 3 titles.

Published

2009

2. On a Paper by Barden

Author

A. V. Zhubr

Subjects

Statistics and Probability, Reduction (complexity), Discrete mathematics, Combinatorics, Applied Mathematics, General Mathematics, Simply connected space, Bibliography, Mathematics::Geometric Topology, Mathematics

Abstract

It is shown that an approach earlier used by the author for classification of closed simply connected 6-manifolds (reduction to the problem of calculating certain bordism groups) can also be applied for easily obtaining the results by Barden (1965) on classification of closed simply connected 5-manifolds. Bibliography: 11 titles.

Published

2004

3. Fractional Factorials and Prime Numbers (A Remark on the Paper 'On Prime Values of Some Quadratic Polynomials')

Author

A. N. Andrianov

Subjects

Statistics and Probability, Applied Mathematics, General Mathematics, 010102 general mathematics, Prime element, 01 natural sciences, Prime k-tuple, Prime (order theory), 010305 fluids & plasmas, Combinatorics, 0103 physical sciences, Prime factor, Unique prime, 0101 mathematics, Fibonacci prime, Prime power, Sphenic number, Mathematics

Abstract

Congruences mod p for a prime p and partial products of the numbers 1,…, p − 1 are obtained. Bibliography: 2 titles.

Published

2016

4. Shabat trees of diameter 4: appendix to a paper of Zvonkin

Author

B. Birch

Subjects

Statistics and Probability, Applied Mathematics, General Mathematics, Calculus, Permission, Mathematics

Abstract

This is an attachment to a letter of the author to Alexander Zvonkin (dated November 1, 1995). It is reproduced here with the kind permission of the author.

Published

2009

5. Erratum: Corrections to the paper 'geometric approach to stable homotopy groups of spheres. The adams–hopf invariants'

Author

P. M. Akhmet’ev

Subjects

Statistics and Probability, Combinatorics, Homotopy groups of spheres, n-connected, Homotopy sphere, Applied Mathematics, General Mathematics, Homotopy, Bott periodicity theorem, Regular homotopy, Mathematics

Published

2011

6. Note on my paper 'one method for approximating attractors'

Author

I. N. Kostin

Subjects

Statistics and Probability, Theoretical computer science, Applied Mathematics, General Mathematics, Attractor, Applied mathematics, Mathematics

Published

1994

7. On the Consistency Analysis of Finite Difference Approximations.

Author

Michels, D. L., Gerdt, V. P., Blinkov, Yu. A., and Lyakhov, D. A.

Subjects

NONLINEAR differential equations, PARTIAL differential equations, FINITE differences, DIFFERENTIAL equations, NAVIER-Stokes equations, APPLIED mathematics, VISCOUS flow

Abstract

Finite difference schemes are widely used in applied mathematics to numerically solve partial differential equations. However, for a given solution scheme, it is usually difficult to evaluate the quality of the underlying finite difference approximation with respect to the inheritance of algebraic properties of the differential problem under consideration. In this paper, we present an appropriate quality criterion of strong consistency for finite difference approximations to systems of nonlinear partial differential equations. This property strengthens the standard requirement of consistency of difference equations with differential ones. We use a verification algorithm for strong consistency, which is based on the computation of difference Gröbner bases. This allows for the evaluation and construction of solution schemes that preserve some fundamental algebraic properties of the system at the discrete level. We demonstrate the suggested approach by simulating a Kármán vortex street for the two-dimensional incompressible viscous flow described by the Navier–Stokes equations. [ABSTRACT FROM AUTHOR]

Published

2019

8. On the oscillation of higher-order delay differential equations.

Author

Baculíková, B., Džurina, J., and Graef, J.

Subjects

OSCILLATIONS, NUMERICAL solutions to delay differential equations, TIME delay systems, PROCESS control systems, COMPARATIVE studies, MATHEMATICAL analysis, APPLIED mathematics

Abstract

The aim of this paper is to study the asymptotic properties and oscillation of the nth-order delay differential equationThe results obtained are based on some new comparison theorems that reduce the problem of oscillation of an nth-order equation to the problem of oscillation of one or more first-order equations. We handle both casesThe comparison principles simplify the analysis of Eq. (E). [ABSTRACT FROM AUTHOR]

Published

2012

9. In memory of V. R. Fatalov.

Subjects

STOCHASTIC processes, PROBABILITY measures, APPLIED mathematics, PROBABILITY theory, WIENER processes

Published

2022

10. Nikolay Dmitrievich Kopachevsky. March 25, 1940 — May 18, 2020.

Subjects

LOW temperature physics, SCIENTIFIC method, MATHEMATICAL analysis, APPLIED mathematics, LOW temperature engineering

Published

2022

11. On Pinsker Factors for Rokhlin Entropy.

Author

Alpeev, A.

Subjects

ENTROPY (Information theory), DYNAMICAL systems, MATHEMATICAL analysis, NUMERICAL analysis, APPLIED mathematics

Abstract

In this paper, we prove that any dynamical system has a unique maximal factor of zero Rokhlin entropy, the so-called Pinsker factor. It is also proven that if the system is ergodic and this factor has no atoms, then the system is a relatively weakly mixing extension of its Pinsker factor. [ABSTRACT FROM AUTHOR]

Published

2015

12. Smoothness of Generalized Solutions of the Neumann Problem for a Strongly Elliptic Differential-Difference Equation on the Boundary of Adjacent Subdomains

Author

D. A. Neverova

Subjects

Statistics and Probability, Smoothness (probability theory), Applied Mathematics, General Mathematics, Mathematical analysis, Neumann boundary condition, Boundary (topology), Differential difference equations, General Medicine, Mathematics

Abstract

This paper is devoted to the study of the qualitative properties of solutions to boundary-value problems for strongly elliptic differential-difference equations. Some results for these equations such as existence and smoothness of generalized solutions in certain subdomains of Q were obtained earlier. Nevertheless, the smoothness of generalized solutions of such problems can be violated near the boundary of these subdomains even for infinitely differentiable right-hand side. The subdomains are defined as connected components of the set that is obtained from the domain Q by throwing out all possible shifts of the boundary Q by vectors of a certain group generated by shifts occurring in the difference operators. For the one dimensional Neumann problem for differential-difference equations there were obtained conditions on the coefficients of difference operators, under which for any continuous right-hand side there is a classical solution of the problem that coincides with the generalized solution. 2 Also there was obtained the smoothness (in Sobolev spaces W k ) of generalized solutions of the second and the third boundary-value problems for strongly elliptic differential-difference equations in subdomains excluding -neighborhoods of certain points. However, the smoothness (in Ho lder spaces) of generalized solutions of the second boundary-value problem for strongly elliptic differential-difference equations on the boundary of adjacent subdomains was not considered. In this paper, we study this question in Ho lder spaces. We establish necessary and sufficient conditions for the coefficients of difference operators that guarantee smoothness of the generalized solution on the boundary of adjacent subdomains for any right-hand side from the Ho lder space.

Published

2022

13. Generalized power functions.

Author

Kaldani, N.

Subjects

ANALYTIC functions, KERNEL functions, REPRESENTATIONS of algebras, CAUCHY problem, MATHEMATICAL expansion, APPLIED mathematics, THEORY of distributions (Functional analysis)

Abstract

In this paper some relations for the kernels of the Carleman-Vekua equation, in particular the representations of these kernels in the form of generalized power functions completely analogous to the well-known elementary Cauchy kernel expansion, are studied. The obtained results are applied to some problems of the theory of generalized analytic functions. [ABSTRACT FROM AUTHOR]

Published

2013

14. On analytic solutions of systems degenerate at a point.

Author

Jikia, V.

Subjects

SYSTEM analysis, POINT processes, ANALYTICAL solutions, SET theory, PARTIAL differential equations, DEGENERATE parabolic equations, APPLIED mathematics

Abstract

This paper deals with analytic solutions for a sufficiently wide class of systems of partial differential equations degenerate in one point. [ABSTRACT FROM AUTHOR]

Published

2013

15. On distance subgraphs of graphs in spaces of lower dimensions.

Author

Raigorodskii, A. and Titova, M.

Subjects

SUBGRAPHS, GRAPH theory, DIMENSIONAL analysis, NUMBER theory, ISOMORPHISM (Mathematics), APPLIED mathematics, MATHEMATICAL analysis

Abstract

This paper studies the problem on the frequency of the event where a graph with a fixed number of vertices contains induced subgraphs that are isomorphic to distance graphs in spaces of definite dimensions. In particular, the case of plane and three-dimensional spaces is considered. [ABSTRACT FROM AUTHOR]

Published

2012

16. Hook Formulas for Skew Shapes IV. Increasing Tableaux and Factorial Grothendieck Polynomials

Author

Morales, Alejandro H., Pak, Igor, and Panova, Greta

Subjects

Statistics and Probability, Mathematics::Combinatorics, Applied Mathematics, General Mathematics, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Mathematics::Representation Theory, 05E05, 05A15 (Primary) 05E10, 05E14, 05A20, 05A10 (Secondary)

Abstract

We present a new family of hook-length formulas for the number of standard increasing tableaux which arise in the study of factorial Grothendieck polynomials. In the case of straight shapes our formulas generalize the classical hook-length formula and Stanley's formula. For skew shapes, our formulas generalize the Naruse hook-length formula and its $q$-analogues, which were studied in previous papers of the series., Comment: 26 pages, 3 figures. This is the fourth paper in the series "Hook formulas for skew shapes", v2. expanded final remarks, added section 6.4 with a generalization of the Okounkov-Olshanski formula, fixed typos

Published

2022

17. On boundary-value problems for semi-linear equations in the plane

Author

Vladimir Gutlyanskiĭ, Vladimir Ryazanov, O.V. Nesmelova, and A.S. Yefimushkin

Subjects

Statistics and Probability, Dirichlet problem, Sobolev space, Pure mathematics, Harmonic function, Applied Mathematics, General Mathematics, Neumann boundary condition, Hölder condition, Boundary value problem, Type (model theory), Analytic function, Mathematics

Abstract

The study of the Dirichlet problem with arbitrary measurable data for harmonic functions in the unit disk 𝔻 is due to the dissertation of Luzin. Later on, the known monograph of Vekua was devoted to boundary-value problems only with Holder continuous data for generalized analytic functions, i.e., continuous complex-valued functions f(z) of the complex variable z = x + iy with generalized first partial derivatives by Sobolev satisfying equations of the form $$ {\partial}_{\overline{z}}f+ af+b\overline{f}=c, $$ where the complexvalued functions a; b, and c are assumed to belong to the class Lp with some p > 2 in smooth enough domains D in ℂ. Our last paper [12] contained theorems on the existence of nonclassical solutions of the Hilbert boundaryvalue problem with arbitrary measurable data (with respect to logarithmic capacity) for generalized analytic functions f : D → ℂ such that $$ {\partial}_{\overline{z}}f=g $$ with the real-valued sources. On this basis, the corresponding existence theorems were established for the Poincare problem on directional derivatives and, in particular, for the Neumann problem to the Poisson equations △U = G ∈ Lp; p > 2, with arbitrary measurable boundary data over logarithmic capacity. The present paper is a natural continuation of the article [12] and includes, in particular, theorems on the existence of solutions for the Hilbert boundary-value problem with arbitrary measurable data for the corresponding nonlinear equations of the Vekua type $$ {\partial}_{\overline{z}}f(z)=h(z)q\left(f(z)\right). $$ On this basis, existence theorems were also established for the Poincar´e boundary-value problem and, in particular, for the Neumann problem for the nonlinear Poisson equations of the form △U(z) = H(z)Q(U(z)) with arbitrary measurable boundary data over logarithmic capacity. The Dirichlet problem was investigated by us for the given equations, too. Our approach is based on the interpretation of boundary values in the sense of angular (along nontangential paths) limits that are a conventional tool of the geometric function theory. As consequences, we give applications to some concrete semi-linear equations of mathematical physics arising from modelling various physical processes. Those results can also be applied to semi-linear equations of mathematical physics in anisotropic and inhomogeneous media.

Published

2021

18. Notes on Functional Integration

Author

A. V. Ivanov

Subjects

Statistics and Probability, Algebra, Applied Mathematics, General Mathematics, Product (mathematics), Path integral formulation, Loop space, Functional derivative, Functional integration, Orthonormal basis, Space (mathematics), Special class, Mathematics

Abstract

The paper is devoted to the construction of an “integral” on an infinite-dimensional space, combining the approaches proposed previously and at the same time the simplest. A new definition of the construction and study its properties on a special class of functionals is given. An introduction of a quasi-scalar product, an orthonormal system, and applications in physics (path integral, loop space, functional derivative) are proposed. In addition, the paper contains a discussion of generalized functionals.

Published

2021

19. On Lacunas in the Spectrum of the Laplacian with the Dirichlet Boundary Condition in a Band with Oscillating Boundary

Author

Denis Borisov

Subjects

Statistics and Probability, Applied Mathematics, General Mathematics, Operator (physics), Mathematical analysis, Spectrum (functional analysis), Boundary (topology), Function (mathematics), symbols.namesake, Amplitude, Dirichlet boundary condition, symbols, Flat band, Laplace operator, Mathematics

Abstract

In this paper, we consider the Laplace operator in a flat band whose lower boundary periodically oscillates under the Dirichlet boundary condition. The period and the amplitude of oscillations are two independent small parameters. The main result obtained in the paper is the absence of internal lacunas in the lower part of the spectrum of the operator for sufficiently small period and amplitude. We obtain explicit upper estimates of the period and amplitude in the form of constraints with specific numerical constants. The length of the lower part of the spectrum, in which the absence of lacunas is guaranteed, is also expressed explicitly in terms of the period function and the amplitude.

Published

2021

20. Method of Boundary Integral Equations with Hypersingular Integrals in Boundary-Value Problems

Author

A. V. Setukha

Subjects

Statistics and Probability, Applied Mathematics, General Mathematics, Numerical analysis, MathematicsofComputing_NUMERICALANALYSIS, Boundary (topology), Singular integral, Quadrature (mathematics), Hadamard transform, Collocation method, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Applied mathematics, Boundary value problem, Value (mathematics), Mathematics

Abstract

In this paper, we formulate mathematical foundations of applications of boundary integral equations with strongly singular integrals understood in the sense of finite Hadamard value to numerical solution of certain boundary-value problems. We describe numerical schemes for solving boundary strongly singular equations based on quadrature formulas and the collocation method. Also, we make references to known results on the mathematical justification of the numerical methods described in the paper.

Published

2021

21. Logarithmic Potential and Generalized Analytic Functions

Author

O.V. Nesmelova, Vladimir Gutlyanskiĭ, Vladimir Ryazanov, and A.S. Yefimushkin

Subjects

Statistics and Probability, Dirichlet problem, Pure mathematics, Applied Mathematics, General Mathematics, Harmonic (mathematics), Unit disk, Sobolev space, Riemann hypothesis, symbols.namesake, Harmonic function, symbols, Neumann boundary condition, Analytic function, Mathematics

Abstract

The study of the Dirichlet problem in the unit disk 𝔻 with arbitrary measurable data for harmonic functions is due to the famous dissertation of Luzin [31]. Later on, the known monograph of Vekua [48] has been devoted to boundary-value problems (only with Holder continuous data) for the generalized analytic functions, i.e., continuous complex valued functions h(z) of the complex variable z = x + iy with generalized first partial derivatives by Sobolev satisfying equations of the form 𝜕zh + ah + b $$ \overline{h} $$ = c ; where it was assumed that the complex valued functions a; b and c belong to the class Lp with some p > 2 in smooth enough domains D in ℂ. The present paper is a natural continuation of our previous articles on the Riemann, Hilbert, Dirichlet, Poincar´e and, in particular, Neumann boundary-value problems for quasiconformal, analytic, harmonic, and the so-called A−harmonic functions with boundary data that are measurable with respect to logarithmic capacity. Here, we extend the corresponding results to the generalized analytic functions h : D → ℂ with the sources g : 𝜕zh = g ∈ Lp, p > 2 , and to generalized harmonic functions U with sources G : △U = G ∈ Lp, p > 2. This paper contains various theorems on the existence of nonclassical solutions of the Riemann and Hilbert boundary-value problems with arbitrary measurable (with respect to logarithmic capacity) data for generalized analytic functions with sources. Our approach is based on the geometric (theoretic-functional) interpretation of boundary-values in comparison with the classical operator approach in PDE. On this basis, it is established the corresponding existence theorems for the Poincar´e problem on directional derivatives and, in particular, for the Neumann problem to the Poisson equations △U = G with arbitrary boundary data that are measurable with respect to logarithmic capacity. These results can be also applied to semilinear equations of mathematical physics in anisotropic and inhomogeneous media.

Published

2021

22. Vibration of Conjugated Shell Systems Under Combined Static Loads.

Author

Grigorenko, Ya. M., Bespalova, O. I., and Boreiko, N. P.

Subjects

DEAD loads (Mechanics), CONJUGATED systems, APPLIED mathematics, NONLINEAR theories, NUMERICAL analysis

Abstract

We propose a mathematical model of vibration of elastic systems formed by conjugated shells of revolution with different geometry in the field of combined static axisymmetric loads. The model is based on the concepts of geometrically nonlinear theory of mean bending and realized within the framework of the classical Kirchhoff–Love theory with the use of contemporary methods of applied mathematics and numerical analysis. The spectral picture of a shell structure with elements of positive, zero, and negative Gaussian curvature is constructed. This picture enables us to detect resonance situations under specific dynamic actions and determine dangerous combinations of static loads in the analysis of stability of the equilibrium states of the structure. [ABSTRACT FROM AUTHOR]

Published

2023

23. Degrees of Enumerations of Countable Wehner-Like Families

Author

I. Sh. Kalimullin and M. Kh. Faizrahmanov

Subjects

Statistics and Probability, Class (set theory), Degree (graph theory), Applied Mathematics, General Mathematics, 010102 general mathematics, 01 natural sciences, Spectrum (topology), 010305 fluids & plasmas, Combinatorics, 0103 physical sciences, Enumeration, Countable set, Family of sets, 0101 mathematics, Turing, computer, Finite set, computer.programming_language, Mathematics

Abstract

This paper is a survey of results on countable families with natural degree spectra. These results were obtained by a modification of the methodology proposed by Wechner, who first found a family of sets with the spectrum consisting precisely of nonzero Turing degrees. Based on this method, many researchers obtained examples of families with other natural spectra. In addition, in this paper we extend these results and present new examples of natural spectra. In particular, we construct a family of finite sets with the spectrum consisting of exactly non-K-trivial degrees and also we find new sufficient conditions on $$ {\Delta}_2^0 $$ -degree a, which guarantees that the class {x : x ≰ a} is the degree spectrum of some family. Finally, we give a survey of our recent results on the degree spectra of α-families, where α is an arbitrary computable ordinal.

Published

2021

24. Theoretical Foundations of the Study of a Certain Class of Hybrid Systems of Differential Equations

Author

A. D. Mizhidon

Subjects

Statistics and Probability, Partial differential equation, Differential equation, Applied Mathematics, General Mathematics, 010102 general mathematics, Dirac (software), Equations of motion, 01 natural sciences, 010305 fluids & plasmas, Mechanical system, Variational principle, Hybrid system, 0103 physical sciences, Applied mathematics, 0101 mathematics, Eigenvalues and eigenvectors, Mathematics

Abstract

In this paper, we consider boundary-value problems for a new class of hybrid systems of differential equations whose coefficients contain the Dirac delta-function. Hybrid systems are systems that contain both ordinary and partial differential equations; such systems appear, for example, when equations of motion of mechanical systems of rigid bodies attached to a beam by elastic bonds are derived from the Hamilton–Ostrogradsky variational principle. We present examples that lead to such systems and introduce the notions of generalized solutions and eigenvalues of a boundary-value problem. We also compare results of numerical simulations based on methods proposed in this paper with results obtained by previously known methods and show that our approach is reliable and universal.

Published

2021

25. Synthesis of Automatic Control for Plane-Type UAV Landing and Stability Analysis of Desired Motion Regimes

Author

L. I. Kulikov

Subjects

Statistics and Probability, Keel, Automatic control, Plane (geometry), Applied Mathematics, General Mathematics, Stability (learning theory), Motion (geometry), Thrust, Flaperon, law.invention, Aileron, Control theory, law, Mathematics

Abstract

This paper is concerned with small UAV (unmanned aerial vehicle) control algorithm development during landing. The UAV landing problem for small UAVs (less than 20 kg) remains actual despite the great amount of books, papers, and monographs devoted to this topic. In this paper, a model with V-shaped keel is under consideration. Mechanization of such a vehicle consists of flaperons and ailerons. To describe a flight, a system of nonlinear differential equations is developed. The automatic control both for longitudinal and lateral motion as well as for thrust is designed. The stability analysis of the controlled system is conducted by plotting stability regions in the space of the feedback coefficients. The results of a numerical modeling of a flight with external disturbances are given.

Published

2021

26. The Method of Construction of Logical Neural Networks on the Basis of Variable-Valued Logical Functions

Author

R. A. Zhilov and D. P. Dmitrichenko

Subjects

Statistics and Probability, Theoretical computer science, Quantitative Biology::Neurons and Cognition, Basis (linear algebra), Artificial neural network, Generalization, Applied Mathematics, General Mathematics, Computer Science::Neural and Evolutionary Computation, Fuzzy logic, TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES, Computer Science::Logic in Computer Science, Point (geometry), Representation (mathematics), Logical Function, Hardware_LOGICDESIGN, Mathematics, Variable (mathematics)

Abstract

In this paper, we suggest a method of constructing logical neural networks on the basis of variable-valued logical functions. We prove the theorem on a possibility of representation of any logical function as a logical neural network. The proof given in the paper contains an algorithm of the construction of the logical neural network. We point out the possibility of the generalization of the result obtained to the case of fuzzy logic.

Published

2021

27. Simplest Test for the Three-Dimensional Dynamical Inverse Problem (The BC-Method)

Author

Mikhail I. Belishev, N. A. Karazeeva, and A. S. Blagoveshchensky

Subjects

Statistics and Probability, Applied Mathematics, General Mathematics, Operator (physics), 010102 general mathematics, Boundary (topology), Function (mathematics), Inverse problem, Positive function, 01 natural sciences, 010305 fluids & plasmas, Combinatorics, 0103 physical sciences, Nabla symbol, 0101 mathematics, Dynamical system (definition), Realization (systems), Mathematics

Abstract

A dynamical system $$ {\displaystyle \begin{array}{ll}{u}_{tt}-\Delta u-\nabla 1\mathrm{n}\;\rho \cdot \nabla u=0& in\kern0.6em {\mathrm{\mathbb{R}}}_{+}^3\times \left(0,T\right),\\ {}{\left.u\right|}_{t=0}={\left.{u}_t\right|}_{t=0}=0& in\kern0.6em \overline{{\mathrm{\mathbb{R}}}_{+}^3},\\ {}{\left.{u}_z\right|}_{z=0}=f& for\kern0.36em 0\le t\le T,\end{array}} $$ is under consideration, where ρ = ρ(x, y, z) is a smooth positive function; f = f(x, y, t) is a boundary control; u = uf (x, y, z, t) is a solution. With the system one associates a response operator R : f ↦ uf|z = 0. The inverse problem is to recover the function ρ via the response operator. A short representation of the local version of the BC-method, which recovers ρ via the data given on a part of the boundary, is provided. If ρ is constant, the forward problem is solved in explicit form. In the paper, the corresponding representations for the solutions and response operator are derived. A way to use them for testing the BC-algorithm, which solves the inverse problem, is outlined. The goal of the paper is to extend the circle of the BC-method users, who are interested in numerical realization of methods for solving inverse problems.

Published

2021

28. Perturbations of the Continuous Spectrum of a Certain Nonlinear Two-Dimensional Operator Sheaf

Author

Denis Borisov

Subjects

Statistics and Probability, Pure mathematics, Dimensional operator, Applied Mathematics, General Mathematics, Operator (physics), 010102 general mathematics, Continuous spectrum, Essential spectrum, 01 natural sciences, 010305 fluids & plasmas, Bounded function, 0103 physical sciences, Sheaf, 0101 mathematics, Laplace operator, Eigenvalues and eigenvectors, Mathematics

Abstract

In this paper, we consider the operator sheaf $$ -\Delta +V+\varepsilon {\mathrm{\mathcal{L}}}_{\varepsilon}\left(\lambda \right)+{\lambda}^2 $$ in the space L2(ℝ2), where the real-valued potential V depends only on the first variable x1, e is a small positive parameter, λ is the spectral parameter, $$ {\mathrm{\mathcal{L}}}_{\varepsilon}\left(\lambda \right) $$ is a localized operator bounded with respect to the Laplacian −Δ, and the essential spectrum of this operator is independent of e and contains certain critical points defined as isolated eigenvalues of the operator $$ -\frac{d^2}{dx_1^2}+V\left({x}_1\right) $$ in L2(ℝ). The basic result obtained in this paper states that for small values of e, in neighborhoods of critical points mentioned, isolated eigenvalues of the sheaf considered arise. Sufficient conditions for the existence or absence of such eigenvalues are obtained. The number of arising eigenvalues is determined, and in the case where they exist, the first terms of their asymptotic expansions are found.

Published

2020

29. A New Convexity-Based Inequality, Characterization of Probability Distributions, and Some Free-of-Distribution Tests

Author

Lev B. Klebanov and Irina V. Volchenkova

Subjects

Statistics and Probability, Class (set theory), Generalization, Applied Mathematics, General Mathematics, Probability (math.PR), 010102 general mathematics, Probabilistic logic, 01 natural sciences, Convexity, 010305 fluids & plasmas, Interpretation (model theory), Character (mathematics), Distribution (mathematics), 0103 physical sciences, FOS: Mathematics, Probability distribution, Applied mathematics, 60E10, 62E10, 0101 mathematics, Mathematics - Probability, Mathematics

Abstract

A goal of the paper is to prove new inequalities connecting some functionals of probability distribution functions. These inequalities are based on the strict convexity of functions used in the definition of the functionals. The starting point is the paper “Cramer–von Mises distance: probabilistic interpretation, confidence intervals and neighborhood of model validation” by Ludwig Baringhaus and Norbert Henze. The present paper provides a generalization of inequality obtained in probabilistic interpretation of the Cramer–von Mises distance. If the equality holds there, then a chance to give characterization of some probability distribution functions appears. Considering this fact and a special character of the functional, it is possible to create a class of free-of-distribution two sample tests.

Published

2020

30. Examples of Integrable Systems with Dissipation on the Tangent Bundles of Three-Dimensional Manifolds

Author

Maxim V. Shamolin

Subjects

Statistics and Probability, Pure mathematics, Integrable system, Dynamical systems theory, Applied Mathematics, General Mathematics, 010102 general mathematics, Degrees of freedom, Tangent, Dissipation, 01 natural sciences, Force field (chemistry), 010305 fluids & plasmas, 0103 physical sciences, Mathematics::Differential Geometry, 0101 mathematics, Mathematics::Symplectic Geometry, Mathematics, Variable (mathematics)

Abstract

In this paper, we prove the integrability of certain classes of dynamical systems on the tangent bundles of four-dimensional manifolds (systems with four degrees of freedom). The force field considered possessed so-called variable dissipation; they are generalizations of fields studied earlier. This paper continues earlier works of the author devoted to systems on the tangent bundles of two- and three-dimensional manifolds.

Published

2020

31. Tailoring a Pair of Pants: The Phase Tropical Version

Author

Ilia Zharkov

Subjects

Statistics and Probability, Pure mathematics, Applied Mathematics, General Mathematics, 010102 general mathematics, Phase (waves), 01 natural sciences, 010305 fluids & plasmas, Mathematics - Algebraic Geometry, 0103 physical sciences, FOS: Mathematics, Isotopy, 0101 mathematics, Algebraic Geometry (math.AG), Pair of pants, Mathematics

Abstract

We show that the phase tropical pair-of-pants is (ambient) isotopic to the complex pair-of-pants. This paper can serve as an addendum to the author's joint paper with Ruddat arXiv:2001.08267 where an isotopy between complex and ober-tropical pairs-of-pants was shown. Thus all three versions are isotopic., 10 pages, 8 figures. arXiv admin note: text overlap with arXiv:2001.08267

Published

2020

32. A Short Proof of a Theorem Due to O. Gabber

Author

Ivan Panin

Subjects

Statistics and Probability, Pure mathematics, Applied Mathematics, General Mathematics, 010102 general mathematics, Field (mathematics), Regular local ring, Reductive group, 01 natural sciences, 010305 fluids & plasmas, Finite field, Scheme (mathematics), 0103 physical sciences, Fraction (mathematics), 0101 mathematics, Mathematics

Abstract

A very short proof of an unpublished result due to O. Gabber is given. More exactly, let R be a regular local ring containing a finite field k. Let G be a simply-connected reductive group scheme over k. It is proved that a principal G-bundle over R is trivial if it is trivial over the fraction field of R. This is the mentioned unpublished result due to O. Gabber. In this paper, this result is derived from a purely geometric one, proved in another paper of the author and stated in the Introduction.

Published

2020

33. Commutators of Congruence Subgroups in the Arithmetic Case

Author

Nikolai Vavilov

Subjects

Statistics and Probability, Ring (mathematics), Multiplicative group, Applied Mathematics, General Mathematics, 010102 general mathematics, General linear group, Commutative ring, Type (model theory), 01 natural sciences, 010305 fluids & plasmas, 0103 physical sciences, Arithmetic function, Dedekind cut, 0101 mathematics, Arithmetic, Mathematics, Counterexample

Abstract

In a joint paper of the author with Alexei Stepanov, it was established that for any two comaximal ideals A and B of a commutative ring R, A + B = R, and any n ≥ 3 one has [E(n,R,A),E(n,R,B)] = E(n,R,AB). Alec Mason and Wilson Stothers constructed counterexamples demonstrating that the above equality may fail when A and B are not comaximal, even for such nice rings as ℤ [i]. The present note proves a rather striking result that the above equality and, consequently, also the stronger equality [GL(n,R,A), GL(n,R,B)] = E(n,R,AB) hold whenever R is a Dedekind ring of arithmetic type with infinite multiplicative group. The proof is based on elementary calculations in the spirit of the previous papers by Wilberd van der Kallen, Roozbeh Hazrat, Zuhong Zhang, Alexei Stepanov, and the author, and also on an explicit computation of the multirelative SK1 from the author’s paper of 1982, which, in its turn, relied on very deep arithmetical results by Jean-Pierre Serre and Leonid Vaserstein (as corrected by Armin Leutbecher and Bernhard Liehl). Bibliography: 50 titles.

Published

2020

34. Delone sets in ℝ3: Regularity Conditions

Author

N. P. Dolbilin

Subjects

Statistics and Probability, Discrete mathematics, Euclidean space, Applied Mathematics, General Mathematics, 010102 general mathematics, Delone set, 01 natural sciences, Identity (music), 010305 fluids & plasmas, Set (abstract data type), 0103 physical sciences, Homogeneous space, Mathematics::Metric Geometry, 0101 mathematics, Symmetry (geometry), Orbit (control theory), Link (knot theory), Mathematics

Abstract

A regular system is a Delone set in Euclidean space with a transitive group of symmetries or, in other words, the orbit of a crystallographic group. The local theory for regular systems, created by the geometric school of B. N. Delone, was aimed, in particular, to rigorously establish the “local-global-order” link, i.e., the link between the arrangement of a set around each of its points and symmetry/regularity of the set as a whole. The main result of this paper is a proof of the so-called 10R-theorem. This theorem asserts that identity of neighborhoods within a radius 10R of all points of a Delone set (in other words, an (r, R)-system) in 3D Euclidean space implies regularity of this set. The result was obtained and announced long ago independently by M. Shtogrin and the author of this paper. However, a detailed proof remains unpublished for many years. In this paper, we give a proof of the 10R-theorem. In the proof, we use some recent results of the author, which simplify the proof.

Published

2020

35. On Finiteness Conditions in Twisted K-Theory

Author

M. A. Gerasimova

Subjects

Statistics and Probability, Pure mathematics, Statement (logic), Applied Mathematics, General Mathematics, 010102 general mathematics, Connection (vector bundle), Lie group, Twisted K-theory, 01 natural sciences, 010305 fluids & plasmas, Elliptic operator, Mathematics::K-Theory and Homology, Bundle, 0103 physical sciences, 0101 mathematics, Special case, Mathematics

Abstract

The aim of this (mostly expository) article is to show a connection between the finiteness conditions arising in twisted K-theory. There are two different conditions arising naturally in two main approaches to the problem of computing the index of the appropriate family of elliptic operators (the approach of Nistor and Troitsky and the approach of Mathai, Melrose, and Singer). These conditions are formulated absolutely differently, but in some sense they should be close to each other. In this paper, we find this connection and prove the corresponding formal statement. Thereby it is shown that these conditions map to each other. This opens a possibility to synthesize these approaches. It is also shown that the finiteness condition arising in the paper of Nistor and Troitsky is a special case of the finiteness condition that appears in the paper of Emerson and Meyer, where the theorem of Nistor and Troitsky is proved not only for the case of a bundle of Lie groups, but also for the case of a general groupoid.

Published

2020

36. Programmed Control with Probability 1 for Stochastic Dynamical Systems

Author

E. V. Karachanskaya

Subjects

Statistics and Probability, Dynamical systems theory, Differential equation, Process (engineering), Applied Mathematics, General Mathematics, 010102 general mathematics, Type (model theory), 01 natural sciences, Invariant theory, 010305 fluids & plasmas, Set (abstract data type), Control theory, 0103 physical sciences, Applied mathematics, 0101 mathematics, Diffusion (business), Mathematics

Abstract

In this paper, we suggest a new type of tasks for control theory for stochastic dynamical systems — programmed control with Probability 1 (PCP1). PCP1 is an application of an invariant theory. We use the PCP1 concept for dynamical processes described by a system of Ito differential equations with jump-diffusion (GSDES). The considered equations include the drift, the diffusion, and the jumps, together or not. Features of our approach are both a wide set of dynamical systems and investigation of such systems for their unique trajectories. Our method is based on the concept of a stochastic first integral (SFI) for GSDES and its equations which author studied before. The purpose of the present paper is to construct a differential equation system (both stochastic and deterministic) using a known set of FIs for the investigating process. Several examples are given.

Published

2020

37. Calibration of Models for Option Pricing Using Neural Networks

Author

Leonid Nazarov and V. Chabanenko

Subjects

Statistics and Probability, Flexibility (engineering), Mathematical optimization, Artificial neural network, Calibration (statistics), Valuation of options, Simple (abstract algebra), Applied Mathematics, General Mathematics, Futures contract, Autoencoder, Mathematics

Abstract

This paper is focused on research into options pricing models. The most popular ones are variancegamma and Heston models. They are powerful and flexible to some extent, but they also have drawbacks. Among their shortcomings are instability and long-time calibration. The model proposed in the paper combines neural network (autoencoder) and relatively simple option pricing (mixture normal) model. The autoencoder gives flexibility to the model and reduces the number of parameters. The mixture normal model gives a certain logic to neural network and minimizes calibration time of the new model. So the resulting model eliminates drawbacks of variance-gamma and Heston models and also keeps their advantages. It has fast calibration and shows good enough precision on S&P futures options market.

Published

2020

38. On the Structure of a 3-Connected Graph. 2

Author

D. V. Karpov

Subjects

Statistics and Probability, Hypergraph, Applied Mathematics, General Mathematics, 010102 general mathematics, Structure (category theory), Type (model theory), 01 natural sciences, 010305 fluids & plasmas, Set (abstract data type), Combinatorics, 0103 physical sciences, Decomposition (computer science), Graph (abstract data type), 0101 mathematics, Connectivity, Hyperbolic tree, Mathematics

Abstract

In this paper, the structure of relative disposition of 3-vertex cutsets in a 3-connected graph is studied. All such cutsets are divided into structural units – complexes of flowers, of cuts, of single cutsets, and trivial complexes. The decomposition of the graph by a complex of each type is described in detail. It is proved that for any two complexes C1 and C2 of a 3-connected graph G there is a unique part of the decomposition of G by C1 that contains C2. The relative disposition of complexes is described with the help of a hypertree T (G) – a hypergraph any cycle of which is a subset of a certain hyperedge. It is also proved that each nonempty part of the decomposition of G by the set of all of its 3-vertex cutsets is either a part of the decomposition of G by one of the complexes or corresponds to a hyperedge of T (G). This paper can be considered as a continuation of studies begun in the joint paper by D. V. Karpov and A. V. Pastor “On the structure of a 3-connected graph,” published in 2011. Bibliography: 10 titles.

Published

2020

39. The Simulation of Finite-Source Retrial Queueing Systems with Collisions and Blocking

Author

János Sztrik, Attila Kuki, Ádám Tóth, Tamás Bérczes, and Wolfgang Schreiner

Subjects

Statistics and Probability, Queueing theory, Mathematical optimization, Exponential distribution, Queue management system, Applied Mathematics, General Mathematics, 010102 general mathematics, Response time, Variance (accounting), Blocking (statistics), 01 natural sciences, 010305 fluids & plasmas, 0103 physical sciences, Orbit (dynamics), 0101 mathematics, Random variable, Mathematics

Abstract

This paper investigates, using a simulation program, a retrial queuing system with a single server which is subject to random breakdowns. The number of sources of calls is finite, and collisions can take place. We assume that the failure of the server blocks the system’s operation such that newly arriving customers cannot enter the system, contrary to an earlier paper where the failure does not affect the arrivals. All the random variables included in the model construction are assumed to be independent of each other, and all times are exponentially distributed except for the service time, which is gamma distributed. The novelty of this analysis is the inspection of the blocking effect on the performance measures using different distributions. Various figures represent the impact of the squared coefficient of the variation of the service time on the main performance measures such as the mean and variance of the number of customers in the system, the mean and variance of the response time, the mean and variance of the time a customer spends in the service, and the mean and variance of the sojourn time in the orbit.

Published

2020

40. The Inverse Ill-Posed Problem of Magnetoencephalography

Author

T. V. Zakharova

Subjects

Statistics and Probability, Well-posed problem, Quantitative Biology::Neurons and Cognition, Series (mathematics), medicine.diagnostic_test, Applied Mathematics, General Mathematics, Physics::Medical Physics, 010102 general mathematics, Stability (learning theory), Inverse, Magnetoencephalography, Inverse problem, 01 natural sciences, 010305 fluids & plasmas, Spherical model, Noise, 0103 physical sciences, medicine, Applied mathematics, 0101 mathematics, Mathematics

Abstract

This paper continues a series of studies dealing with noninvasive preoperative methods for localizing eloquent areas of the human brain. The inverse problem of magnetoencephalography (MEG) is illposed and difficult for both analytical and numerical solutions. An analytical formula is derived for the solution of the forward problem that computes the magnetic field on the surface of the head from the known location and orientation of a current dipole in the low-frequency approximation in the spherical model. In addition, the paper considers the question of stability of solutions of the inverse problem of MEG to the effect of noise. The solution is unstable to the effect of noise on its angular component, but the deviation from the true solution is much less than the noise variance.

Published

2020

41. Smooth Julia Sets

Author

V. S. Sekovanov

Subjects

Statistics and Probability, Discrete mathematics, Mathematics::Dynamical Systems, Fractal, Mathematics::Complex Variables, Applied Mathematics, General Mathematics, Chaotic, Structure (category theory), Interval (mathematics), Julia set, Complex plane, Mathematics

Abstract

It is known that Julia sets, as a rule, have a fractal structure. In this paper, we give examples of smooth Julia sets, among them: a circle, a segment, an infinite interval, a straight line, and the complex plane. It is shown that the functions studied in the paper are chaotic on their Julia sets. The results obtained by analytical research are visualized using computer programs. The algorithms for constructing the Julia sets being considered are indicated.

Published

2020

42. The Wiener Measure on the Heisenberg Group and Parabolic Equations

Author

S. V. Mamon

Subjects

Statistics and Probability, Pure mathematics, Semigroup, Stochastic process, Applied Mathematics, General Mathematics, 010102 general mathematics, Markov process, 01 natural sciences, Measure (mathematics), 010305 fluids & plasmas, Nilpotent, symbols.namesake, 0103 physical sciences, Path integral formulation, Lie algebra, symbols, Heisenberg group, 0101 mathematics, Mathematics

Abstract

In this paper, we study questions related to the theory of stochastic processes on Lie nilpotent groups. In particular, we consider the stochastic process on the Heisenberg group H3(ℝ) whose trajectories satisfy the horizontal conditions in the stochastic sense relative to the standard contact structure on H3 (ℝ). It is shown that this process is a homogeneous Markov process relative to the Heisenberg group operation. There was found a representation in the form of a Wiener integral for a one-parameter linear semigroup of operators for which the Heisenberg sublaplacian generated by basis vector fields of the corresponding Lie algebra L(H3) is producing. The main method of solving the problem in this paper is using the path integrals technique, which indicates the common direction of further development of the results.

Published

2020

43. Computable Presentability of Countable Linear Orders

Author

A. N. Frolov

Subjects

Statistics and Probability, Set (abstract data type), Discrete mathematics, Property (philosophy), Applied Mathematics, General Mathematics, Order (group theory), Countable set, Natural number, Order type, Mathematics

Abstract

The main goal of this paper is to study algorithmic properties of countable linear orders by constructing effective presentations of these structures on the set of natural numbers. In 1991, C. Jockusch and R. Soare constructed a low linear order without computable presentations. Earlier, in 1989, R. Downey and M. Moses showed that each low discrete linear order has a computable copy. It is natural to ask for which order types of low presentations the existence of a computable presentation is sufficient. This question (namely, research program) was stated by R. Downey in 1998: Describe the order property P such that, for any low linear order L, P(L) implies the existence of a computable presentation of L. In this paper, we give a detailed review of the main results in this direction. These results are mostly obtained by the author or in co-authorship.

Published

2021

44. Products of Commutators on a General Linear Group Over a Division Algebra

Author

Nikolai Gordeev and E. A. Egorchenkova

Subjects

Statistics and Probability, Group (mathematics), Applied Mathematics, General Mathematics, 010102 general mathematics, Center (category theory), General linear group, Field (mathematics), 01 natural sciences, 010305 fluids & plasmas, Combinatorics, 0103 physical sciences, Division algebra, 0101 mathematics, Word (group theory), Mathematics

Abstract

The word maps $$ \tilde{w}:\kern0.5em {\mathrm{GL}}_m{(D)}^{2k}\to {\mathrm{GL}}_n(D) $$ and $$ \tilde{w}:\kern0.5em {D}^{\ast 2k}\to {D}^{\ast } $$ for a word $$ w=\prod \limits_{i=1}^k\left[{x}_i,{y}_i\right], $$ where D is a division algebra over a field K, are considered. It is proved that if $$ \tilde{w}\left({D}^{\ast 2k}\right)=\left[{D}^{\ast },{D}^{\ast}\right], $$ then $$ \tilde{w}\left({\mathrm{GL}}_n(D)\right)\supset {E}_n(D)\backslash Z\left({E}_n(D)\right), $$ where En(D) is the subgroup of GLn(D), generated by transvections, and Z(En(D)) is its center. Furthermore if, in addition, n > 2, then $$ \tilde{w}\left({E}_n(D)\right)\supset {E}_n(D)\backslash Z\left({E}_n(D)\right). $$ The proof of the result is based on an analog of the “Gauss decomposition with prescribed semisimple part” (introduced and studied in two papers of the second author with collaborators) in the case of the group GLn(D), which is also considered in the present paper.

Published

2019

45. Extremal decomposition of a multidimensional complex space for five domains

Author

Yaroslav Zabolotnii and I. V. Denega

Subjects

Statistics and Probability, Pure mathematics, Geometric function theory, Applied Mathematics, General Mathematics, 010102 general mathematics, 01 natural sciences, 010305 fluids & plasmas, symbols.namesake, Unit circle, Complex space, Product (mathematics), Green's function, 0103 physical sciences, Simply connected space, Decomposition (computer science), symbols, 0101 mathematics, Quadratic differential, Mathematics

Abstract

The paper is devoted to one open extremal problem in the geometric function theory of complex variables associated with estimates of a functional defined on the systems of non-overlapping domains. We consider the problem of the maximum of a product of inner radii of n non-overlapping domains containing points of a unit circle and the power γ of the inner radius of a domain containing the origin. The problem was formulated in 1994 in Dubinin’s paper in the journal “Russian Mathematical Surveys” in the list of unsolved problems and then repeated in his monograph in 2014. Currently, it is not solved in general. In this paper, we obtained a solution of the problem for five simply connected domains and power γ ∈ (1; 2:57] and generalized this result to the case of multidimensional complex space.

Published

2019

46. Quantum Markov States and Quantum Hidden Markov States

Author

Z. I. Bezhaeva and V. I. Oseledets

Subjects

Statistics and Probability, Discrete mathematics, Markov chain, Applied Mathematics, General Mathematics, Markov process, Function (mathematics), State (functional analysis), Mathematical proof, Tree (graph theory), symbols.namesake, symbols, Hidden Markov model, Quantum, Mathematics

Abstract

In a previous paper (Funct. Anal. Appl., 3 (2015), 205–209), we defined quantum Markov states. Here we recall this definition and present a proof of the results from that paper (which are given there without proofs). We give a definition of a quantum hidden Markov state generated by a function of a quantum Markov process and show how it is related to other definitions of such states. Our definitions work for quantum Markov fields on ℤN and on graphs. We consider an example with the Cayley tree.

Published

2019

47. Comparison of Asymptotic and Numerical Approaches to the Study of the Resonant Tunneling in Two-Dimensional Symmetric Quantum Waveguides of Variable Cross-Sections

Author

M. M. Kabardov, N. M. Sharkova, O. V. Sarafanov, and Boris Plamenevskii

Subjects

Statistics and Probability, Helmholtz equation, Applied Mathematics, General Mathematics, Numerical analysis, 010102 general mathematics, Mathematical analysis, 01 natural sciences, 010305 fluids & plasmas, Matrix (mathematics), Resonator, 0103 physical sciences, Boundary value problem, 0101 mathematics, Wave function, Quantum, Quantum tunnelling, Mathematics

Abstract

The waveguide considered coincides with a strip having two narrows of width e. An electron wave function satisfies the Dirichlet boundary value problem for the Helmholtz equation. The part of the waveguide between the narrows serves as a resonator, and conditions for the electron resonant tunneling may occur. In the paper, asymptotic formulas as e → 0 for characteristics of the resonant tunneling are used. The asymptotic results are compared with the numerical ones obtained by approximate calculation of the scattering matrix for energies in the interval between the second and third thresholds. The comparison allows us to state an interval of e, where the asymptotic and numerical approaches agree. The suggested methods can be applied to more complicated models than that considered in the paper. In particular, the same approach can be used for asymptotic and numerical analysis of the tunneling in three-dimensional quantum waveguides of variable cross-sections. Bibliography: 3 titles.

Published

2019

48. On Justification of the Asymptotics of Eigenfunctions of the Absolutely Continuous Spectrum in the Problem of Three One-Dimensional Short-Range Quantum Particles with Repulsion

Author

S. B. Levin, A. M. Budylin, and I. V. Baibulov

Subjects

Statistics and Probability, Scattering, Applied Mathematics, General Mathematics, Operator (physics), 010102 general mathematics, Spectrum (functional analysis), Eigenfunction, Absolute continuity, 01 natural sciences, 010305 fluids & plasmas, symbols.namesake, 0103 physical sciences, symbols, 0101 mathematics, Quantum, Schrödinger's cat, Resolvent, Mathematics, Mathematical physics

Abstract

The present paper offers a new approach to the construction of the coordinate asymptotics of the kernel of the resolvent of the Schrodinger operator in the scattering problem of three onedimensional quantum particles with short-range pair potentials. Within the framework of this approach, the asymptotics of eigenfunctions of the absolutely continuous spectrum of the Schrodinger operator can be constructed. In the paper, the possibility of a generalization of the suggested approach to the case of the scattering problem of N particles with arbitrary masses is discussed.

Published

2019

49. Duality and Free Measures in Vector Spaces, the Spectral Theory of Actions of Non-Locally Compact Groups

Author

Anatoly Vershik

Subjects

Statistics and Probability, Pure mathematics, Measurable function, Applied Mathematics, General Mathematics, Probability (math.PR), 010102 general mathematics, Duality (mathematics), 22D25, 22D40, 28O15, 46A22, 60B11, Space (mathematics), 01 natural sciences, Measure (mathematics), Linear subspace, Functional Analysis (math.FA), 010305 fluids & plasmas, Mathematics - Functional Analysis, Vector measure, 0103 physical sciences, FOS: Mathematics, Locally compact space, 0101 mathematics, Mathematics - Probability, Mathematics, Vector space

Abstract

The paper presents a general duality theory for vector measure spaces taking its origin in the author's papers written in the 1960s. The main result establishes a direct correspondence between the geometry of a measure in a vector space and the properties of the space of measurable linear functionals on this space regarded as closed subspaces of an abstract space of measurable functions. An example of useful new features of this theory is the notion of a free measure and its applications., Comment: 20 pp.23 Ref

Published

2019

50. Performance Simulation of Finite-Source Cognitive Radio Networks with Servers Subjects to Breakdowns and Repairs

Author

Hamza Nemouchi and János Sztrik

Subjects

Statistics and Probability, Primary channel, Queueing theory, business.industry, Network packet, Applied Mathematics, General Mathematics, 010102 general mathematics, 01 natural sciences, 010305 fluids & plasmas, Task (computing), Channel (programming), Server, 0103 physical sciences, 0101 mathematics, Priority queue, business, Queue, Mathematics, Computer network

Abstract

The present paper deals with the performance evaluation of a cognitive radio network with the help of a queueing model. The queueing system contains two interconnected, not independent sub-systems. The first part is for the requests of the Primary Units (PU). The number of sources is finite, and each source generates high priority requests after a exponentially distributed time. The requests are sent to a single server unit or Primary Channel Service (PCS) with a preemptive priority queue. The service times are assumed to be exponentially distributed. The second sub-system is for the requests of the Secondary Units (SU), which is finite sources system too; the inter-request times and service times of the single server unit or Secondary system Channel Service (SCS) are assumed to be exponentially distributed, respectively. A generated high priority packet goes to the primary service unit. If the unit is idle, the service of the packet begins immediately. If the server is busy with a high priority request, the packet joins the preemptive priority queue. When the unit is engaged with a request from SUs, the service is interrupted and the interrupted low priority task is sent back to the SCS. Depending on the state of the secondary channel, the interrupted job is directed to either the server or the orbit. In case the requests from SUs find the SCS idle, the service starts, and if the SCS is busy, the packet looks for the PCS. In the case of an idle PCS, the service of the low-priority packet begins at the high-priority channel (PCS). If the PCS is busy, the packet goes to the orbit. From the orbit it retries to be served after an exponentially distributed time. The novelty of our investigation is that each server is subject to random breakdowns, in which case the interrupted request is sent to the queue or orbit, respectively. The operating and repair times of the servers are assumed to be generally distributed. Finally, all the random times included in the model construction are assumed to be independent of each other. The main aim of the paper is to analyze the effect of the nonreliability of the servers on the mean and variance of the response time for the SUs by using simulation.

Published

2019