Your search keyword '"Hayotov, Abdullo R."' showing total 224 results

1. Optimal quadrature formulas for non-periodic functions in Sobolev space and its application to CT image reconstruction

Author

Hayotov, Abdullo R., Jeon, Soomin, Lee, Chang-Ock, and Shadimetov, Kholmat M.

Subjects

Mathematics - Numerical Analysis, 41A05, 41A15, 65D30, 65D32

Abstract

In the present paper, optimal quadrature formulas in the sense of Sard are constructed for numerical integration of the integral $\int_a^be^{2\pi i\omega x}\varphi(x)d x$ with $\omega\in \mathbb{R}$ in the Sobolev space $L_2^{(m)}[a,b]$ of complex-valued functions which are square integrable with $m$-th order derivative. Here, using the discrete analogue of the differential operator $\frac{d^{2m}}{d x^{2m}}$, the explicit formulas for optimal coefficients are obtained. The order of convergence of the obtained optimal quadrature formula is $O(h^m)$. As an application, we implement the filtered back-projection (FBP) algorithm, which is a well-known image reconstruction algorithm for computed tomography (CT). By approximating Fourier transforms and its inversion using the proposed optimal quadrature formula of the second and third orders, we observe that the accuracy of the reconstruction algorithm is improved. In numerical experiments, we compare the quality of the reconstructed image obtained by using the proposed optimal quadrature formulas with the conventional FBP, in which fast Fourier transform is used for the calculation of Fourier transform and its inversion. In the noise test, the proposed algorithm provides more reliable results against the noise than the conventional FBP., Comment: 22 pages, 5 figures. arXiv admin note: text overlap with arXiv:1907.12702

Published

2020

2. The order of convergence of an optimal quadrature formula with derivative in the space $W_2^{(2,1)}$

Author

Hayotov, Abdullo R. and Rasulov, Rashidjon G.

Subjects

Mathematics - Numerical Analysis, 65D30, 65D32

Abstract

The present work is devoted to extension of the trapezoidal rule in the space $W_2^{(2,1)}$. The optimal quadrature formula is obtained by minimizing the error of the formula by coefficients at values of the first derivative of a integrand. Using the discrete analog of the operator $\frac{d^2}{dx^{2}}-1$ the explicit formulas for the coefficients of the optimal quadrature formula are obtained. Furthermore, it is proved that the obtained quadrature formula is exact for any function of the set $\mathbf{F}=\mathrm{span}\{1,x,e^{x},e^{-x}\}$. Finally, in the space $W_2^{(2,1)}$ the square of the norm of the error functional of the constructed quadrature formula is calculated. It is shown that the error of the obtained optimal quadrature formula is less than the error of the Euler-Maclaurin quadrature formula on the space $L_2^{(2)}$., Comment: 12 pages

Published

2019

3. On an optimal quadrature formula for approximation of Fourier integrals in the space $L_2^{(1)}$

Author

Hayotov, Abdullo R., Jeon, Soomin, and Lee, Chang-Ock

Subjects

Mathematics - Numerical Analysis, 41A05, 41A15

Abstract

This paper deals with the construction of an optimal quadrature formula for the approximation of Fourier integrals in the Sobolev space $L_2^{(1)}[a,b]$ of non-periodic, complex valued functions which are square integrable with first order derivative. Here the quadrature sum consists of linear combination of the given function values in a uniform grid. The difference between the integral and the quadrature sum is estimated by the norm of the error functional. The optimal quadrature formula is obtained by minimizing the norm of the error functional with respect to coefficients. Analytic formulas for optimal coefficients can also be obtained using discrete analogue of the differential operator $d^2/d x^2$. In addition, the convergence order of the optimal quadrature formula is studied. It is proved that the obtained formula is exact for all linear polynomials. Thus, it is shown that the convergence order of the optimal quadrature formula for functions of the space $C^2[a,b]$ is $O(h^2)$. Moreover, several numerical results are presented and the obtained optimal quadrature formula is applied to reconstruct the X-ray Computed Tomography image by approximating Fourier transforms., Comment: 27 pages, 6 figures

Published

2019

4. Application of optimal quadrature formulas for reconstruction of CT images

Author

Hayotov, Abdullo R., Jeon, Soomin, and Shadimetov, Kholmat M.

Published

2021

5. On an optimal quadrature formula for approximation of Fourier integrals in the space [formula omitted]

Author

Hayotov, Abdullo R., Jeon, Soomin, and Lee, Chang-Ock

Published

2020

6. Construction of interpolation splines minimizing the semi-norm in the space $K_2(P_m)$

Author

Hayotov, Abdullo R.

Subjects

Mathematics - Numerical Analysis, 41A05, 41A15

Abstract

In the present paper, using S.L. Sobolev's method, interpolation spline that minimizes the expression $\int_0^1(\varphi^{(m)}(x)+\omega^2\varphi^{(m-2)}(x))^2dx$ in the $K_2(P_m)$ space are constructed. Explicit formulas for the coefficients of the interpolation splines are obtained. The obtained interpolation spline is exact for monomials $1,x,x^2,..., x^{m-3}$ and for trigonometric functions $\sin\omega x$ and $\cos\omega x$.

Published

2014

7. Optimal Quadrature Formulas and Interpolation Splines Minimizing the Semi-Norm in the Hilbert Space

Author

Hayotov, Abdullo R., Milovanović, Gradimir V., Shadimetov, Kholmat M., Milovanović, Gradimir V., editor, and Rassias, Michael Th., editor

Published

2014

8. Optimal quadratures in the sense of Sard in a Hilbert space

Author

Hayotov, Abdullo R., Milovanović, Gradimir V., and Shadimetov, Kholmat M.

Published

2015

9. Optimal quadrature formulas in the sense of Sard in $$W_2^{(m,m-1)}$$ space

Author

Shadimetov, Kholmat M. and Hayotov, Abdullo R.

Published

2014

10. Interpolation splines minimizing a semi-norm

Author

Hayotov, Abdullo R., Milovanović, Gradimir V., and Shadimetov, Kholmat M.

Published

2014

11. Construction of interpolation splines minimizing semi-norm in $W_{2}^{(m,m-1)}(0,1)$ space

Author

Shadimetov, Kholmat M. and Hayotov, Abdullo R.

Published

2013

12. On an optimal quadrature formula for approximation of Fourier integrals in the space L2(1)

Author

Hayotov, Abdullo R., primary, Jeon, Soomin, additional, and Lee, Chang-Ock, additional

Published

2020

13. Direct and inverse dynamic quasilinear problems of poroelasticity.

Author

Imomnazarov, Kholmatzhon, Kholmuradov, A. E., Dilmuradov, Nosir, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

POROELASTICITY, SYSTEMS theory, INVERSE problems, FREE vibration

Abstract

A fundamental solution to the system of equations of the poroelasticity theory in the nondissipative case is obtained. It is shown that when the porosity disappears, the obtained fundamental solution goes over to the fundamental solution of the system of equations of the theory of elasticity. The inverse problem of determining a distributed source from the system of equations of the theory of poroelasticity in terms of the free surface vibration mode is also considered. Using the method of spherical means, a formula for solutions of the considered inverse dynamic problem of the theory for poroelasticity is obtained. [ABSTRACT FROM AUTHOR]

Published

2021

14. Mathematical modeling of learning processes based on the theory of control.

Author

Yodgorov, Gayrat, Jurakulov, Tollib, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

LEARNING, MATHEMATICAL models

Abstract

The learning process is considering as object of optimal control, for process controlling offered sequence of innovative approaches. Given a functional structure didactic system "teacher-reader" and on this bases created cyclic structure of calculation experience. The obtained results are graphically displayed. [ABSTRACT FROM AUTHOR]

Published

2021

15. Computational experiment of numerical study of hydrodynamic processes in interacting formations.

Author

Suvonov, Olim, Kuchkarova, Surmakhon, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

LIQUIDS, GASES

Abstract

The article discusses the dynamic non-stationary filtration of gas (liquid) in the system of two interacting layers, provided that edge water moves through the developed layer. The changes in time of the position of the gas-water contact, the pressure indicators in the interacting layers are determined. The results of the computational experiment are presented in the form of tables. [ABSTRACT FROM AUTHOR]

Published

2021

16. Unique solvability of the boundary value problem for integro-differential equations with involution.

Author

Nazarova, Kulzina, Usmanov, Kairat, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

BOUNDARY value problems

Abstract

In this paper, it is established a criteria for the unique solvability of a boundary value problem for systems of integro-differential equations with an involutive transformation when the kernel is degenerate. A modified parametrization method is applied to the study of a boundary value problem for systems of integro-differential equations with involution, and conditions for the unique solvability of the problem under consideration are obtained. [ABSTRACT FROM AUTHOR]

Published

2021

17. On a boundary value problem for a nonlocal mixed-type equation with the Hilfer operator.

Author

Jalilov, Muhammadali, Kayumova, Gavhar, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

BOUNDARY value problems, OPERATOR equations, SEPARATION of variables, FRACTIONAL differential equations, DIFFERENTIAL equations, INTEGRO-differential equations, LAPLACIAN operator

Abstract

In this paper, we consider a boundary value problem for a fourth-order differential equation of mixed type with involution and with Hilfer operator of fractional integro-differentiation in a rectangular domain. The mixed type differential equation under consideration is a fourth-order differential equation with respect to the second variable. Regarding the first variable, this equation is a fractional differential equation in the positive part of the segment and is a second-order differential equation in the negative part of the segment. Using the spectral method of separation of variables, the solution of the problem is constructed in the form of a Fourier series. Theorems on the existence and uniqueness of the problem are proved. [ABSTRACT FROM AUTHOR]

Published

2021

18. Nonlinear deformation of a current shell in a magnetic field.

Author

Indiaminov, Ravshan, Butaev, Ruslan, Narkulov, Akram, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

MAGNETIC fields, ELECTRIC currents, ELECTROMAGNETIC induction, EXTREME value theory, ELECTRIC conductivity, ORTHOTROPY (Mechanics)

Abstract

The strain of a flexible current-carrying orthotropic cone with orthotropic electrical conductivity under external mag- netic fleld and external electric current is considered in this paper; and the effect of account for the conicity when determining the stress state of current-carrying orthotropic shells in a geometrically nonlinear statement is studied. It was revealed that the interaction of magnetic induction and shearing force causes the appearance of extreme values of shell stresses. [ABSTRACT FROM AUTHOR]

Published

2021

19. Nonlinear mathematical model of stress-deformed state of spatially loaded rods with account for temperature.

Author

Anarova, Shahzoda, Ismoilov, Shokhimardon, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

MATHEMATICAL models, EXERGY, GEOGRAPHIC boundaries, TEMPERATURE

Abstract

Derivation of a mathematical model of oscillation processes of spatially loaded rods with account for temperature is considered in the paper. On the basis of the problem posed, using the generalized Hamilton-Ostrogradsky principle, the variations in kinetic, potential energy and work of external forces were calculated, and a nonlinear mathematical model of spatially loaded rods was derived, taking into account temperature. Based on the mathematical model, the resolving equations of spatially loaded rods with generalized natural initial and boundary conditions were derived. [ABSTRACT FROM AUTHOR]

Published

2021

20. The influence of magnetic field on wall shear stress in power law fluid flow of blood.

Author

Talib, Amira Husni, Abdullah, Ilyani, Naser, Nik Nabilah Nik Mohd, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

SHEARING force, SHEAR walls, FLUID flow, BLOOD flow, MAGNETIC fields, MAGNETIC field effects, NON-Newtonian fluids

Abstract

The profile of wall shear stress in non-Newtonian fluid which power law fluid through a cosine shape stenosis is analysed in this study. This study also reveals the effect of magnetic field as an external force on wall shear stress. Wall shear stress is an important flow characteristic in order to determine the behavior of blood. The governing equations employing the blood flow in the cylindrical coordinate system and then solved by finite difference scheme in staggered grid known as Marker and Cell (MAC) method. The influence of various parameters on wall shear stress profile are evaluated via graphical results. The results show that wall shear stress increases when magnetic field applied and higher at the stenotic region. [ABSTRACT FROM AUTHOR]

Published

2021

21. Influence of the method for calculating the value of the thermal conductivity coefficient on the numerical solution.

Author

Uzakov, Zair, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

HEAT conduction, NONLINEAR equations, THERMAL conductivity

Abstract

In the article, using the method of computational experiments on a computer, the influence of the method for calculating the values of the thermal conductivity coefficient at the nodes of the difference grid on the numerical solutions of a one-dimensional nonlinear problem of heat conduction according to explicit and implicit conservative difference schemes is investigated. The thermal conductivity is a power-law function of temperature. [ABSTRACT FROM AUTHOR]

Published

2021

22. Magnetoelastic strain of flexible shells in nonlinear statement.

Author

Indiaminov, Ravshan, Narkulov, Akram, Butaev, Ruslan, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

MAGNETIC fields, STRAINS & stresses (Mechanics), NONLINEAR oscillators

Abstract

An account for the nonlinearity effect in determining the stress-strain state of current-carrying plates and shells in a geometrically nonlinear statement is studied in this paper, using the example of a flexible current-carrying shell in a magnetic field. [ABSTRACT FROM AUTHOR]

Published

2021

23. An inverse problem for a parabolic equation with involution.

Author

Turmetov, Batirkhan, Kadirkulov, Bahtiyor, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

SEPARATION of variables, DIRICHLET problem, EQUATIONS, GENERALIZATION

Abstract

In this paper, we consider two-dimensional generalization of an analog of parabolic equation. In the paper, by using the Fourier method, we study solvability of inverse problems with the Dirichlet condition. [ABSTRACT FROM AUTHOR]

Published

2021

24. The need for qualitative theory of ordinary differential equations: A review.

Author

Daud, Auni Aslah Mat, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

DYNAMICAL systems, INFORMATION storage & retrieval systems, ORDINARY differential equations

Abstract

This note discusses the definition, the history and the importance of the qualitative theory of ordinary differential equations (ODE). Although such discussions can be found in many textbooks and online lecture notes, some of the information provided are distinct and some are repeated. This article takes the union of the information and fills in the missing details by providing suitable examples from other references. The qualitative theory of ODEs are essential to complement the analytical and numerical methods. It is also required to prove qualitative properties of a dynamical system. Qualitative analysis of ODEs is also needed when exact solution, even if it can be found, is difficult to interpret or visualise. Furthermore, in some applications, only qualitative properties of the system are of interest. The qualitative methods also will provide information on the sensitivity of the system under study to perturbations of change of initial conditions and of various parameters. [ABSTRACT FROM AUTHOR]

Published

2021

25. Monitoring the radio-frequency spectran-based integrated antenna system.

Author

Khotamov, Abdugafur, Eshnazarov, Nodir, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

RADIO frequency, ANTENNAS (Electronics), RADIO broadcasting

Abstract

This article is devoted to the variety of measuring antennas included in the measuring systems used for monitoring radio broadcasts. However, solutions are still being sought to create a universal antenna that allows measurements to be taken in a very wide frequency band with minimal errors. One of the possible solutions to this problem could be the creation of an antenna system consisting of several antennas operating in certain frequency ranges, but jointly covering the entire studied range of radio air. [ABSTRACT FROM AUTHOR]

Published

2021

26. On a problem for a parabolic-hyperbolic fractional order equation with degeneration in time.

Author

Eshmatov, Bakhodir, Kayumova, Gavhar, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

HYPERBOLIC differential equations, SEPARATION of variables, BOUNDARY value problems, EXISTENCE theorems, EQUATIONS

Abstract

In the present paper, we study the boundary value problem for a mixed parabolic-hyperbolic equation with fractional derivative and degeneration in time. Using the method of separation of variables, we prove theorems on the uniqueness and existence for the classical solution of this problem. [ABSTRACT FROM AUTHOR]

Published

2021

27. The regularity of a Stokes-type problem for a stationary system of the two-velocity hydrodynamics on the plane.

Author

Kuyliev, Sarvar, Imomnazarov, Kholmatzhon, Iskandarov, Ilham, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

HYDRODYNAMICS, PROBLEM solving, NAVIER-Stokes equations

Abstract

A stationary system of the two-velocity hydrodynamics with one pressure is obtained from a system of non-stationary equations of two-velocity hydrodynamics. This system is overdetermined. To solve the overdetermined problem, a new version of the method of orthogonal regularization is used. We study the regularity of the Stokes-type problem on the plane. [ABSTRACT FROM AUTHOR]

Published

2021

28. Space formation for the description of thematic documents.

Author

Tuliyev, Ulugbek, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

TOPOLOGICAL property, ENCYCLOPEDIAS & dictionaries

Abstract

Reducing the dimension of feature space is considered to describe thematic documents. Documents are presented in the form of "object-property" tables, for the formation of which thematic dictionaries are used, usually with a volume of not more than 100 keywords. As a tool for research, we use the study of the topological properties of feature space from the values of class compactness measures based on relations between objects. [ABSTRACT FROM AUTHOR]

Published

2021

29. Methodology for assessing the quality of educational information systems.

Author

Azhmukhamedov, Iskandar, Yorkulov, Behzod, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

EDUCATIONAL quality, INFORMATION storage & retrieval systems, SYSTEMS theory, DIGITAL technology, SET theory

Abstract

The paper considers the problem of assessing the quality of educational information systems in the context of the digital transformation of society. A method for determining the quality of information systems based on expert assessments is proposed. This approach differs in that it allows one to formalize qualitative assessments of the state of the system using the theory of fuzzy sets. The fuzzy quality assessment models included in the The fuzzy quality assessment models included in the methodology, as well as their corresponding algorithms, allow, on the basis of expert data, to assess the quality of educational information systems at the stage of their development, implementation and use. The implementation of the methodology makes it possible to increase the efficiency of the quality management process of educational information systems and the educational process as a whole. [ABSTRACT FROM AUTHOR]

Published

2021

30. Refining the main lemma of the theory of critical branching random processes.

Author

Formanov, Shakir, Juraev, Shukurjon, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

STOCHASTIC processes, CRITICAL theory, BRANCHING processes, ORDER picking systems

Abstract

In this paper that the estimate of the convergence rate of the remainder term in the main lemma of the theory of Galton-Watson critical branching random processes is of order O ( ln n n) , n → ∞ is proved. [ABSTRACT FROM AUTHOR]

Published

2021

31. Inversion formula for the problem of integral geometry on families of parabolas.

Author

Uteuliev, Niyetbay, Djaykov, Gafur, Seidullaev, Abat, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

GEOMETRY, INVERSE problems, ALGORITHMS, INTEGRALS, FAMILIES, PARABOLA

Abstract

In this paper, we consider the problems of integral geometry on families of parabolas. We examined the application of the integral geometry problem to seismic problems. We shall get the inverse formula for the problem of integral geometry on families of parabolas. Numerical experiments demonstrate the performance of the algorithm. [ABSTRACT FROM AUTHOR]

Published

2021

32. Numerical modeling of Kondratyev's long waves taking into account heredity.

Author

Makarov, Dani I., Parovik, Roman, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

BUSINESS cycles, HEREDITY, HARMONIC functions, ECONOMIC models, MATHEMATICAL models

Abstract

The paper proposes a new mathematical model of economic cycles and crises, which generalizes the well-known model of Dubovsky S.V. The novelty of the proposed model lies in taking into account the effect of heredity (memory), as well as the introduction of harmonic functions responsible for the arrival of investments in fixed assets and new management technologies in innovation. The mathematical description is given using the Gerasimov-Caputo fractional derivatives, which are studied within the framework of the theory of fractional calculus. The mathematical model was investigated using the numerical method of Adams- Bashforth-Moulton (ABM), phase trajectories were constructed. It is shown that the proposed mathematical model can have both regular and chaotic regimes. [ABSTRACT FROM AUTHOR]

Published

2021

33. A system of equations of the two-velocity hydrodynamics without pressure.

Author

Turdiyev, Ulugbek, Imomnazarov, Kholmatzhon, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

NONLINEAR differential equations, HYDRODYNAMICS, ORDINARY differential equations, DIFFERENTIAL equations, NONLINEAR waves, BURGERS' equation

Abstract

We have obtained systems of equations of the Burgers and the Hopf types from the system of non-stationary equations of the two-velocity hydrodynamics. Account must be taken of the fact that the energy dissipation occurs due to the viscosities of subsystems and the coefficient of inter-component friction. For a Hopf-type model, the analysis of the system of differential equations reduces in the form of traveling waves to solving a system of nonlinear ordinary differential equations. The effect of the kinetic coefficients on the propagation of nonlinear waves is clarified. [ABSTRACT FROM AUTHOR]

Published

2021

34. An approximate solution by the Galerkin method of a quasilinear equation with a boundary condition containing the time derivative of the unknown function.

Author

Mamatov, Alisher, Bakhramov, Sayfiddin, Narmamatov, Alibek, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

GALERKIN methods, BOUNDARY value problems, EQUATIONS

Abstract

In the paper, we consider one boundary value problem of parabolic type with a divergent principal part when the boundary condition contains the time derivative of the unknown function with the dimension of the domain m ≥ 3. An approximate solution of the considered problem is constructed by the Galerkin method. The existence and uniqueness of a generalized solution of the problem is proved in the space H ˜ 1 , 1 (Q T). [ABSTRACT FROM AUTHOR]

Published

2021

35. Global existence and nonexistence for a multidimensional system of parabolic equations with nonlinear boundary conditions.

Author

Rakhmonov, Zafar, Parovik, Roman, Alimov, Akram, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

NONLINEAR equations, CRITICAL exponents

Abstract

In this paper, we study the conditions of global solvability and unsolvability in time of solutions to the nonlinear diffusion problem based on self-similar analysis. We constructed various self-similar solutions of the nonlinear diffusion problem in the slow diffusion case. We established critical exponents of the Fujita type and critical exponents for the global existence of the solution. Using the asymptotic formulas as the initial approximation for the iterative process, numerical calculations are performed. [ABSTRACT FROM AUTHOR]

Published

2021

36. Numerical modelling of spatial heavy ideal incompressible liquids with free surface.

Author

Ruziev, Raup, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

LIQUID surfaces, FREE surfaces, DIFFERENCE equations, ALGORITHMS, DEPENDENT variables

Abstract

The mathematical statement of a problem about potential movement of a liquid for dependent variables is given, features of numerical algorithm for the decision of a spatial eaday, the system of the difference equations for potential is offered, the order of calculation of sizes in a single-step method is described, the method of construction of a grid is considered. [ABSTRACT FROM AUTHOR]

Published

2021

37. Development of a method for generating substitution tables for binary and ternary number systems.

Author

Abdullaev, Timur, Juraev, Gayrat, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

NUMBER systems, HAMMING distance, TERNARY system, ALGORITHMS, STATISTICAL correlation

Abstract

The article proposes a technique for generating substitution tables for 256 elements for binary and 729 elements for ternary number systems, estimates the correlation coefficients, avalanche effect and nonlinearity (Hamming distance) of the obtained substitution tables, and also describes a computational experiment for finding the coefficients of the Algebraic Normal Form (ANF) the output functions of the table substitution for 729 values (S-box) and the estimation of its algebraic degree of nonlinearity. The resulting S-boxes can be further used as cryptographic primitives in encryption algorithms. [ABSTRACT FROM AUTHOR]

Published

2021

38. Selection of the optimal type of the gamming function for symmetric encryption algorithms.

Author

Abdullaev, Timur, Juraev, Gayrat, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

SYMMETRIC functions, ALGORITHMS, LOGIC, GAMMA functions

Abstract

The article investigates the gamma functions of ternary logic, evaluates their features, makes the choice of the most preferable one for use as a cryptographic primitive in the encryption algorithm. [ABSTRACT FROM AUTHOR]

Published

2021

39. Central limit theorem and invariance principle for associated random fields.

Author

Mukhamedov, Abdurakhman, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

RANDOM fields, CENTRAL limit theorem, LIMIT theorems, LEAST squares

Abstract

In this paper, we consider the central limit theorem for associated random fields, invariance principles for two-parameter associated random fields, and an application of the invariance principle to the least squares estimates. [ABSTRACT FROM AUTHOR]

Published

2021

40. Central limit theorem for branching process with immigration.

Author

Sharipov, Sadillo O., Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

CENTRAL limit theorem, BRANCHING processes, LIMIT theorems, EMIGRATION & immigration

Abstract

In the paper we consider a sequence of nearly critical branching processes with immigration. We will prove central limit theorem for fluctuation of branching processes with ϕ − mixing immigration. [ABSTRACT FROM AUTHOR]

Published

2021

41. Central limit theorem for random fields with values in Hilbert space under Hannan's condition.

Author

Sharipov, Olimjon, Ruzieva, Dilnura, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

RANDOM fields, HILBERT space, CENTRAL limit theorem

Abstract

In the paper the central limit theorem for Hilbert space-valued random fields satisfying some dependence condition is proved. [ABSTRACT FROM AUTHOR]

Published

2021

42. Inequalities for moments of branching processes in a varying environment.

Author

Khusanbaev, Yakubjan, Kudratov, Khamza, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

BRANCHING processes, RANDOM numbers

Abstract

In the paper, we give the upper bounds for moments of branching processes in a varying environment starting with a random number of particles. [ABSTRACT FROM AUTHOR]

Published

2021

43. An efficient analytical approach for nonlinear fractional Swift-Hohenberg model involving conformable operator.

Author

Amryeen, Rasha, Harun, Fatimah Noor, Al-Smadi, Mohammed, Alias, Azwani, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

PARTIAL differential equations, NONLINEAR differential equations, FRACTIONAL differential equations, ERROR functions, NONLINEAR operators

Abstract

The pivotal aim of the present work is to obtain analytical and approximate solution for nonlinear time-fractional Swift-Hohenberg equations (FS-HEs) using the conformable residual series method (CRSM). The fractional derivative is proposed within a conformable concept. The proposed method is graceful amalgamations of the conformable residual error functions and generalized Talyor series in the sense of conformable operator. The truncated approximate solution is substituted in the nonlinear fractional model where the conformable derivative to the residual function is equal to zero. The convergence analysis is discussed to show the accuracy and efficiency of the CRSM to obtain approximate solutions for the FS-HEs. Numerical simulation with graphical representation is also given to validate and illustrate the proposed method. The obtained results indicate that the CRS technique is effective, simple, and systematic for analyzing the behavior of nonlinear partial differential equations of fractional order arisen in many areas of physics and science. [ABSTRACT FROM AUTHOR]

Published

2021

44. Rothe's method for nonlinear parabolic variational inequalities in noncylindrical domains.

Author

Kulieva, Gulchehra, Kuliev, Komil, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Abstract

In this paper, a nonlinear parabolic variational inequality in noncylindrical domain is considered. Using extended Rothe's method recently achieved in [10] an approximate solution is constructed. Existence and uniqueness results are proved. Also, we present some further results and comments related to the main result. [ABSTRACT FROM AUTHOR]

Published

2021

45. Mathematical description of the fluid flow outside and inside a porous medium based on an interpenetrating model.

Author

Dalabaev, Umurdin, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

POROUS materials, FLUID flow, MATHEMATICAL models, NAVIER-Stokes equations, MANUFACTURING processes

Abstract

In many environmental, industrial and biological processes, flows occur in a saturated porous fluid medium. The transport of substances between surface water and groundwater is a very serious problem. A mathematical model of this problem is studied here. The basis of the mathematical model is based on the interpenetrating model of two-phase media. The proposed equations make it possible to study the flow of a liquid in and outside the porous region in a uniform manner. In this case, the Navier-Stokes equation is obtained in the liquid region. In the porous region, the equations are close to the Brinkman model. In connection with the description of the flow from the standpoint of a single equation for the entire region, there is no need to set boundary conditions in the separation region (such as Beavers Joseph Saffman). Cross-border conditions arise if the Darcy model is used for the porous region. In this case, the order of the systems of equations in each area is different. On the basis of the proposed model, one-dimensional and two-dimensional problems are considered. For the numerical solution of two-dimensional problems, the SIMPLE algorithm with appropriate modifications. [ABSTRACT FROM AUTHOR]

Published

2021

46. Classification of borrowers to improve the scoring system of microfinance organizations.

Author

Azhmukhamedov, Iskandar, Valentina, Kuznetsova, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

INTEREST rates, DEFAULT (Finance), MICROFINANCE, SERVICE industries, PRESSURE regulators

Abstract

The development of information technology is accompanied by a comprehensive transformation of the service sector, including microcredit. This sector of the Russian financial market shows steady growth annually. However, amid the high debt load on the Russian population, the availability of microcredit for most citizens, including online, has led to a high share of default disbursements of microloans in MFIs. Pressure from the regulator and a decrease in the income of Russians led the majority of MFIs to bankruptcy, while the remaining players in the microfinance market led to lower interest rates, and as a result, their margins decreased significantly. In this regard, MFIs have an urgent need to develop a scoring model that would be able to identify high-margin borrowers at the stage of applying for a microloan and "cut off" potentially defaulted borrowers. As part of this work, a methodology is proposed for clustering borrowers based on the fuzzy criterion "level of financial responsibility" and the proposed classification of borrowers. [ABSTRACT FROM AUTHOR]

Published

2021

47. Logistic regression analysis on the determinants of homeownership.

Author

Amit, Norani Binti, Sapiri, Hasimah Binti, Yusof, Zahayu Binti Md, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

HOME ownership, HOUSING policy, GOAL (Psychology), HOUSING market, STATISTICAL software

Abstract

Nowadays, a house has become a necessity for everyone. Most Malaysians put homeownership as one of their ultimate goals in life. Yet, homeownership is a rather complicated feat due to the many factors involved. Therefore, this study aims to determine the most significant factors to homeownership. The factors involved are financial assistance, housing performance, housing motivation, housing market and housing policy. Using a sample of 100 respondents, questionnaire surveys were distributed to obtain their feedbacks. Binary logistic regression analysis was employed in this study and the data was analyzed using IBM SPSS Statistical Software. The data analysis revealed that financial assistance and housing policy significantly influence homeownership. The study results can be beneficial for policymakers and developers in gaining a more in-depth insight of consumer needs and the factors that motivate them to own a house in Malaysia. [ABSTRACT FROM AUTHOR]

Published

2021

48. On some properties of vertex processes of random convex hulls.

Author

Formanov, Shakir, Khamdamov, Isakjan, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

STOCHASTIC processes, CENTRAL limit theorem, POISSON processes, RANDOM variables, CONVEX sets, CONVEX bodies, RANDOM graphs, POINT processes

Abstract

Consider a convex hull generated by a homogeneous Poisson point process in a cone on the plane. In this paper, we present a result that the area of bounded perimeters of the convex hull and the support boundary of the distribution in the cone is the sum of independent identically distributed random variables. In addition, we prove the central limit theorem for the number of vertices of the convex hull in a cone bounded by a disk of radius T as T → ∞. The known results of [1] coincide with the results obtained in the paper. [ABSTRACT FROM AUTHOR]

Published

2021

49. On the numerical characteristics in the central limit theorem.

Author

Formanov, Shakir, Khusainova, Bikajon, Sirozhitdinov, Abdulhamid, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

RANDOM variables, CENTRAL limit theorem, INDEPENDENT variables, LIMIT theorems

Abstract

In the paper problems related to the fulfillment of infinite smallness condition and the validity of the Central Limit Theorems are considered for a sequence of series of independent random variables. In this case, instead of traditional condition of the Lindeberg type, the numerical characteristic introduced by I.A. Ibrahimov and L.V. Osipov is used. [ABSTRACT FROM AUTHOR]

Published

2021

50. About using unicode to hide information in a text document.

Author

Zaynalov, Nodir, Narzullaev, Ulugbek, Muhamadiev, Abdinabi, Qilichev, Dusmurod, Aloev, Rakhmatillo D., Shadimetov, Kholmat M., Hayotov, Abdullo R., and Khudoyberganov, Mirzoali U.

Subjects

DATA integration, CHEMICAL reagents, CRYPTOGRAPHY, SHIPPING containers

Abstract

Steganography develops tools and methods for hiding the fact of message transmission. The first traces of stegano-graphic methods are lost in ancient times. From detective works, various methods of secret writing between the lines of ordinary text are well known: from milk to complex chemical reagents with subsequent processing. Digital steganography is based on hid- ing or embedding additional information in digital objects while causing some distortion of these objects. In this case, text, images, audio, video, network packets, and so on can be used as objects or containers. To embed a secret message, steganographic methods rely on redundant container information or properties that the human perception system cannot distinguish. Recently, there has been a lot of progress in hiding information in a text container, since text documents are used in many organizations. Based on this, here the MS Word document is considered as a data carrier, which has various parameters, changing these parameters can achieve data integration. In the same article, we present steganography using invisible Unicode characters of the Space type, but with a different encoding. [ABSTRACT FROM AUTHOR]

Published

2021