Your search keyword '"Yuldasheva, N.T."' showing total 2 results

1. Bitsadze-Samarskii Type Problem for the Diffusion Equation and Degenerate Hyperbolic Equation

Author

Ruziev, M.Kh., Zunnunov, R.T., Yuldasheva, N.T., and Rakhimova, G.B.

Subjects

boundary value problem, diffusion equation, degenerate hyperbolic equation, gauss hypergeometric function, wright function, uniqueness of the solution to the problem, existence of a solution to the problem, краевая задача, уравнение диффузии, вырожденное гиперболическое уравнение, гипергеометрическая функция гаусса, функция райта, единственность решения задачи, существование решения задачи, Science

Abstract

A boundary value problem of the Bitsadze-Samarskii type is studied in the article for a fractionalorder diffusion equation and a degenerate hyperbolic equation with singular coefficients at lower terms in an unbounded domain. The article considers a mixed domain where the parabolic part of the domain under consideration coincides with the upper half-plane and the hyperbolic part is bounded by two characteristics of the equation under consideration and a segment of the abscissa axis. The uniqueness of the solution to the problem under consideration is proven by the method of energy integrals. The existence of a solution to the problem under consideration is reduced to the concept of solvability of a fractional-order differential equation. An explicit form of the solution to the modified Cauchy problem is given in the hyperbolic part of the mixed domain under consideration. Using this solution, due to the boundary condition of the problem, the main functional relationship between the traces of the unknown function brought to the interval of the degeneracy line of the equation is obtained. Further, using the representation of the solution of the diffusion equation of fractional order, the second main functional relationship between the traces of the sought-for function on the interval of the abscissa axis from the parabolic part of the considered mixed domain is obtained. Through the conjugation condition of the problem under study, an equation with fractional derivatives is obtained from two functional relationships by eliminating one unknown function; its solution is written out in explicit form. In the study of the boundary value problem, generalized fractional integro-differentiation operators with the Gauss hypergeometric function are employed. The properties of the Wright and Mittag-Leffler type functions are extensively utilized in the study.

Published

2024

2. WIDESPREAD OSTEONECROSIS OF THE UPPER JAW AFTER CORONAVIRUS INFECTION

Author

Bairikov, I.M., Samutkina, M.G., Yuldasheva, N.T., Vasilyev, Y.L., and Fatenkov, O.V.

Subjects

new coronavirus infection, osteonecrosis, maxillary osteonecrosis, sequestrectomy

Abstract

The pandemic caused by the new coronavirus SARS-CoV-2 is another challenge for humanity. The efforts of scientists and doctors around the world are aimed at studying the features of the epidemiology, pathogenesis, clinic and treatment of the coronavirus infection COVID-2019. Direct interaction of the causative agent of a new coronavirus infection with ACE-2 receptors, which are present both in the alveoli of the lungs, the myocardium, and in the endothelium of blood vessels, leads to damage to the vascular wall, stimulates response thrombus formation. One of the important mechanisms in the pathogenesis of osteonecrosis, including that of the jaw bones, in the occurrence of bone necrosis is a violation of blood circulation, as well as a deterioration in the rheological properties of blood and a slowdown in the rate of volumetric blood flow, which can be the cause of intravascular coagulation. These two factors are the main cause of bone necrosis with the release of inflammatory mediators. Therefore, it can be assumed that damage to the vascular wall and impaired microcirculation in a new coronavirus infection may contribute to the development of a destructive form of osteonecrosis of the jaw bones. We report a case of diffuse destructive osteonecrosis of the maxilla in a 67-year- old female patient suffering from hypertension and type 2 diabetes mellitus after bilateral pneumonia associated with a new coronavirus infection. During the first hospitalization, surgical intervention consisted in the removal of teeth 2.4, 2.5, 2.6, a freely located bone sequester of the alveolar process within the boundaries of teeth 2.4, 2.5, periostectomy within the boundaries of teeth 2.2, 2.3, 2.4, 2.5. There was no bleeding from the sockets of the teeth, the visible bone of the alveolar process was white, bloodless, “naked”. When examined 2 months after the operation, in the oral cavity - exposure of the bone of the alveolar process within the boundaries of 2.1 - 2.6 teeth, when probing from the side of the palate - a pathological pocket extending in the direction of the soft palate to a depth of more than 2.0 cm. Bone sequestration within the boundaries of the alveolar the process containing the sockets of the removed teeth is mobile. A surgical intervention was performed - sequestrectomy, during which a defect was formed that communicates the oral cavity with the nasal cavity on the left and the maxillary sinus. The defect is closed by a protective plate that separates the cavity of the mouth, nose and maxillary sinus.

Published

2023