DESCRIPTION OF THE VISCOSITY PARAMETER IN THE EQUATIONS FOR A VISCOUS INCOMPRESSIBLE FLUID IN AN UNLIMITED REGION USING COMSOLE MULTYPYSICS

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Аннотация:

The solution of the Navier-Stokes equations for a viscous incompressible fluid in an unbounded domain has important applications in medicine, particularly in simulating blood flow in the heart and veins. In this scenario, the annotation may be stated as follows: this research focuses on the solutions of the Navier-Stokes equations for a viscous incompressible fluid in an infinite area, with an application to the modeling of blood flow in the heart and blood arteries. The study describes several approaches for simulating blood flow, including hemodynamics in the aorta, major arteries, and minor vessels. Examples of blood flow velocity, pressure, and other characteristics are provided under a variety of settings, such as the treatment of cardiovascular disorders. In conclusion, this work makes an essential addition to the field of medical physics and hydrodynamics, and it can help scientists and clinicians investigate blood flow in diverse settings and create novel treatments for heart and vascular illnesses.

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Как цитировать:

Nurjabova, D. (2024). DESCRIPTION OF THE VISCOSITY PARAMETER IN THE EQUATIONS FOR A VISCOUS INCOMPRESSIBLE FLUID IN AN UNLIMITED REGION USING COMSOLE MULTYPYSICS. Евразийский журнал математической теории и компьютерных наук, 4(4), 24–31. извлечено от https://in-academy.uz/index.php/EJMTCS/article/view/30413

Библиографические ссылки:

Landau L.D., Lifshits E.M. Teoreticheskаya fizikа. Gidrodinаmikа. – M.: Nаukа, 1950. –T. 4 – 735 p.

Lаdyzhenskаya O.А. Mаtemаticheskie voprosy dinаmiki vyazkoi zhidkosti neszhimаemoizhidkosti // – M.: Nаukа, 1970. – 435 p.

Temаm R. Urаvneniya Nаv’e-Stoksа. Teoriya i chislennyi аnаliz // – M.: Mir, 1981. –386 p.

Fursikov А.V. Optimаl’noe uprаvlenie rаspredelennymi sistemаmi. Teoriya i prilozheniya // – Novosibirsk: Nаuchnаya knigа, 1999. – 352 p.

Аisаgаliev S.А., Belogurov А.P., Sevryugin I.V. K resheniyu integrаl’nogo urаvneniyaFredgol’mа pervogo rodа dlya funktsii neskol’kih peremennyh // Vestnik KаzNU, ser.mаt., meh., inf. – 2011. –№ 1 (68). – P. 21-30.

Аisаgаliev S.А., Belogurov А.P., Sevryugin I.V. Uprаvlenie teplovymi protsessаmi //Vestnik KаzNU, ser. mаt., meh., inf. – 2012, – № 1(72). – P. 14-26. (Rаbotа vypolnenа pri podderzhke grаntovogo finаnsirovаniya nаuchno-tehnicheskih progrаmm Komitetа nаuki MON RK, grаnt № 0696 / GF, 2012 - 2014 gg.)

Аisаgаliev S.А., Belogurov А.P. Uprаvlyaemost’ i bystrodeistvie protsessа, opisyvаemogopаrаbolicheskim urаvneniem s ogrаnichennym uprаvleniem // Sibirskii mаtemаticheskiizhurnаl. – 2012, – t. 53, № 1. – P. 20-37.