Cover Image

Mathematical modeling of the peristaltic processes based on lattice Boltzmann equation

Saved in:

Bibliographic Details
Date:	2014
Main Authors:	B. B. Nesterenko, M. A. Novotarskyi
Format:	Article
Language:	English
Published:	2014
Series:	Mathematical and computer modelling. Series: Technical sciences
Online Access:	http://jnas.nbuv.gov.ua/article/UJRN-0000380236
Tags:	Add Tag No Tags, Be the first to tag this record!
Journal Title:	Library portal of National Academy of Sciences of Ukraine \| LibNAS

Institution

Library portal of National Academy of Sciences of Ukraine | LibNAS

Similar Items

Mathematical modeling of fluid flow, which is caused by peristaltic fluctuations
by: B. B. Nesterenko, et al.
Published: (2013)

Texture advection in the viscous fluid flow modeling with the lattice Boltzmann method
by: H. H. Bulanchuk, et al.
Published: (2019)

A new Lattice Boltzmann method for a Gray–Scott based model applied to image restoration and contrast enhancement
by: H. Alaa, et al.
Published: (2022)

The application of lattice Boltzmann to flow analysisnanofluid in the channel between coaxial cylinders
by: A. O. Avramenko, et al.
Published: (2016)

Some approximate solutions of the Boltzmann equation
by: Gordevsky, V.D., et al.
Published: (2001)

Construction of probabilistic solutions of the Boltzmann equation
by: Virchenko, Yu.P., et al.
Published: (2007)

The Boltzmann kinetic equation with correlations for hard sphere fluids
by: V. I. Herasymenko, et al.
Published: (2015)

Approximate solutions of the Boltzmann equation with infinitely many modes
by: Gordevskii, V. D., et al.
Published: (2017)

New explicit approximate solution of the Boltzmann equation in the case of the hard sphere model
by: Hukalov, O., et al.
Published: (2026)

On the approaches to the derivation of the Boltzmann equation with hard sphere collisions
by: V. I. Gerasimenko
Published: (2013)

Approximate solutions of the Boltzmann equation with infinitely many modes
by: V. D. Hordevskyi, et al.
Published: (2017)

Spatially-Homogeneous Boltzmann Hierarchy as Averaged Spatially-Inhomogeneous Stochastic Boltzmann Hierarchy
by: Lampis, M., et al.
Published: (2002)

Spatially-Homogeneous Boltzmann Hierarchy as Averaged Spatially-Inhomogeneous Stochastic Boltzmann Hierarchy
by: Lampis, M., et al.
Published: (2002)

Application of the Boltzmann lattice method to the analysis of nanofluid flow in a curved channel with radial irregularities of the temperature and the concentration of nanoparticles
by: A. O. Avramenko, et al.
Published: (2017)

Stochastic Dynamics and Hierarchy for the Boltzmann Equation with Arbitrary Differential Scattering Cross Section
by: Lampis, M., et al.
Published: (2004)

Stochastic Dynamics and Hierarchy for the Boltzmann Equation with Arbitrary Differential Scattering Cross Section
by: Lampis, M., et al.
Published: (2004)

An analysis of the fluctuation potential in the modified Poisson-Boltzmann theory for restricted primitive model electrolytes
by: Ulloa-Dávila, E.O., et al.
Published: (2017)

Mathematical modelling of the sintering process of iron-based metal-glass materials
by: T. G. Jabbarov, et al.
Published: (2019)

Mathematical modelling of the sintering process of iron-based metal-glass materials
by: Jabbarov, T.G., et al.
Published: (2019)

Stochastic dynamics and Boltzmann hierarchy. III
by: Petrina, D. Ya., et al.
Published: (1998)

Stochastic dynamics and Boltzmann hierarchy. II
by: Petrina, D. Ya., et al.
Published: (1998)

Stochastic dynamics and Boltzmann hierarchy. I
by: Petrina, D. Ya., et al.
Published: (1998)

Methods for derivation of the stochastic Boltzmann hierarchy
by: Petrina, D. Ya., et al.
Published: (2000)

Methods for derivation of the stochastic Boltzmann hierarchy
by: Petrina, D.Ya.
Published: (2000)

Mathematical modeling of evaporation processes at ebm of alloys based
by: S. V. Akhonin, et al.
Published: (2022)

Model of the immunosensor on the basis of lattice differential equations with delay
by: V. P. Martseniuk, et al.
Published: (2018)

On application of lattice differential equations with delay for immunosensor modeling
by: V. P. Martsenjuk, et al.
Published: (2018)

Numerical Analysis of the Cyber-Physical Model of the Immunosensor in a Rectangular Grid Based on Lattice Difference Equations
by: A. S. Sverstiuk
Published: (2019)

Model of the immunosensor on the basis of difference equations on a hexagonal lattice
by: A. S. Sverstiuk
Published: (2018)

Mathematical modeling of verifying the coatings of construction units on the base of singular integral equations
by: A. V. Usov, et al.
Published: (2010)

Thermodynamics of primitive model electrolytes in the symmetric and modified Poisson-Boltzmann theories. A comparative study with Monte Carlo simulations
by: Quiñones, A.O., et al.
Published: (2018)

Mathematical modeling of verifying the coatings of construction units on the base of singular integral equations
by: Усов, А. В., et al.
Published: (2016)

Mathematical modeling of verifying the coatings of construction units on the base of singular integral equations
by: Усов, А. В., et al.
Published: (2016)

A modified choice function hyper-heuristic with Boltzmann function
by: O. Mellouli, et al.
Published: (2021)

Mathematical modeling of neutron radiography processes
by: Prokhorets, S.I., et al.
Published: (2023)

Lattice Model of Intercalation
by: Mysakovych, T.S., et al.
Published: (2010)

Mathematical Models of Technological Processes of Oil Refining and Their Qualitative Analysis Based on the General Concept Of Models
by: S. A. Polozhaenko, et al.
Published: (2022)

A modified Poisson-Boltzmann approach to homogeneous ionic solutions
by: Outhwaite, C.W.
Published: (2004)

Mathematical and Simulation Modeling of Epidemiology Processes
by: I. T. Kosovych, et al.
Published: (2022)

Application of differential equations with time delay on a hexagonal lattice for immunosensor modeling
by: V. P. Martsenjuk, et al.
Published: (2019)