Global existence of weak solutions to viscoelastic phase separation part: I. Regular case
Published 2022 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
Global existence of weak solutions to viscoelastic phase separation part: I. Regular case
Authors
Keywords
-
Journal
NONLINEARITY
Volume 35, Issue 7, Pages 3417-3458
Publisher
IOP Publishing
Online
2022-06-22
DOI
10.1088/1361-6544/ac5920
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- Analysis of a viscoelastic phase separation model
- (2021) Aaron Brunk et al. JOURNAL OF PHYSICS-CONDENSED MATTER
- Systematic derivation of hydrodynamic equations for viscoelastic phase separation
- (2021) Dominic Spiller et al. JOURNAL OF PHYSICS-CONDENSED MATTER
- Existence of large-data global-in-time finite-energy weak solutions to a compressible FENE-P model
- (2018) John W. Barrett et al. MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES
- Existence of global weak solutions to the kinetic Peterlin model
- (2018) P. Gwiazda et al. NONLINEAR ANALYSIS-REAL WORLD APPLICATIONS
- Thermodynamics of viscoelastic rate-type fluids with stress diffusion
- (2018) Josef Málek et al. PHYSICS OF FLUIDS
- Energy-stable linear schemes for polymer–solvent phase field models
- (2018) Paul J. Strasser et al. COMPUTERS & MATHEMATICS WITH APPLICATIONS
- Numerical analysis of the Oseen-type Peterlin viscoelastic model by the stabilized Lagrange–Galerkin method. Part II: A linear scheme
- (2017) Mária Lukáčová–Medvid’ová et al. ESAIM-MATHEMATICAL MODELLING AND NUMERICAL ANALYSIS-MODELISATION MATHEMATIQUE ET ANALYSE NUMERIQUE
- Global Existence Result for the Generalized Peterlin Viscoelastic Model
- (2017) Mária Lukáčová-Medviďová et al. SIAM JOURNAL ON MATHEMATICAL ANALYSIS
- Weak Solutions for the Cahn–Hilliard Equation with Degenerate Mobility
- (2015) Shibin Dai et al. ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
- Stability and convergence of a second-order mixed finite element method for the Cahn–Hilliard equation
- (2015) Amanda E. Diegel et al. IMA JOURNAL OF NUMERICAL ANALYSIS
- On a variant of the Maxwell and Oldroyd-B models within the context of a thermodynamic basis
- (2015) J. Málek et al. INTERNATIONAL JOURNAL OF NON-LINEAR MECHANICS
- Error Estimates of a Pressure-Stabilized Characteristics Finite Element Scheme for the Oseen Equations
- (2015) Hirofumi Notsu et al. JOURNAL OF SCIENTIFIC COMPUTING
- Global existence and uniqueness result for the diffusive Peterlin viscoelastic model
- (2015) Mária Lukáčová - Medvid’ová et al. NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS
- A diffuse interface model for two-phase incompressible flows with non-local interactions and non-constant mobility
- (2015) Sergio Frigeri et al. NONLINEARITY
- On weak solutions to a diffuse interface model of a binary mixture of compressible fluids
- (2015) Eduard Feireisl Discrete and Continuous Dynamical Systems-Series S
- On an incompressible Navier–Stokes/Cahn–Hilliard system with degenerate mobility
- (2013) Helmut Abels et al. ANNALES DE L INSTITUT HENRI POINCARE-ANALYSE NON LINEAIRE
- Global existence of weak solutions to macroscopic models of polymeric flows
- (2011) Nader Masmoudi JOURNAL DE MATHEMATIQUES PURES ET APPLIQUEES
- Regularity and separation from potential barriers for a non-local phase-field system
- (2011) Stig-Olof Londen et al. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS
- Global existence of weak solutions to a nonlocal Cahn–Hilliard–Navier–Stokes system
- (2011) Pierluigi Colli et al. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS
- EXISTENCE AND EQUILIBRATION OF GLOBAL WEAK SOLUTIONS TO KINETIC MODELS FOR DILUTE POLYMERS I: FINITELY EXTENSIBLE NONLINEAR BEAD-SPRING CHAINS
- (2011) JOHN W. BARRETT et al. MATHEMATICAL MODELS & METHODS IN APPLIED SCIENCES
- The Cahn-Hilliard Equation with Logarithmic Potentials
- (2011) Laurence Cherfils et al. Milan Journal of Mathematics
- Kinetic models for polymers with inertial effects
- (2009) Pierre Degond et al. Networks and Heterogeneous Media
- On a Diffuse Interface Model for Two-Phase Flows of Viscous, Incompressible Fluids with Matched Densities
- (2008) Helmut Abels ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
- On a diffuse interface model for a two-phase flow of compressible viscous fluids
- (2008) Helmut Abels et al. INDIANA UNIVERSITY MATHEMATICS JOURNAL
Discover Peeref hubs
Discuss science. Find collaborators. Network.
Join a conversationCreate your own webinar
Interested in hosting your own webinar? Check the schedule and propose your idea to the Peeref Content Team.
Create Now