- Home
- Publications
- Publication Search
- Publication Details
Title
Strain gradient viscoelasticity theory of polymer networks
Authors
Keywords
-
Journal
INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE
Volume 192, Issue -, Pages 103937
Publisher
Elsevier BV
Online
2023-08-14
DOI
10.1016/j.ijengsci.2023.103937
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- A physically-based nonlocal strain gradient theory for crosslinked polymers
- (2023) Yiyuan Jiang et al. INTERNATIONAL JOURNAL OF MECHANICAL SCIENCES
- A spatiotemporally-nonlocal continuum field theory of polymer networks
- (2023) Yiyuan Jiang et al. Science China-Physics Mechanics & Astronomy
- A surpassingly stiff yet lossy multiscale nanocomposite inspired by bio-architecture
- (2023) Chenhao Xu et al. Materials Today Communications
- Strain gradient elasticity theory of polymer networks
- (2022) Yiyuan Jiang et al. ACTA MECHANICA
- Isogeometric analysis of size-dependent Bernoulli–Euler beam based on a reformulated strain gradient elasticity theory
- (2021) Shuohui Yin et al. COMPUTERS & STRUCTURES
- Construction of micromorphic continua by homogenization based on variational principles
- (2021) S.E. Alavi et al. JOURNAL OF THE MECHANICS AND PHYSICS OF SOLIDS
- Vitrimers: Current research trends and their emerging applications
- (2021) Jie Zheng et al. Materials Today
- Nonlinear axisymmetric bending analysis of strain gradient thin circular plate
- (2020) Anqing Li et al. APPLIED MATHEMATICAL MODELLING
- A strain gradient linear viscoelasticity theory
- (2020) Zhongya Lin et al. INTERNATIONAL JOURNAL OF SOLIDS AND STRUCTURES
- A viscoelastic damage model for nanoparticle/epoxy nanocomposites at finite strain: A multiscale approach
- (2019) Behrouz Arash et al. JOURNAL OF THE MECHANICS AND PHYSICS OF SOLIDS
- Three-phase model of particulate composites in second gradient elasticity
- (2019) Yury Solyaev et al. EUROPEAN JOURNAL OF MECHANICS A-SOLIDS
- Revisiting bending theories of elastic gradient beams
- (2018) S. Lurie et al. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE
- Comparison between the Mori-Tanaka and generalized self-consistent methods in the framework of anti-plane strain inclusion problem in strain gradient elasticity
- (2018) S. Lurie et al. MECHANICS OF MATERIALS
- A new computationally efficient finite element formulation for nanoplates using second-order strain gradient Kirchhoff's plate theory
- (2018) Bishweshwar Babu et al. COMPOSITES PART B-ENGINEERING
- Vibration and buckling of first-order shear deformable circular cylindrical micro-/nano-shells based on Mindlin's strain gradient elasticity theory
- (2016) R. Gholami et al. EUROPEAN JOURNAL OF MECHANICS A-SOLIDS
- Molecular simulation guided constitutive modeling on finite strain viscoelasticity of elastomers
- (2016) Ying Li et al. JOURNAL OF THE MECHANICS AND PHYSICS OF SOLIDS
- A size-dependent model for bi-layered Kirchhoff micro-plate based on strain gradient elasticity theory
- (2014) Anqing Li et al. COMPOSITE STRUCTURES
- Cylindrical thin-shell model based on modified strain gradient theory
- (2014) Hamid Zeighampour et al. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE
- A size-dependent shear deformation beam model based on the strain gradient elasticity theory
- (2013) Bekir Akgöz et al. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE
- Current issues in research on structure–property relationships in polymer nanocomposites
- (2010) J. Jancar et al. POLYMER
- Graphene-based polymer nanocomposites
- (2010) Jeffrey R. Potts et al. POLYMER
- Static and dynamic analysis of micro beams based on strain gradient elasticity theory
- (2008) Shengli Kong et al. INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE
- Polymer nanotechnology: Nanocomposites
- (2008) D.R. Paul et al. POLYMER
Add your recorded webinar
Do you already have a recorded webinar? Grow your audience and get more views by easily listing your recording on Peeref.
Upload NowAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started