The axisymmetric contact problem of the indentation of a conical punch into a half-space with a coating inhomogeneous in depth
From MaRDI portal
Publication:2277934
DOI10.1016/J.JAPPMATHMECH.2016.03.011zbMath1432.74163OpenAlexW2405148861MaRDI QIDQ2277934
Publication date: 7 December 2019
Published in: Journal of Applied Mathematics and Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jappmathmech.2016.03.011
Related Items (5)
Plane contact problem on indentation of a flat punch into a transversely-isotropic half-plane with functionally graded transversely-isotropic coating ⋮ Indentation of a hard transversely isotropic functionally graded coating by a conical indenter ⋮ Non-symmetric indentation of an elastic half-plane ⋮ Lubricated point heavily loaded contacts of functionally graded materials. Part 1. Dry contacts ⋮ Gravitational settling of a cell on a high-aspect-ratio nanostructured substrate -- an asymptotic modeling approach
Cites Work
- Unnamed Item
- Analytical solution of axisymmetric contact problem about indentation of a circular indenter into a soft functionally graded elastic layer
- Axisymmetric frictionless contact of functionally graded materials
- An asymptotic solution of a class of coupled equations
- Indentation of solids with gradients in elastic properties. I: Point force. II: Axisymmetric indentors
- Torsion of a punch attached to transversely-isotropic half-space with functionally graded coating
- Analytical solution of the spherical indentation problem for a half-space with gradients with the depth elastic properties
- A bilateral asymptotic method of solving the integral equation of the contact problem of the torsion of an elastic half-space inhomogeneous in depth
- Pressure of a die on an elastic layer of finite thickness
- Asymptotic solution of the contact problem for a thin elastic layer
This page was built for publication: The axisymmetric contact problem of the indentation of a conical punch into a half-space with a coating inhomogeneous in depth
