Energy bounds for a mixture of two linear elastic solids occupying a semi-infinite cylinder
From MaRDI portal
Publication:1914326
DOI10.1007/BF01176822zbMath0849.73006MaRDI QIDQ1914326
Alessandra Borrelli, Maria Christina Patria
Publication date: 5 June 1996
Published in: Acta Mechanica (Search for Journal in Brave)
Related Items
Phragmen–Lindelof alternative in nonlinear viscoelasticity ⋮ Dynamic equivalence, self-equilibrated excitation and Saint-Venant's principle for an elastic strip ⋮ Energy bounds in dynamical problems for a semi-infinite magnetoelastic beam ⋮ End effects in thermoelasticity ⋮ Dynamic version of Saint-Venant's principle-historical account and recent results
Cites Work
- Unnamed Item
- Unnamed Item
- Uniqueness and reciprocity in the boundary-initial value problem for a mixture of two elastic solids occupying an unbounded domain
- Uniqueness in the boundary-value problems for the static equilibrium equations of a mixture of two elastic solids occupying an unbounded domain
- Weighted energy methods in fluid dynamics and elasticity
- Uniqueness in the linear theory of a mixture of two elastic solids
- Saint-Venant's principle
- Recent Developments Concerning Saint-Venant's Principle
- CONTINUUM THEORIES OF MIXTURES: BASIC THEORY AND HISTORICAL DEVELOPMENT
- Continuum Theories of Mixtures: Applications
