On rigid and infinitesimal rigid displacements in three-dimensional elasticity
Résumé
Let Ω be an open connected subset of R^3 and let Θ be an immersion from Ω into R^3. It is first established that the set formed by all rigid displacements, i.e., that preserve the metric, of the open set Θ(Ω) is a submanifold of dimension 6 and of class C^∞ of the space H^1(Ω). It is then shown that the vector space formed by all the infinitesimal rigid displacements of the same set Θ(Ω) is nothing but the tangent space at the origin to this submanifold. In this fashion, the familiar “infinitesimal rigid displacement lemma” of three-dimensional linearized elasticity is put in its proper perspective.