Abstract EN:

The main subject is equilibrium properties of 2D and 3D dry soap-like foams. For 2D foams at equilibrium, a star-triangle equivalence is proved using geometrical methods and invariance by inversion transformations. This equivalence states that triangular bubbles can be freely exchanged with threefold stars without perturbing the overall equilibrium; a star is a set of three edges ending at a central vertex. The main implication of the star-triangle equivalence is that the disappearance of a three-sided bubble during coarsening is a continuous topological process [1]. Using Moukarzel's duality, the star-triangle equivalence is extended to general 2D foams where the films have different line tensions. Then, as a corollary, the equivalence implies the so called vertex ``decoration'' theorem for foams with a little liquid [1]. The star-triangle equivalence is also proved for 3D foams provided the films are spherical-caps. Considering an equilibrated foam in contact with a solid, curved and smooth, surface and considering the trace of the films on the surface as a non-conventional 2D foam, the equilibrium equations are established for this 2D foam, generalising the standard case of flat Hele-Shaw cells [2]. The invariance of the vertex equilibrium conditions by conformal transformations is proved. As an application, the configurations of foams in thin interstices between two non parallel plates is analysed in details; we give arguments explaining the resemblance of these patterns with images of Laplace's law lead to an approximate equation relating the plate profile to the conformal map. Solutions are given for the logarithm and power laws in the case of constant pressure. The predictions are compared to available experimental data [3] and to the constant volumes case. [1] M. Mancini and C. Oguey, Phil. Mag. Lett. 83, 643-649 (2003). [2] M. Mancini and C. Oguey, Col. Surf. A, 263, 33-38 (2005).