Publications by authors named "Douglas Reinelt"
Article Synopsis
- The study investigates the elastic behavior of a 3D soap froth confined between two rigid walls, focusing on the arrangement of cells and how they respond to shear stress.
- Simulations reveal that the equilibrium structure consists of Fejes-Toth cells at the walls and Kelvin cells in the core, with variations in confinement impacting elastic properties and shear moduli.
- The elastic limit is influenced by foam confinement, and topological transitions are analyzed, highlighting similarities with bulk Kelvin foam behavior.
Quasistatic simple shearing flow of random monodisperse soap froth is investigated by analyzing surface evolver simulations of spatially periodic foams. Elastic-plastic behavior is caused by irreversible topological rearrangements (T1s) that occur when Plateau's laws are violated; the first T1 determines the elastic limit and frequent T1 avalanches sustain the yield-stress plateau at large strains. The stress and shape anisotropy of individual cells is quantified by Q, a scalar derived from an interface tensor that gauges the cell's contribution to the global stress.
View Article and Find Full Text PDFThe Surface Evolver was used to compute the equilibrium microstructure of dry soap foams with random structure and a wide range of cell-size distributions. Topological and geometric properties of foams and individual cells were evaluated. The theory for isotropic Plateau polyhedra describes the dependence of cell geometric properties on their volume and number of faces.
View Article and Find Full Text PDFThe Surface Evolver was used to calculate the equilibrium microstructure of random monodisperse soap froth, starting from Voronoi partitions of randomly packed spheres. The sphere packing has a strong influence on foam properties, such as E (surface free energy) and