Global existence for three-dimensional incompressible isotropic elastodynamics

## Abstract The existence of global‐in‐time classical solutions to the Cauchy problem for incompressible nonlinear isotropic elastodynamics for small initial displacements is proved. Solutions are constructed via approximation by slightly compressible materials. The energy for the approximate solut

## Abstract In this paper, we investigate the asymptotic behavior of solutions of the three‐dimensional Brinkman–Forchheimer equation. We first prove the existence and uniqueness of solutions of the equation in __L__^2^, and then show that the equation has a global attractor in __H__^2^ when the ex

## Abstract We study the __p__‐system with viscosity given by __v__~__t__~ − __u__~__x__~ = 0, __u__~__t__~ + __p__(__v__)~__x__~ = (__k__(__v__)__u__~__x__~)~__x__~ + __f__(∫ __v__d__x__, __t__), with the initial and the boundary conditions (v(x, 0), u(x,0)) = (__v__~0~, __u__~0~(__x__)), __u__(0,

## Abstract In this work a fast solver for large‐scale three‐dimensional elastodynamic crack problems is presented, implemented, and tested. The dual boundary element method in the Laplace transform domain is used for the accurate dynamic analysis of cracked bodies. The fast solution procedure is b