Lines Matching refs:bm

209 * - Displacement, $\bm u$
215 * - Body force (gravity) on volume, $\int \rho \bm g$
219 …eter 100` to measure displacement in centimeters), but $E$ and $\int \rho \bm g$ have the same dep…
225 …ment in the $z$ direction, pressure, $\operatorname{trace} \bm{E}$, $\operatorname{trace} \bm{E}^2…
237      - $\lambda \operatorname{trace} \bm{\epsilon}$
238      - $\lambda \log \operatorname{trace} \bm{\epsilon}$
242      - $\operatorname{trace} \bm{\epsilon}$
243      - $\operatorname{trace} \bm{\epsilon}$
244      - $\operatorname{trace} \bm{E}$
246    * - $\operatorname{trace} \bm{E}^2$
247      - $\operatorname{trace} \bm{\epsilon}^2$
248      - $\operatorname{trace} \bm{\epsilon}^2$
249      - $\operatorname{trace} \bm{E}^2$
252      - $1 + \operatorname{trace} \bm{\epsilon}$
253      - $1 + \operatorname{trace} \bm{\epsilon}$
257 …   - $\frac{\lambda}{2} (\operatorname{trace} \bm{\epsilon})^2 + \mu \bm{\epsilon} : \bm{\epsilon}$
258 …bda (1 + \operatorname{trace} \bm{\epsilon}) (\log(1 + \operatorname{trace} \bm{\epsilon} ) - 1) +…
259      - $\frac{\lambda}{2}(\log J)^2 + \mu \operatorname{trace} \bm{E} - \mu \log J$