ball.stress.full
Syntax
Tensor Access
- m = ball.stress.full(bp)
Get the full stress tensor arising from all contacts acting on the ball. The stress tensor is computed as:
\[\sigma^{(\phi)}_{ij} = \frac{1}{V} \sum_{n_c}(x^{(c)}_i - x^{(\phi)}_i) F^{(c,\phi)}_j\]This tensor is returned as a matrix with dimension {2*2 in 2D; 3*3 in 3D}. Use
ball.stress
to access the symmetric part of the ball stress tensor.
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