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The general form of the cauchy stress tensor is given by the dyadic decomposition

$$\boldsymbol \sigma = \sigma_{ij}\,\,\mathbf{e}_i \otimes \mathbf{e}_j$$

I want to know how this can be expanded in a different coordinate system such as spherical coordinates.

Related: linklink

The general form of the cauchy stress tensor is given by the dyadic decomposition

$$\boldsymbol \sigma = \sigma_{ij}\,\,\mathbf{e}_i \otimes \mathbf{e}_j$$

I want to know how this can be expanded in a different coordinate system such as spherical coordinates.

Related: link

The general form of the cauchy stress tensor is given by the dyadic decomposition

$$\boldsymbol \sigma = \sigma_{ij}\,\,\mathbf{e}_i \otimes \mathbf{e}_j$$

I want to know how this can be expanded in a different coordinate system such as spherical coordinates.

Related: link

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Cauchy stress tensor in different coordinate system

The general form of the cauchy stress tensor is given by the dyadic decomposition

$$\boldsymbol \sigma = \sigma_{ij}\,\,\mathbf{e}_i \otimes \mathbf{e}_j$$

I want to know how this can be expanded in a different coordinate system such as spherical coordinates.

Related: link