In the language of differential forms, the field strength $F$ for the Yang-Mills theory is given by
$$F={\rm d}A+A\wedge A,$$
where $A$ is a matrix of one-forms.
In the language of Ricci calculus, the the field strength $F_{\mu\nu}^{a}$ for the Yang-Mills theory is given by
$$F_{\mu\nu}^{a}=\partial_{\mu}A_{\nu}^{a}-\partial_{\nu}A_{\mu}^{a}+f^{abc}A_{\mu}^{b}A_{\nu}^{c},$$
where $\mu$ and $\nu$ label the indices of the field strength and $a$ labels the $a^{\text{th}}$ component of the matrix $A.$
I understand that $F=\frac{1}{2}F_{\mu\nu}\; {\rm d}x^{\mu}\wedge {\rm d}x^{\nu}=(\partial_{\mu}\partial_{\nu}-\partial_{\nu}\partial_{\mu})\; {\rm d}x^{\mu}\wedge {\rm d}x^{\nu},$
but how do you write the $A\wedge A$ in tensor notation?
Edit:
I understand that $F=\frac{1}{2}F_{\mu\nu}\; {\rm d}x^{\mu}\wedge {\rm d}x^{\nu}+\cdots=\frac{1}{2}(\partial_{\mu} A_{\nu}-\partial_{\nu} A_{\mu})\; {\rm d}x^{\mu}\wedge {\rm d}x^{\nu}+\cdots,$
where the dots denote $A\wedge A$ in Ricci calculus.
How do you write the $A\wedge A$ in tensor notation?
