So we know that [Hodge duality](http://ift.tt/VO1pvY) works this way
$$⋆(dx^i_1 \wedge ... \wedge dx^i_p)= \frac{1}{(n-p)!} \epsilon^{i_1..i_p}_{i_{p+1}..i_n} dx^{i_{p+1} } \wedge dx^{i_n}$$
where p represents the p in p-form and n is the dimensional number.
My...
Hodge duality and some properties
Hodge duality and some properties
$$⋆(dx^i_1 \wedge ... \wedge dx^i_p)= \frac{1}{(n-p)!} \epsilon^{i_1..i_p}_{i_{p+1}..i_n} dx^{i_{p+1} } \wedge dx^{i_n}$$
where p represents the p in p-form and n is the dimensional number.
My...
Hodge duality and some properties
Hodge duality and some properties
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