What is the wedge product $\wedge$ of a $0$-form $f(x_1,...,x_n)$ with a $1$-form $\displaystyle\sum_{i=1}^{n} a_i dx_i$? According to the theory, it should be a (0+1=1)-form.
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In his Advanced Calculus of Several Variables, C. H. Edwards, Jr. assaults his reader with $d\left(ab\right)= da\wedge b+a\wedge db,$ without the least bit of discussion, nor definition. – Steven Thomas Hatton Aug 12 '18 at 04:06
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A $0$-form is nothing but a function. The exterior product is in this case the usual multiplication, i.e. the product is
$$f(x)\wedge\sum_{i=1}^n a_i(x) dx_i=\sum_{i=1}^n a_i(x)f(x) dx_i$$
As you can see, this really is a $1$-form.
J.R.
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For any $0$-form such as $f(x_1, x_2, . . . , x_n)$ and any $k$-form $\beta$, the operation $f \wedge \beta$ of wedge multiplication of $\beta$ by $f$ is simply ordinary multiplication by $f$: $f \wedge \beta = f\beta$, a $k$-form. Thus
$f \wedge \sum_1^n a_i dx_i = \sum_1 ^n fa_i dx_i, \tag{1}$
clearly another $1$-form. Details may be found at http://www.sjsu.edu/faculty/watkins/difforms0.htm.
Hope this helps. Cheerio,
and as always,
Fiat Lux!!!
Robert Lewis
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