Notational confusion of multivariable derivatives

I think there's several different confusions that arise from multivariable derivative notation:

• The thing where ${\displaystyle {\frac {\partial w}{\partial t}}}$ can mean two different things on LHS and RHS when ${\displaystyle t}$ is used as both an initial and intermediate variable. (See Folland for details.)
• The thing where if ${\displaystyle f(x,y)=(x^{2},y^{2})}$ then ${\displaystyle {\frac {\partial f}{\partial x}}(x,x)}$ feels like it might be ${\displaystyle (2x,2x)}$ even though it's actually ${\displaystyle (2x,0)}$. (Example from Tao.) See also [1]
• The ambiguity of expressions like ${\displaystyle \nabla f(Ax)}$
• dual basis stuff -- see Tao's explanation of this in p. 225 of [2]

The derivative as a linear transformation in the several variable case and a number in the single-variable case

• The thing where the total derivative for ${\displaystyle n=m=1}$ "should" be a function but people treat it as a number. Refer to "Appendix A: Perorations of Dieudonne" (p. 337) in Pugh's Real Mathematical Analysis.

Total derivative versus derivative matrix

Technically the total derivative at a point is a linear transformation, whereas the derivative matrix is a matrix so an array of numbers arranged in a certain order. However, there is a one-to-one correspondence between linear transformations ${\displaystyle \mathbf {R} ^{n}\to \mathbf {R} ^{m}}$ and ${\displaystyle m}$ by ${\displaystyle n}$ matrices, so many books call the total derivative a matrix or equate the two.

A similar confusion exists in the teaching of linear algebra, where sometimes only matrices are mentioned.

See also

• Summary table of multivariable derivatives