Hasse derivative

Let k[X] be a polynomial ring over a field k. The r-th Hasse derivative of Xⁿ is

${\displaystyle D^{(r)}X^{n}={\binom {n}{r}}X^{n-r},}$

if n ≥ r and zero otherwise.[1] In characteristic zero we have

${\displaystyle D^{(r)}={\frac {1}{r!}}\left({\frac {\mathrm {d} }{\mathrm {d} X}}\right)^{r}\ .}$

The Hasse derivative is a generalized derivation on k[X] and extends to a generalized derivation on the function field k(X),[1] satisfying an analogue of the product rule

${\displaystyle D^{(r)}(fg)=\sum _{i=0}^{r}D^{(i)}(f)D^{(r-i)}(g)}$

and an analogue of the chain rule.[2] Note that the ${\displaystyle D^{(r)}}$ are not themselves derivations in general, but are closely related.

A form of Taylor's theorem holds for a function f defined in terms of a local parameter t on an algebraic variety:[3]

${\displaystyle f=\sum _{r}D^{(r)}(f)\cdot t^{r}\ .}$

• Goldschmidt, David M. (2003). Algebraic functions and projective curves. Graduate Texts in Mathematics. 215. New York, NY: Springer-Verlag. ISBN 0-387-95432-5. Zbl 1034.14011.