| I wrote a short paper on the topic once upon a time[1] which you may find interesting. It's part history of math, part philosophy of math. It's not a great paper and most of the insights in it come from others but here is some of the arithmetic of nilpotent[1] infinitesimals as shown in the appendix. Imagine an entity which is not equal to zero but that when raised to the power of 2 or higher is equal to zero! Sounds odd, doesn't it, but it works! (ϵ is an infinitesimal) ϵ != 0 but ϵ^n = 0 | n>1 ok? so we get: (ϵ + 1)^n = 1 + nϵ
thus: (ϵ + 1)^−1 = 1 − ϵ e^ϵ = 1+ϵ (ϵ + 1)(ϵ−1) = −1, or alternately (1 + ϵ)(1 − ϵ) = −1 and finally (for calculus): ϵf′(x) = f(x + ϵ)−f(x) 1: http://leto.electropoiesis.org/propaganda/The_Analyst_Revisi... 2: https://en.wikipedia.org/wiki/Nilpotent edit: clarity, line breaks! |