Limit

The limit (of a Cauchy procedure) is the target which a Cauchy procedure approaches. [TODO ugh]

Examples

Planes are the limit of increasingly large spheres

Work with 3 dimensional rectilinear coordinates, and consider some sequence of spheres, ${\displaystyle C_{1},C_{2},\cdots }$ on the plane, where the sphere ${\displaystyle C_{n}}$ is centered at ${\displaystyle (0,0,n)}$ and has radius ${\displaystyle n}$. Near the origin ${\displaystyle (0,0,0)}$, the sphere ${\displaystyle C_{n}}$ will look increasingly similar to the xy plane ${\displaystyle P:=\{(x,y,z):z=0\}}$, as ${\displaystyle n}$ gets larger. For any given context, there exists some ${\displaystyle N}$ such that when ${\displaystyle n\geq N}$, the sphere ${\displaystyle C_{n}}$ is indistinguishable from the plane. We say [TODO should OM say?] that the limit of the sequence ${\displaystyle \{C_{n}\}_{n=1}^{\infty }}$ is ${\displaystyle P}$.

This example is very practical; it is why we may think of the Earth as being flat in most everyday contexts. The Earth is a sphere, but it has a radius which is so large that near a point it can be identified as a plane (or to state it more confusingly, it is a plane).

Turing Machines are the limit of increasingly robust computer programs [TODO]

Turing Machines are an idealization of computer programs [TODO no no no no no no no no no no no that's not the right way to think about it!] in the "limit" where the runtime increases. blech