In my free time I'm preparing for interview questions like: *implement multiplying numbers represented as arrays of digits*. Obviously I'm forced to write it from the scratch in a language like `Python`

or `Java`

, so an answer like "use GMP" is not acceptable (as mentioned here: Understanding Schönhage-Strassen algorithm (huge integer multiplication)).

For which exactly `range`

of sizes of those 2 numbers (i.e. number of digits), I should choose

- School grade algorithm
- Karatsuba algorithm
- Toom-Cook
- Schönhage–Strassen algorithm ?

Is Schönhage–Strassen `O(n log n log log n)`

always a good solution? Wikipedia mentions that Schönhage–Strassen is advisable for numbers beyond `2^2^15`

to `2^2^17`

. What to do when one number is ridiculously huge (e.g. `10,000`

to `40,000`

decimal digits), but second consists of just couple of digits?

Does all those 4 algorithms parallelizes easily?