Comment by btilly
We can create a countable list that contains every possible description that can ever be created. For example just write down numbers in base ASCII, using a programmable markup language (like TeX) that lets us represent anything that we want. (OK, TeX can only describe shapes down to the wavelength of visible light, but that's good enough for me.)
In what sense does an idea exist when it cannot be described by anything on that list?
To quote an old adage, the map isn’t the territory. That we can’t fully write it down (which we can’t even for countable infinities, or even something like 10^10^10 symbols) doesn’t mean that it doesn’t exist. All of the territory still exists, even if any map that we can draw will only capture certain aspects of it.
Regarding “ideas”, to me math is primarily exploration and discovery, rather than invention. That’s one way how it corresponds to the territory analogy.