The answer is 4.

The cubes mod9 are {-1,0,1}, but 346^346 mod9 = 4.  

Therefore 346^346 cannot be the sum of less than 4 cubes.

Apparently, the largest number that cannot be expressed as the sum of 4 positive cubes has no more than 13 digits. https://mathworld.wolfram.com/CubicNumber.html

Even assuming this is out by an order of magnitude, 346^346 has almost 900 digits.