Yes, there are faster solutions:
Improve your method to count runs from O(n^2) to O(1/2n^2) -> O(1/2n^2 * 2^n)
Set the first character to 0, you can get the other solutions by exchanging all ones and zeros -> O(1/2n^2 * 2^(n-1))
Incremental calculation of the solution for n based on values from...
It is true that all solutions of length n with run count in [maxNumberOfRuns(n) − maxaddlast(n + 1), maxNumberOfRuns(n)] are sufficient to find all solutions of length n + 1 with run count maxNumberOfRuns(n). But are they sufficient to find all solutions of length n + 1 with run count in [maxNumberOfRuns(n + 1) − naxaddlast(n + 2), maxNumberOfRuns(n + 1)] (so that you can then find optimal solutions of length n + 2, and so on)?
Also, do you have an argument to justify the startsWith("0010") optimization? And a more concrete reason to be concerned: even if you remove that optimization, your program never finds the string 000110110011011 of length 15 with 10 runs. Although it finds all the other strings of length 15 with 10 runs, this omission suggests that at some point it could be missing some seeds necessary to find bigger optimal solutions.
The startsWith("0010") optimization is definitely wrong: your code as written outputs 8 4 0.0 00100100, missing 00110011 of length 8 with 5 runs. And even with that optimization removed, it gives a 185-run string of length 205, missing 0110101101001011010110100110101101001011010110100101101001101011010010110101101001101011010010110101101001011010110100110101101001011010110100101101001101011010010110101101001101011010010110101101001011010 of length 205 with 186 runs.
A larger example of startsWith("0010") being wrong: you give a 147-run string of length 165, but 010110100101101011010010110101101011010010110101101001011010110110101101001011010110100101101011101101011010010110101101001011010110110101101001011010110100101101011 of length 165 has 148 runs.
@AndersKaseorg: I will look into the seeds. But your examples do not match the text. Your given strings have length 177 and 221 - not 165 and 205. /shrug
Your 177 and 221 counts include the extra U+200B ZERO WIDTH SPACE and U+200C ZERO WIDTH NON-JOINER characters inserted by StackExchange into the string to make it wrap. With those invisible characters removed, the strings are correct.
The question asks for an algorithm, not a guess, and I showed above that your guess is wrong: it causes you to output a 4-run string of length 8 rather than a 5-run string, and a 147-run string of length 165 rather than a 148-run string.
The algorithm is working - it just needs a tuning in defining the nextSeedStack, which slows it down, but it's still faster than the brute force. Right now I am looking into it, to find an optimal and still correct size.
With my current settings it passes 165/148 after ~550 seconds. But I think it could be even faster.
