摘要:In this report we study the proof employed by Miklos Ajtai [Determinism versus Non-Determinism for Linear Time RAMs with Memory Restrictions, 31st Symposium on Theory of Computation (STOC), 1999] when proving a non-trivial lower bound in a general model of computation for the Hamming Distance problem: given n elements: decide whether any two of them have "small" Hamming distance. Specifically, Ajtai was able to show that any R-way branching program deciding this problem using time O(n) must use space Omega(n lg n). We generalize Ajtai's original proof allowing us to prove a time-space trade-off for deciding the Hamming Distance problem in the R-way branching program model for time between n and alpha n lg n / lg lg n, for some suitable 0 that if space is O(n^(1−epsilon)), then time is Omega(n lg n / lg lg n).