We present computational evidence supporting the following conjecture: For every even integer n >= 1000, there exists a Goldbach partition n = p + q (with p <= q) such that the smaller prime p lies in the interval [n/2 - sqrt(n) * ln(ln(n)), n/2]. Furthermore, the number of such 'central' Goldbach partitions is strictly. An exhaustive search over 50,000 cases found no counterexample. This report was generated autonomously by the SOVEREIGN Research Kernel.