The charged lepton mass spectrum exhibits a precise empirical relation known as the Koide formula (Q = 2/3), which has long been regarded as a numerological curiosity lacking a physical basis. In this letter, we demonstrate that this relation finds a natural geometric origin if the mass operator resides on the null-cone of an internal space with an indefinite metric, specifically the Split-Quaternionic algebra. We argue that the existence of such an indefinite metric structure in the infrared regime poses a threat to vacuum stability due to the potential for unbounded negative energy states. We prove that the unique, minimal structural extension capable of stabilizing this geometry while preserving relativistic invariance is the introduction of a higher-derivative operator of the Lee-Wick type (□2). Thus, we propose that the Koide formula is not an accident, but a low-energy signature of the same geometric mechanism that regulates the ultraviolet divergence of the vacuum energy.
Masayuki Note (Wed,) studied this question.