The fine structure constant alpha = 1/137. 036. . . has been called the most mysterious number inphysics. Its reciprocal, approximately 137, has no derivation from first principles in the StandardModel. We present a construction in Gaussian integer arithmetic that produces the integer 137 asthe norm of a flanking element: N (11 + 4i) = 11² + 4² = 137, where 11 = Im ( (2+i) ³) and4 = Im ( (2+i) ²). We prove that 137 decomposes as 133 + 4, where 133 = dim (e₇) and4 = maxₘark (E₇-hat), and that this decomposition is unique among all simple Lie algebras. We show that the flanking norm of any thin Gaussian prime a + i follows a quartic polynomialf (a) = 9a⁴ - 2a² + 1, with 137 = f (2) being the first prime value. These are arithmetic results, verified by direct computation. No physical assumptions are required. The paper is self-containedand addresses only the question: is there a number-theoretic reason why the integer nearest to1/alpha is 137?
Robert A. Kenney (Sat,) studied this question.