The Spectral Floor: λ₁ = 168 as the Quadratic Level of the Self-Reference Tower

The spectral gap of the Poincaré homology sphere S³/2I is λ₁ = 168. Paper 157 established that removing the trivial representation from a group action produces the interaction space at each level of the icosahedral tower: dimension 11 at the vertex level (Klein's coefficient), dimension 59 at the rotation level (the electromagnetic coupling). We show that the spectral gap follows the same pattern at a quadratic level: the first non-trivial Laplacian eigenspace on S³/2I has dimension (V+1)² = 13² = 169, and removing the trivial subrepresentation gives 169 − 1 = 168 = λ₁. The construction at this level is trace removal from the eigenspace rather than the augmentation ideal of the group algebra; the two are…