theorem
proved
current_chain_partition
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IndisputableMonolith.Masses.StepValueEnumeration on GitHub at line 132.
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129/-! ## Constraint 3: The current chain (13, 11, 6, 8) satisfies all structural constraints -/
130
131/-- The current chain satisfies the partition constraint. -/
132theorem current_chain_partition :
133 13 + 2*11 + 2*6 + 8 = 55 := by norm_num
134
135/-- The current chain has middle pair summing to W. -/
136theorem current_chain_middle : 11 + 6 = 17 := by norm_num
137
138/-- The current chain has endpoint sum = 21. -/
139theorem current_chain_endpoints : 13 + 8 = 21 := by norm_num
140
141/-- All four values of the current chain are distinct. -/
142theorem current_chain_distinct : (13 : ℕ) ≠ 11 ∧ 11 ≠ 6 ∧ 6 ≠ 8 ∧ 13 ≠ 6 ∧ 13 ≠ 8 ∧ 11 ≠ 8 := by
143 refine ⟨?_, ?_, ?_, ?_, ?_, ?_⟩ <;> norm_num
144
145/-! ## Constraint 4: The Unique Fully-Integer-Chain Containing E±1
146
147One natural structural filter: the chain should contain both "edge plus one"
148(E+1 = 13) and "edge minus one" (E-1 = 11). These are the simplest
149symmetric deformations of the edge count E = 12.
150
151Under this filter, the remaining two values must sum to 21 - 13 - 11 = ...
152wait, that over-constrains. Let me redo:
153
154If two of the four values are E±1, and the cyclic chain structure is
155(E+1, E-1, ?, ?) ending back at E+1, then the middle pair is (E-1, ?) with
156sum 17, forcing ? = 17 - 11 = 6 = F. Then the fourth value must satisfy
1576 + d = span_down, with span_down = 55 - 24 - 17 = 14, so d = 8 = V.
158
159Under this filter, the chain (E+1, E-1, F, V) = (13, 11, 6, 8) is unique.
160-/
161
162/-- If the chain contains both E+1 and E-1 as adjacent values, the chain is