Abstract This paper uses the companion-matrix viewpoint to separate and classify two obstructions to lower-bound principles for Lucas-type periods. The organizing shift is from isolated scalar coordinates to full Lucas state vectors: for M, ₐ=pmatrixP in companion form this gives exactly (P, Q) \ (0, -1), (-1, 1), (0, 1), (1, 1) \. The same bridge records the split/nonsplit discriminant bounds, rank-period relations, a GRH-conditional Artin benchmark for the classical Fibonacci matrix, and higher-order analogues for order- recurrences. The unified conclusion is that lower-bound conjectures fail for two structurally different reasons—weight periods can disappear after reduction, and recurrence parameters can specialize to torsion—while the modular period theory itself is governed by integer companion matrices reduced modulo primes. --- Keywords Lucas sequence; pseudorandom weighted sums; bridge theorem; companion matrix; modular periodicity; lower-bound conjectures; period collapse; torsion classification; reduced weight period --- MSC Classification 11B39, 11B50, 11T06, 37B15
Jianming Wang (Sun,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: