A One-Step Cascade Symmetric Model: Rank-1 Packets, Binary Shielding, and the Even Exact-Cardinality Profile
Abstract
We introduce a one-step cascade symmetric system whose local symmetry geometry is organized by finite -closed windows and one-step stars rather than by rowwise-independent toggles. The resulting symmetric model isolates a new ZF + DC + BPI geometry in which rank-1 hereditarily symmetric reals admit a packet normalization theorem over countable -closed supports. The technical center of the paper is the finite star-span lemma and the associated rank-1 packet calculus. From this we obtain a normalization theorem and a two-layer coding consequence for rank-1 reals (in the metatheory, via a well-orderable base of packets). We then apply the same binary fresh-support shielding pattern to prove C2, hence ACfin, and therefore the failure of every even Cn (where Cn denotes the principle that every family of nonempty n-element sets admits a choice function). On the odd side, the present bounded packet calculus remains dyadic: support-fixed local actions factor through finite 2-groups, bounded support-equivariant quotients of finite local orbits have power-of-two size, and trace-separated bounded rigid ternary families admit canonical selectors within a fixed finite trace window. Accordingly, the odd exact-cardinality profile remains open beyond the current local binary machinery.
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