Closure-Shaped Activation Region in a Gated Accumulation Model

This deposit contains a short technical note and supporting scan outputs for a gated accumulation model in the `nₚulses × tauᵣest` plane. The main result is the detection of a compact closure-shaped activation region with a declining right boundary. In this scan, `tauᵣest` is a dimensionless model rest time between pulses, and `max (b) ` is the maximum value of the internal accumulation variable `b` during a single run. A point is classified as `gold` when the pump/drizzle regime is active while hammer-control at the same `tauᵣest` remains inactive. In the present dataset, the gold region and the active region coincide topologically. The scan yields `goldₐrea = 70` and `activeₐrea = 70` out of `totalcells = 510`; the active fraction is about `0. 137`, and `closurefractionₒverₜau` is about `0. 94`. The right edge of the region falls from `lastgoldₙ = 19` at `tauᵣest = 0. 00` to `lastgoldₙ = 2` at `tauᵣest = 3. 75`; at `tauᵣest = 4. 00` the gold region disappears. The `max (b) ` map shows that the binary boundary is supported by a continuous field of accumulation.: contentReferenceoaicite: 0index=0: contentReferenceoaicite: 1index=1 Files included: - main note (`. docx`) - gold regime map- `max (b) ` map- right-boundary plot- full scan table (`drizzleₛcanₘap. csv`) - global metrics summary- README This deposit fixes one local result from this scan: activation in this gated accumulation model forms an ordered closure-shaped region rather than a random set of working points. It does not claim universality of the detected boundary, a general theory of memory, or broad multistability beyond this scan.: contentReferenceoaicite: 2index=2