How is this calculated?
The math continuously tracks how strongly this post is connected to the rest of the network. Every tag forms a 2-way link. The base stats determine personal node strength, and the pie charts below show this node's share against its direct neighbours.
// 1. Base variables (floored at 1 to prevent zero-multiplication math errors)
$inbound = max(1, 3) = 3
$outbound = max(1, 3) = 3
// 2. Node Base Values (Local connection strength)
Base_Strength (PV) = $inbound * $outbound = 3 * 3 = 9
Base_Influence (IV) = $inbound / $outbound = 3 / 3 = 1
// 3. Exponential Network Values (accumulating 22 direct neighbours)
Network_Strength (CV) = Base_PV * (Neighbour_1_PV * Neighbour_2_PV * ...)
= 9 *
( 324 [The Accountant] *
256 [The Jackal] *
361 [Spider-Man 2] *
121 [J.K. Simmons] *
225 [The Cider House Rules] *
100 [Spider-Man] *
324 [Spider-Man 3] *
289 [Harsh Times] *
225 [Ghostbusters: Afterlife] *
289 [Megamind] *
324 [The Astronaut Farmer] *
361 [Remember the Titans] *
441 [Blade Runner 2049] *
49 [Ryan Gosling] *
484 [The Big Short] *
400 [Gangster Squad] *
9 [Drive] *
324 [The Notebook] *
16 [Raya Yarbrough] *
100 [10 Cloverfield Lane] *
4 [Kidnap] *
1 [Europa Report]
)
= 4.08 x 10^46
Network_Influence (TV) = Base_IV * (Neighbour_1_IV * Neighbour_2_IV * ...)
= 1 *
( 1 [The Accountant] *
1 [The Jackal] *
1 [Spider-Man 2] *
1 [J.K. Simmons] *
1 [The Cider House Rules] *
1 [Spider-Man] *
1 [Spider-Man 3] *
1 [Harsh Times] *
1 [Ghostbusters: Afterlife] *
1 [Megamind] *
1 [The Astronaut Farmer] *
1 [Remember the Titans] *
1 [Blade Runner 2049] *
1 [Ryan Gosling] *
1 [The Big Short] *
1 [Gangster Squad] *
1 [Drive] *
1 [The Notebook] *
1 [Raya Yarbrough] *
1 [10 Cloverfield Lane] *
1 [Kidnap] *
1 [Europa Report]
)
= 1
Outbound
3
Tags on post
Inbound
3
Posts tagging this
Connections
22
Total nodes
Base Node Strength
9
Base Node Influence
1
Strength Share (vs Direct Neighbours)
0.18%
(4.08 × 1046 overall)
Influence Share (vs Direct Neighbours)
Connected Network Hierarchy
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Connection Health Audit (Red = broken 1-way link)