Maybe not ‘insight’, but re. ‘accuracy’ this sort of decomposition is often in the tool box of better forecasters. I think the longest path I evaluated in a question had 4 steps rather than 6, and I think I’ve seen other forecasters do similar things on occasion. (The general practice of ‘breaking down problems’ to evaluate sub-issues is recommended in Superforecasting IIRC).
I guess the story why this works in geopolitical forecasting is folks tend to overestimate the chance ‘something happens’ and tend to be underdamped in increasing the likelihood of something based on suggestive antecedents (e.g. chance of a war given an altercation, etc.) So attending to “Even if A, for it to lead to D one should attend to P(B|A), P(C|B) etc. etc.”, tend to lead to downwards corrections.
Naturally, you can mess this up. Although it’s not obvious you are at greater risk if you arrange your decomposed considerations conjunctively or disjunctively: “All of A-E must be true for P to be true” ~also means “if any of ¬A-¬E are true, then ¬P”. In natural language and heuristics, I can imagine “Here are several different paths to P, and each of these seem not-too-improbable, so P must be highly likely” could also lead one astray.
Maybe not ‘insight’, but re. ‘accuracy’ this sort of decomposition is often in the tool box of better forecasters. I think the longest path I evaluated in a question had 4 steps rather than 6, and I think I’ve seen other forecasters do similar things on occasion. (The general practice of ‘breaking down problems’ to evaluate sub-issues is recommended in Superforecasting IIRC).
I guess the story why this works in geopolitical forecasting is folks tend to overestimate the chance ‘something happens’ and tend to be underdamped in increasing the likelihood of something based on suggestive antecedents (e.g. chance of a war given an altercation, etc.) So attending to “Even if A, for it to lead to D one should attend to P(B|A), P(C|B) etc. etc.”, tend to lead to downwards corrections.
Naturally, you can mess this up. Although it’s not obvious you are at greater risk if you arrange your decomposed considerations conjunctively or disjunctively: “All of A-E must be true for P to be true” ~also means “if any of ¬A-¬E are true, then ¬P”. In natural language and heuristics, I can imagine “Here are several different paths to P, and each of these seem not-too-improbable, so P must be highly likely” could also lead one astray.