Odd, the last paragraph of the above seems to have gotten chopped. Restored. No, I haven’t particularly heard anyone else point that out but wouldn’t be surprised to find someone had. It’s an important point and I would also like to know if anyone has developed it further.
I found that idea so intriguing I made an account.
Have you considered that such a causal graph can be rearranged while preserving the arrows? I’m inclined to say, for example, that by moving your node E to be on the same level—simultaneous with—B and C, and squishing D into the middle, you’ve done something akin to taking a Lorentz transform?
I would go further to say that the act of choosing a “cut” of a discrete causal graph—and we assume that B, C, and D share some common ancestor to prevent completely arranging things—corresponds to the act of the choosing a reference frame in Minkowski space. Which makes me wonder if max-flow algorithms have a continuous generalization.
edit: in fact, max-flows might be related to Lagrangians. See this.
Odd, the last paragraph of the above seems to have gotten chopped. Restored. No, I haven’t particularly heard anyone else point that out but wouldn’t be surprised to find someone had. It’s an important point and I would also like to know if anyone has developed it further.
I found that idea so intriguing I made an account.
Have you considered that such a causal graph can be rearranged while preserving the arrows? I’m inclined to say, for example, that by moving your node E to be on the same level—simultaneous with—B and C, and squishing D into the middle, you’ve done something akin to taking a Lorentz transform?
I would go further to say that the act of choosing a “cut” of a discrete causal graph—and we assume that B, C, and D share some common ancestor to prevent completely arranging things—corresponds to the act of the choosing a reference frame in Minkowski space. Which makes me wonder if max-flow algorithms have a continuous generalization.
edit: in fact, max-flows might be related to Lagrangians. See this.