> Given the centrality of linear algebra to applied mathematics (even in places where you wouldn't first expect, like the theory of regular expressions and finite automata)
Decreased activity in the ACC/medial prefrontal cortex (mPFC) was a consistent finding and the magnitude of this decrease predicted the intensity of the subjective effects. Based on these results, a seed-based pharmaco-physiological interaction/functional connectivity analysis was performed using a medial prefrontal seed. Psilocybin caused a significant decrease in the positive coupling between the mPFC and PCC. These results strongly imply that the subjective effects of psychedelic drugs are caused by decreased activity and connectivity in the brain's key connector hubs, enabling a state of unconstrained cognition.
Kuhn Poker [1] is a game of imperfect information, which was solved by its creator in 1950. The only fundamental difference between Kuhn Poker and LHE, the game discussed in the article, is that regular LHE has much more cards involved, making the game more complex.
Your statement is technically correct because of the use of the word "completely", but wrong in a practical sense. The algorithm used to solve these games is iterative, so the solution only ever approaches a complete solution, but this is only meaningful if you want to argue that a 0.0000001BB difference in win-rate per hand is really meaningful.
Where can I read more about this?