In the second part of the "Silent Duels" series on Math ∩ Programming, Jeremy Kun details the iterative numerical approach required to find optimal firing times, based on solving for specific probability parameters
) are met, transforming abstract game theory into a concrete computational problem. Read the full story at Math ∩ Programming . Silent Duels—Constructing the Solution part 1
. The process involves a backwards-recursive calculation, using a root-finding algorithm to ensure boundary conditions (
In the second part of the "Silent Duels" series on Math ∩ Programming, Jeremy Kun details the iterative numerical approach required to find optimal firing times, based on solving for specific probability parameters
) are met, transforming abstract game theory into a concrete computational problem. Read the full story at Math ∩ Programming . Silent Duels—Constructing the Solution part 1
. The process involves a backwards-recursive calculation, using a root-finding algorithm to ensure boundary conditions (
