# Finding optimum path through graph search

I am currently working on Euler 411 https://projecteuler.net/problem=411.

I have figured out the mod exponentiation simplification to find all the coordinates in a reasonable amount of time and store the coordinates in files (70-200MB).

I also can plot coordinates and possible solutions. This is not the optimal solution. The optimal solution for this problem hits the maximum amount of stations.

Here's an image of N = 10000, PE reports 48 is the correct answer. The red line approximator gets 36. 504 coordinates.

N = 7**5 (16807) (actual from problem). Red line gets 159 points, 14406 unique coordinates.

This is a search problem right? Am I missing something? I have tried greedy search with a density heuristic to get an approximate search, but it is not good enough to approximate the solution to the biggest problems. It would take days to finish. I have not tried an exact search like A* because it would be slower than greedy. BFS is out of the question.

Any hints? NO SPOILERS PLEASE!! There must be a way to eliminate nodes from this massive search space I am missing.

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Have you considered that there may be a pattern in where the points occur...and hence the function value? You should solve small cases (of `k`) by hand! Also check that there is nothing special about `S(k^5)`. Finally, the second to last line of the problem statement seems a little suspicious, giving you particular information about S(123) and S(10000). If `S(10000)` is so low at forty-eight, it seems certain you are missing something and the search space need not be diabolical. So to my first reading, it does not appear to be a brute force search problem.