Agreed, with current tools it's the same as before, extremely difficult to solve the DLP, but one has to penetrate deep into the unknown territories of math and elliptic curves, then you will realize everything is in the group order N, for each curve you'd need to find the weaknesses of N instead of G, or P.

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Just to show one example, take this key  :
When you first look at it, what do you think would happen if you divide it by 2? Normally you'd say a key with 31 leading zeros. But in reality the result mod n is :
Can you see the difference? There are also other hidden properties, keys etc.
One thing you should think about, is there a way to reduce a number to a perfect composite number and then easily dividing that composite number to reach a range close to 2^65? I believe with a certain subtraction tricks, we can do that, I have done it, but I know the key so it doesn't count, I want to know how to operate with 2 unknown points without knowing the distance between them, whether or not we can reach a composite point as a result of either subtraction and or division.  Like : 59, if we know the range, we could subtract it from 100 to have 41, now all we need is to subtract 9 from 41 to get to 32, and now we can safely divide 32 by 2 a few times to reach 8, where 8 is our desired small range where we can brute force under an hour. The question is, how can we determine that 9 is the right key to reach 32? By operating with scalar mod n of course, first we study and learn then we go for our targets in points.