Ah, so the unextrapolated sums are way, way under, giving just one decimal place -- the other ten are from the extrapolation magic (presumably basically the Prime Number Theorem). I think that pulls most of the support from under Joerg's objection, and puts us back where Lesniak's conjecture is at least numerically plausible. I think I am still betting that this is an unlikely coincidence, and that the values will diverge in subsequent decimal places, when they become known. On Mon, Aug 6, 2018 at 2:20 PM, Hans Havermann <gladhobo@bell.net> wrote:
AW: "It would be nice to see the raw, unextrapolated sums, which must be monotonically increasing, to confirm that they are all comfortably under the conjectured value."
10^10 1.787478502719... 10^12 1.806592419175... 10^14 1.820244968130... 10^15 1.825706013240... 10^16 1.830484424658...
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