[Manifold Plays Chess 3] If we play 33. b4, what is the score after move 34 (leveraged)?
Basic
3
Ṁ107
resolved May 16
Resolved as
80%

Check the game here: https://lichess.org/GF9YULQP.

The game so far: 1. e4 e5 2. Bc4 Nf6 3. Nc3 Nc6 4. Nf3 Nxe4 5. Nxe4 d5 6. Bd3 dxe4 7. Rg1 Bf5 8. Bb5 exf3 9. Bxc6+ bxc6 10. Qxf3 Qd7 11. Qc3 f6 12. g4 Bxg4 13. Rxg4 h5 14. Re4 Qd5 15. Qf3 Rd8 16. d3 a6 17. b3 Qc5 18. Kd1 a5 19. Bb2 g6 20. Qxf6 Kd7 21. Rxe5 Qd6 22. Qxh8 Be7 23. Qg7 Rf8 24. Rxe7+ Qxe7 25. Qxe7+ Kxe7 26. Ba3+ Kf7 27. Bxf8 Kxf828. Kd2 Kf7 29. Re1 Kg7 30. Re7+ Kf6 31. Rxc7 h4 32. a4 g5

The other candidate move is 33. Rxc6+

The conditional market for the other move is here:



The market value (averaged over the last 4 hours before close) of this market and the other market will be measured. If this market has a higher (last-4-hour-average) market value, it will resolve to the score after move 34, otherwise it will resolve N/A. Note that "Market value" and "Score" do not work on the same schale.

Here is a table of the correspondence to market value and score for the current move which will be used to calculate PROB from this score:

Here is a table of the correspondence to market value and score

value score

----- -----

0.00 0.000

0.03 0.246

0.07 0.574

0.10 0.820

0.20 0.840

0.30 0.860

0.40 0.880

0.50 0.900

0.60 0.920

0.70 0.940

0.80 0.960

0.90 0.980

0.93 0.986

0.97 0.994

1.00 1.000

----- -----

This correspondence is defined by linearly interpolating between the points

(0.0, 0.0), (0.1, 0.82), (0.9, 0.98), (1.0).

The score after move 34 is the score (not market value) of the winning move in move 34.

It might have a different function to calculate scores from market values: The function assigns score z to 50% market value, z+0.08 to 90% market value and z-0.08 to 10% market value, where z is the (rounded) score after move 33, but at most 0.9 and at least 0.1. Note that when the game ends, the score will be 1.0 - #moves x 0.0004 if white wins, 0.5 - #moves x 0.0002 if its a draw, or 0.0 if we lose.

Some More details for the overall game here:

https://manifold.markets/harfe/will-white-win-in-manifold-plays-ch

Get
Ṁ1,000
and
S3.00
Sort by:
predictedNO

resolution of market 33. b4:

resolution score: 0.960699

corresponding market value: 0.803496

probabilistically rounded: 80%

predictedNO

33. Rxc6+: Average market value: 0.716451

33. Rxc6+: score: 0.943290

33. b4: Average market value: 0.747352

33. b4: score: 0.949470

Winner: 33. b4

--------------------

resolution of market 32. a4:

resolution score: 0.949470

corresponding market value: 0.747352

probabilistically rounded: 74%

Related questions

© Manifold Markets, Inc.Terms + Mana-only TermsPrivacyRules