Books about Advanced strategies?

Gramazeka

Well-Known Member
#4
Books

I am one of the best blackjack specialists in the world and want to share some information with you.

[1] D. Aldous. Random walks on finite groups and rapidly mixing Markov chains. In Seminar on probability, XVII,
volume 986 of Lecture Notes in Math., pages 243?297. Springer, Berlin, 1983.
[2] D. Aldous and P. Diaconis. Shuffling cards and stopping times. Amer. Math. Monthly, 93(5):333?348, 1986.
[3] D. Bayer and P. Diaconis. Trailing the dovetail shuffle to its lair. Ann. Appl. Probab., 2(2):294?313, 1992.
[4] S. Boyd, P. Diaconis, P. Parrilo, and L. Xiao. Symmetry analysis of reversible Markov chains. Internet Math.,
2(1):31?71, 2005.
[5] T. Ceccherini-Silberstein, F. Scarabotti, and F. Tolli. Harmonic analysis on finite groups, volume 108 of Cam-
bridge Studies in Advanced Mathematics. Cambridge University Press, Cambridge, 2008. Representation theory,
Gelfand pairs and Markov chains.
[6] G.-Y. Chen and L. Saloff-Coste. The cutoff phenomenon for randomized riffle shuffles. Random Structures Algo-
rithms, 32(3):346?3745, 2008.
[7] M. Ciucu. No-feedback card guessing for dovetail shuffles. Ann. Appl. Probab., 8(4):1251?1269, 1998.
[8] M. Conger and D. Viswanath. Riffle shuffles of decks with repeated cards. Ann. Probab., 34(2):804?819, 2006.
[9] M. Conger and D. Viswanath. Normal approximations for descents and inversions of permutations of multisets.
J. Theoret. Probab., 20(2):309?325, 2007.
[10] P. Diaconis. Group representations in probability and statistics. Institute of Mathematical Statistics Lecture
Notes?Monograph Series, 11. Institute of Mathematical Statistics, Hayward, CA, 1988.
[11] P. Diaconis. Mathematical developments from the analysis of riffle shuffling. In Groups, combinatorics & geometry
(Durham, 2001), pages 73?97. World Sci. Publ., River Edge, NJ, 2003.
[12] P. Diaconis and J. Fulman. Carries, shuffling and an amazing matrix. preprint, 2008.
[13] P. Diaconis and S. P. Holmes. Random walks on trees and matchings. Electron. J. Probab., 7:no. 6, 17 pp.
(electronic), 2002.
[14] P. Diaconis, M. McGrath, and J. Pitman. Riffle shuffles, cycles, and descents. Combinatorica, 15(1):11?29, 1995.
[15] P. Diaconis and M. Shahshahani. Generating a random permutation with random transpositions. Z. Wahrsch.
Verw. Gebiete, 57(2):159?179, 1981.

[16] A. F¨assler and E. Stiefel. Group theoretical methods and their applications. Birkh¨auser Boston Inc., Boston, MA,
1992. Translated from the German by Baoswan Dzung Wong.
[17] J. Fulman. Applications of symmetric functions to cycle and increasing subsequence structure after shuffles. J.
Algebraic Combin., 16(2):165?194, 2002.
[18] M. Gardner. Martin Gardners New Mathematical Diversions from Scientific American. Simon & Schuster, New
York, 1966.
[19] E. Gilbert. Theory of shuffling. Technical memorandum, Bell Laboratories, 1955.
[20] J. M. Holte. Carries, combinatorics, and an amazing matrix. Amer. Math. Monthly, 104(2):138 ,149, 1997.
[21] J. Reeds. Theory of shuffling. Unpublished manuscript, 1976.
[22] J.-P. Serre. Linear representations of finite groups. Springer-Verlag, New York, 1977. Translated from the second
French edition by Leonard L. Scott, Graduate Texts in Mathematics, Vol. 42.
[23] J. R. Weaver. Centrosymmetric (cross-symmetric) matrices, their basic properties, eigenvalues, and eigenvectors.
Amer. Math. Monthly, 92(10):711,717, 1985.
 

Elhombre

Well-Known Member
#5
Gramazeka said:
I am one of the best blackjack specialists in the world and want to share some information with you.

[1] D. Aldous. Random walks on finite groups and rapidly mixing Markov chains. In Seminar on probability, XVII,
volume 986 of Lecture Notes in Math., pages 243?297. Springer, Berlin, 1983.
[2] D. Aldous and P. Diaconis. Shuffling cards and stopping times. Amer. Math. Monthly, 93(5):333?348, 1986.
[3] D. Bayer and P. Diaconis. Trailing the dovetail shuffle to its lair. Ann. Appl. Probab., 2(2):294?313, 1992.
[4] S. Boyd, P. Diaconis, P. Parrilo, and L. Xiao. Symmetry analysis of reversible Markov chains. Internet Math.,
2(1):31?71, 2005.
[5] T. Ceccherini-Silberstein, F. Scarabotti, and F. Tolli. Harmonic analysis on finite groups, volume 108 of Cam-
bridge Studies in Advanced Mathematics. Cambridge University Press, Cambridge, 2008. Representation theory,
Gelfand pairs and Markov chains.
[6] G.-Y. Chen and L. Saloff-Coste. The cutoff phenomenon for randomized riffle shuffles. Random Structures Algo-
rithms, 32(3):346?3745, 2008.
[7] M. Ciucu. No-feedback card guessing for dovetail shuffles. Ann. Appl. Probab., 8(4):1251?1269, 1998.
[8] M. Conger and D. Viswanath. Riffle shuffles of decks with repeated cards. Ann. Probab., 34(2):804?819, 2006.
[9] M. Conger and D. Viswanath. Normal approximations for descents and inversions of permutations of multisets.
J. Theoret. Probab., 20(2):309?325, 2007.
[10] P. Diaconis. Group representations in probability and statistics. Institute of Mathematical Statistics Lecture
Notes?Monograph Series, 11. Institute of Mathematical Statistics, Hayward, CA, 1988.
[11] P. Diaconis. Mathematical developments from the analysis of riffle shuffling. In Groups, combinatorics & geometry
(Durham, 2001), pages 73?97. World Sci. Publ., River Edge, NJ, 2003.
[12] P. Diaconis and J. Fulman. Carries, shuffling and an amazing matrix. preprint, 2008.
[13] P. Diaconis and S. P. Holmes. Random walks on trees and matchings. Electron. J. Probab., 7:no. 6, 17 pp.
(electronic), 2002.
[14] P. Diaconis, M. McGrath, and J. Pitman. Riffle shuffles, cycles, and descents. Combinatorica, 15(1):11?29, 1995.
[15] P. Diaconis and M. Shahshahani. Generating a random permutation with random transpositions. Z. Wahrsch.
Verw. Gebiete, 57(2):159?179, 1981.

[16] A. F¨assler and E. Stiefel. Group theoretical methods and their applications. Birkh¨auser Boston Inc., Boston, MA,
1992. Translated from the German by Baoswan Dzung Wong.
[17] J. Fulman. Applications of symmetric functions to cycle and increasing subsequence structure after shuffles. J.
Algebraic Combin., 16(2):165?194, 2002.
[18] M. Gardner. Martin Gardners New Mathematical Diversions from Scientific American. Simon & Schuster, New
York, 1966.
[19] E. Gilbert. Theory of shuffling. Technical memorandum, Bell Laboratories, 1955.
[20] J. M. Holte. Carries, combinatorics, and an amazing matrix. Amer. Math. Monthly, 104(2):138 ,149, 1997.
[21] J. Reeds. Theory of shuffling. Unpublished manuscript, 1976.
[22] J.-P. Serre. Linear representations of finite groups. Springer-Verlag, New York, 1977. Translated from the second
French edition by Leonard L. Scott, Graduate Texts in Mathematics, Vol. 42.
[23] J. R. Weaver. Centrosymmetric (cross-symmetric) matrices, their basic properties, eigenvalues, and eigenvectors.
Amer. Math. Monthly, 92(10):711,717, 1985.
That's right, these books are a part of my Sequenzing library


Eh.:cool2:
 
#8
@Gramazeka

i have read a few of those articles, but i doubt it will help in practice. for one thing, what the OP was talking about is asking for something practical, not something so theoretical as any of those articles discusses.

P. Diaconis. is a great statistician but his purpose for studying shuffling was not motivated by being good at shuffle tracking.

there are two academic articles on non-random shuffling, that is more appliacable, then stuff on finite group/group representation/algebraic combinatorics. Don't get me wrong, you gave wonderful lists of articles for educational purposes, but it would not be easy to extract practical information from it in practice.

Cheers.
 

prankster

Well-Known Member
#9
Gramazeka said:
I am one of the best blackjack specialists in the world and want to share some information with you.

[1] D. Aldous. Random walks on finite groups and rapidly mixing Markov chains. In Seminar on probability, XVII,
volume 986 of Lecture Notes in Math., pages 243?297. Springer, Berlin, 1983.
[2] D. Aldous and P. Diaconis. Shuffling cards and stopping times. Amer. Math. Monthly, 93(5):333?348, 1986.
[3] D. Bayer and P. Diaconis. Trailing the dovetail shuffle to its lair. Ann. Appl. Probab., 2(2):294?313, 1992.
[4] S. Boyd, P. Diaconis, P. Parrilo, and L. Xiao. Symmetry analysis of reversible Markov chains. Internet Math.,
2(1):31?71, 2005.
[5] T. Ceccherini-Silberstein, F. Scarabotti, and F. Tolli. Harmonic analysis on finite groups, volume 108 of Cam-
bridge Studies in Advanced Mathematics. Cambridge University Press, Cambridge, 2008. Representation theory,
Gelfand pairs and Markov chains.
[6] G.-Y. Chen and L. Saloff-Coste. The cutoff phenomenon for randomized riffle shuffles. Random Structures Algo-
rithms, 32(3):346?3745, 2008.
[7] M. Ciucu. No-feedback card guessing for dovetail shuffles. Ann. Appl. Probab., 8(4):1251?1269, 1998.
[8] M. Conger and D. Viswanath. Riffle shuffles of decks with repeated cards. Ann. Probab., 34(2):804?819, 2006.
[9] M. Conger and D. Viswanath. Normal approximations for descents and inversions of permutations of multisets.
J. Theoret. Probab., 20(2):309?325, 2007.
[10] P. Diaconis. Group representations in probability and statistics. Institute of Mathematical Statistics Lecture
Notes?Monograph Series, 11. Institute of Mathematical Statistics, Hayward, CA, 1988.
[11] P. Diaconis. Mathematical developments from the analysis of riffle shuffling. In Groups, combinatorics & geometry
(Durham, 2001), pages 73?97. World Sci. Publ., River Edge, NJ, 2003.
[12] P. Diaconis and J. Fulman. Carries, shuffling and an amazing matrix. preprint, 2008.
[13] P. Diaconis and S. P. Holmes. Random walks on trees and matchings. Electron. J. Probab., 7:no. 6, 17 pp.
(electronic), 2002.
[14] P. Diaconis, M. McGrath, and J. Pitman. Riffle shuffles, cycles, and descents. Combinatorica, 15(1):11?29, 1995.
[15] P. Diaconis and M. Shahshahani. Generating a random permutation with random transpositions. Z. Wahrsch.
Verw. Gebiete, 57(2):159?179, 1981.

[16] A. F¨assler and E. Stiefel. Group theoretical methods and their applications. Birkh¨auser Boston Inc., Boston, MA,
1992. Translated from the German by Baoswan Dzung Wong.
[17] J. Fulman. Applications of symmetric functions to cycle and increasing subsequence structure after shuffles. J.
Algebraic Combin., 16(2):165?194, 2002.
[18] M. Gardner. Martin Gardners New Mathematical Diversions from Scientific American. Simon & Schuster, New
York, 1966.
[19] E. Gilbert. Theory of shuffling. Technical memorandum, Bell Laboratories, 1955.
[20] J. M. Holte. Carries, combinatorics, and an amazing matrix. Amer. Math. Monthly, 104(2):138 ,149, 1997.
[21] J. Reeds. Theory of shuffling. Unpublished manuscript, 1976.
[22] J.-P. Serre. Linear representations of finite groups. Springer-Verlag, New York, 1977. Translated from the second
French edition by Leonard L. Scott, Graduate Texts in Mathematics, Vol. 42.
[23] J. R. Weaver. Centrosymmetric (cross-symmetric) matrices, their basic properties, eigenvalues, and eigenvectors.
Amer. Math. Monthly, 92(10):711,717, 1985.
Keeping it simple,ey?:whip::joker:
 

tribute

Well-Known Member
#12
Gramazeka said:
I am one of the best blackjack specialists in the world and want to share some information with you.

[1] D. Aldous. Random walks on finite groups and rapidly mixing Markov chains. In Seminar on probability, XVII,
volume 986 of Lecture Notes in Math., pages 243?297. Springer, Berlin, 1983.
[2] D. Aldous and P. Diaconis. Shuffling cards and stopping times. Amer. Math. Monthly, 93(5):333?348, 1986.
[3] D. Bayer and P. Diaconis. Trailing the dovetail shuffle to its lair. Ann. Appl. Probab., 2(2):294?313, 1992.
[4] S. Boyd, P. Diaconis, P. Parrilo, and L. Xiao. Symmetry analysis of reversible Markov chains. Internet Math.,
2(1):31?71, 2005.
[5] T. Ceccherini-Silberstein, F. Scarabotti, and F. Tolli. Harmonic analysis on finite groups, volume 108 of Cam-
bridge Studies in Advanced Mathematics. Cambridge University Press, Cambridge, 2008. Representation theory,
Gelfand pairs and Markov chains.
[6] G.-Y. Chen and L. Saloff-Coste. The cutoff phenomenon for randomized riffle shuffles. Random Structures Algo-
rithms, 32(3):346?3745, 2008.
[7] M. Ciucu. No-feedback card guessing for dovetail shuffles. Ann. Appl. Probab., 8(4):1251?1269, 1998.
[8] M. Conger and D. Viswanath. Riffle shuffles of decks with repeated cards. Ann. Probab., 34(2):804?819, 2006.
[9] M. Conger and D. Viswanath. Normal approximations for descents and inversions of permutations of multisets.
J. Theoret. Probab., 20(2):309?325, 2007.
[10] P. Diaconis. Group representations in probability and statistics. Institute of Mathematical Statistics Lecture
Notes?Monograph Series, 11. Institute of Mathematical Statistics, Hayward, CA, 1988.
[11] P. Diaconis. Mathematical developments from the analysis of riffle shuffling. In Groups, combinatorics & geometry
(Durham, 2001), pages 73?97. World Sci. Publ., River Edge, NJ, 2003.
[12] P. Diaconis and J. Fulman. Carries, shuffling and an amazing matrix. preprint, 2008.
[13] P. Diaconis and S. P. Holmes. Random walks on trees and matchings. Electron. J. Probab., 7:no. 6, 17 pp.
(electronic), 2002.
[14] P. Diaconis, M. McGrath, and J. Pitman. Riffle shuffles, cycles, and descents. Combinatorica, 15(1):11?29, 1995.
[15] P. Diaconis and M. Shahshahani. Generating a random permutation with random transpositions. Z. Wahrsch.
Verw. Gebiete, 57(2):159?179, 1981.

[16] A. F¨assler and E. Stiefel. Group theoretical methods and their applications. Birkh¨auser Boston Inc., Boston, MA,
1992. Translated from the German by Baoswan Dzung Wong.
[17] J. Fulman. Applications of symmetric functions to cycle and increasing subsequence structure after shuffles. J.
Algebraic Combin., 16(2):165?194, 2002.
[18] M. Gardner. Martin Gardners New Mathematical Diversions from Scientific American. Simon & Schuster, New
York, 1966.
[19] E. Gilbert. Theory of shuffling. Technical memorandum, Bell Laboratories, 1955.
[20] J. M. Holte. Carries, combinatorics, and an amazing matrix. Amer. Math. Monthly, 104(2):138 ,149, 1997.
[21] J. Reeds. Theory of shuffling. Unpublished manuscript, 1976.
[22] J.-P. Serre. Linear representations of finite groups. Springer-Verlag, New York, 1977. Translated from the second
French edition by Leonard L. Scott, Graduate Texts in Mathematics, Vol. 42.
[23] J. R. Weaver. Centrosymmetric (cross-symmetric) matrices, their basic properties, eigenvalues, and eigenvectors.
Amer. Math. Monthly, 92(10):711,717, 1985.


After reading these, you may want to get a copy of Bluebook II.
 

tribute

Well-Known Member
#13
Gramazeka said:
I am one of the best blackjack specialists in the world and want to share some information with you.

[1] D. Aldous. Random walks on finite groups and rapidly mixing Markov chains. In Seminar on probability, XVII,
volume 986 of Lecture Notes in Math., pages 243?297. Springer, Berlin, 1983.
[2] D. Aldous and P. Diaconis. Shuffling cards and stopping times. Amer. Math. Monthly, 93(5):333?348, 1986.
[3] D. Bayer and P. Diaconis. Trailing the dovetail shuffle to its lair. Ann. Appl. Probab., 2(2):294?313, 1992.
[4] S. Boyd, P. Diaconis, P. Parrilo, and L. Xiao. Symmetry analysis of reversible Markov chains. Internet Math.,
2(1):31?71, 2005.
[5] T. Ceccherini-Silberstein, F. Scarabotti, and F. Tolli. Harmonic analysis on finite groups, volume 108 of Cam-
bridge Studies in Advanced Mathematics. Cambridge University Press, Cambridge, 2008. Representation theory,
Gelfand pairs and Markov chains.
[6] G.-Y. Chen and L. Saloff-Coste. The cutoff phenomenon for randomized riffle shuffles. Random Structures Algo-
rithms, 32(3):346?3745, 2008.
[7] M. Ciucu. No-feedback card guessing for dovetail shuffles. Ann. Appl. Probab., 8(4):1251?1269, 1998.
[8] M. Conger and D. Viswanath. Riffle shuffles of decks with repeated cards. Ann. Probab., 34(2):804?819, 2006.
[9] M. Conger and D. Viswanath. Normal approximations for descents and inversions of permutations of multisets.
J. Theoret. Probab., 20(2):309?325, 2007.
[10] P. Diaconis. Group representations in probability and statistics. Institute of Mathematical Statistics Lecture
Notes?Monograph Series, 11. Institute of Mathematical Statistics, Hayward, CA, 1988.
[11] P. Diaconis. Mathematical developments from the analysis of riffle shuffling. In Groups, combinatorics & geometry
(Durham, 2001), pages 73?97. World Sci. Publ., River Edge, NJ, 2003.
[12] P. Diaconis and J. Fulman. Carries, shuffling and an amazing matrix. preprint, 2008.
[13] P. Diaconis and S. P. Holmes. Random walks on trees and matchings. Electron. J. Probab., 7:no. 6, 17 pp.
(electronic), 2002.
[14] P. Diaconis, M. McGrath, and J. Pitman. Riffle shuffles, cycles, and descents. Combinatorica, 15(1):11?29, 1995.
[15] P. Diaconis and M. Shahshahani. Generating a random permutation with random transpositions. Z. Wahrsch.
Verw. Gebiete, 57(2):159?179, 1981.

[16] A. F¨assler and E. Stiefel. Group theoretical methods and their applications. Birkh¨auser Boston Inc., Boston, MA,
1992. Translated from the German by Baoswan Dzung Wong.
[17] J. Fulman. Applications of symmetric functions to cycle and increasing subsequence structure after shuffles. J.
Algebraic Combin., 16(2):165?194, 2002.
[18] M. Gardner. Martin Gardners New Mathematical Diversions from Scientific American. Simon & Schuster, New
York, 1966.
[19] E. Gilbert. Theory of shuffling. Technical memorandum, Bell Laboratories, 1955.
[20] J. M. Holte. Carries, combinatorics, and an amazing matrix. Amer. Math. Monthly, 104(2):138 ,149, 1997.
[21] J. Reeds. Theory of shuffling. Unpublished manuscript, 1976.
[22] J.-P. Serre. Linear representations of finite groups. Springer-Verlag, New York, 1977. Translated from the second
French edition by Leonard L. Scott, Graduate Texts in Mathematics, Vol. 42.
[23] J. R. Weaver. Centrosymmetric (cross-symmetric) matrices, their basic properties, eigenvalues, and eigenvectors.
Amer. Math. Monthly, 92(10):711,717, 1985.

Could any of these help me become a better slot player?
 

Brock Windsor

Well-Known Member
#14
QFIT Please elaborate

QFIT said:
I would keep it on.
To my knowledge both Forte and Zender have both rescinded their endorsement of McDowell's work. Snyder (he may not have been first but was the most credible) made the error of the calculations public and did not endorse the book. What value do you think an AP or AT can extract from the published source? Was it a case of good theory and bad math?
-BW
 
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