Gems in Experimental Mathematics
Gems in Experimental Mathematics
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Author(s): McGuire, Gary
Mullen, Gary
Panario, Daniel
ISBN No.: 9780821848692
Pages: 413
Year: 201007
Format: Trade Paper
Price: $ 161.46
Dispatch delay: Dispatched between 7 to 15 days
Status: Available

G. Almkvist, The art of finding Calabi-Yau differential equations; T. Amdeberhan, A note on a question due to A. Garsia; D. H. Bailey and J. M. Borwein, Experimental computation with oscillatory integrals; D.


H. Bailey, J. M. Borwein, D. Broadhurst, and W. Zudilin, Experimental mathematics and mathematical physics; S. T. Boettner, An extension of the parallel Risch algorithm; R.


P. Boyer and W. M. Y. Goh, Appell polynomials and their zero attractors; O-Y. Chan and D. Manna, Congruences for Stirling numbers of the second kind; M. W.


Coffey, Expressions for harmonic number exponential generating functions; R. E. Crandall, Theory of log-rational integrals; S. Garoufalidis and X. Sun, A new algorithm for the recursion of hypergeometric multisums with improved universal denominator; I. Gonzalez, V. H. Moll, and A.


Straub, The method of brackets. Part 2: Examples and applications; J. G. Goyanesa, History of the formulas and algorithms for $\pi$; J. Guillera, A matrix form of Ramanujan-type series for $1/\pi$; K. Kohl and F. Stan, An algorithmic approach to the Mellin transform method; C. Koutschan, Eliminating human insight: An algorithmic proof of Stembridge's TSPP theorem; M.


L. Lapidus and R. G. Niemeyer, Towards the Koch snowflake fractal billiard: Computer experiments and mathematical conjectures; L. A. Medina and D. Zeilberger, An experimental mathematics perspective on the old, and still open, question of when to stop?; M. J.


Mossinghoff, The distance to an irreducible polynomial; S. Northshield, Square roots of 2 x 2 matrices; O. Oloa, On a series of Ramanujan; P. Raff and D. Zeilberger, Finite analogs of Szemeredi's theorems; A. V. Sills, Towards an automation of the circle method; J. H.


Silverman, The greatest common divisor of $a^n-1$ and $b^n-1$ and the Ailon-Rudnick conjecture; J. Sondow and K. Schalm, Which partial sums of the Taylor series for $e$ are convergents to $e$? (and a link to the primes 2, 5, 13, 37, 463). II; C. Hillar, L. Garcia-Puente, A. M. Del Campo, J.


Ruffo, Z. Teitler, S. L. Johnson, and F. Sottile, Experimentation at the frontiers of reality in Schubert calculus; Y. Yang and W. Zudilin, On Sp$_4$ modularity of Picard-Fuchs differential equations for Calabi-Yau threefolds.


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