Binary BBP-Formulae for Logarithms and Generalized Gaussian-Mersenne Primes
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1 Journal of Integer Sequences, Vol ), Article Binary BBP-Formulae for Logarithms and Generalized Gaussian-Mersenne Primes Marc Chamberland Department of Mathematics and Computer Science Grinnell College Grinnell, IA 50 USA chamberl@math.grinnell.edu Constants of the form C = Abstract k=0 pk) qk)b k where p and q are integer polynomials, deg p < deg q, and pk)/qk) is non-singular for nonnegative k and b, have special properties. The n th digit base b) of C may be calculated in essentially) linear time without computing its preceding digits, and constants of this form are conjectured to be either rational or normal to base b. This paper constructs such formulae for constants of the form log p for many primes p. This holds for all Gaussian-Mersenne primes and for a larger class of generalized Guassian- Mersenne primes. Finally, connections to Aurifeuillian factorizations are made. Introduction The 997 paper of Bailey, Borwein and Plouffe[] heralded a new era for the computation of various transcendental constants. For formulae such as the alluring 4 π = 6 k 8k + 8k + 4 8k + 5 ) 8k + 6 and more generally k=0 C = k=0 pk) qk)b k
2 where p and q are integer polynomials, deg p < deg q, and pk)/qk) is non-singular for non-negative k and b Z +, they showed that the n th digit base b) may be calculated in essentially) linear time without computing its preceding digits. Moreover, constants of this form are conjectured to be either rational or normal to base b; see Bailey and Crandall[3]. Bailey[] has recently catalogued a collection of these BBP-formulae. Curiously, these formulae intersect with the search for prime numbers. call that the Gaussian-Mersenne primes Sloane A05749) are the primes p such that + i) p ) i) p ) is prime. Not only will we see that log q has a BBP-formula for every Gaussian-Mersenne prime q, but also for a much broader sequence of generalized Gaussian-Mersenne primes. Section shows how evaluating cyclotomic polynomials at particular complex values yields new BBP-formulae, which in turn is used to motivate the definition of generalized Gaussian-Mersenne primes. In performing such calculations, certain redundancies keep cropping up, shown to be related to Aurifeuillian identities. Section 3 shows how the cyclotomic polynomials can be used to construct such formulae. Cyclotomic Polynomials and Generalized Gaussian- Mersenne Primes Perhaps the simplest BBP-formula for logarithms is the classical log = k= k k. Bailey et al.[] sought to determine all integers m such that log m has a binary BBP-formula, that is, where b = l. Bailey and Crandall noted that the space of constants which admit a binary BBP-formula is linear; if C has such a formula with base l and C has a formula with base l, then C + C has a formula with base lcml,l ). Since log n ) n log = log ) = n k= k kn, log n ) has a binary BBP-formula, subsequently yielding formulae for log n + ) and the natural logarithm of any integer of the form a ) a ) a h ) b ) b ) b j ). ) The paper [] gave a list of some primes which have this form. Bailey [] extended this list by using the expression )) + i)k log ± ) n
3 suggested by R. Harley and J. Borwein. This expression has a binary BBP-formula since, for example, log + i ) n = = = ) j + i n j j= 8 ) 8j+k + i n 8j + k j=0 k= j=0 8n 4)j 8 ) k + i n 8j + k. A crucial tool for factoring numbers of the form b n is the classical theory of cyclotomic polynomials: b n = d n Φ d b) 3) k= where Φ d x), the d th cyclotomic polynomial, is defined as φd) Φ d x) = x ζ j ). j= The terms ζ j are the primitive d th roots of unity and φ ) is the Euler totient function. Alternatively, a well-known identity for these polynomials derived using Möbius inversion is Φ d x) = x d/k ) µk) 4) k d where µ ) is the Möbius function. In conjunction with expression ), Bailey et al. state that log Φ m ) admits a binary BBP-formula for all positive integers m. One may easily extend this to log Φ m k ) 5) for all integers k. However, the cyclotomic polynomials may be used to obtain many other values. Using the Möbius formula 4) with x = ± + i)/ n yields )) ± + i log Φ m = ) )) m/d ± + i µd) log. 6) n n d m As in the consideration of the expression ), the right side is a binary BBP-formula. Though it is simply a linear combination of expressions of the form ), the advantage here is that implicitly some cancellation may take place. For example, we have )) + i log Φ 6 = [log log ], 6 3
4 hence 4449 joins the list. Similarly, one may use the Möbius formula 4) with x = ± + )/ n to obtain log Φ m ± + )) = n d m µd) log ± + n again producing binary BBP-formulae. An example here is + log )) Φ 5 = [log 33 8 log ], 4 ) m/d, 7) so 33 comes onto the list. Again, such results are linear combinations of earlier formulae since, for example, log + )) x = log x 3 ) log x). Modest calculations with Maple produced the following augmentation of Bailey s list of primes whose logarithm admits a binary BBP-formula underlined numbers are given by Bailey[]):, 3, 5, 7,, 3, 7, 9, 9, 3, 37, 4, 43, 6, 73, 09, 3, 7, 5, 4, 57, 33, 337, 397, 683, 3, 49, 63, 3, 73, 549, 89, 4449, 637, 38737, 4369, 668, 65537, 87, 307, 74763, 464, 6657, 6850, 79073, 3709, 5487, 5533, , 79603, , 74636, 57903, , 36689, 94766, , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , , Of course, products of two primes, three primes, etc. were found to be on the list. Keeping track of these products of primes helps generate new single primes. For example, since = 3 89, the product 3 89 is on the list. In addition, we have + log )) Φ 6 = [log 7 + log3 89) + log log ], 4
5 so this is how was obtained. Products of two primes which are on the list include: 3 89, , 53 57, , , 7 9, , , , 0 80, , , , , , , 9 457, , 5 405, , 8 867, , 33 49, , , , 60 80, 63 33, , , , 3 84, , , , , , , , , Note that all the primes up to 0 are on the list, either alone or multiplied by one other prime. Indeed, every odd prime p is on the list, either alone or in some multiple product of primes since p is on the list and p p ). Carl Pomerance see []) showed that 3 could not be written in the form ); however, it is still unknown whether log 3 has a binary BBP-formula. lated questions are extensively dealt with by Borwein, Borwein and Galway[4]. An important subclass of binary BBP-formulae concerns the expression log Φ m + i Letting m equal a prime p = 4k +, we have ) ) ) + i + i + i + i Φ p = i ) +i ) 4k = +i ) = + i ) ) k, 4 )). 8) ) 4k+) which produces )) + i log Φ p = log + ) ) k 4 = log 4 k 4) k + ) k log = log + i) 4k+) ) i) 4k+) ) k log = log + i)p ) i) p ) k log = ) + i) p log ) i) p ). 4k 5
6 A similar calculation may be done for primes of the form p = 4k. We then have that if q is a Gaussian-Mersenne prime, then log q admits a binary BBP-formula. This connection implies a larger question: For which positive integers m is the numerator of the rational expression ))) + i exp log Φ m 9) prime? Besides the Gaussian-Mersenne primes, many composite m satisfy this condition. These generalized Gaussian-Mersenne primes, checked for all m < 3000, are listed below the regular Gaussian-Mersenne primes are underlined)., 3, 4, 5, 7, 9, 0,,, 4, 5, 8, 9,,, 6, 7, 9, 30, 33, 34, 35, 4, 45, 47, 49, 5, 54, 55, 58, 63, 65, 66, 69, 70, 73, 79, 85, 86, 87, 05, 06, 0,, 3, 4, 6, 9, 38, 47, 5, 57, 63, 67, 78, 86, 89, 7, 3, 39, 4, 4, 83, 39, 33, 350, 353, 363, 367, 375, 379, 385, 39, 457, 46, 5, 543, 566, 60, 6, 633, 65, 679, 74, 779, 89, 87, 885, 997, 06, 4, 6, 50, 6, 75, 37, 39, 367, 38, 434, 477, 70, 96, 970, 33, 4, 446, 995. Some of the primes produced by expression 9) have been put on the previous list of primes. When m = 995, this produces a prime with over 700 digits. 3 Aurifeuillian Factorizations Since the cyclotomic polynomials are irreducible in Z[x], it would seem no further factorization of b n in equation 3) is possible. However, by imposing certain restrictions on x, other factorizations exist. An example is Φ 5 x) = x 4 + x 3 + x + x + = x + 3x + ) 5xx + ) which, upon letting x = 5 k and factoring the difference of squares, yields Φ 5 5 k ) = [5 4k k + 5 k 5 k + )][5 4k k k 5 k + )]. These special polynomial identities were first noted by A. Aurifeuille and subsequently generalized by E. Lucas. ferences and other examples of Aurifeuillian identities may be found in Brillhart et al. [6], as well as their use in factoring. Theorems regarding writing Φ n x) as a difference of squares may be found in Schinzel[7], Stevenhagen[8] and Brent[5]. Earlier we saw that log n ± ) has a binary BBP-formula. Bailey[]) notes that log ± + i n )) = n ) log + log n ± n + ), so the two expressions n ± n + come onto the list. However, multiplying these terms gives the classical Aurifeuillian identity 4n + = n + n + ) n n + ). 6
7 This demonstrates why some calculations used in the last section to generate the list of primes were redundant. Indeed, in searching for various families of factors, similar identities arise. We now develop other Aurifeuillian identities, interesting for their own sake, and make connections to expressions used in the last section. Let us start with a general theorem regarding cyclotomic polynomials. Theorem 3. Let m, n Z + satisfy gcdm, n) = and at least one of m or n is greater than. Then Φ mn x) = where ζ j are the primitive m th roots of unity. φm) j= Φ n xζ j ) 0) Proof: Since the degree of Φ n x) is φn), the degree of the left side polynomial of 0) is φmn) = φm)φn), matching the degree of the right. The left polynomial is monic, while the leading coefficient of the right side is φm) j= ζ j φn) = = φm) so the right is also monic. It remains to show that the roots of each side are the same. The roots of Φ mn x) are simply e kiπ/mn with gcdk, mn) =. We will show that each of these φmn) distinct roots is also a root of the right side. To expand the right side, first note that each ζ j has the form e liπ/m for some l satisfying gcdl, m) =. This combines to give xζ j = e k+ln)iπ/mn so it is suffices to show that for each k there exists an l such that ) k + ln gcd m, n =. Since gcdk, mn) =, we have gcdk, n) =. This implies that gcdk + ln, n) = and, using the Euclidean algorithm with gcdm, n) =, there exists an l such that k + ln is a multiple of m. This completes the proof. With the identities Φ k nx) = Φ n x k ), n odd j= ζ j φn) and we construct several examples. Φ pn x) = Φ n x p ), p prime, p n, 7
8 Example 3. The case m = 4 was foreshadowed by Schinzel[7, formula )]. Letting n be odd in Theorem 3. gives Φ n x ) = Φ 4n x) = Φ n ix)φ n ix). placing x with ix gives Φ n x ) = Φ n x)φ n x). Example 3. Letting m = 8, n odd, we have Φ 8n x) = [Φ n x + i ) Φ n x i )] [ Φ n x + i ) Φ n x i )]. ) placing x with x yields Φ n 4x 4 ) = Φ 4n x ) = [Φ n x + i))φ n x i))] [Φ n x + i))φ n x i))]. ) If x is real, the two right side expressions must be integer polynomials since they are each the product of complex conjugates. Example subcases with x = k are n=: 4k+ + = k+ + k+ + ) k+ k+ + ) n=5: where 3k+6 + 8k+4 0k+0 6k+8 k+6 + 4k+ + = L R L, R = 6k+8 ± 5k+8 + 4k+7 ± 3k+7 + k+7 ± k k+5 ± 9k k+4 ± 7k k+3 ± 5k+4 + 4k+3 ± 3k+ + k+ ± k+ + Getting back to the redundancies in our earlier calculations, let x = / k in ) to produce )) [ )) ))] + i + i log Φ 4n = log Φ k n + log Φ k n. k This shows how terms from 5) and 6) appear in some factorizations. Example 3.3 Letting m = and, 3 n, we have ) ) 3 + i 3 i Φ n x) = Φ n x Φ n x Φ n x 3 + i ) Φ n x 3 i ) 3) placing x with 3x gives Φ 6n x ) = [Φ n x3 + ) ) Φ n x3 )] ) [Φ n x 3 + ) ) Φ n x 3 )] ) 8
9 Again, the two right side expressions must be integer polynomials. Example subcases with x = k are n=: 9 4k 3 k + = 3 k 3 k + )3 k + 3 k + ) n=5: 6k k 3 7 0k 3 5 8k 3 4 6k k 3 + 8k k k k k 3 + 3k 3 + k+ 3 + k 3 + ) 8k 3 4 7k k k k 3 3k 3 + k+ 3 k 3 + ) To show how equation 3) produces redundancies, replace x with x 3 + i)/ to obtain + ) ) 3 + i Φ 6n x + ) ) = Φ n x = Φ n x Φ n x Φ n x)φ n x). With x = / k this yields the relationship + log )) + Φ 6n = log )) + Φ k n + log )) Φ k n k ) ) + log Φ n + log Φ k n. k This shows how terms from 5) and 7) appear in some factorizations. Acknowledgement: I would like thank David Bailey, Jonathan Borwein and Samuel Wagstaff for supportive dialgoue. Special thanks go to Arnold Adelberg for helping me obtain Theorem 3. in its general form. ferences [] D. H. Bailey, A compendium of BBP-type formulas for mathematical constants. Preprint, dhbailey/dhbpapers/index.html, 000). [] D. H. Bailey, P. B. Borwein, and S. Plouffe. On the rapid computation of various polylogarithmic constants. Math. Comp ), [3] D. H. Bailey and R. E. Crandall, On the random character of fundamental constant expansions. Experiment. Math. 0 00), [4] D. Borwein, J. M. Borwein, and W. F. Galway. Finding and excluding b-ary Machin-type BBP formulae. Canadian J. Math. submitted, 003). CECM Preprint 003:95. [5] R. Brent. Computing Aurifeuillian factors. In Computational Algebra and Number Theory, Mathematics and its Applications Vol. 35, Kluwer, Dordrecht, 995), pp. 0. 9
10 [6] J. Brillhart, D.H. Lehmer, J.L. Selfridge, B. Tuckerman, and S.S. Wagstaff,Jr. Factorizations of b n ±. American Mathematical Society, Providence, 983. [7] A. Schinzel. On primitive prime factors of a n b n. Proc. Cambridge Phil. Soc ), [8] P. Stevenhagen. On Aurifeuillian factorizations. Proc. Kon. Akad. Wetensch ), Mathematics Subject Classification: Primary Y05; Secondary A4, B99, T, Y60. Keywords: primes, Gaussian-Mersenne, BBP, Aurifeuillian. Concerned with sequence A05749.) ceived July 5, 003; revised version received October 4, 003. Published in Journal of Integer Sequences, October 5, 003. turn to Journal of Integer Sequences home page. 0
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