New Upper Bounds for Taxicab and Cabtaxi numbers

New Upper Bounds for Taxicab and Cabtaxi Numbers
Christian Boyer, France, 2006-2011 (Last update: March 24, 2011)

Updated tables of best known results
(see also the previous tables of the best known results, when the JIS and PLS papers were written in 2007)

Taxicab(2)	= 1729	~1.73E+03	Bernard Frenicle de Bessy (France)	1657
Taxicab(3)	= 87539319	~8.75E+07	John Leech (UK)	1957
Taxicab(4)	= 6963472309248	~6.96E+12	Edwin Rosenstiel, John A. Dardis, Colin R. Rosenstiel (UK)	1989
Taxicab(5)	= 48988659276962496	~4.90E+16	John A. Dardis (UK)	1994
Taxicab(6)	= 24153319581254312065344	~2.42E+22	Randall L. Rathbun (USA), Uwe Hollerbach (USA)	July 2002, March 2008 (*)
Taxicab(7)	≤ 24885189317885898975235988544	~2.49E+28	Christian Boyer (France)	Dec. 2006
Taxicab(8)	≤ 50974398750539071400590819921724352	~5.10E+34
Taxicab(9)	≤ 136897813798023990395783317207361432493888	~1.37E+41
Taxicab(10)	≤ 7335345315241855602572782233444632535674275447104	~7.34E+48
Taxicab(11)	≤ 87039729655193781808322993393446581825405320183232000	~8.70E+52	Christian Boyer - Jaroslaw Wroblewski (France - Poland)	April 2008
Taxicab(12)	≤ 16119148654034302034428760115512552827992287460693283776000	~1.61E+58
Taxicab(13) ... Taxicab(22)	see the downloadable file at the end of this web page	~9.88E+64 ... ~4.68E+159

In the second column, numbers with background are best known upper bounds: not sure that they are the true Taxicab numbers, but they may have a chance.
(*) Randall L. Rathbun found this number as an upper bound. Six years later, this number is proved to be Taxicab(6) by Uwe Hollerbach, USA.

Cabtaxi(2)	= 91	=9.1E+01	François Viète (France), Pietro Bongo (Italy) indep.	1591
Cabtaxi(3)	= 728	=7.28E+02	Edward B. Escott (USA)	1902
Cabtaxi(4)	= 2741256	~2.74E+06	Randall L. Rathbun (USA)	~1992
Cabtaxi(5)	= 6017193	~6.02E+06
Cabtaxi(6)	= 1412774811	~1.41E+09
Cabtaxi(7)	= 11302198488	~1.13E+10
Cabtaxi(8)	= 137513849003496	~1.38E+14	Daniel. J. Bernstein (USA)	1998
Cabtaxi(9)	= 424910390480793000	~4.25E+17	Duncan Moore (UK)	Feb. 2005
Cabtaxi(10)	= 933528127886302221000	~9.34E+20	Christian Boyer (France), Uwe Hollerbach (USA)	Dec. 2006, May 2008 (**)
Cabtaxi(11)	≤ 261858398098545372249216	~2.62E+23	Duncan Moore (UK)	March 2008
Cabtaxi(12)	≤ 1796086752557922708257372544	~1.80E+27	Duncan Moore (UK)	March 2008
Cabtaxi(13)	≤ 308110458144384714689809795584	~3.08E+29	C. Boyer - J. Wroblewski (France - Poland)	April 2008
Cabtaxi(14)	≤ 3424462108508996825708504669331456	~3.42E+33	Duncan Moore (UK)	March 2008
Cabtaxi(15)	≤ 119860206095954108554485737248700928	~1.20E+35	Christian Boyer - Jaroslaw Wroblewski (France - Poland)	April 2008
Cabtaxi(16)	≤ 822121153612149230575217671788839665152	~8.22E+38
Cabtaxi(17)	≤ 228528345587492406268587814296067158147072	~2.29E+41
Cabtaxi(18)	≤ 1567475922384610414596243818256724637730766848	~1.57E+45
Cabtaxi(19)	≤ 22388474568951577754900099772066812785435844544000	~2.24E+49
Cabtaxi(20)	≤ 3901860835762247103510236821129665273758992896000000	~3.90E+51
Cabtaxi(21)	≤ 1494725379426214299719362865171579535464276835200448000	~1.49E+54
Cabtaxi(22)	≤ 2804160172002816034210551378130963637402667204941047872000	~2.80E+57
Cabtaxi(23) ... Cabtaxi(42)	see the downloadable file at the end of this web page	~7.57E+58 ... ~ 9.11E+157

In the second column, numbers with background are best known upper bounds: not sure that they are the true Cabtaxi numbers, but they may have a chance.
(**) I found this number as an upper bound. One year and a half later, this number is proved to be Cabtaxi(10) by Uwe Hollerbach, USA. And also confirmed by Bill Butler, USA, in July 2008

What is a "Taxicab" or "Cabtaxi" number?

Famous anecdote on Ramanujan related by G.H. Hardy:

I remember once going to see him [Ramanujan] when he was lying ill at Putney. I had ridden in taxi-cab No. 1729, and remarked that the number seemed to me rather a dull one, and that I hoped it was not an unfavourable omen. “No,” he replied, “it is a very interesting number; it is the smallest number expressible as a sum of two cubes in two different ways.”

London Taxi cab n°1729.
Built in France by Unic, they were the most current taxi cabs in London at the time of the Hardy/Ramanujan anecdote.
Image from the "London Vintage Taxi Association" http://www.lvta.co.uk/history.htm....but slightly modified: LF 5795 becomes here LF 1729!

Pierre de Fermat

But this problem was much older. 350 years ago, in 1657, Pierre de Fermat asked the question:

Trouver deux nombres cubes dont la somme soit égale à deux autres nombres cubes

Bernard Frenicle de Bessy found several solutions, including the number 1729 = 1³ + 12³ = 9³ + 10³. This is the smallest solution to Fermat's problem. Today, this number is called Taxicab(2), in memory of the Hardy/Ramanujan anecdote.

Definitions:

Taxicab(n) is the smallest number expressible as a sum of two positive cubes in n different ways
Cabtaxi(n) is the smallest number expressible as a sum of two positive or negative cubes in n different ways (for example: Cabtaxi(2) = 91 = 3³ + 4³ = 6³ - 5³)

Fermat proved that numbers expressible as a sum of two cubes in n different ways exist for any n: see the Theorem 412 of Hardy & Wright, An Introduction of Theory of Numbers, p. 333-334 (fifth edition).

For more information on Taxicab and Cabtaxi numbers:

http://euler.free.fr/taxicab.htm (Jean-Charles Meyrignac) and http://homepage.ntlworld.com/duncan-moore/taxicab/index.htm (Duncan Moore)
http://mathworld.wolfram.com/TaxicabNumber.html and http://mathworld.wolfram.com/CabtaxiNumber.html
http://en.wikipedia.org/wiki/Taxicab_number and http://en.wikipedia.org/wiki/Cabtaxi_number
http://oeis.org/A011541 and http://oeis.org/A047696
Part of problem D1, Richard K. Guy, Unsolved Problems in Number Theory, p. 211-212 (third edition).

2008: Publication of my JIS and PLS papers,
Taxicab(6) and Cabtaxi(10) now proved by Uwe Hollerbach,
better bounds by Moore and by Boyer-Wroblewski.

"New Upper Bounds for Taxicab and Cabtaxi Numbers" in Journal of Integer Sequences, Volume 11, 2008, article 08.1.6
This paper on my Taxicab and Cabtaxi research of 2006-2007 can be downloaded from the JIS website since March 7th 2008, http://www.cs.uwaterloo.ca/journals/JIS/vol11.html, but the figures are not very clear. I recommend this other version with exactly the same text, but cleaner figures:

Download "New Upper Bounds for Taxicab and Cabtaxi Numbers" (PDF file, 1.3Mb)

"Les nombres Taxicab" in Pour La Science (the French edition of Scientific American), Dossier N°59 Jeux Math', avril-juin 2008, pages 26-28
This second paper is a shorter version in French.

Interesting news, known after the writing of the two above articles:

March 2008. As mentioned in these articles, the upper bound found in 2002 by Randall L. Rathbun was probably Taxicab(6). It is now sure, his upper bound is really Taxicab(6). Look at the annoucement done by Uwe Hollerbach, USA, http://listserv.nodak.edu/cgi-bin/wa.exe?A2=ind0803&L=nmbrthry&T=0&P=1059 and his webpage http://www.korgwal.com/ramanujan.
March-April 2008. In March, Duncan Moore, UK, announced better Cabtaxi(11..15) upper bounds than my published bounds. And in April, with Jaroslaw Wroblewski, Poland, we found better Cabtaxi(13) and Cabtaxi(≥15) bounds than Moore's. We also found better Taxicab(≥11) upper bounds than my published bounds. See above the updated tables of Taxicab and Cabtaxi numbers!
May 2008. Cabtaxi(10) = 933528127886302221000. My upper bound of Cabtaxi(10) found in Dec 2006 and published in the above articles is now proved to be the real number! Uwe Hollerbach confirmed it by an exhaustive search. Look at his announcement at http://listserv.nodak.edu/cgi-bin/wa.exe?A2=ind0805&L=nmbrthry&T=0&P=1284. He also confirmed the part < 9.5 * 10²⁰ of my list of 9-10-way and list of 8-9-10-way Cabtaxi solutions, no number is missing.
April-May 2008. Other interesting results found by Uwe Hollerbach during his search on Cabtaxi(10). On one of the problems presented in Part 8.2 of the JIS paper, he found several 3-way cabtaxi solutions using 4 primes (different from the only known solution), and the first known solutions using 5 primes. This is also the solution of the question 2, Puzzle 386 of Carlos Rivera http://www.primepuzzles.net/puzzles/puzz_386.htm. But the problem of a 3-way solution using 6 primes is still unsolved! After Uwe's search, we know that such a solution (if existing) is bigger than 9.5 * 10²⁰. Who will solve this difficult problem?

68913 = 40³ + 17³ = 41³ - 2³ = 89³ - 86³ (previously only known solution using 4 primes)
439926932718 = 7639³ - 1801³ = 9007³ - 6625³ = 11257³ - 9955³ (2nd smallest solution using 4 primes, found by Uwe H.)
3607745483160 = 15349³- 2029³ = 18313³ - 13633³ = 29334³ - 27864³ (3rd smallest solution using 4 primes, found by Uwe H.)
7070014626807314 = 159535³ + 144379³ = 198817³ - 92399³ = 228757³ - 169859³ (smallest solution using 5 primes, found by Uwe H., March 29, 2008)
104886396577678268754 = 4685887³ + 1259051³ = 4873763³ - 2216057³ = 5857309³- 4579915³ (2nd smallest solution using 5 primes, found by Uwe H., April 3, 2008)
319969457707558764294 = 7054657³ - 3145699³ = 10174807³ - 9018049³ = 18819961³ - 18513883³ (3rd smallest solution using 5 primes, found by Uwe H., May 11, 2008)
771993128736890238906 = 8160617³ + 6113857³ = 8943911³ + 3838075³ = 23118287³ - 22626413³ (4th smallest solution using 5 primes, found by Uwe H., May 12, 2008)
1289090709154791499117014 = 102944713³ + 58296773³ = 108883871³ - 12172313³ = 119375213³ - 74413727³ (another solution using 5 primes, found by Jaroslaw W., May 8, 2008)

July 2008. Cabtaxi(10) and my list of 9-way solutions < Cabtaxi(10) also confirmed by Bill Butler, USA, using a Skulltrail computer: http://www.durangobill.com/Ramanujan.html . Bill worked on Cabtaxi(10) since the beginning of April 2008.
August 2008. Uwe Hollerbach has completed his computation up to 1.5 * 10²¹ : no solution using 6 primes, and no new solution using 5 primes. And we know now that Cabtaxi(11) > 1.5 * 10²¹.
November 2008. Uwe Hollerbach has reached 2 * 10²¹ : we know now that Cabtaxi(11) > 2 * 10²¹. And using his specific prime scan, up to 2 * 10²² (faster than his main scan) : still no solution using 6 primes, and still no new solution using 5 primes.

The next steps are Taxicab(7) and Cabtaxi(11): are upper bounds in the above tables the real numbers? Here are my list of 6-7-way Taxicab solutions up to 5 * 10²⁸ and my list of 9-10-11-way Cabtaxi solutions up to 1.2 * 10²⁵. Who will confirm these lists including Taxicab(7) and Cabtaxi(11)?

2010-2011: Bill Butler on the way to Taxicab(7),
and Uwe Hollerbach on the way to Cabtaxi(11).

March 2010. Bill Butler works on Taxicab(7) and has reached 10²³ : with his exhaustive search, we know now that Taxicab(7) > 10²³. There are 867 four-way-or-higher solutions < 10²³, but no seven-way.
April 2010. Uwe Hollerbach works on Cabtaxi(11) and has reached 10²² : with his exhaustive search, we know now that Cabtaxi(11) > 10²². There are 3535 six-way, 836 seven-way, 170 eight-way, 42 nine-way and 6 ten-way Cabtaxi solutions < 10²², but no eleven-way.
March 2011. Uwe Hollerbach has reached 2.61858 * 10²², ie exactly 10% of the Cabtaxi(11) upper-bound target. He found 4246 six-way, 997 seven-way, 222 eight-way, 53 nine-way and 8 ten-way Cabtaxi solutions < 2.61858 * 10²², but still no eleven-way, still no solution using 6 primes, and still no new solution using 5 primes. The only known solutions using 5 primes remain as listed above.
My above list of 9-10-11-way Cabtaxi solutions computed in 2008 seems correct... at least at this point of the search... the 53 nine-way and 8 ten-way solutions found by Uwe being exactly the same.

Decompositions of upper bounds

Taxicab(7) ≤ 24885189317885898975235988544 (≈ 2.49 * 10²⁸)
1st way	= 2648660966³ + 1847282122³
2nd way	= 2685635652³ + 1766742096³
3rd way	= 2736414008³ + 1638024868³
4th way	= 2894406187³ + 860447381³
5th way	= 2915734948³ + 459531128³
6th way	= 2918375103³ + 309481473³
7th way	= 2919526806³ + 58798362³
and differences of cubes	= 4965459364³ - 4603244680³
and differences of cubes	= 5702591300³ - 5435167136³

(...)

Below, no more an upper bound!
This is the real Cabtaxi(10) number.
Cabtaxi(10) = 933528127886302221000 (≈ 9.34 * 10²⁰)
1st way	= 8387730³ + 7002840³
2nd way	= 8444345³ + 6920095³
3rd way	= 9773330³ - 84560³
4th way	= 9781317³ - 1318317³
5th way	= 9877140³ - 3109470³
6th way	= 10060050³ - 4389840³
7th way	= 10852660³ - 7011550³
8th way	= 18421650³ - 17454840³
9th way	= 41337660³ - 41154750³
10th way	= 77480130³ - 77428260³

Lists of decompositions:

TaxicabUpdated.txt Taxicab(7..12)
CabtaxiUpdated.txt Cabtaxi(10..22)

And list of bigger upper bounds:

TaxibigUpdated.txt Taxicab(13..22) and Cabtaxi (23..42)