// y-cruncher Custom Formula File // // This can be loaded directly from the Custom Compute menu or // entered from the command line as "custom:filename.cfg". // y-cruncher custom custom:"filename.cfg" // // // Author: Alexander J. Yee // Date: February 19, 2019 // // Value = 1.03692775514336992633136548645703416805708091950191... // // Formula: Broadhurst (1998) rearranged as Huvent (2006) // http://functions.wolfram.com/ZetaFunctionsandPolylogarithms/Zeta/06/05/0002/ // // Huvent's 2006 formula is mathematically the same as Broadhurst's 1998 formula. // // ***Therefore, Broadhurst's and Huvent's formulas cannot be used as a compute/verify pair.*** // // The use of the optimized 74-term rearrangement by Alex Yee (2018) to pair with either // Broadhurst (1998) or Huvent (2006) is also questionable. But the reformulation is // significant enough that it can be considered *computationally* independent, though // still *mathematically* the same. // { NameShort : "Zeta(5)" NameLong : "Zeta(5)" AlgorithmShort : "Broadhurst (Huvent 2006)" AlgorithmLong : "Broadhurst (1998), Huvent (2006)" Formula : { LinearCombination : [ [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "true" PowerCoef : -10 PowerShift : 12 PolynomialP : [369] PolynomialQ : [-1 20 -160 640 -1280 1024] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "true" PowerCoef : -10 PowerShift : 0 PolynomialP : [369] PolynomialQ : [0 0 0 0 0 1] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "true" PowerCoef : -10 PowerShift : 17 PolynomialP : [369] PolynomialQ : [-243 1620 -4320 5760 -3840 1024] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 18 PolynomialP : [7263] PolynomialQ : [-161051 878460 -1916640 2090880 -1140480 248832] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 1691577 Alternating : "false" PowerCoef : -12 PowerShift : 20 PolynomialP : [32635] PolynomialQ : [-16807 96040 -219520 250880 -143360 32768] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 13 PolynomialP : [13977] PolynomialQ : [-3125 18750 -45000 54000 -32400 7776] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 20 PolynomialP : [9] PolynomialQ : [-2476099 15638520 -39507840 49904640 -31518720 7962624] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 563859 Alternating : "false" PowerCoef : -12 PowerShift : 18 PolynomialP : [1051] PolynomialQ : [-243 1620 -4320 5760 -3840 1024] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 19 PolynomialP : [9] PolynomialQ : [-1419857 10022520 -28298880 39951360 -28200960 7962624] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 7 PolynomialP : [83871] PolynomialQ : [-32 240 -720 1080 -810 243] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 1691577 Alternating : "false" PowerCoef : -12 PowerShift : 17 PolynomialP : [32635] PolynomialQ : [-3125 25000 -80000 128000 -102400 32768] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 14 PolynomialP : [7263] PolynomialQ : [-16807 144060 -493920 846720 -725760 248832] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 17 PolynomialP : [9] PolynomialQ : [-371293 3427320 -12654720 23362560 -21565440 7962624] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 54567 Alternating : "false" PowerCoef : -12 PowerShift : 6 PolynomialP : [3187] PolynomialQ : [-1 10 -40 80 -80 32] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 16 PolynomialP : [9] PolynomialQ : [-161051 1756920 -7666560 16727040 -18247680 7962624] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 12 PolynomialP : [7263] PolynomialQ : [-3125 37500 -180000 432000 -518400 248832] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 1691577 Alternating : "false" PowerCoef : -12 PowerShift : 14 PolynomialP : [32635] PolynomialQ : [-243 3240 -17280 46080 -61440 32768] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 3 PolynomialP : [83871] PolynomialQ : [-1 15 -90 270 -405 243] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 14 PolynomialP : [9] PolynomialQ : [-16807 288120 -1975680 6773760 -11612160 7962624] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 563859 Alternating : "false" PowerCoef : -12 PowerShift : 12 PolynomialP : [1051] PolynomialQ : [-1 20 -160 640 -1280 1024] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 13 PolynomialP : [9] PolynomialQ : [-3125 75000 -720000 3456000 -8294400 7962624] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 5 PolynomialP : [13977] PolynomialQ : [-1 30 -360 2160 -6480 7776] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 1691577 Alternating : "false" PowerCoef : -12 PowerShift : 11 PolynomialP : [32635] PolynomialQ : [-1 40 -640 5120 -20480 32768] }}] [-1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 62651 Alternating : "false" PowerCoef : -12 PowerShift : 8 PolynomialP : [7263] PolynomialQ : [-1 60 -1440 17280 -103680 248832] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 11 PolynomialP : [9] PolynomialQ : [-1 120 -5760 138240 -1658880 7962624] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 1691577 Alternating : "false" PowerCoef : -12 PowerShift : -5 PolynomialP : [128125] PolynomialQ : [0 0 0 0 0 1] }}] [1 {SeriesBinaryBBP : { CoefficientP : 1 CoefficientQ : 0 CoefficientD : 2021 Alternating : "false" PowerCoef : -12 PowerShift : 22 PolynomialP : [9] PolynomialQ : [-6436343 33580920 -70081920 73128960 -38154240 7962624] }}] ] } }