On Some Classes of Series Representations for $1/\pi$ and $\pi^2$

Hakan Küçük; Sezer Sorgun

doi:10.36753/mathenot.795582

Araştırma Makalesi

Yıl 2021, Cilt: 9 Sayı: 4, 176 - 184, 31.12.2021

Hakan Küçük Sezer Sorgun

https://doi.org/10.36753/mathenot.795582

Öz

Kaynakça

[1] G.Bauer,Vondencoefficientenderreihenvonkugelfunctioneneinervariabeln,J.ReineAngew.Math.,56(1859) 101-121.
[2] N.D. Baruah, B. C. Berndt and H. H. Chan, Ramanujan’s Series for 1/π: A Survey. Amer. Math. Monthly, Vol. 116, No. 7 (Aug. - Sep., 2009), pp. 567-587.
[3] J.M.BorweinandP.B.Borwein,PiandtheAGM:AstudyinAnalyticNumberTheoryandComputational Complexity, Wiley, New York, 1987.
[4] J.M.BorweinandP.B.Borwein,ClassnumberthreeRamanujantypeseriesfor1/π,J.Comput.Appl.Math., 46(1993) 281-290.
[5] J.M.BorweinandP.B.Borwein,MoreRamanujan-typeseriesfor1/π,InRamanujanRevisited,G.E.Andrews, R. A. Askey, B. C. Berndt, K. G Ramanathan and R. A. Rankin (edts), Academic Press, Boston, 1988, 359-374.
[6] J. M. Borwein and P. B. Borwein, Ramanujan’s rational and algebraic series for 1/π, J. Indian Math. Soc., 51(1987), 147-160.
[7] , H. H. Chan, S. H. Chan and Z. Liu, Domb’s numbers and Ramanujan-Sato type series for 1/π, Adv. Math., v.186, no.2, 2004, 396-410.
[8] H.H.Chan,J.WanandW.Zudilin,LegendrepolynomialsandRamanujan-typeseriesfor1/π,IsraelJ.ofMath., v.194, no.1, 2013, 183-207.
[9] D.V.ChudnovskyandG.V.Chudnovsky,InRmanujanRevisited,ProceedingsofthecentenaryConference (Urbana-Champaign), G. E. Andrews, R. A. Askey, B. C. Berndt, K. G Ramanathan and R. A. Rankin (edts), Academic Press, Boston, 1988, 375-472.
[10] J.W.L.Glaisher,Onseriesfor1/πand1/π2,Quart.,J.PureAppl.Math.,37(1905)173-198.
[11] J. Guillera, Dougall’s 5F4 sum and the WZ algorithm, Ramanujan J. v.46, no.3, no.1, 2018, 667-675.
[12] J. Guillera, Proofs of some Ramanujan series for 1/π using a program due to Zeilberger, J. Difference Equ. Appl., v.24, no.10, 2018, 1643-1648.
[13] J.Guillera,Ramanujanserieswithshift,J.Aust.Math.Soc.,2019inpress.
[14] J. Guillera, A family of Ramanujan-Orr formulas for 1/π, Integral Transforms Spec. Funct., v.26, no.7, 2015, 531-538.
[15] J.Guillera,Ramanujanseriesupside-down,J.Aust.Math.Soc.,v.97,no.1,2014,78-106.
[16] J.Guillera,MorehypergeometricidentitiesrelatedtoRamanujan-typeseries,RamanujanJ.,v.32,no.1,2013, 5-22.
[17] J.Guillera,AnewRamanujan-likeseriesfor1/π2,RamanujanJ.v.26,no.3,2011,369-374.
[18] J.Guillera,OnWZ-pairswhichproveRamanujanseries,RamanujanJ.,v.22,no.3,2010,249-259.
[19] J.Guillera,Hypergeometricidentitiesfor10extendedRamanujan-typeseries,RamanujanJ.,v.15,no.2,2008, 219-234.
[20] J.Guillera,SomebinomialseriesobtainedbytheWZ-method,Adv.inAppl.Math.,v.29,no.4,2002,599-603.
[21] J.Guillera,AmethodforprovingRamanujan’sseriesfor1/π,RamanujanJ.,2019,inpress.
[22] Z-GLiu,SummationformulaandRamanujantypeseries,J.Math.Anal.Appl.,v.389,no.2,2012,1059-1065.
[23] Z-GLiu,GausssummationandRamanujan-typeseriesfor1/π,Int.J.NumberTheory,v.8,no.2,2012,289-297.
[24] M.Petkovšek,H.S.WilfandD.Zeilberger,A=B,A.K.Peters,Ltd.,Wellesley,Mass.,1996.
[25] S.Ramanujan,Modularequationsandapproximationstoπ,Quart.J.Math(Oxford)45(1914)350-372.
[26] H.M.Srivastava,J.Jhoi,Zetaandq-zetaFunctionsandAssociatedSeriesandIntegrals,Elsevier,2012.
[27] H.S.WilfandD.Zeilberger,Rationalfunctionscertifycombinatorialidentities,J.Amer.Math.Soc.3(1990), 147-158.

On Some Classes of Series Representations for $1/\pi$ and $\pi^2$

Yıl 2021, Cilt: 9 Sayı: 4, 176 - 184, 31.12.2021

Hakan Küçük Sezer Sorgun

https://doi.org/10.36753/mathenot.795582

Öz

We propose some classes of series representations for $1/\pi$ and $\pi^2$ by using a new WZ-pair. As examples, among many others, we prove that
\begin{equation*}
\frac{3}{2}\sum_{n=1}^{\infty}\frac{n}{16^n(n+1)(2n-1)}\binom{2n}{n}^2=\frac{1}{\pi},
\end{equation*}
\begin{equation*}
1-\frac{1}{4}\sum_{n=0}^{\infty}\frac{3n+2}{(n+1)^2}\binom{2n}{n}^2 \frac{1}{16^n}=\frac{1}{\pi}
\end{equation*}
and
$$
4\sum_{n=0}^{\infty}\frac{1}{(n+1)(2n+1)}\frac{4^n}{ \binom{2 n}{n}}=\pi^2.
$$
Furthermore, our results lead to new combinatorial identities and binomial sums involving harmonic numbers.

Anahtar Kelimeler

Ramanujan-type series, WZ pair, Combinatorial identities, Binomial sums, Ekhad package

Kaynakça

[1] G.Bauer,Vondencoefficientenderreihenvonkugelfunctioneneinervariabeln,J.ReineAngew.Math.,56(1859) 101-121.
[2] N.D. Baruah, B. C. Berndt and H. H. Chan, Ramanujan’s Series for 1/π: A Survey. Amer. Math. Monthly, Vol. 116, No. 7 (Aug. - Sep., 2009), pp. 567-587.
[3] J.M.BorweinandP.B.Borwein,PiandtheAGM:AstudyinAnalyticNumberTheoryandComputational Complexity, Wiley, New York, 1987.
[4] J.M.BorweinandP.B.Borwein,ClassnumberthreeRamanujantypeseriesfor1/π,J.Comput.Appl.Math., 46(1993) 281-290.
[5] J.M.BorweinandP.B.Borwein,MoreRamanujan-typeseriesfor1/π,InRamanujanRevisited,G.E.Andrews, R. A. Askey, B. C. Berndt, K. G Ramanathan and R. A. Rankin (edts), Academic Press, Boston, 1988, 359-374.
[6] J. M. Borwein and P. B. Borwein, Ramanujan’s rational and algebraic series for 1/π, J. Indian Math. Soc., 51(1987), 147-160.
[7] , H. H. Chan, S. H. Chan and Z. Liu, Domb’s numbers and Ramanujan-Sato type series for 1/π, Adv. Math., v.186, no.2, 2004, 396-410.
[8] H.H.Chan,J.WanandW.Zudilin,LegendrepolynomialsandRamanujan-typeseriesfor1/π,IsraelJ.ofMath., v.194, no.1, 2013, 183-207.
[9] D.V.ChudnovskyandG.V.Chudnovsky,InRmanujanRevisited,ProceedingsofthecentenaryConference (Urbana-Champaign), G. E. Andrews, R. A. Askey, B. C. Berndt, K. G Ramanathan and R. A. Rankin (edts), Academic Press, Boston, 1988, 375-472.
[10] J.W.L.Glaisher,Onseriesfor1/πand1/π2,Quart.,J.PureAppl.Math.,37(1905)173-198.
[11] J. Guillera, Dougall’s 5F4 sum and the WZ algorithm, Ramanujan J. v.46, no.3, no.1, 2018, 667-675.
[12] J. Guillera, Proofs of some Ramanujan series for 1/π using a program due to Zeilberger, J. Difference Equ. Appl., v.24, no.10, 2018, 1643-1648.
[13] J.Guillera,Ramanujanserieswithshift,J.Aust.Math.Soc.,2019inpress.
[14] J. Guillera, A family of Ramanujan-Orr formulas for 1/π, Integral Transforms Spec. Funct., v.26, no.7, 2015, 531-538.
[15] J.Guillera,Ramanujanseriesupside-down,J.Aust.Math.Soc.,v.97,no.1,2014,78-106.
[16] J.Guillera,MorehypergeometricidentitiesrelatedtoRamanujan-typeseries,RamanujanJ.,v.32,no.1,2013, 5-22.
[17] J.Guillera,AnewRamanujan-likeseriesfor1/π2,RamanujanJ.v.26,no.3,2011,369-374.
[18] J.Guillera,OnWZ-pairswhichproveRamanujanseries,RamanujanJ.,v.22,no.3,2010,249-259.
[19] J.Guillera,Hypergeometricidentitiesfor10extendedRamanujan-typeseries,RamanujanJ.,v.15,no.2,2008, 219-234.
[20] J.Guillera,SomebinomialseriesobtainedbytheWZ-method,Adv.inAppl.Math.,v.29,no.4,2002,599-603.
[21] J.Guillera,AmethodforprovingRamanujan’sseriesfor1/π,RamanujanJ.,2019,inpress.
[22] Z-GLiu,SummationformulaandRamanujantypeseries,J.Math.Anal.Appl.,v.389,no.2,2012,1059-1065.
[23] Z-GLiu,GausssummationandRamanujan-typeseriesfor1/π,Int.J.NumberTheory,v.8,no.2,2012,289-297.
[24] M.Petkovšek,H.S.WilfandD.Zeilberger,A=B,A.K.Peters,Ltd.,Wellesley,Mass.,1996.
[25] S.Ramanujan,Modularequationsandapproximationstoπ,Quart.J.Math(Oxford)45(1914)350-372.
[26] H.M.Srivastava,J.Jhoi,Zetaandq-zetaFunctionsandAssociatedSeriesandIntegrals,Elsevier,2012.
[27] H.S.WilfandD.Zeilberger,Rationalfunctionscertifycombinatorialidentities,J.Amer.Math.Soc.3(1990), 147-158.

Toplam 27 adet kaynakça vardır.

Ayrıntılar

Birincil Dil	İngilizce
Konular	Matematik
Bölüm	Articles
Yazarlar	Hakan Küçük 0000-0002-8596-1112 Sezer Sorgun 0000-0001-8708-1226
Yayımlanma Tarihi	31 Aralık 2021
Gönderilme Tarihi	15 Eylül 2020
Kabul Tarihi	7 Aralık 2020
Yayımlandığı Sayı	Yıl 2021 Cilt: 9 Sayı: 4

Kaynak Göster

APA	Küçük, H., & Sorgun, S. (2021). On Some Classes of Series Representations for $1/\pi$ and $\pi^2$. Mathematical Sciences and Applications E-Notes, 9(4), 176-184. https://doi.org/10.36753/mathenot.795582
AMA	Küçük H, Sorgun S. On Some Classes of Series Representations for $1/\pi$ and $\pi^2$. Math. Sci. Appl. E-Notes. Aralık 2021;9(4):176-184. doi:10.36753/mathenot.795582
Chicago	Küçük, Hakan, ve Sezer Sorgun. “On Some Classes of Series Representations for $1/\pi$ and $\pi^2$”. Mathematical Sciences and Applications E-Notes 9, sy. 4 (Aralık 2021): 176-84. https://doi.org/10.36753/mathenot.795582.
EndNote	Küçük H, Sorgun S (01 Aralık 2021) On Some Classes of Series Representations for $1/\pi$ and $\pi^2$. Mathematical Sciences and Applications E-Notes 9 4 176–184.
IEEE	H. Küçük ve S. Sorgun, “On Some Classes of Series Representations for $1/\pi$ and $\pi^2$”, Math. Sci. Appl. E-Notes, c. 9, sy. 4, ss. 176–184, 2021, doi: 10.36753/mathenot.795582.
ISNAD	Küçük, Hakan - Sorgun, Sezer. “On Some Classes of Series Representations for $1/\pi$ and $\pi^2$”. Mathematical Sciences and Applications E-Notes 9/4 (Aralık 2021), 176-184. https://doi.org/10.36753/mathenot.795582.
JAMA	Küçük H, Sorgun S. On Some Classes of Series Representations for $1/\pi$ and $\pi^2$. Math. Sci. Appl. E-Notes. 2021;9:176–184.
MLA	Küçük, Hakan ve Sezer Sorgun. “On Some Classes of Series Representations for $1/\pi$ and $\pi^2$”. Mathematical Sciences and Applications E-Notes, c. 9, sy. 4, 2021, ss. 176-84, doi:10.36753/mathenot.795582.
Vancouver	Küçük H, Sorgun S. On Some Classes of Series Representations for $1/\pi$ and $\pi^2$. Math. Sci. Appl. E-Notes. 2021;9(4):176-84.

Kapak Resmi İndir

Makale Dosyaları

Tam Metin

20477

The published articles in MSAEN are licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.