On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions

Kwara Nantomah; Edward Prempeh; Stephen Boakye Twum

doi:10.36753/mathenot.421447

Research Article

Year 2016, Volume: 4 Issue: 2, 23 - 28, 30.10.2016

Kwara Nantomah Edward Prempeh Stephen Boakye Twum

https://doi.org/10.36753/mathenot.421447

Abstract

References

[1] C. Alsina and M. S. Tomás, A geometrical proof of a new inequality for the gamma function, J. Ineq. Pure Appl. Math., 6(2)(2005), Art. 48.
[2] T. M. Apostol, Introduction to Analytic Number Theory, Springer-Verlag, 1976.
[3] R. Díaz and E. Pariguan, On hypergeometric functions and Pachhammer k-symbol, Divulgaciones Matemtícas, 15(2)(2007), 179-192.
[4] R. Díaz and C. Teruel, q, k-generalized gamma and beta functions, J. Nonlin. Math. Phys., 12(2005), 118-134.
[5] F. H. Jackson, On a q-Definite Integrals, Quarterly Journal of Pure and Applied Mathematics, 41(1910), 193-203.
[6] V. Krasniqi and F. Merovci, Some Completely Monotonic Properties for the (p, q)-Gamma Function, Mathematica Balkanica, New Series, 26(2012), Fasc. 1-2.
[7] K. Nantomah, Some Inequalities for the Ratios of Generalized Digamma Functions, Advances in Inequalities and Applications, 2014(2014), Article ID 28.
[8] K. Nantomah and M. M. Iddrisu, The k-analogue of some inequalities for the Gamma function, Electron. J. Math. Anal. Appl., 2(2)(2014), 172-177.
[9] K. Nantomah, E. Prempeh and S. B. Twum, The (q, k)-extension of some Gamma function inequalities, Konuralp Journal of Mathematics, 4(1)(2016), 148-154.
[10] N. V. Vinh and N. P. N. Ngoc, An inequality for the Gamma Function, International Mathematical Forum, 4(28)(2009), 1379-1382.
[11] N. P. N. Ngoc, N. V. Vinh and P. T. T. Hien, Generalization of Some Inequalities for the Gamma Function, Int. J. Open Problems Compt. Math., 2(4)(2009), 532-535.
[12] J. Zhang and H. Shi, Two double inequalities for k-gamma and k-Riemann zeta functions, Journal of Inequalities and Applications, 2014, 2014:191.

On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions

Year 2016, Volume: 4 Issue: 2, 23 - 28, 30.10.2016

Kwara Nantomah Edward Prempeh Stephen Boakye Twum

https://doi.org/10.36753/mathenot.421447

Abstract

In this paper, the authors present the (p, q) and (q, k)-extensions of a double inequality involving a ratio of
Gamma functions. The method is based on some monotonicity properties of certain functions associated
with the (p, q) and (q, k)-extensions of the Gamma function.

Keywords

Gamma function, psi function, inequality, (pˏ q)-extension, (qˏk)-extension

References

[1] C. Alsina and M. S. Tomás, A geometrical proof of a new inequality for the gamma function, J. Ineq. Pure Appl. Math., 6(2)(2005), Art. 48.
[2] T. M. Apostol, Introduction to Analytic Number Theory, Springer-Verlag, 1976.
[3] R. Díaz and E. Pariguan, On hypergeometric functions and Pachhammer k-symbol, Divulgaciones Matemtícas, 15(2)(2007), 179-192.
[4] R. Díaz and C. Teruel, q, k-generalized gamma and beta functions, J. Nonlin. Math. Phys., 12(2005), 118-134.
[5] F. H. Jackson, On a q-Definite Integrals, Quarterly Journal of Pure and Applied Mathematics, 41(1910), 193-203.
[6] V. Krasniqi and F. Merovci, Some Completely Monotonic Properties for the (p, q)-Gamma Function, Mathematica Balkanica, New Series, 26(2012), Fasc. 1-2.
[7] K. Nantomah, Some Inequalities for the Ratios of Generalized Digamma Functions, Advances in Inequalities and Applications, 2014(2014), Article ID 28.
[8] K. Nantomah and M. M. Iddrisu, The k-analogue of some inequalities for the Gamma function, Electron. J. Math. Anal. Appl., 2(2)(2014), 172-177.
[9] K. Nantomah, E. Prempeh and S. B. Twum, The (q, k)-extension of some Gamma function inequalities, Konuralp Journal of Mathematics, 4(1)(2016), 148-154.
[10] N. V. Vinh and N. P. N. Ngoc, An inequality for the Gamma Function, International Mathematical Forum, 4(28)(2009), 1379-1382.
[11] N. P. N. Ngoc, N. V. Vinh and P. T. T. Hien, Generalization of Some Inequalities for the Gamma Function, Int. J. Open Problems Compt. Math., 2(4)(2009), 532-535.
[12] J. Zhang and H. Shi, Two double inequalities for k-gamma and k-Riemann zeta functions, Journal of Inequalities and Applications, 2014, 2014:191.

There are 12 citations in total.

Details

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Articles
Authors	Kwara Nantomah Edward Prempeh This is me Stephen Boakye Twum This is me
Publication Date	October 30, 2016
Submission Date	January 16, 2016
Published in Issue	Year 2016 Volume: 4 Issue: 2

Cite

APA	Nantomah, K., Prempeh, E., & Twum, S. B. (2016). On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions. Mathematical Sciences and Applications E-Notes, 4(2), 23-28. https://doi.org/10.36753/mathenot.421447
AMA	Nantomah K, Prempeh E, Twum SB. On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions. Math. Sci. Appl. E-Notes. October 2016;4(2):23-28. doi:10.36753/mathenot.421447
Chicago	Nantomah, Kwara, Edward Prempeh, and Stephen Boakye Twum. “On (p, Q) and (q, K)-Extensions of a Double-Inequality Bounding a Ratio of Gamma Functions”. Mathematical Sciences and Applications E-Notes 4, no. 2 (October 2016): 23-28. https://doi.org/10.36753/mathenot.421447.
EndNote	Nantomah K, Prempeh E, Twum SB (October 1, 2016) On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions. Mathematical Sciences and Applications E-Notes 4 2 23–28.
IEEE	K. Nantomah, E. Prempeh, and S. B. Twum, “On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions”, Math. Sci. Appl. E-Notes, vol. 4, no. 2, pp. 23–28, 2016, doi: 10.36753/mathenot.421447.
ISNAD	Nantomah, Kwara et al. “On (p, Q) and (q, K)-Extensions of a Double-Inequality Bounding a Ratio of Gamma Functions”. Mathematical Sciences and Applications E-Notes 4/2 (October 2016), 23-28. https://doi.org/10.36753/mathenot.421447.
JAMA	Nantomah K, Prempeh E, Twum SB. On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions. Math. Sci. Appl. E-Notes. 2016;4:23–28.
MLA	Nantomah, Kwara et al. “On (p, Q) and (q, K)-Extensions of a Double-Inequality Bounding a Ratio of Gamma Functions”. Mathematical Sciences and Applications E-Notes, vol. 4, no. 2, 2016, pp. 23-28, doi:10.36753/mathenot.421447.
Vancouver	Nantomah K, Prempeh E, Twum SB. On (p, q) and (q, k)-extensions of a double-inequality bounding a ratio of Gamma functions. Math. Sci. Appl. E-Notes. 2016;4(2):23-8.