On Infinite Lower Order of Vector Valued Dirichlet Series

Wan Chun Lu

doi:10.4028/www.scientific.net/AMR.936.2276

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HomeAdvanced Materials ResearchAdvanced Materials Research Vol. 936On Infinite Lower Order of Vector Valued Dirichlet...

On Infinite Lower Order of Vector Valued Dirichlet Series

Abstract:

In this paper, the infinite lower order of vector valued Dirichlet series is investigated. By using a kind of new growth parameters of infinite lower order of analysis functions is introduced, the characterizations of coefficients of series are obtained.

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Periodical:

Advanced Materials Research (Volume 936)

Pages:

2276-2280

DOI:

https://doi.org/10.4028/www.scientific.net/AMR.936.2276

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Online since:

June 2014

Authors:

Wan Chun Lu*

Keywords:

Analysis Functions, Growth, Infinite Order, Vector Valued Dirichlet Series

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References

[1] B.L. Srivastava, A study of spaces of certain classes of Vector Valued Dirichlet Series, Ph. D. Thesis, I.I. T Kanpur, (1983).

Google Scholar

[2] G.S. Srivastava, Archna Sharma, On generalized order and generalized type of vector valued Dirichlet series of slow growth. Internationa Journal of Mathematical Archive, 2(2011), 2652-2659.

Google Scholar

[3] G.S. Srivastava, A note on relative type of entire functions represented by vector valued Dirichlet series. Journal of Classical Analysis, 2(2013), 61-72.

DOI: 10.7153/jca-02-06

Google Scholar

[4] W.Q. Liu, D.C. Sun, Growth of Dirichlet series of infinite order in the plane. Acta Mathematica Scientia, 32A(2012), 808-815.

Google Scholar

[5] W.C. Lu, C.F. Yi, Y.H. He, On the zero order of Laplace-Stieltjes transforms in the whole plane. Mathematics in Practice and Theory, 43(2013), 222-227.

Google Scholar

[6] G.S. Srivastava, S. Kumar, Uniform approximation of entire functions of slow growth on compact sets. Acta Mathematica Scientia, 32B(2012), 2401-2410.

DOI: 10.1016/s0252-9602(12)60188-x

Google Scholar

[7] O.B. Skaskiv, O.Y. Zadorozhna, Two open problems for absolutely convergent Dirichlet series. Matematychni Studii, 38(2012), 106-112.

Google Scholar

[8] J.R. Yu, Some properties of random Dirichlet series, Acta Math. Sinaca, 21(1978), 97-118.

Google Scholar

[9] G.S. Srivastava, A. Sharma. On bases in the space of vector valued entire Dirichlet series of two complex variables. Bulletin of Mathematical Analysis and Applications, 4(2012), 83-90.

Google Scholar

[10] J.R. Yu, D.C. Sun, On the distribution of values of random Dirichlet series (I), Lectures on Comp. Anal., World Scientific, Singapore, (1988).

Google Scholar

[11] G.S. Srivastava, A. Sharma, Spaces of entire functions represented by vector valued Dirichlet series. Journal of Mathematics and Applications, 34(2011), 97-107.

Google Scholar

[12] G.S. Srivastava, A. Sharma, Bases in the space of vector valued analytic Dirichlet series. International Journal of Pure and Applied Mathematics. 70(2011), 993-1000.

Google Scholar