Biswas, Tanmay; Biswas, Chinmay On the growth properties of composite entire functions. (English) Zbl 1492.30065 J. Ramanujan Soc. Math. Math. Sci. 9, No. 1, 47-58 (2021). Summary: The main aim of this paper is to study some growth properties of entire functions on the basis of generalized relative order \((\alpha,\beta)\) where \(\alpha\) and \(\beta\) are continuous non-negative functions on \((-\infty,+\infty)\). Cited in 1 Document MSC: 30D20 Entire functions of one complex variable (general theory) 30D15 Special classes of entire functions of one complex variable and growth estimates Keywords:entire functions; growth; order PDF BibTeX XML Cite \textit{T. Biswas} and \textit{C. Biswas}, J. Ramanujan Soc. Math. Math. Sci. 9, No. 1, 47--58 (2021; Zbl 1492.30065) Full Text: Link OpenURL References: [1] Bernal-Gonzaléz L., Crecimiento relativo de funciones enteras. Aportaciones al estudio de las funciones enteras coníndice exponencial finito, Doctoral Thesis, (1984), Universidad de Sevilla, Spain. [2] Bernal L., Orden relative de crecimiento de funciones enteras, Collect. Math., 39 (1988), 209-229. · Zbl 0713.30030 [3] Biswas T. and Biswas C., Generalized (α, β) order based on some growth properties of wronskians, Mat. Stud., 54(1) (2020), 46-55. · Zbl 1456.30051 [4] Biswas T. and Biswas C., Some results on generalized relative order (α, β) and generalized relative type (α, β) of meromorphic function with respective to an entire function, GANITA, 70(2) (2020), 239-252. [5] Biswas T., Biswas C. and Biswas R., A note on generalized growth analysis of composite entire functions, Poincare J. Anal. Appl., 7(2) (2020), 257-266. · Zbl 1474.30210 [6] Biswas T. and Biswas C., Generalized order (α, β) oriented some growth properties of composite entire functions, Ural Math. J., 6(2) (2020) 25-37. · Zbl 1462.30052 [7] Biswas T. and Biswas C., Some generalized growth properties of composite entire and meromorphic functions, Korean J. Math., 29(1) (2021) 121-136. · Zbl 1475.30080 [8] Biswas T. and Biswas C., On some growth properties of composite entire and meromorphic functions from the view point of their generalized type (α, β) and generalized weak type (α, β), South East Asian J. Math. Math. Sci., 17, (1) (2021), 31-44. · Zbl 1499.30268 [9] Biswas T., Biswas C. and Saha B., Sum and product theorems relating to generalized relative order (α, β) and generalized relative type (α, β) of en-tire functions, J. Korean Soc. Math. Educ. Ser. B: Pure Appl. Math., https://doi.org/10.7468/jksmeb.2021.28.2.155, 28(2) (2021), 155-185. · Zbl 1494.30062 [10] Biswas T., Biswas C. and Saha B., Entire functions and some of their growth properties on the basis of generalized order (α, β), Int. J. Nonlinear Anal. Appl., 12 (2) (2021), 1735-1747. [11] Biswas T. and Biswas C., Some comparative growth properties of meromor-phic function in the light of generalized relative order(α, β), Special issue “30 years of publication of CMI”, Creat. Math. Inform., 30(2) (2021), 149-156. [12] Biswas T. and Biswas C., Some results on generalized relative order (α, β) and generalized relative type (α, β) of meromorphic functions with respect to entire functions, J. Fract. Calc. Appl. , 13(1) (2022), 240-271. · Zbl 1499.30267 [13] Biswas T. and Biswas C., A note on some growth properties of composite entire function on the basis of their generalized type (α, β) and generalized weak type (α, β), GANITA, 71(1) (2021), 55-66. [14] Biswas T. and Biswas C., On some inequalities concerning generalized relative order (α, β) and generalized relative type (α, β) of entire function with respect to an entire function, J. Class. Anal., 18(2) (2021), 97-109. · Zbl 1499.30248 [15] Biswas T. and Biswas C., A note on the integral representations of gener-alized relative order (α, β) and generalized relative type (α, β) of entire and meromorphic functions with respect to an entire function, J. Korean Soc. Math. Educ. Ser. B: Pure Appl. Math., 28(4) (2021), 355-376. · Zbl 1502.30102 [16] Biswas T. and Biswas C., Some growth analysis of composite entire and mero-morphic functions in the light of their generalized order (α, β) and generalized type (α, β), Palest. J. Math., 11(1) (2022) , 354-362. · Zbl 1493.30062 [17] Biswas T. and Biswas C., On some growth properties of composite entire functions on the basis of their generalized relative order (α, β), J. Ramanujan Soc. Math. Math. Sci., accepted for publication and to appear in 9(1) (2021). · Zbl 1492.30073 [18] Clunie J., The composition of entire and meromorphic functions, Mathemati-cal Essays dedicated to A. J. Macintyre, Ohio University Press (1970), 75-92. · Zbl 0218.30032 [19] Singh A. P., On maximum term of composition of entire functions, Proc. Nat. Acad. Sci. India, Sect. A, 59(1) (1989), 103-115. · Zbl 0693.30023 [20] Singh A. P. and Baloria M. S., On the maximum modulus and maximum term of composition of entire functions, Indian J. Pure Appl. Math., 22(12) (1991), 1019-1026. · Zbl 0757.30036 [21] Sheremeta M. N., Connection between the growth of the maximum of the modulus of an entire function and the moduli of the coefficients of its power series expansion, Izv. Vyssh. Uchebn. Zaved Mat., 2 (1967), 100-108 (in Russian). [22] Sheremeta M. N., On the growth of a composition of entire functions, Carpathian Math. Publ., 9(2) (2017), 181-187. · Zbl 1387.30035 [23] Valiron G., Lectures on the general theory of integral functions, Chelsea Publishing Company, New York (NY) USA, (1949). [24] Yang L., Value distribution theory, Springer-Verlag, Berlin, (1993). · Zbl 0790.30018 This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.