$(p,q)$th order oriented growth measurement of composite $p$-adic entire functions

Relative orders and slowly changing functions oriented growth analysis of composite entire functions

In the paper we establish some new results depending on the comparative growth properties of composition of entire functions using relative $L^{ast }$-order (relative $L^{ast }$-lower order) as compared to their corresponding left and right factors where $Lequiv Lleft( rright) $ is a slowly changing function.

relative orders and slowly changing functions oriented growth analysis of composite entire functions

in the paper we establish some new results depending on thecomparative growth properties of composition of entire functionsusing relative $l^{ast }$-order (relative $l^{ast }$-lowerorder) as compared to their corresponding left and right factorswhere $lequiv lleft( rright) $ is a slowly changing function.

Growth analysis of entire functions of two complex variables

In this paper, we introduce the idea of generalized relative order (respectively generalized relative lower order) of entire functions of two complex variables. Hence, we study some growth properties of entire functions of two complex variables on the basis of the definition of generalized relative order and generalized relative lower order of entire functions of two complex variables.

Estimation of Growth of Composite Entire and Meromorphic Functions of Order Zero on the Basis of Slowly Changing Functions

In the paper we study the growth properties of composite entire and meromophic functions using L-order and L∗-order improving some earlier results where L ≡ L(r) is a slowly changing function. Mathematics Subject Classification: 30D35, 30D30

p-ADIC PERIODS, p-ADIC L-FUNCTIONS, AND THE p-ADIC UNIFORMIZATION OF SHIMURA CURVES