The aim of the chapter is to introduce the concepts of generalized relative
Gol`dberg order (α,β); generalized relative hyper Gol`dberg order (α,β), and generalized
relative logarithmic Gol`dberg order (α,β) of an entire function of several complex vari-
ables with respect to another entire function of several complex variables, where α,β are
continuous non-negative functions defined on (-∞,+∞). Then we discuss some growth
analysis of entire functions of several complex variables. Also we established some integral
representations of the above growth indicators.
Keywords: Entire functions of several complex variables, increasing function, Gener-
alized relative Gol`dberg order (α, β); generalized relative hyper Gol`dberg order (α, β),
generalized relative logarithmic Gol`dberg order (α, β), generalized relative logarithmic
Gol`dberg lower order (α, β).
