The classical Levin-Pfluger theory of entire functions of completely regular growth ($CRG$) of finite

order $\rho$ in one variable establishes a relation between the distribution of zeros of an entire

function and its growth. The most important and interesting result in this theory is the fundamental

principle for $CRG$ functions. In the book of Gruman and Lelong, this basic theorem was

generalized to entire functions of several variables. In this theorem the additional hypotheses

have to be made for integral order $\rho$. We prove one common characterization for

any $\rho$. As an application we prove the following fact: $ r^{-\rho} \log

|f(rz)|$ converges to the indicator function $h^\ast_f(z)$ as a distribution if and only if $r^{-\rho}

\Delta\log |f(rz)|$ converges to $\Delta h^\ast_f(z)$ as a distribution. This also strengthens

a result of Azarin. Lelong has shown that the

indicator $h^\ast_f$ is no longer continuous in several variables. But

Gruman and Berndtsson have proved that $h^\ast_f$ is continuous if the density of

the zero set of $f$ is very small. We relax their conditions. We also get a

characterization of regular growth functions with continuous indicators. Moreover,

we characterize several kinds of limit sets in the sense of Azarin.



For subharmonic $CRG$ functions in a cone, the situation is much different from functions defined in the

whole space. We introduce a new

definition for $CRG$ functions in a cone. We also give new criteria for

functions to be $CRG$ in an open cone, and strengthen some results due to Ronkin.

Furthermore, we study $CRG$ functions in a closed cone.



It was proved by Bedford and Taylor that the complex Monge-Amp\`ere operator

$(dd^c)^q$ is continuous under monotone limits. Cegrell and Lelong showed

that the monotonicity hypothesis is essential. Improving a result of Ronkin, we get that $(dd^c)^q$ is

continuous under almost uniform limits with respect to Hausdorff $\alpha$-content.

Moreover, we study the Dirichlet problem for the

complex Monge-Amp\`ere operator.



Finally, we confirm a conjecture of Bloom on a generalization of the

M\"untz-Sz\'asz theorem to several variables.