What is the Standard Algorithm to convert any given Regular Expression(RE) to a Left (or Right) Linear Grammar?

I know I can do this like this (to write Linear Grammar from RE):

`RegEx -> NFA -> DFA -> Right Linear grammar`

.

For a direct approach, I can handle simple regex like `(0 + 10)*`

and create a linear grammar.

But when there is, say, a nested kleene star, its really hard to produce a CFG that is linear, without any well-defined method.

I saw some answers to similar questions here and here. But they do not provide a general algo or does not convert the regex to a **linear** grammar.

In particular, how do I convert this : `(((01+10)*00)*11)*`

directly to a linear grammar, using some algorithm?

Any help is appreciated.

**EDIT**

Did some more searching. And got this.

Constructing an Equivalent Regular Grammar from a Regular Expression

Standard algorithmfor RE to Linear Grammar(LG) . happens in two steps first from RE to DFA algorithmicly, then DFA to LG algorithmicly(so search for two algorithms). Although Its fortunate that We have Regular Expression for Regular Languages Because Regular Expressions and Grammars uses for same purpose but for other then regular languages we don't have any regular expression type mechanism to express the language. Yes for RL we have both RE and Grammar. – Grijesh Chauhan Apr 11 '13 at 5:14