Simple precedence grammar

G = (N, Σ, P, S) is a simple precedence grammar if all the production rules in P comply with the following constraints:

• There are no erasing rules (ε-productions)
• There are no useless rules (unreachable symbols or unproductive rules)
• For each pair of symbols X, Y (X, Y ${\displaystyle \in }$ (N ∪ Σ)) there is only one Wirth–Weber precedence relation.
• G is uniquely inversible

${\displaystyle S\to aSSb|c}$

precedence table

${\displaystyle {\begin{array}{c|ccccc}&S&a&b&c&\$\\\hline S&{\dot {=}}&\lessdot &{\dot {=}}&\lessdot &\\a&{\dot {=}}&\lessdot &&\lessdot &\\b&&\gtrdot &&\gtrdot &\gtrdot \\c&&\gtrdot &\gtrdot &\gtrdot &\gtrdot \\\$&&\lessdot &&\lessdot &\end{array}}}$

• Alfred V. Aho, Jeffrey D. Ullman (1977). Principles of Compiler Design. 1st Edition. Addison–Wesley.
• William A. Barrett, John D. Couch (1979). Compiler construction: Theory and Practice. Science Research Associate.
• Jean-Paul Tremblay, P. G. Sorenson (1985). The Theory and Practice of Compiler Writing. McGraw–Hill.

• "Simple Precedence Relations" at Clemson University