# ERE Monitoring Algorithm

Regular expressions can be easily understood by ordinary software engineers and programmers, as shown by the immense interest in and the success of scripting languages like Perl, based essentially on regular expression pattern matching. We believe that regular expressions provide an elegant and powerful specification language also for monitoring requirements, because an execution trace of a program is in fact a string of states. Extended regular expressions (EREs) add complementation to regular expressions, which brings additional benefits by allowing one to specify patterns that must not occur during an execution. Complementation gives one the power to express patterns on strings non-elementarily more compactly. Also, one important observation about the use of ERE in the context of runtime verification is that ERE patterns are often used to describe *buggy* patterns instead of desired properties.

Our approach is to generate a minimal binary transition tree finite state
machines (BTT-FSM) instead from an ERE using coinductive techniques.
A BTT-FSM is a finite state machine (FSM) in which each node "runs" a little boolean program when an event is received, called a binary transition tree, to decide which state to transit to. We prefer BTT-FSMs to ordinary FSMs because they have the advantage that atomic propositions, whose evaluation can be costy in some monitoring applications, are evaluated "by need".
Briefly, in our approach we use the concept of derivatives
of a regular expression which is based on the idea of *event*
consumption*, in the sense that an extended regular expression R*
and an event a produce another extended regular expression, denoted
R{a}, with the property that for any trace w, a w in R if
and only if w in R{a}. Let's consider an operation _{_}
which takes an ERE and an event, then we give several equations
which define its operational semantics recursively, on the structure
of regular expressions:

(R1 + R2){a} = R1{a} + R2{a} (R1 R2){a} = (R1{a}) R2 +if(epsilon in R1)thenR2{a}elseemptyendifR*{a} = (R{a}) R* ! R{a} = ! (R{a}) b{a} =if(b == a)thenepsilonelseemptyendifepsilon{a} = empty empty{a} = empty

For a given ERE one generates all possible derivatives that the ERE can generate for all possible sequences of events. This set of derivatives is finite and its size depends on the size of the initial ERE. However a number of these derivative EREs can be equivalent to each other. We check the equivalence of EREs using an automatic procedure based on coinduction, getting a set of equivalence classes of derivatives. These equivalence classes form distinct states in the optimal BTT-FSM. For a given ERE one generates all possible derivatives that the ERE can generate for all possible sequences of events. This set of derivatives is finite and its size depends on the size of the initial ERE. However a number of these derivative EREs can be equivalent to each other. We check the equivalence of EREs using an automatic procedure based on coinduction, getting a set of equivalence classes of derivatives. These equivalence classes form distinct states in the optimal BTT-FSM that is generated at the end.

### Publications

More information can be found in the following paper:

*Towards Monitoring-Oriented Programming: A Paradigm Combining Specification and Implementation*- Feng Chen and Grigore Rosu
, ENTCS 89, issue 2, pp 108 - 127. 2003.**RV'03**

PDF, ENTCS, RV'03, DBLP, BIB