Operator precedence grammars define a classical Boolean and deterministic context-free language family (called Floyd languages or FLs). FLs have been shown to strictly include the well-known Visibly Pushdown Languages, and enjoy the same nice closure properties. In this paper we provide a complete characterization of FLs in terms of a suitable Monadic Second-Order Logic. Traditional approaches to logic characterization of formal languages refer explicitly to the structures over which they are interpreted - e.g, trees or graphs - or to strings that are isomorphic to the structure, as in parenthesis languages. In the case of FLs, instead, the syntactic structure of input strings is “invisible” and must be reconstructed through parsing. This r...
In the last decades much research effort has been devoted to extending the success of model checking...
A classic result in formal language theory is the equivalence among non-counting, or aperiodic, regu...
A classic result in formal language theory is the equivalence among noncounting, or aperiodic, regul...
Operator precedence grammars define a classical Boolean and deterministic context-free language fami...
Operator precedence grammars define a classical Boolean and deterministic context-free language fami...
Abstract. Operator precedence grammars define a classical Boolean and deterministic context-free lan...
Floyd’s operator precedence grammars and languages (FG, FL) are a classical subclass of deterministi...
Operator precedence languages were introduced half a century ago by Robert Floyd to support determin...
AbstractFloydʼs operator precedence grammars and languages (FG, FL) are a classical subclass of dete...
Abstract. Operator precedence grammars define a classical Boolean and deterministic context-free fam...
Operator precedence grammars define a classical Boolean and deterministic context-free family (calle...
Operator precedence languages, designated as Floyd’s Languages (FL) to honor their inventor, are a c...
Omega-languages are becoming more and more relevant nowadays when most applications are "ever-runnin...
Operator precedence languages were introduced half a century ago by Robert Floyd to support determin...
In the last decades much research effort has been devoted to extending the success of model checking...
A classic result in formal language theory is the equivalence among non-counting, or aperiodic, regu...
A classic result in formal language theory is the equivalence among noncounting, or aperiodic, regul...
Operator precedence grammars define a classical Boolean and deterministic context-free language fami...
Operator precedence grammars define a classical Boolean and deterministic context-free language fami...
Abstract. Operator precedence grammars define a classical Boolean and deterministic context-free lan...
Floyd’s operator precedence grammars and languages (FG, FL) are a classical subclass of deterministi...
Operator precedence languages were introduced half a century ago by Robert Floyd to support determin...
AbstractFloydʼs operator precedence grammars and languages (FG, FL) are a classical subclass of dete...
Abstract. Operator precedence grammars define a classical Boolean and deterministic context-free fam...
Operator precedence grammars define a classical Boolean and deterministic context-free family (calle...
Operator precedence languages, designated as Floyd’s Languages (FL) to honor their inventor, are a c...
Omega-languages are becoming more and more relevant nowadays when most applications are "ever-runnin...
Operator precedence languages were introduced half a century ago by Robert Floyd to support determin...
In the last decades much research effort has been devoted to extending the success of model checking...
A classic result in formal language theory is the equivalence among non-counting, or aperiodic, regu...
A classic result in formal language theory is the equivalence among noncounting, or aperiodic, regul...