42 research outputs found
Spartan Daily, February 9, 1995
Volume 104, Issue 10https://scholarworks.sjsu.edu/spartandaily/8655/thumbnail.jp
First-Order and Temporal Logics for Nested Words
Nested words are a structured model of execution paths in procedural
programs, reflecting their call and return nesting structure. Finite nested
words also capture the structure of parse trees and other tree-structured data,
such as XML. We provide new temporal logics for finite and infinite nested
words, which are natural extensions of LTL, and prove that these logics are
first-order expressively-complete. One of them is based on adding a "within"
modality, evaluating a formula on a subword, to a logic CaRet previously
studied in the context of verifying properties of recursive state machines
(RSMs). The other logic, NWTL, is based on the notion of a summary path that
uses both the linear and nesting structures. For NWTL we show that
satisfiability is EXPTIME-complete, and that model-checking can be done in time
polynomial in the size of the RSM model and exponential in the size of the NWTL
formula (and is also EXPTIME-complete). Finally, we prove that first-order
logic over nested words has the three-variable property, and we present a
temporal logic for nested words which is complete for the two-variable fragment
of first-order.Comment: revised and corrected version of Mar 03, 201
Spartan Daily, May 23, 1960
Volume 47, Issue 133https://scholarworks.sjsu.edu/spartandaily/4049/thumbnail.jp
Spartan Daily, April 2, 1998
Volume 110, Issue 43https://scholarworks.sjsu.edu/spartandaily/9259/thumbnail.jp
Transitive closure logic, nested tree walking automata, and XPath
International audienceWe study FO(MTC), first-order logic with monadic transitive closure, a logical formalism in between FO and MSO on trees. We characterize the expressive power of FO(MTC) in terms of nested tree-walking automata. Using the latter, we show that FO(MTC) is strictly less expressive than MSO, solving an open problem. We also present a temporal logic on trees that is expressively complete for FO(MTC), in the form of an extension of the XML document navigation language XPath with two operators: the Kleene star for taking the transitive closure of path expressions, and a subtree relativisation operator, allowing one to restrict attention to a specific subtree while evaluating a subexpression. We show that the expressive power of this XPath dialect equals that of FO(MTC) for Boolean, unary and binary queries. We also investigate the complexity of the automata model as well as the XPath dialect. We show that query evaluation be done in polynomial time (combined complexity), but that emptiness (or, satisfiability) is 2ExpTime-complete
Daily Eastern News: March 29, 1996
https://thekeep.eiu.edu/den_1996_mar/1015/thumbnail.jp
Spartan Daily, October 14, 1999
Volume 113, Issue 32https://scholarworks.sjsu.edu/spartandaily/9461/thumbnail.jp