TY - JOUR
T1 - Coinductive foundations of infinitary rewriting and infinitary equational logic
AU - Endrullis, Jörg
AU - Hansen, Helle Hvid
AU - Hendriks, Dimitri
AU - Polonsky, Andrew
AU - Silva, Alexandra
PY - 2018
Y1 - 2018
N2 - We present a coinductive framework for defining and reasoning about the infinitary analogues of equational logic and term rewriting in a uniform way. We define Equation found, the infinitary extension of a given equational theory =R, and →∞, the standard notion of infinitary rewriting associated to a reduction relation →R, as follows: (Formula Presented) Equation found Here μ and ν are the least and greatest fixed-point operators, respectively, and (Formula Presented) Equation found The setup captures rewrite sequences of arbitrary ordinal length, but it has neither the need for ordinals nor for metric convergence. This makes the framework especially suitable for formalizations in theorem provers.
AB - We present a coinductive framework for defining and reasoning about the infinitary analogues of equational logic and term rewriting in a uniform way. We define Equation found, the infinitary extension of a given equational theory =R, and →∞, the standard notion of infinitary rewriting associated to a reduction relation →R, as follows: (Formula Presented) Equation found Here μ and ν are the least and greatest fixed-point operators, respectively, and (Formula Presented) Equation found The setup captures rewrite sequences of arbitrary ordinal length, but it has neither the need for ordinals nor for metric convergence. This makes the framework especially suitable for formalizations in theorem provers.
KW - Coinduction
KW - Infinitary equational reasoning
KW - Infinitary rewriting
UR - http://www.scopus.com/inward/record.url?scp=85055789501&partnerID=8YFLogxK
U2 - 10.23638/LMCS-14(1:3)2018
DO - 10.23638/LMCS-14(1:3)2018
M3 - Article
AN - SCOPUS:85055789501
SN - 1860-5974
VL - 14
JO - Logical Methods in Computer Science
JF - Logical Methods in Computer Science
IS - 1
M1 - 3
ER -