We present a coinductive framework for defining infinitary analogues of equational reasoning and rewriting in a uniform way. We define the relation ∞=, a notion of infinitary equational reasoning, and →∞, the standard notion of infinitary rewriting as follows: ∞=:= νR. (=R ≊ R)→∞ := μR. νS.(→R ≊ R)o S where μ and ν are the least and greatest fixed-point operators, respectively, and where R := {f(s1, . . . , sn), f(t1, . . . , tn) f∈∑ s1 R t1, . . . , snR tn } ≊ Id . 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
Proof terms in term rewriting are a representation means for reduction sequences, and more in genera...
An \em equational system\/ is a set of equations. Often we are interested in knowing if an equation ...
Proof terms in term rewriting are a representation means for reduction sequences, and more in genera...
htmlabstractWe present a coinductive framework for defining infinitary analogues of equational reaso...
We present a coinductive framework for defining and reasoning about the infinitary analogues of equa...
htmlabstractrewriting in a uniform way. We define the relation 1=, a notion of infinitary equational...
We present a coinductive framework for defining infinitary analogues of equational reasoning and re...
We present a coinductive framework for defining and reasoning about theinfinitary analogues of equat...
Contains fulltext : 143600_pre.pdf (preprint version ) (Open Access) ...
Infinitary Term Rewriting allows to express infinitary terms and infinitary reductions that converge...
Infinitary Term Rewriting allows to express infinite terms and transfinite reductions that converge ...
Coinductive reasoning about infinitary structures such as streams is widely applicable. However, pra...
Term rewriting is used for the modelling of computation in declarative languages and proof systems. ...
Infinitary and regular proofs are commonly used in fixed point logics. Being natural intermediatedev...
We provide a coinductive definition of strongly convergent reductions between infinite lambda terms....
Proof terms in term rewriting are a representation means for reduction sequences, and more in genera...
An \em equational system\/ is a set of equations. Often we are interested in knowing if an equation ...
Proof terms in term rewriting are a representation means for reduction sequences, and more in genera...
htmlabstractWe present a coinductive framework for defining infinitary analogues of equational reaso...
We present a coinductive framework for defining and reasoning about the infinitary analogues of equa...
htmlabstractrewriting in a uniform way. We define the relation 1=, a notion of infinitary equational...
We present a coinductive framework for defining infinitary analogues of equational reasoning and re...
We present a coinductive framework for defining and reasoning about theinfinitary analogues of equat...
Contains fulltext : 143600_pre.pdf (preprint version ) (Open Access) ...
Infinitary Term Rewriting allows to express infinitary terms and infinitary reductions that converge...
Infinitary Term Rewriting allows to express infinite terms and transfinite reductions that converge ...
Coinductive reasoning about infinitary structures such as streams is widely applicable. However, pra...
Term rewriting is used for the modelling of computation in declarative languages and proof systems. ...
Infinitary and regular proofs are commonly used in fixed point logics. Being natural intermediatedev...
We provide a coinductive definition of strongly convergent reductions between infinite lambda terms....
Proof terms in term rewriting are a representation means for reduction sequences, and more in genera...
An \em equational system\/ is a set of equations. Often we are interested in knowing if an equation ...
Proof terms in term rewriting are a representation means for reduction sequences, and more in genera...