Termination proof

1: switching to dependency pairs

The following set of initial dependency pairs has been identified.

a__f#( f( X ) ) → a__c#( f( g( f( X ) ) ) )

a__h#( X ) → a__c#( d( X ) )

mark#( f( X ) ) → a__f#( mark( X ) )

mark#( f( X ) ) → mark#( X )

mark#( c( X ) ) → a__c#( X )

mark#( h( X ) ) → a__h#( mark( X ) )

mark#( h( X ) ) → mark#( X )

1.1: dependency graph processor

The dependency pairs are split into 1 component(s).

The 1st component contains the pair(s)

mark#( h( X ) ) → mark#( X )

mark#( f( X ) ) → mark#( X )

1.1.1: reduction pair processor

Using the following reduction pair

Linear polynomial interpretation over the naturals

[h (x₁) ] = 2 x₁

[mark (x₁) ] = 2 x₁

[a__f (x₁) ] = x₁ + 2

[a__c (x₁) ] = x₁

[f (x₁) ] = x₁ + 2

[d (x₁) ] = 0

[mark# (x₁) ] = x₁

[a__h (x₁) ] = 2 x₁

[c (x₁) ] = x₁

[g (x₁) ] = x₁

[f(x₁, ..., x_n)] = x₁ + ... + x_n + 1 for all other symbols f of arity n

one remains with the following pair(s).

mark#( h( X ) ) → mark#( X )

1.1.1.1: reduction pair processor

Using the following reduction pair

Linear polynomial interpretation over the naturals

[h (x₁) ] = x₁ + 2

[mark (x₁) ] = 2 x₁

[a__f (x₁) ] = 3

[a__c (x₁) ] = 3

[f (x₁) ] = 2

[d (x₁) ] = 0

[mark# (x₁) ] = x₁

[a__h (x₁) ] = x₁ + 3

[c (x₁) ] = 3

[g (x₁) ] = 2 x₁ + 2

[f(x₁, ..., x_n)] = x₁ + ... + x_n + 1 for all other symbols f of arity n

one remains with the following pair(s).

none

1.1.1.1.1: P is empty

All dependency pairs have been removed.

a__f#( f( X ) )	→	a__c#( f( g( f( X ) ) ) )
a__h#( X )	→	a__c#( d( X ) )
mark#( f( X ) )	→	a__f#( mark( X ) )
mark#( f( X ) )	→	mark#( X )
mark#( c( X ) )	→	a__c#( X )
mark#( h( X ) )	→	a__h#( mark( X ) )
mark#( h( X ) )	→	mark#( X )

[h (x₁) ]	=	2 x₁
[mark (x₁) ]	=	2 x₁
[a__f (x₁) ]	=	x₁ + 2
[a__c (x₁) ]	=	x₁
[f (x₁) ]	=	x₁ + 2
[d (x₁) ]	=	0
[mark# (x₁) ]	=	x₁
[a__h (x₁) ]	=	2 x₁
[c (x₁) ]	=	x₁
[g (x₁) ]	=	x₁
[f(x₁, ..., x_n)]	=	x₁ + ... + x_n + 1	for all other symbols f of arity n