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, ..., xn)]
|
= |
x1 + ... + xn + 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, ..., xn)]
|
= |
x1 + ... + xn + 1
|
for all other symbols f of arity n
|
one remains with the following pair(s).
1.1.1.1.1: P is empty
All dependency pairs have been removed.