R
↳Dependency Pair Analysis
CONCAT(cons(u, v), y) -> CONCAT(v, y)
LESSLEAVES(cons(u, v), cons(w, z)) -> LESSLEAVES(concat(u, v), concat(w, z))
LESSLEAVES(cons(u, v), cons(w, z)) -> CONCAT(u, v)
LESSLEAVES(cons(u, v), cons(w, z)) -> CONCAT(w, z)
R
↳DPs
→DP Problem 1
↳Forward Instantiation Transformation
→DP Problem 2
↳Nar
CONCAT(cons(u, v), y) -> CONCAT(v, y)
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
one new Dependency Pair is created:
CONCAT(cons(u, v), y) -> CONCAT(v, y)
CONCAT(cons(u, cons(u'', v'')), y'') -> CONCAT(cons(u'', v''), y'')
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 3
↳Forward Instantiation Transformation
→DP Problem 2
↳Nar
CONCAT(cons(u, cons(u'', v'')), y'') -> CONCAT(cons(u'', v''), y'')
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
one new Dependency Pair is created:
CONCAT(cons(u, cons(u'', v'')), y'') -> CONCAT(cons(u'', v''), y'')
CONCAT(cons(u, cons(u''0, cons(u'''', v''''))), y'''') -> CONCAT(cons(u''0, cons(u'''', v'''')), y'''')
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 3
↳FwdInst
...
→DP Problem 4
↳Polynomial Ordering
→DP Problem 2
↳Nar
CONCAT(cons(u, cons(u''0, cons(u'''', v''''))), y'''') -> CONCAT(cons(u''0, cons(u'''', v'''')), y'''')
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
CONCAT(cons(u, cons(u''0, cons(u'''', v''''))), y'''') -> CONCAT(cons(u''0, cons(u'''', v'''')), y'''')
POL(cons(x1, x2)) = 1 + x2 POL(CONCAT(x1, x2)) = 1 + x1
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 3
↳FwdInst
...
→DP Problem 5
↳Dependency Graph
→DP Problem 2
↳Nar
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Narrowing Transformation
LESSLEAVES(cons(u, v), cons(w, z)) -> LESSLEAVES(concat(u, v), concat(w, z))
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
four new Dependency Pairs are created:
LESSLEAVES(cons(u, v), cons(w, z)) -> LESSLEAVES(concat(u, v), concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(w, z)) -> LESSLEAVES(v', concat(w, z))
LESSLEAVES(cons(cons(u'', v''), v0), cons(w, z)) -> LESSLEAVES(cons(u'', concat(v'', v0)), concat(w, z))
LESSLEAVES(cons(u, v), cons(leaf, z')) -> LESSLEAVES(concat(u, v), z')
LESSLEAVES(cons(u, v), cons(cons(u'', v''), z')) -> LESSLEAVES(concat(u, v), cons(u'', concat(v'', z')))
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Nar
→DP Problem 6
↳Narrowing Transformation
LESSLEAVES(cons(u, v), cons(cons(u'', v''), z')) -> LESSLEAVES(concat(u, v), cons(u'', concat(v'', z')))
LESSLEAVES(cons(u, v), cons(leaf, z')) -> LESSLEAVES(concat(u, v), z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(w, z)) -> LESSLEAVES(cons(u'', concat(v'', v0)), concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(w, z)) -> LESSLEAVES(v', concat(w, z))
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
two new Dependency Pairs are created:
LESSLEAVES(cons(leaf, v'), cons(w, z)) -> LESSLEAVES(v', concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(leaf, v'), cons(cons(u', v''), z')) -> LESSLEAVES(v', cons(u', concat(v'', z')))
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Nar
→DP Problem 6
↳Nar
...
→DP Problem 7
↳Narrowing Transformation
LESSLEAVES(cons(leaf, v'), cons(cons(u', v''), z')) -> LESSLEAVES(v', cons(u', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(u, v), cons(leaf, z')) -> LESSLEAVES(concat(u, v), z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(w, z)) -> LESSLEAVES(cons(u'', concat(v'', v0)), concat(w, z))
LESSLEAVES(cons(u, v), cons(cons(u'', v''), z')) -> LESSLEAVES(concat(u, v), cons(u'', concat(v'', z')))
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
four new Dependency Pairs are created:
LESSLEAVES(cons(cons(u'', v''), v0), cons(w, z)) -> LESSLEAVES(cons(u'', concat(v'', v0)), concat(w, z))
LESSLEAVES(cons(cons(u'', leaf), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', v0'), concat(w, z))
LESSLEAVES(cons(cons(u'', cons(u', v')), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', cons(u', concat(v', v0'))), concat(w, z))
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(cons(u', v'), z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), cons(u', concat(v', z')))
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Nar
→DP Problem 6
↳Nar
...
→DP Problem 8
↳Narrowing Transformation
LESSLEAVES(cons(cons(u'', v''), v0), cons(cons(u', v'), z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), cons(u', concat(v', z')))
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
LESSLEAVES(cons(cons(u'', cons(u', v')), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', cons(u', concat(v', v0'))), concat(w, z))
LESSLEAVES(cons(cons(u'', leaf), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', v0'), concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(u, v), cons(cons(u'', v''), z')) -> LESSLEAVES(concat(u, v), cons(u'', concat(v'', z')))
LESSLEAVES(cons(u, v), cons(leaf, z')) -> LESSLEAVES(concat(u, v), z')
LESSLEAVES(cons(leaf, v'), cons(cons(u', v''), z')) -> LESSLEAVES(v', cons(u', concat(v'', z')))
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
two new Dependency Pairs are created:
LESSLEAVES(cons(u, v), cons(leaf, z')) -> LESSLEAVES(concat(u, v), z')
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Nar
→DP Problem 6
↳Nar
...
→DP Problem 9
↳Narrowing Transformation
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
LESSLEAVES(cons(cons(u'', cons(u', v')), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', cons(u', concat(v', v0'))), concat(w, z))
LESSLEAVES(cons(cons(u'', leaf), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', v0'), concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(cons(u', v''), z')) -> LESSLEAVES(v', cons(u', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(u, v), cons(cons(u'', v''), z')) -> LESSLEAVES(concat(u, v), cons(u'', concat(v'', z')))
LESSLEAVES(cons(cons(u'', v''), v0), cons(cons(u', v'), z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), cons(u', concat(v', z')))
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
four new Dependency Pairs are created:
LESSLEAVES(cons(u, v), cons(cons(u'', v''), z')) -> LESSLEAVES(concat(u, v), cons(u'', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(cons(u'', v''), z')) -> LESSLEAVES(v', cons(u'', concat(v'', z')))
LESSLEAVES(cons(cons(u''', v'''), v0), cons(cons(u'', v''), z')) -> LESSLEAVES(cons(u''', concat(v''', v0)), cons(u'', concat(v'', z')))
LESSLEAVES(cons(u, v), cons(cons(u'', leaf), z'')) -> LESSLEAVES(concat(u, v), cons(u'', z''))
LESSLEAVES(cons(u, v), cons(cons(u'', cons(u''', v''')), z'')) -> LESSLEAVES(concat(u, v), cons(u'', cons(u''', concat(v''', z''))))
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Nar
→DP Problem 6
↳Nar
...
→DP Problem 10
↳Polynomial Ordering
LESSLEAVES(cons(u, v), cons(cons(u'', cons(u''', v''')), z'')) -> LESSLEAVES(concat(u, v), cons(u'', cons(u''', concat(v''', z''))))
LESSLEAVES(cons(u, v), cons(cons(u'', leaf), z'')) -> LESSLEAVES(concat(u, v), cons(u'', z''))
LESSLEAVES(cons(cons(u''', v'''), v0), cons(cons(u'', v''), z')) -> LESSLEAVES(cons(u''', concat(v''', v0)), cons(u'', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(cons(u'', v''), z')) -> LESSLEAVES(v', cons(u'', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(cons(u', v'), z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), cons(u', concat(v', z')))
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
LESSLEAVES(cons(cons(u'', cons(u', v')), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', cons(u', concat(v', v0'))), concat(w, z))
LESSLEAVES(cons(cons(u'', leaf), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', v0'), concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(cons(u', v''), z')) -> LESSLEAVES(v', cons(u', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost
LESSLEAVES(cons(u, v), cons(cons(u'', cons(u''', v''')), z'')) -> LESSLEAVES(concat(u, v), cons(u'', cons(u''', concat(v''', z''))))
LESSLEAVES(cons(u, v), cons(cons(u'', leaf), z'')) -> LESSLEAVES(concat(u, v), cons(u'', z''))
LESSLEAVES(cons(cons(u''', v'''), v0), cons(cons(u'', v''), z')) -> LESSLEAVES(cons(u''', concat(v''', v0)), cons(u'', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(cons(u'', v''), z')) -> LESSLEAVES(v', cons(u'', concat(v'', z')))
LESSLEAVES(cons(leaf, v'), cons(leaf, z')) -> LESSLEAVES(v', z')
LESSLEAVES(cons(cons(u'', v''), v0), cons(cons(u', v'), z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), cons(u', concat(v', z')))
LESSLEAVES(cons(cons(u'', v''), v0), cons(leaf, z')) -> LESSLEAVES(cons(u'', concat(v'', v0)), z')
LESSLEAVES(cons(cons(u'', cons(u', v')), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', cons(u', concat(v', v0'))), concat(w, z))
LESSLEAVES(cons(cons(u'', leaf), v0'), cons(w, z)) -> LESSLEAVES(cons(u'', v0'), concat(w, z))
LESSLEAVES(cons(leaf, v'), cons(cons(u', v''), z')) -> LESSLEAVES(v', cons(u', concat(v'', z')))
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
POL(cons(x1, x2)) = 1 + x1 + x2 POL(LESS_LEAVES(x1, x2)) = 1 + x2 POL(leaf) = 0 POL(concat(x1, x2)) = x1 + x2
R
↳DPs
→DP Problem 1
↳FwdInst
→DP Problem 2
↳Nar
→DP Problem 6
↳Nar
...
→DP Problem 11
↳Dependency Graph
concat(leaf, y) -> y
concat(cons(u, v), y) -> cons(u, concat(v, y))
lessleaves(x, leaf) -> false
lessleaves(leaf, cons(w, z)) -> true
lessleaves(cons(u, v), cons(w, z)) -> lessleaves(concat(u, v), concat(w, z))
innermost