Certification Problem

Input (TPDB SRS_Standard/Waldmann_07_size12/size-12-alpha-3-num-563)

The rewrite relation of the following TRS is considered.

Property / Task

Answer / Result

Proof (by matchbox @ termCOMP 2023)

1 Closure Under Flat Contexts

{c(☐), b(☐), a(☐)}

1.1 Semantic Labeling

As carrier we take the set {0,1,2}. Symbols are labeled by the interpretation of their arguments using the interpretations (modulo 3):

1.1.1 Dependency Pair Transformation

1.1.1.1 Dependency Graph Processor

The dependency pairs are split into 1 component.

• The 1^st component contains the pair

  c1#(b0(c0(x1)))	→	c2#(a1(b0(x1)))	(40)
  c2#(a0(c0(x1)))	→	c1#(b2(a0(x1)))	(48)
  c1#(b0(c0(x1)))	→	a1#(b0(x1))	(41)
  a1#(b0(c0(x1)))	→	a1#(b0(x1))	(74)
  a1#(b0(c0(x1)))	→	a2#(a1(b0(x1)))	(75)
  a2#(a0(c0(x1)))	→	c1#(b2(a0(x1)))	(82)
  c1#(b0(c1(x1)))	→	c2#(a1(b1(x1)))	(42)
  c2#(a0(c0(x1)))	→	b2#(a0(x1))	(49)
  b2#(a0(c0(x1)))	→	c1#(b2(a0(x1)))	(66)
  c1#(b0(c1(x1)))	→	b1#(x1)	(43)
  b1#(b0(c0(x1)))	→	b2#(a1(b0(x1)))	(58)
  b2#(a0(c0(x1)))	→	b2#(a0(x1))	(67)
  b2#(a0(c1(x1)))	→	c1#(b2(a1(x1)))	(68)
  c1#(b0(c1(x1)))	→	a1#(b1(x1))	(44)
  a1#(b0(c1(x1)))	→	b1#(x1)	(76)
  b1#(b0(c0(x1)))	→	a1#(b0(x1))	(59)
  a1#(b0(c1(x1)))	→	a1#(b1(x1))	(77)
  a1#(b0(c1(x1)))	→	a2#(a1(b1(x1)))	(78)
  a2#(a0(c0(x1)))	→	b2#(a0(x1))	(83)
  b2#(a0(c1(x1)))	→	b2#(a1(x1))	(69)
  b2#(a0(c1(x1)))	→	a1#(x1)	(70)
  a1#(b0(c2(x1)))	→	b2#(x1)	(79)
  b2#(a0(c2(x1)))	→	c1#(b2(a2(x1)))	(71)
  c1#(b0(c2(x1)))	→	c2#(a1(b2(x1)))	(45)
  c2#(a0(c1(x1)))	→	c1#(b2(a1(x1)))	(50)
  c1#(b0(c2(x1)))	→	b2#(x1)	(46)
  b2#(a0(c2(x1)))	→	b2#(a2(x1))	(72)
  b2#(a0(c2(x1)))	→	a2#(x1)	(73)
  a2#(a0(c1(x1)))	→	c1#(b2(a1(x1)))	(84)
  c1#(b0(c2(x1)))	→	a1#(b2(x1))	(47)
  a1#(b0(c2(x1)))	→	a1#(b2(x1))	(80)
  a1#(b0(c2(x1)))	→	a2#(a1(b2(x1)))	(81)
  a2#(a0(c1(x1)))	→	b2#(a1(x1))	(85)
  a2#(a0(c1(x1)))	→	a1#(x1)	(86)
  a2#(a0(c2(x1)))	→	c1#(b2(a2(x1)))	(87)
  a2#(a0(c2(x1)))	→	b2#(a2(x1))	(88)
  a2#(a0(c2(x1)))	→	a2#(x1)	(89)
  a2#(a1(b1(x1)))	→	a1#(x1)	(90)
  a2#(a1(b2(x1)))	→	a2#(x1)	(91)
  c2#(a0(c1(x1)))	→	b2#(a1(x1))	(51)
  c2#(a0(c1(x1)))	→	a1#(x1)	(52)
  c2#(a0(c2(x1)))	→	c1#(b2(a2(x1)))	(53)
  c2#(a0(c2(x1)))	→	b2#(a2(x1))	(54)
  c2#(a0(c2(x1)))	→	a2#(x1)	(55)
  c2#(a1(b1(x1)))	→	c1#(x1)	(56)
  c2#(a1(b2(x1)))	→	c2#(x1)	(57)
  b1#(b0(c1(x1)))	→	b1#(x1)	(60)
  b1#(b0(c1(x1)))	→	b2#(a1(b1(x1)))	(61)
  b1#(b0(c1(x1)))	→	a1#(b1(x1))	(62)
  b1#(b0(c2(x1)))	→	b2#(x1)	(63)
  b1#(b0(c2(x1)))	→	b2#(a1(b2(x1)))	(64)
  b1#(b0(c2(x1)))	→	a1#(b2(x1))	(65)

  1.1.1.1.1 Reduction Pair Processor with Usable Rules

  Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

  [c0(x1)]	=	2 2 2 2 · x1 + -∞ -∞
  [c1(x1)]	=	0 0 0 0 · x1 + -∞ -∞
  [c2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
  [b0(x1)]	=	0 0 0 0 · x1 + -∞ -∞
  [b1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
  [b2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
  [a0(x1)]	=	2 2 0 2 · x1 + -∞ -∞
  [a1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
  [a2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
  [c1#(x1)]	=	3 3 3 3 · x1 + -∞ -∞
  [c2#(x1)]	=	3 5 3 5 · x1 + -∞ -∞
  [b1#(x1)]	=	3 3 3 3 · x1 + -∞ -∞
  [b2#(x1)]	=	3 3 3 3 · x1 + -∞ -∞
  [a1#(x1)]	=	3 5 3 5 · x1 + -∞ -∞
  [a2#(x1)]	=	5 6 5 6 · x1 + -∞ -∞

  together with the usable rules

  a2(a1(b2(x1)))	→	a2(x1)	(13)
  a2(a1(b1(x1)))	→	a1(x1)	(14)
  a2(a1(b0(x1)))	→	a0(x1)	(15)
  b2(a1(b2(x1)))	→	b2(x1)	(16)
  b2(a1(b1(x1)))	→	b1(x1)	(17)
  b2(a1(b0(x1)))	→	b0(x1)	(18)
  c2(a1(b2(x1)))	→	c2(x1)	(19)
  c2(a1(b1(x1)))	→	c1(x1)	(20)
  c2(a1(b0(x1)))	→	c0(x1)	(21)
  a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
  a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
  a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
  b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
  b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
  b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
  c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
  c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
  c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
  a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
  a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
  a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
  b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
  b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
  b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
  c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
  c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
  c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

  (w.r.t. the implicit argument filter of the reduction pair), the pairs

  c2#(a0(c0(x1)))	→	c1#(b2(a0(x1)))	(48)
  a1#(b0(c0(x1)))	→	a1#(b0(x1))	(74)
  a1#(b0(c0(x1)))	→	a2#(a1(b0(x1)))	(75)
  a2#(a0(c0(x1)))	→	c1#(b2(a0(x1)))	(82)
  c2#(a0(c0(x1)))	→	b2#(a0(x1))	(49)
  b2#(a0(c0(x1)))	→	c1#(b2(a0(x1)))	(66)
  b1#(b0(c0(x1)))	→	b2#(a1(b0(x1)))	(58)
  b2#(a0(c0(x1)))	→	b2#(a0(x1))	(67)
  b2#(a0(c1(x1)))	→	c1#(b2(a1(x1)))	(68)
  a1#(b0(c1(x1)))	→	b1#(x1)	(76)
  a1#(b0(c1(x1)))	→	a1#(b1(x1))	(77)
  a2#(a0(c0(x1)))	→	b2#(a0(x1))	(83)
  b2#(a0(c1(x1)))	→	b2#(a1(x1))	(69)
  a1#(b0(c2(x1)))	→	b2#(x1)	(79)
  b2#(a0(c2(x1)))	→	c1#(b2(a2(x1)))	(71)
  c2#(a0(c1(x1)))	→	c1#(b2(a1(x1)))	(50)
  b2#(a0(c2(x1)))	→	b2#(a2(x1))	(72)
  a2#(a0(c1(x1)))	→	c1#(b2(a1(x1)))	(84)
  a1#(b0(c2(x1)))	→	a1#(b2(x1))	(80)
  a2#(a0(c1(x1)))	→	b2#(a1(x1))	(85)
  a2#(a0(c1(x1)))	→	a1#(x1)	(86)
  a2#(a0(c2(x1)))	→	c1#(b2(a2(x1)))	(87)
  a2#(a0(c2(x1)))	→	b2#(a2(x1))	(88)
  a2#(a0(c2(x1)))	→	a2#(x1)	(89)
  c2#(a0(c1(x1)))	→	b2#(a1(x1))	(51)
  c2#(a0(c1(x1)))	→	a1#(x1)	(52)
  c2#(a0(c2(x1)))	→	c1#(b2(a2(x1)))	(53)
  c2#(a0(c2(x1)))	→	b2#(a2(x1))	(54)
  c2#(a0(c2(x1)))	→	a2#(x1)	(55)

  could be deleted.

  1.1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

  Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

  [c0(x1)]	=	x1 + 0
  [c1(x1)]	=	x1 + 0
  [c2(x1)]	=	x1 + 0
  [b0(x1)]	=	x1 + 0
  [b1(x1)]	=	x1 + 0
  [b2(x1)]	=	x1 + 0
  [a0(x1)]	=	x1 + 0
  [a1(x1)]	=	x1 + 0
  [a2(x1)]	=	x1 + 0
  [c1#(x1)]	=	x1 + 3
  [c2#(x1)]	=	x1 + 3
  [b1#(x1)]	=	x1 + 2
  [b2#(x1)]	=	x1 + 1
  [a1#(x1)]	=	x1 + 0
  [a2#(x1)]	=	x1 + 0

  together with the usable rules

  a2(a1(b2(x1)))	→	a2(x1)	(13)
  a2(a1(b1(x1)))	→	a1(x1)	(14)
  a2(a1(b0(x1)))	→	a0(x1)	(15)
  b2(a1(b2(x1)))	→	b2(x1)	(16)
  b2(a1(b1(x1)))	→	b1(x1)	(17)
  b2(a1(b0(x1)))	→	b0(x1)	(18)
  c2(a1(b2(x1)))	→	c2(x1)	(19)
  c2(a1(b1(x1)))	→	c1(x1)	(20)
  c2(a1(b0(x1)))	→	c0(x1)	(21)
  a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
  a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
  a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
  b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
  b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
  b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
  c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
  c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
  c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
  a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
  a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
  a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
  b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
  b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
  b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
  c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
  c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
  c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

  (w.r.t. the implicit argument filter of the reduction pair), the pairs

  c1#(b0(c0(x1)))	→	a1#(b0(x1))	(41)
  c1#(b0(c1(x1)))	→	b1#(x1)	(43)
  c1#(b0(c1(x1)))	→	a1#(b1(x1))	(44)
  b1#(b0(c0(x1)))	→	a1#(b0(x1))	(59)
  b2#(a0(c1(x1)))	→	a1#(x1)	(70)
  c1#(b0(c2(x1)))	→	b2#(x1)	(46)
  b2#(a0(c2(x1)))	→	a2#(x1)	(73)
  c1#(b0(c2(x1)))	→	a1#(b2(x1))	(47)
  b1#(b0(c1(x1)))	→	b2#(a1(b1(x1)))	(61)
  b1#(b0(c1(x1)))	→	a1#(b1(x1))	(62)
  b1#(b0(c2(x1)))	→	b2#(x1)	(63)
  b1#(b0(c2(x1)))	→	b2#(a1(b2(x1)))	(64)
  b1#(b0(c2(x1)))	→	a1#(b2(x1))	(65)

  and no rules could be deleted.

  1.1.1.1.1.1.1 Dependency Graph Processor

  The dependency pairs are split into 3 components.

  • The 1^st component contains the pair

    c1#(b0(c0(x1)))	→	c2#(a1(b0(x1)))	(40)
    c2#(a1(b1(x1)))	→	c1#(x1)	(56)
    c1#(b0(c1(x1)))	→	c2#(a1(b1(x1)))	(42)
    c2#(a1(b2(x1)))	→	c2#(x1)	(57)
    c1#(b0(c2(x1)))	→	c2#(a1(b2(x1)))	(45)

    1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

    Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

    [c0(x1)]	=	2 2 0 0 · x1 + -∞ -∞
    [c1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
    [c2(x1)]	=	0 2 0 0 · x1 + -∞ -∞
    [b0(x1)]	=	0 2 0 0 · x1 + -∞ -∞
    [b1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
    [b2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
    [a0(x1)]	=	2 2 2 2 · x1 + -∞ -∞
    [a1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
    [a2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
    [c1#(x1)]	=	7 8 7 8 · x1 + -∞ -∞
    [c2#(x1)]	=	8 9 8 9 · x1 + -∞ -∞

    together with the usable rules

    a2(a1(b2(x1)))	→	a2(x1)	(13)
    a2(a1(b1(x1)))	→	a1(x1)	(14)
    a2(a1(b0(x1)))	→	a0(x1)	(15)
    b2(a1(b2(x1)))	→	b2(x1)	(16)
    b2(a1(b1(x1)))	→	b1(x1)	(17)
    b2(a1(b0(x1)))	→	b0(x1)	(18)
    c2(a1(b2(x1)))	→	c2(x1)	(19)
    c2(a1(b1(x1)))	→	c1(x1)	(20)
    c2(a1(b0(x1)))	→	c0(x1)	(21)
    a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
    a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
    a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
    b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
    b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
    b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
    c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
    c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
    c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
    a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
    a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
    a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
    b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
    b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
    b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
    c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
    c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
    c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

    (w.r.t. the implicit argument filter of the reduction pair), the pair

    c1#(b0(c2(x1)))

    →

    c2#(a1(b2(x1)))

    (45)

    could be deleted.

    1.1.1.1.1.1.1.1.1 Dependency Graph Processor

    The dependency pairs are split into 1 component.

    • The 1^st component contains the pair

      c1#(b0(c0(x1)))	→	c2#(a1(b0(x1)))	(40)
      c2#(a1(b1(x1)))	→	c1#(x1)	(56)
      c1#(b0(c1(x1)))	→	c2#(a1(b1(x1)))	(42)
      c2#(a1(b2(x1)))	→	c2#(x1)	(57)

      1.1.1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

      Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

      [c0(x1)]	=	2 2 0 0 · x1 + -∞ -∞
      [c1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
      [c2(x1)]	=	0 2 -2 0 · x1 + -∞ -∞
      [b0(x1)]	=	0 0 0 0 · x1 + -∞ -∞
      [b1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
      [b2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
      [a0(x1)]	=	2 2 2 2 · x1 + -∞ -∞
      [a1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
      [a2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
      [c1#(x1)]	=	8 10 8 10 · x1 + -∞ -∞
      [c2#(x1)]	=	10 11 10 11 · x1 + -∞ -∞

      together with the usable rules

      a2(a1(b2(x1)))	→	a2(x1)	(13)
      a2(a1(b1(x1)))	→	a1(x1)	(14)
      a2(a1(b0(x1)))	→	a0(x1)	(15)
      b2(a1(b2(x1)))	→	b2(x1)	(16)
      b2(a1(b1(x1)))	→	b1(x1)	(17)
      b2(a1(b0(x1)))	→	b0(x1)	(18)
      c2(a1(b2(x1)))	→	c2(x1)	(19)
      c2(a1(b1(x1)))	→	c1(x1)	(20)
      c2(a1(b0(x1)))	→	c0(x1)	(21)
      a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
      a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
      a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
      b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
      b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
      b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
      c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
      c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
      c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
      a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
      a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
      a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
      b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
      b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
      b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
      c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
      c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
      c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

      (w.r.t. the implicit argument filter of the reduction pair), the pair

      c1#(b0(c0(x1)))

      →

      c2#(a1(b0(x1)))

      (40)

      could be deleted.

      1.1.1.1.1.1.1.1.1.1.1 Dependency Graph Processor

      The dependency pairs are split into 1 component.

      • The 1^st component contains the pair

        c2#(a1(b1(x1)))	→	c1#(x1)	(56)
        c1#(b0(c1(x1)))	→	c2#(a1(b1(x1)))	(42)
        c2#(a1(b2(x1)))	→	c2#(x1)	(57)

        1.1.1.1.1.1.1.1.1.1.1.1 Reduction Pair Processor with Usable Rules

        Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

        [c0(x1)]	=	2 2 0 0 · x1 + -∞ -∞
        [c1(x1)]	=	0 0 0 0 · x1 + -∞ -∞
        [c2(x1)]	=	0 2 0 0 · x1 + -∞ -∞
        [b0(x1)]	=	0 2 0 0 · x1 + -∞ -∞
        [b1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
        [b2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
        [a0(x1)]	=	2 2 2 2 · x1 + -∞ -∞
        [a1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
        [a2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
        [c1#(x1)]	=	1 1 1 1 · x1 + -∞ -∞
        [c2#(x1)]	=	3 5 3 5 · x1 + -∞ -∞

        together with the usable rules

        a2(a1(b2(x1)))	→	a2(x1)	(13)
        a2(a1(b1(x1)))	→	a1(x1)	(14)
        a2(a1(b0(x1)))	→	a0(x1)	(15)
        b2(a1(b2(x1)))	→	b2(x1)	(16)
        b2(a1(b1(x1)))	→	b1(x1)	(17)
        b2(a1(b0(x1)))	→	b0(x1)	(18)
        c2(a1(b2(x1)))	→	c2(x1)	(19)
        c2(a1(b1(x1)))	→	c1(x1)	(20)
        c2(a1(b0(x1)))	→	c0(x1)	(21)
        a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
        a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
        a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
        b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
        b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
        b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
        c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
        c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
        c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
        a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
        a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
        a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
        b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
        b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
        b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
        c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
        c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
        c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

        (w.r.t. the implicit argument filter of the reduction pair), the pair

        c2#(a1(b1(x1)))

        →

        c1#(x1)

        (56)

        could be deleted.

        1.1.1.1.1.1.1.1.1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

        Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

        [c0(x1)]	=	x1 + 0
        [c1(x1)]	=	x1 + 0
        [c2(x1)]	=	x1 + 0
        [b0(x1)]	=	x1 + 0
        [b1(x1)]	=	x1 + 0
        [b2(x1)]	=	x1 + 0
        [a0(x1)]	=	x1 + 0
        [a1(x1)]	=	x1 + 0
        [a2(x1)]	=	x1 + 0
        [c1#(x1)]	=	x1 + 1
        [c2#(x1)]	=	x1 + 0

        together with the usable rules

        a2(a1(b2(x1)))	→	a2(x1)	(13)
        a2(a1(b1(x1)))	→	a1(x1)	(14)
        a2(a1(b0(x1)))	→	a0(x1)	(15)
        b2(a1(b2(x1)))	→	b2(x1)	(16)
        b2(a1(b1(x1)))	→	b1(x1)	(17)
        b2(a1(b0(x1)))	→	b0(x1)	(18)
        c2(a1(b2(x1)))	→	c2(x1)	(19)
        c2(a1(b1(x1)))	→	c1(x1)	(20)
        c2(a1(b0(x1)))	→	c0(x1)	(21)
        a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
        a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
        a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
        b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
        b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
        b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
        c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
        c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
        c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
        a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
        a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
        a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
        b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
        b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
        b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
        c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
        c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
        c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

        (w.r.t. the implicit argument filter of the reduction pair), the pair

        c1#(b0(c1(x1)))

        →

        c2#(a1(b1(x1)))

        (42)

        and no rules could be deleted.

        1.1.1.1.1.1.1.1.1.1.1.1.1.1 Dependency Graph Processor

        The dependency pairs are split into 1 component.

        • The 1^st component contains the pair

          c2#(a1(b2(x1)))

          →

          c2#(x1)

          (57)

          1.1.1.1.1.1.1.1.1.1.1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

          Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

          [b2(x1)]	=	x1 + 1
          [a1(x1)]	=	x1 + 1
          [c2#(x1)]	=	x1 + 0

          having no usable rules (w.r.t. the implicit argument filter of the reduction pair), the pair

          c2#(a1(b2(x1)))

          →

          c2#(x1)

          (57)

          and no rules could be deleted.

          1.1.1.1.1.1.1.1.1.1.1.1.1.1.1.1 Dependency Graph Processor

          The dependency pairs are split into 0 components.

  • The 2^nd component contains the pair

    a1#(b0(c1(x1)))	→	a2#(a1(b1(x1)))	(78)
    a2#(a1(b1(x1)))	→	a1#(x1)	(90)
    a1#(b0(c2(x1)))	→	a2#(a1(b2(x1)))	(81)
    a2#(a1(b2(x1)))	→	a2#(x1)	(91)

    1.1.1.1.1.1.1.2 Reduction Pair Processor with Usable Rules

    Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

    [c0(x1)]	=	0 2 0 2 · x1 + -∞ -∞
    [c1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
    [c2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
    [b0(x1)]	=	2 2 0 2 · x1 + -∞ -∞
    [b1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
    [b2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
    [a0(x1)]	=	2 4 2 4 · x1 + -∞ -∞
    [a1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
    [a2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
    [a1#(x1)]	=	3 3 3 3 · x1 + -∞ -∞
    [a2#(x1)]	=	3 5 3 5 · x1 + -∞ -∞

    together with the usable rules

    a2(a1(b2(x1)))	→	a2(x1)	(13)
    a2(a1(b1(x1)))	→	a1(x1)	(14)
    a2(a1(b0(x1)))	→	a0(x1)	(15)
    b2(a1(b2(x1)))	→	b2(x1)	(16)
    b2(a1(b1(x1)))	→	b1(x1)	(17)
    b2(a1(b0(x1)))	→	b0(x1)	(18)
    c2(a1(b2(x1)))	→	c2(x1)	(19)
    c2(a1(b1(x1)))	→	c1(x1)	(20)
    c2(a1(b0(x1)))	→	c0(x1)	(21)
    a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
    a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
    a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
    b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
    b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
    b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
    c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
    c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
    c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
    a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
    a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
    a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
    b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
    b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
    b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
    c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
    c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
    c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

    (w.r.t. the implicit argument filter of the reduction pair), the pair

    a1#(b0(c1(x1)))

    →

    a2#(a1(b1(x1)))

    (78)

    could be deleted.

    1.1.1.1.1.1.1.2.1 Dependency Graph Processor

    The dependency pairs are split into 1 component.

    • The 1^st component contains the pair

      a2#(a1(b1(x1)))	→	a1#(x1)	(90)
      a1#(b0(c2(x1)))	→	a2#(a1(b2(x1)))	(81)
      a2#(a1(b2(x1)))	→	a2#(x1)	(91)

      1.1.1.1.1.1.1.2.1.1 Reduction Pair Processor with Usable Rules

      Using the matrix interpretations of dimension 2 with strict dimension 1 over the arctic semiring over the naturals

      [c0(x1)]	=	2 2 0 0 · x1 + -∞ -∞
      [c1(x1)]	=	0 0 0 0 · x1 + -∞ -∞
      [c2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
      [b0(x1)]	=	0 2 0 0 · x1 + -∞ -∞
      [b1(x1)]	=	0 0 -2 -2 · x1 + -∞ -∞
      [b2(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
      [a0(x1)]	=	2 2 2 2 · x1 + -∞ -∞
      [a1(x1)]	=	0 0 -2 0 · x1 + -∞ -∞
      [a2(x1)]	=	0 2 0 2 · x1 + -∞ -∞
      [a1#(x1)]	=	1 1 1 1 · x1 + -∞ -∞
      [a2#(x1)]	=	1 1 1 1 · x1 + -∞ -∞

      together with the usable rules

      a2(a1(b2(x1)))	→	a2(x1)	(13)
      a2(a1(b1(x1)))	→	a1(x1)	(14)
      a2(a1(b0(x1)))	→	a0(x1)	(15)
      b2(a1(b2(x1)))	→	b2(x1)	(16)
      b2(a1(b1(x1)))	→	b1(x1)	(17)
      b2(a1(b0(x1)))	→	b0(x1)	(18)
      c2(a1(b2(x1)))	→	c2(x1)	(19)
      c2(a1(b1(x1)))	→	c1(x1)	(20)
      c2(a1(b0(x1)))	→	c0(x1)	(21)
      a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
      a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
      a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
      b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
      b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
      b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
      c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
      c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
      c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
      a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
      a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
      a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
      b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
      b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
      b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
      c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
      c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
      c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

      (w.r.t. the implicit argument filter of the reduction pair), the pair

      a1#(b0(c2(x1)))

      →

      a2#(a1(b2(x1)))

      (81)

      could be deleted.

      1.1.1.1.1.1.1.2.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

      Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

      [c0(x1)]	=	x1 + 0
      [c1(x1)]	=	x1 + 0
      [c2(x1)]	=	x1 + 0
      [b0(x1)]	=	x1 + 0
      [b1(x1)]	=	x1 + 0
      [b2(x1)]	=	x1 + 0
      [a0(x1)]	=	x1 + 0
      [a1(x1)]	=	x1 + 0
      [a2(x1)]	=	x1 + 0
      [a1#(x1)]	=	x1 + 0
      [a2#(x1)]	=	x1 + 1

      together with the usable rules

      a2(a1(b2(x1)))	→	a2(x1)	(13)
      a2(a1(b1(x1)))	→	a1(x1)	(14)
      a2(a1(b0(x1)))	→	a0(x1)	(15)
      b2(a1(b2(x1)))	→	b2(x1)	(16)
      b2(a1(b1(x1)))	→	b1(x1)	(17)
      b2(a1(b0(x1)))	→	b0(x1)	(18)
      c2(a1(b2(x1)))	→	c2(x1)	(19)
      c2(a1(b1(x1)))	→	c1(x1)	(20)
      c2(a1(b0(x1)))	→	c0(x1)	(21)
      a2(a0(c2(x1)))	→	a0(c0(c1(b2(a2(x1)))))	(22)
      a2(a0(c1(x1)))	→	a0(c0(c1(b2(a1(x1)))))	(23)
      a2(a0(c0(x1)))	→	a0(c0(c1(b2(a0(x1)))))	(24)
      b2(a0(c2(x1)))	→	b0(c0(c1(b2(a2(x1)))))	(25)
      b2(a0(c1(x1)))	→	b0(c0(c1(b2(a1(x1)))))	(26)
      b2(a0(c0(x1)))	→	b0(c0(c1(b2(a0(x1)))))	(27)
      c2(a0(c2(x1)))	→	c0(c0(c1(b2(a2(x1)))))	(28)
      c2(a0(c1(x1)))	→	c0(c0(c1(b2(a1(x1)))))	(29)
      c2(a0(c0(x1)))	→	c0(c0(c1(b2(a0(x1)))))	(30)
      a1(b0(c2(x1)))	→	a2(a1(b2(x1)))	(31)
      a1(b0(c1(x1)))	→	a2(a1(b1(x1)))	(32)
      a1(b0(c0(x1)))	→	a2(a1(b0(x1)))	(33)
      b1(b0(c2(x1)))	→	b2(a1(b2(x1)))	(34)
      b1(b0(c1(x1)))	→	b2(a1(b1(x1)))	(35)
      b1(b0(c0(x1)))	→	b2(a1(b0(x1)))	(36)
      c1(b0(c2(x1)))	→	c2(a1(b2(x1)))	(37)
      c1(b0(c1(x1)))	→	c2(a1(b1(x1)))	(38)
      c1(b0(c0(x1)))	→	c2(a1(b0(x1)))	(39)

      (w.r.t. the implicit argument filter of the reduction pair), the pair

      a2#(a1(b1(x1)))

      →

      a1#(x1)

      (90)

      and no rules could be deleted.

      1.1.1.1.1.1.1.2.1.1.1.1 Dependency Graph Processor

      The dependency pairs are split into 1 component.

      • The 1^st component contains the pair

        a2#(a1(b2(x1)))

        →

        a2#(x1)

        (91)

        1.1.1.1.1.1.1.2.1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules

        Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

        [b2(x1)]	=	x1 + 1
        [a1(x1)]	=	x1 + 1
        [a2#(x1)]	=	x1 + 0

        having no usable rules (w.r.t. the implicit argument filter of the reduction pair), the pair

        a2#(a1(b2(x1)))

        →

        a2#(x1)

        (91)

        and no rules could be deleted.

        1.1.1.1.1.1.1.2.1.1.1.1.1.1 Dependency Graph Processor

        The dependency pairs are split into 0 components.

  • The 3^rd component contains the pair

    b1#(b0(c1(x1)))

    →

    b1#(x1)

    (60)

    1.1.1.1.1.1.1.3 Monotonic Reduction Pair Processor with Usable Rules

    Using the matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1

    [c1(x1)]	=	x1 + 1
    [b0(x1)]	=	x1 + 1
    [b1#(x1)]	=	x1 + 0

    having no usable rules (w.r.t. the implicit argument filter of the reduction pair), the pair

    b1#(b0(c1(x1)))

    →

    b1#(x1)

    (60)

    and no rules could be deleted.

    1.1.1.1.1.1.1.3.1 Dependency Graph Processor

    The dependency pairs are split into 0 components.