lean2/tests/lean/tst6.lean.expected.out

  Set option: pp::colors
  Assumed: N
  Assumed: h
  Proved: CongrH
  Set option: lean::pp::implicit
Theorem CongrH {a1 a2 b1 b2 : N} (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) :=
    Congr::explicit
        N
        (λ x : N, N)
        (h a1)
        (h b1)
        a2
        b2
        (Congr::explicit N (λ x : N, N → N) h h a1 b1 (Refl::explicit (N → N → N) h) H1)
        H2
Theorem CongrH::explicit (a1 a2 b1 b2 : N) (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) :=
    CongrH::explicit a1 a2 b1 b2 H1 H2
  Set option: lean::pp::implicit
Theorem CongrH {a1 a2 b1 b2 : N} (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) := Congr (Congr (Refl h) H1) H2
Theorem CongrH::explicit (a1 a2 b1 b2 : N) (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) := CongrH H1 H2
  Proved: Example1
  Set option: lean::pp::implicit
Theorem Example1 (a b c d : N) (H : a = b ∧ b = c ∨ a = d ∧ d = c) : (h a b) = (h c b) :=
    DisjCases::explicit
        (a = b ∧ b = c)
        (a = d ∧ d = c)
        ((h a b) = (h c b))
        H
        (λ H1 : a = b ∧ b = c,
           CongrH::explicit
               a
               b
               c
               b
               (Trans::explicit
                    N
                    a
                    b
                    c
                    (Conjunct1::explicit (a = b) (b = c) H1)
                    (Conjunct2::explicit (a = b) (b = c) H1))
               (Refl::explicit N b))
        (λ H1 : a = d ∧ d = c,
           CongrH::explicit
               a
               b
               c
               b
               (Trans::explicit
                    N
                    a
                    d
                    c
                    (Conjunct1::explicit (a = d) (d = c) H1)
                    (Conjunct2::explicit (a = d) (d = c) H1))
               (Refl::explicit N b))
  Proved: Example2
  Set option: lean::pp::implicit
Theorem Example2 (a b c d : N) (H : a = b ∧ b = c ∨ a = d ∧ d = c) : (h a b) = (h c b) :=
    DisjCases::explicit
        (a = b ∧ b = c)
        (a = d ∧ d = c)
        ((h a b) = (h c b))
        H
        (λ H1 : a = b ∧ b = c,
           CongrH::explicit
               a
               b
               c
               b
               (Trans::explicit
                    N
                    a
                    b
                    c
                    (Conjunct1::explicit (a = b) (b = c) H1)
                    (Conjunct2::explicit (a = b) (b = c) H1))
               (Refl::explicit N b))
        (λ H1 : a = d ∧ d = c,
           CongrH::explicit
               a
               b
               c
               b
               (Trans::explicit
                    N
                    a
                    d
                    c
                    (Conjunct1::explicit (a = d) (d = c) H1)
                    (Conjunct2::explicit (a = d) (d = c) H1))
               (Refl::explicit N b))
  Proved: Example3
  Set option: lean::pp::implicit
Theorem Example3 (a b c d e : N) (H : a = b ∧ b = e ∧ b = c ∨ a = d ∧ d = c) : (h a b) = (h c b) :=
    DisjCases
        H
        (λ H1 : a = b ∧ b = e ∧ b = c, CongrH (Trans (Conjunct1 H1) (Conjunct2 (Conjunct2 H1))) (Refl b))
        (λ H1 : a = d ∧ d = c, CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
  Proved: Example4
  Set option: lean::pp::implicit
Theorem Example4 (a b c d e : N) (H : a = b ∧ b = e ∧ b = c ∨ a = d ∧ d = c) : (h a c) = (h c a) :=
    DisjCases
        H
        (λ H1 : a = b ∧ b = e ∧ b = c,
           let AeqC := Trans (Conjunct1 H1) (Conjunct2 (Conjunct2 H1)) in CongrH AeqC (Symm AeqC))
        (λ H1 : a = d ∧ d = c, let AeqC := Trans (Conjunct1 H1) (Conjunct2 H1) in CongrH AeqC (Symm AeqC))
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								  Set option: pp::colors
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								  Assumed: N
 								  Assumed: h
 								  Proved: CongrH
 								  Set option: lean::pp::implicit
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem CongrH {a1 a2 b1 b2 : N} (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) :=
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								    Congr::explicit
 								        N
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ x : N, N)
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								        (h a1)
 								        (h b1)
 								        a2
 								        b2
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (Congr::explicit N (λ x : N, N → N) h h a1 b1 (Refl::explicit (N → N → N) h) H1)
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								        H2
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem CongrH::explicit (a1 a2 b1 b2 : N) (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) :=
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								    CongrH::explicit a1 a2 b1 b2 H1 H2
 								  Set option: lean::pp::implicit
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem CongrH {a1 a2 b1 b2 : N} (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) := Congr (Congr (Refl h) H1) H2
 								Theorem CongrH::explicit (a1 a2 b1 b2 : N) (H1 : a1 = b1) (H2 : a2 = b2) : (h a1 a2) = (h b1 b2) := CongrH H1 H2
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								  Proved: Example1
 								  Set option: lean::pp::implicit
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem Example1 (a b c d : N) (H : a = b ∧ b = c ∨ a = d ∧ d = c) : (h a b) = (h c b) :=
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								    DisjCases::explicit
 								        (a = b ∧ b = c)
 								        (a = d ∧ d = c)
 								        ((h a b) = (h c b))
 								        H
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ H1 : a = b ∧ b = c,
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								           CongrH::explicit
 								               a
 								               b
 								               c
 								               b
 								               (Trans::explicit
 								                    N
 								                    a
 								                    b
 								                    c
 								                    (Conjunct1::explicit (a = b) (b = c) H1)
 								                    (Conjunct2::explicit (a = b) (b = c) H1))
 								               (Refl::explicit N b))
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ H1 : a = d ∧ d = c,
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								           CongrH::explicit
 								               a
 								               b
 								               c
 								               b
 								               (Trans::explicit
 								                    N
 								                    a
 								                    d
 								                    c
 								                    (Conjunct1::explicit (a = d) (d = c) H1)
 								                    (Conjunct2::explicit (a = d) (d = c) H1))
 								               (Refl::explicit N b))
 								  Proved: Example2
 								  Set option: lean::pp::implicit
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem Example2 (a b c d : N) (H : a = b ∧ b = c ∨ a = d ∧ d = c) : (h a b) = (h c b) :=
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								    DisjCases::explicit
 								        (a = b ∧ b = c)
 								        (a = d ∧ d = c)
 								        ((h a b) = (h c b))
 								        H
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ H1 : a = b ∧ b = c,
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								           CongrH::explicit
 								               a
 								               b
 								               c
 								               b
 								               (Trans::explicit
 								                    N
 								                    a
 								                    b
 								                    c
 								                    (Conjunct1::explicit (a = b) (b = c) H1)
 								                    (Conjunct2::explicit (a = b) (b = c) H1))
 								               (Refl::explicit N b))
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ H1 : a = d ∧ d = c,
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								           CongrH::explicit
 								               a
 								               b
 								               c
 								               b
 								               (Trans::explicit
 								                    N
 								                    a
 								                    d
 								                    c
 								                    (Conjunct1::explicit (a = d) (d = c) H1)
 								                    (Conjunct2::explicit (a = d) (d = c) H1))
 								               (Refl::explicit N b))
 								  Proved: Example3
 								  Set option: lean::pp::implicit
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem Example3 (a b c d e : N) (H : a = b ∧ b = e ∧ b = c ∨ a = d ∧ d = c) : (h a b) = (h c b) :=
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								    DisjCases
 								        H
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ H1 : a = b ∧ b = e ∧ b = c, CongrH (Trans (Conjunct1 H1) (Conjunct2 (Conjunct2 H1))) (Refl b))
 								        (λ H1 : a = d ∧ d = c, CongrH (Trans (Conjunct1 H1) (Conjunct2 H1)) (Refl b))
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								  Proved: Example4
 								  Set option: lean::pp::implicit
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								Theorem Example4 (a b c d e : N) (H : a = b ∧ b = e ∧ b = c ∨ a = d ∧ d = c) : (h a c) = (h c a) :=
-												Move files in examples directory to tests directory. They are not real examples

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 02:15:48 +00:00
+								    DisjCases
 								        H
-												Minimize use the colors in tests. The colors make the diff hard to read

Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>

											
										
										
											2013-09-01 17:34:57 +00:00
+								        (λ H1 : a = b ∧ b = e ∧ b = c,
 								           let AeqC := Trans (Conjunct1 H1) (Conjunct2 (Conjunct2 H1)) in CongrH AeqC (Symm AeqC))
 								        (λ H1 : a = d ∧ d = c, let AeqC := Trans (Conjunct1 H1) (Conjunct2 H1) in CongrH AeqC (Symm AeqC))