module Tests.Face where -- -- | Given in Sorokina and Zeilfelder, p. 78. -- prop_cijk1_identity :: Cube -> Bool -- prop_cijk1_identity cube = -- and [ c t0' i j k 1 ~= (c t1' (i+1) j k 0) * ((b0 t0') (v3 t1')) + -- (c t1' i (j+1) k 0) * ((b1 t0') (v3 t1')) + -- (c t1' i j (k+1) 0) * ((b2 t0') (v3 t1')) + -- (c t1' i j k 1) * ((b3 t0') (v3 t1')) | i <- [0..2], -- j <- [0..2], -- k <- [0..2], -- i + j + k == 2] -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c0120_identity1 :: Cube -> Bool -- prop_c0120_identity1 cube = -- c t0' 0 1 2 0 ~= (c t0' 0 0 2 1 + c t1' 0 0 2 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c0210_identity1 :: Cube -> Bool -- prop_c0210_identity1 cube = -- c t0' 0 2 1 0 ~= (c t0' 0 1 1 1 + c t1' 0 1 1 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c0300_identity1 :: Cube -> Bool -- prop_c0300_identity1 cube = -- c t0' 0 3 0 0 ~= (c t0' 0 2 0 1 + c t1' 0 2 0 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1110_identity :: Cube -> Bool -- prop_c1110_identity cube = -- c t0' 1 1 1 0 ~= (c t0' 1 0 1 1 + c t1' 1 0 1 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1200_identity1 :: Cube -> Bool -- prop_c1200_identity1 cube = -- c t0' 1 2 0 0 ~= (c t0' 1 1 0 1 + c t1' 1 1 0 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c2100_identity1 :: Cube -> Bool -- prop_c2100_identity1 cube = -- c t0' 2 1 0 0 ~= (c t0' 2 0 0 1 + c t1' 2 0 0 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron1 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c0102_identity1 :: Cube -> Bool -- prop_c0102_identity1 cube = -- c t0' 0 1 0 2 ~= (c t0' 0 0 1 2 + c t3' 0 0 1 2) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t3 = tetrahedron3 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t3' = Tetrahedron cube (v3 t3) (v2 t3) (v1 t3) (v0 t3) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c0201_identity1 :: Cube -> Bool -- prop_c0201_identity1 cube = -- c t0' 0 2 0 1 ~= (c t0' 0 1 1 1 + c t3' 0 1 1 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t3 = tetrahedron3 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t3' = Tetrahedron cube (v3 t3) (v2 t3) (v1 t3) (v0 t3) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c0300_identity2 :: Cube -> Bool -- prop_c0300_identity2 cube = -- c t0' 3 0 0 0 ~= (c t0' 0 2 1 0 + c t3' 0 2 1 0) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t3 = tetrahedron3 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t3' = Tetrahedron cube (v3 t3) (v2 t3) (v1 t3) (v0 t3) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1101_identity :: Cube -> Bool -- prop_c1101_identity cube = -- c t0' 1 1 0 1 ~= (c t0' 1 1 0 1 + c t3' 1 1 0 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t3 = tetrahedron3 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t3' = Tetrahedron cube (v3 t3) (v2 t3) (v1 t3) (v0 t3) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1200_identity2 :: Cube -> Bool -- prop_c1200_identity2 cube = -- c t0' 1 1 1 0 ~= (c t0' 1 1 1 0 + c t3' 1 1 1 0) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t3 = tetrahedron3 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t3' = Tetrahedron cube (v3 t3) (v2 t3) (v1 t3) (v0 t3) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c2100_identity2 :: Cube -> Bool -- prop_c2100_identity2 cube = -- c t0' 2 1 0 0 ~= (c t0' 2 0 1 0 + c t3' 2 0 1 0) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t3 = tetrahedron3 (face0 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t3' = Tetrahedron cube (v3 t3) (v2 t3) (v1 t3) (v0 t3) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c3000_identity :: Cube -> Bool -- prop_c3000_identity cube = -- c t0' 3 0 0 0 ~= c t0' 2 1 0 0 + c t2' 2 1 0 0 - ((c t0' 2 0 1 0 + c t0' 2 0 0 1)/ 2) -- where -- t0 = tetrahedron0 (face0 cube) -- t2 = tetrahedron2 (face5 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t2' = Tetrahedron cube (v3 t2) (v2 t2) (v1 t2) (v0 t2) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c2010_identity :: Cube -> Bool -- prop_c2010_identity cube = -- c t0' 2 0 1 0 ~= c t0' 1 1 1 0 + c t2' 1 1 1 0 - ((c t0' 1 0 2 0 + c t0' 1 0 1 1)/ 2) -- where -- t0 = tetrahedron0 (face0 cube) -- t2 = tetrahedron2 (face5 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t2' = Tetrahedron cube (v3 t2) (v2 t2) (v1 t2) (v0 t2) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c2001_identity :: Cube -> Bool -- prop_c2001_identity cube = -- c t0' 2 0 0 1 ~= c t0' 1 1 0 1 + c t2' 1 1 0 1 - ((c t0' 1 0 0 2 + c t0' 1 0 1 1)/ 2) -- where -- t0 = tetrahedron0 (face0 cube) -- t2 = tetrahedron2 (face5 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t2' = Tetrahedron cube (v3 t2) (v2 t2) (v1 t2) (v0 t2) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1020_identity :: Cube -> Bool -- prop_c1020_identity cube = -- c t0' 1 0 2 0 ~= c t0' 0 1 2 0 + c t2' 0 1 2 0 - ((c t0' 0 0 3 0 + c t0' 0 0 2 1)/ 2) -- where -- t0 = tetrahedron0 (face0 cube) -- t2 = tetrahedron2 (face5 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t2' = Tetrahedron cube (v3 t2) (v2 t2) (v1 t2) (v0 t2) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1002_identity :: Cube -> Bool -- prop_c1002_identity cube = -- c t0' 1 0 0 2 ~= c t0' 0 1 0 2 + c t2' 0 1 0 2 - ((c t0' 0 0 0 3 + c t0' 0 0 1 2)/ 2) -- where -- t0 = tetrahedron0 (face0 cube) -- t2 = tetrahedron2 (face5 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t2' = Tetrahedron cube (v3 t2) (v2 t2) (v1 t2) (v0 t2) -- -- | Given in Sorokina and Zeilfelder, p. 79. -- prop_c1011_identity :: Cube -> Bool -- prop_c1011_identity cube = -- c t0' 1 0 1 1 ~= c t0' 0 1 1 1 + c t2' 0 1 1 1 - ((c t0' 0 0 1 2 + c t0' 0 0 2 1)/ 2) -- where -- t0 = tetrahedron0 (face0 cube) -- t2 = tetrahedron2 (face5 cube) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t2' = Tetrahedron cube (v3 t2) (v2 t2) (v1 t2) (v0 t2) -- -- | Given in Sorokina and Zeilfelder, p. 80. -- prop_c0120_identity2 :: Cube -> Bool -- prop_c0120_identity2 cube = -- c t0' 0 1 2 0 ~= (c t0' 1 0 2 0 + c t1' 1 0 2 0) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron0 (face2 (top cube)) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 80. -- prop_c0102_identity2 :: Cube -> Bool -- prop_c0102_identity2 cube = -- c t0' 0 1 0 2 ~= (c t0' 1 0 0 2 + c t1' 1 0 0 2) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron0 (face2 (top cube)) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 80. -- prop_c0111_identity :: Cube -> Bool -- prop_c0111_identity cube = -- c t0' 0 1 1 1 ~= (c t0' 1 0 1 1 + c t1' 1 0 1 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron0 (face2 (top cube)) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 80. -- prop_c0210_identity2 :: Cube -> Bool -- prop_c0210_identity2 cube = -- c t0 0 2 1 0 ~= (c t0 1 1 1 0 + c t1 1 1 1 0) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron0 (face2 (top cube)) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 80. -- prop_c0201_identity2 :: Cube -> Bool -- prop_c0201_identity2 cube = -- c t0 0 2 0 1 ~= (c t0 1 1 0 1 + c t1 1 1 0 1) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron0 (face2 (top cube)) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1) -- -- | Given in Sorokina and Zeilfelder, p. 80. -- prop_c0300_identity3 :: Cube -> Bool -- prop_c0300_identity3 cube = -- c t0 0 3 0 0 ~= (c t0 1 2 0 0 + c t1 1 2 0 0) / 2 -- where -- t0 = tetrahedron0 (face0 cube) -- t1 = tetrahedron0 (face2 (top cube)) -- t0' = Tetrahedron cube (v3 t0) (v2 t0) (v1 t0) (v0 t0) -- t1' = Tetrahedron cube (v3 t1) (v2 t1) (v0 t1) (v1 t1)