def test_innermorphic(self, p, q): layout, blades = Cl(p, q) A = Frame(layout.randomV(p + q)) R = layout.randomRotor() B = Frame([R * a * ~R for a in A]) assert A.is_innermorphic_to(B)
def test_innermorphic(self): for p, q in [(2, 0), (3, 0), (4, 0)]: layout, blades = Cl(p, q) A = Frame(layout.randomV(p + q)) R = layout.randomRotor() B = Frame([R * a * ~R for a in A]) self.assertTrue(A.is_innermorphic_to(B))
def test_innermorphic(self): for p, q in [(2, 0), (3, 0), (4, 0)]: layout, blades = Cl(p, q) A = Frame(layout.randomV(p+q)) R = layout.randomRotor() B = Frame([R*a*~R for a in A]) self.assertTrue(A.is_innermorphic_to(B))
def checkit(self, p, q, rng): # noqa: F811 # p, q =4,0 N = p + q # eps(1e-4) layout, blades = Cl(p, q) # create frame A = layout.randomV(n=N, rng=rng) # create Rotor R = 5. * layout.randomRotor(rng=rng) # create rotated frame B = [R * a * ~R for a in A] # find versor from both frames R_found, rs = of2v(A, B) # Rotor is determiend correctly, within a sign self.assertTrue(R == R_found or R == -R_found) # Determined Versor implements desired transformation self.assertTrue([R_found * a * ~R_found for a in A] == B)
def checkit(self, p, q): # p, q =4,0 N = p + q # eps(1e-4) layout, blades = Cl(p, q) # create frame A = layout.randomV(n=N) # create Rotor R = 5.*layout.randomRotor() # create rotated frame B = [R*a*~R for a in A] # find verser from both frames R_found, rs = of2v(A, B) # Rotor is determiend correctly, within a sign self.assertTrue(R == R_found or R == -R_found) # Determined Verser implements desired transformation self.assertTrue([R_found*a*~R_found for a in A] == B)
def test_frame_inv(self, p, q): layout, blades = Cl(p, q) A = Frame(layout.randomV(p + q)) self.check_inv(A)
def test_frame_inv(self): for p, q in [(2, 0), (3, 0), (4, 0)]: layout, blades = Cl(p, q) A = Frame(layout.randomV(p + q)) self.check_inv(A)
def test_innermorphic(self, p, q, rng): # noqa: F811 layout, blades = Cl(p, q) A = Frame(layout.randomV(p + q, rng=rng)) R = layout.randomRotor(rng=rng) B = Frame([R * a * ~R for a in A]) assert A.is_innermorphic_to(B)
def test_frame_inv(self, p, q, rng): # noqa: F811 layout, blades = Cl(p, q) A = Frame(layout.randomV(p + q, rng=rng)) self.check_inv(A)