Magnetic diffraction Systematic Absences for the group Pa-3 (#205.33)For this space group, BNS and OG settings coincide. Its label in the OG setting is given as: Pa-3 (#205.1.1535) Values of h, k, l: h integer, k integer, l integer Systematic absences for special reflections: Diffraction vector type: (h 0 0) -> Systematic absence: h = 2n For h = 1: I /= 0 F = (0,Fy,0) For h = 2: I = 0 F = (0,0,0) Diffraction vector type: (0 k 0) -> Systematic absence: k = 2n For k = 1: I /= 0 F = (0,0,Fz) For k = 2: I = 0 F = (0,0,0) Diffraction vector type: (0 0 l) -> Systematic absence: l = 2n For l = 1: I /= 0 F = (Fx,0,0) For l = 2: I = 0 F = (0,0,0) Diffraction vector type: (h h h) -> Systematic absence: h any For h = 1: I = 0 F = (Fx,Fx,Fx) For h = 2: I = 0 F = (Fx,Fx,Fx) Diffraction vector type: (h h -h) -> Systematic absence: h any For h = 1: I = 0 F = (Fx,Fx,-Fx) For h = 2: I = 0 F = (Fx,Fx,-Fx) Diffraction vector type: (h -h -h) -> Systematic absence: h any For h = 1: I = 0 F = (Fx,-Fx,-Fx) For h = 2: I = 0 F = (Fx,-Fx,-Fx) Diffraction vector type: (h -h h) -> Systematic absence: h any For h = 1: I = 0 F = (Fx,-Fx,Fx) For h = 2: I = 0 F = (Fx,-Fx,Fx) [Show form of structure factor for every type of reflection] Go to the list of the General Positions of the Group Pa-3 (#205.33) [OG:Pa-3 (#205.1.1535)] Go to the list of the Wyckoff Positions of the Group Pa-3 (#205.33) [OG:Pa-3 (#205.1.1535)]
[Show systematic absences in a different setting]