Décomposants de Goldbach : visualisations par sommes de complexes sur disque unité (Denise Vella-Chemla, 9.9.2020)
n = 6 (2p); E = {2,3}
n = 8 (2k); E = {2,2,2}
n = 10 (2p); E = {2,5} n = 12 (2kp); E = {2,2,3}
n = 18 ; E = {2,3,3} n = 20 (2kp); E = {2,2,5}
n = 22 (2p); E = {2,11} n = 24 (2kp); E = {2,2,2,3}
n = 26 (2p); E = {2,13} n = 28 (2kp); E = {2,2,7}
n = 30 ; E = {2,3,5} n = 32 (2k) ; E = {2,2,2,2,2}
n = 34 (2p); E = {2,17} n = 36 ; E = {2,2,3,3}
n = 38 (2p); E = {2,19}
n = 40 (2kp); E = {2,2,2,5}
n = 42 ; E = {2,3,7} n = 44 (2kp) ; E = {2,2,11}
n = 46 (2p); E = {2,23} n = 48 (2kp) ; E = {2,2,2,2,3}
n = 50 ; E = {2,5,5} n = 52 (2kp); E = {2,2,13}
n = 54 ; E = {2,3,3,3} n = 56 (2kp); E = {2,2,2,7}
n = 58 (2p); E = {2,29} n = 60 ; E = {2,2,3,5}
n = 62 (2p); E = {2,31} n = 64 (2k) ; E = {2,2,2,2,2,2}
n = 66 ; E = {2,3,11} n = 68 (2kp); E = {2,2,17}
n = 70 ; E = {2,5,7} n = 72 ; E = {2,2,2,3,3}
n = 74 (2p); E = {2,37} n = 76 (2kp); E = {2,2,19}
n = 78 ; E = {2,3,13} n = 80 (2kp) ; E = {2,2,2,2,5}
n = 82 (2p); E = {2,41} n = 84 ; E = {2,2,3,7}
n = 86 (2p); E = {2,43} n = 88 (2kp) ; E = {2,2,2,11}
n = 90 ; E = {2,3,3,5} n = 92 (2kp); E = {2,2,23}
n = 94 (2p); E = {2,47} n = 96 ; E = {2,2,2,2,2,3}
n = 98 ; E = {2,7,7} n = 100 ; E = {2,2,5,5}