(* depth 3 *) rRel[16, 3] = { - 80 CB[e0, CB[e4, e12]] + 250 CB[e0, CB[e6, e10]] + 96 CB[e4, CB[e0, e12]] + 462 CB[e4, CB[e4, e8]] - 375 CB[e6, CB[e0, e10]] - 1725 CB[e6, CB[e4, e6]] + 280 CB[e8, CB[e0, e8]]}, rRel[18, 3] = {}, rRel[20, 3] = {1050 CB[e0, CB[e6, e14]] - 6580 CB[e0, CB[e8, e12]] - 17325 CB[e10, CB[e0, e10]] + 4320 CB[e4, CB[e0, e16]] - 10970 CB[e4, CB[e4, e12]] + 166675 CB[e4, CB[e6, e10]] - 17150 CB[e6, CB[e0, e14]] - 500675 CB[e6, CB[e6, e8]] + 30184 CB[e8, CB[e0, e12]] + 80388 CB[e8, CB[e4, e8]]}, rRel[22, 3] = {910 CB[e0, CB[e10, e12]] + 40 CB[e0, CB[e6, e16]] - 280 CB[e0, CB[e8, e14]] + 858 CB[e10, CB[e0, e12]] - 360 CB[e4, CB[e0, e18]] - 11535 CB[e4, CB[e6, e12]] + 6069 CB[e4, CB[e8, e10]] + 1320 CB[e6, CB[e0, e16]] + 15140 CB[e6, CB[e4, e12]] - 7150 CB[e6, CB[e6, e10]] - 1820 CB[e8, CB[e0, e14]] - 12922 CB[e8, CB[e6, e8]]}, rRel[24, 3] = {33 CB[e0, CB[e10, e14]] + CB[e0, CB[e6, e18]] - 8 CB[e0, CB[e8, e16]] - 208 CB[e10, CB[e0, e14]] - 8872/3 CB[e10, CB[e4, e10]] + 2288/25 CB[e12, CB[e0, e12]] + 192/5 CB[e4, CB[e0, e20]] + 2475/2 CB[e4, CB[e6, e14]] - 17391/25 CB[e4, CB[e8, e12]] - 143 CB[e6, CB[e0, e18]] - 4763 CB[e6, CB[e6, e12]] + 7744/35 CB[e8, CB[e0, e16]] + 104192/175 CB[e8, CB[e4, e12]] + 58256/7 CB[e8, CB[e6, e10]]}, rRel[26, 3] = { - (75/7) CB[e0, CB[e10, e16]] + 274/5 CB[e0, CB[e12, e14]] + CB[e0, CB[e8, e18]] - 16728/49 CB[e10, CB[e0, e16]] - 765538/441 CB[e10, CB[e4, e12]] + 260780/147 CB[e10, CB[e6, e10]] + 1768/15 CB[e12, CB[e0, e14]] + 576/7 CB[e4, CB[e0, e22]] + 162110/63 CB[e4, CB[e6, e16]] - 318956/315 CB[e4, CB[e8, e14]] - 2704/9 CB[e6, CB[e0, e20]] - 160865/18 CB[e6, CB[e6, e14]] + 557677/63 CB[e6, CB[e8, e12]] + 442 CB[e8, CB[e0, e18]] + 218604/35 CB[e8, CB[e6, e12]] - 297432/35 CB[e8, CB[e8, e10]]}, rRel[28, 3] = { - (957/16) CB[e0, CB[e10, e18]] + 455 CB[e0, CB[e12, e16]] + CB[e0, CB[e6, e22]] + 379071/32 CB[e10, CB[e0, e18]] + 3888935/616 CB[e10, CB[e6, e12]] - 3912839/32 CB[e10, CB[e8, e10]] - 44220/7 CB[e12, CB[e0, e16]] + 671787/28 CB[e12, CB[e4, e12]] + 7917/4 CB[e14, CB[e0, e14]] - 30960/11 CB[e4, CB[e0, e24]] - 7828471/88 CB[e4, CB[e6, e18]] + 1806791/44 CB[e4, CB[e8, e16]] + 50919/5 CB[e6, CB[e0, e22]] + 88570427/168 CB[e6, CB[e10, e12]] + 78325643/240 CB[e6, CB[e6, e16]] - (1369208999 CB[e6, CB[e8, e14]])/2640 - 44660/3 CB[e8, CB[e0, e20]] - (133869059 CB[e8, CB[e6, e14]])/1056 + 7979807/48 CB[e8, CB[e8, e12]], - (387/32) CB[e0, CB[e10, e18]] + 5247/70 CB[e0, CB[e12, e16]] + CB[e0, CB[e8, e20]] + 820719/448 CB[e10, CB[e0, e18]] + (10529963 CB[e10, CB[e6, e12]])/9856 - 2431765/128 CB[e10, CB[e8, e10]] - 4914/5 CB[e12, CB[e0, e16]] + 1028281/280 CB[e12, CB[e4, e12]] + 2483/8 CB[e14, CB[e0, e14]] - 167184/385 CB[e4, CB[e0, e24]] - (67640563 CB[e4, CB[e6, e18]])/4928 + 1394633/220 CB[e4, CB[e8, e16]] + 7857/5 CB[e6, CB[e0, e22]] + 27308465/336 CB[e6, CB[e10, e12]] + (169191371 CB[e6, CB[e6, e16]])/3360 - (845188363 CB[e6, CB[e8, e14]])/10560 - 34472/15 CB[e8, CB[e0, e20]] - 645692/33 CB[e8, CB[e6, e14]] + 12333949/480 CB[e8, CB[e8, e12]]} rRel[30, 3] = { - (55/4) CB[e0, CB[e10, e20]] + 2067/20 CB[e0, CB[e12, e18]] - 1105/2 CB[e0, CB[e14, e16]] + CB[e0, CB[e8, e22]] - 13167 CB[e10, CB[e0, e20]] - (10420399485 CB[e10, CB[e6, e14]])/ 1792 + 4058134227/640 CB[e10, CB[e8, e12]] + 31977/5 CB[e12, CB[e0, e18]] - 70254/35 CB[e12, CB[e4, e14]] - 589878/5 CB[e12, CB[e6, e12]] - 11628/7 CB[e14, CB[e0, e16]] + 3240 CB[e4, CB[e0, e26]] + 341543277/112 CB[e4, CB[e12, e14]] + 97976547/160 CB[e4, CB[e8, e18]] - 11628 CB[e6, CB[e0, e24]] - 43446645/112 CB[e6, CB[e10, e14]] - 5847615/16 CB[e6, CB[e6, e18]] - 161860617/32 CB[e6, CB[e8, e16]] + 16830 CB[e8, CB[e0, e22]] + 183768633/32 CB[e8, CB[e6, e16]] - 1244232/5 CB[e8, CB[e8, e14]]}