/*** * This code is a part of EvoApproxLib library (ehw.fit.vutbr.cz/approxlib) distributed under The MIT License. * When used, please cite the following article(s): V. Mrazek, Z. Vasicek and R. Hrbacek, "Role of circuit representation in evolutionary design of energy-efficient approximate circuits" in IET Computers & Digital Techniques, vol. 12, no. 4, pp. 139-149, 7 2018. doi: 10.1049/iet-cdt.2017.0188 * This file contains a circuit from a sub-set of pareto optimal circuits with respect to the pwr and mae parameters ***/ // MAE% = 0.049 % // MAE = 4.0 // WCE% = 0.098 % // WCE = 8.0 // WCRE% = 100.00 % // EP% = 96.88 % // MRE% = 0.14 % // MSE = 20 // PDK45_PWR = 0.036 mW // PDK45_AREA = 71.3 um2 // PDK45_DELAY = 0.68 ns #include #include uint64_t add12u_2KC(uint64_t a, uint64_t b) { uint64_t o = 0; int n_415=0, n_414=0, n_36=0, n_42=0, n_37=0, n_314=0, n_315=0, n_23=0, n_22=0, n_21=0; int n_20=0, n_27=0, n_26=0, n_25=0, n_24=0, n_248=0, n_29=0, n_28=0, n_348=0, n_249=0; int n_381=0, n_380=0, n_280=0, n_281=0, n_214=0, n_349=0, n_39=0, n_38=0, n_181=0, n_180=0; int n_8=0, n_9=0, n_4=0, n_5=0, n_6=0, n_7=0, n_0=0, n_1=0, n_2=0, n_3=0; int n_30=0, n_31=0, n_32=0, n_33=0, n_34=0, n_35=0, n_18=0, n_19=0, n_16=0, n_17=0; int n_14=0, n_15=0, n_12=0, n_13=0, n_10=0, n_11=0, n_45=0, n_44=0, n_43=0, n_47=0; int n_215=0, n_46=0, n_41=0, n_40=0; n_0 = (a >> 0) & 0x1; n_1 = (a >> 0) & 0x1; n_2 = (a >> 1) & 0x1; n_3 = (a >> 1) & 0x1; n_4 = (a >> 2) & 0x1; n_5 = (a >> 2) & 0x1; n_6 = (a >> 3) & 0x1; n_7 = (a >> 3) & 0x1; n_8 = (a >> 4) & 0x1; n_9 = (a >> 4) & 0x1; n_10 = (a >> 5) & 0x1; n_11 = (a >> 5) & 0x1; n_12 = (a >> 6) & 0x1; n_13 = (a >> 6) & 0x1; n_14 = (a >> 7) & 0x1; n_15 = (a >> 7) & 0x1; n_16 = (a >> 8) & 0x1; n_17 = (a >> 8) & 0x1; n_18 = (a >> 9) & 0x1; n_19 = (a >> 9) & 0x1; n_20 = (a >> 10) & 0x1; n_21 = (a >> 10) & 0x1; n_22 = (a >> 11) & 0x1; n_23 = (a >> 11) & 0x1; n_24 = (b >> 0) & 0x1; n_25 = (b >> 0) & 0x1; n_26 = (b >> 1) & 0x1; n_27 = (b >> 1) & 0x1; n_28 = (b >> 2) & 0x1; n_29 = (b >> 2) & 0x1; n_30 = (b >> 3) & 0x1; n_31 = (b >> 3) & 0x1; n_32 = (b >> 4) & 0x1; n_33 = (b >> 4) & 0x1; n_34 = (b >> 5) & 0x1; n_35 = (b >> 5) & 0x1; n_36 = (b >> 6) & 0x1; n_37 = (b >> 6) & 0x1; n_38 = (b >> 7) & 0x1; n_39 = (b >> 7) & 0x1; n_40 = (b >> 8) & 0x1; n_41 = (b >> 8) & 0x1; n_42 = (b >> 9) & 0x1; n_43 = (b >> 9) & 0x1; n_44 = (b >> 10) & 0x1; n_45 = (b >> 10) & 0x1; n_46 = (b >> 11) & 0x1; n_47 = (b >> 11) & 0x1; n_180 = n_8 ^ n_32 ^n_30; n_181 = (n_8 & n_32) | (n_32 & n_30) | (n_8 & n_30); n_214 = n_10 ^ n_34 ^n_181; n_215 = (n_10 & n_34) | (n_34 & n_181) | (n_10 & n_181); n_248 = n_12 ^ n_36 ^n_215; n_249 = (n_12 & n_36) | (n_36 & n_215) | (n_12 & n_215); n_280 = n_14 ^ n_38 ^n_249; n_281 = (n_14 & n_38) | (n_38 & n_249) | (n_14 & n_249); n_314 = n_16 ^ n_40 ^n_281; n_315 = (n_16 & n_40) | (n_40 & n_281) | (n_16 & n_281); n_348 = n_18 ^ n_42 ^n_315; n_349 = (n_18 & n_42) | (n_42 & n_315) | (n_18 & n_315); n_380 = n_20 ^ n_44 ^n_349; n_381 = (n_20 & n_44) | (n_44 & n_349) | (n_20 & n_349); n_414 = n_22 ^ n_46 ^n_381; n_415 = (n_22 & n_46) | (n_46 & n_381) | (n_22 & n_381); o |= (n_24 & 0x01) << 0; o |= (n_28 & 0x01) << 1; o |= (n_4 & 0x01) << 2; o |= (n_6 & 0x01) << 3; o |= (n_180 & 0x01) << 4; o |= (n_214 & 0x01) << 5; o |= (n_248 & 0x01) << 6; o |= (n_280 & 0x01) << 7; o |= (n_314 & 0x01) << 8; o |= (n_348 & 0x01) << 9; o |= (n_380 & 0x01) << 10; o |= (n_414 & 0x01) << 11; o |= (n_415 & 0x01) << 12; return o; }