Problem: glpsol Rows: 78 Columns: 51 (15 integer, 15 binary) Non-zeros: 199 Status: INTEGER OPTIMAL Objective: obj_fn = 1.717986918e+10 (MINimum) No. Row name Activity Lower bound Upper bound ------ ------------ ------------- ------------- ------------- 1 obj_fn 1.71799e+10 2 c0 -1 -0 3 c1 -4.29497e+09 -0 4 c2 -1 -0 5 c3 -4.29497e+09 -0 6 c4 0 -0 = 7 c5 0 -0 = 8 c6 0 -0 = 9 c7 0 -0 = 10 c8 -1 -0 11 c9 -4.29497e+09 -0 12 c10 0 -0 13 c11 -4.29497e+09 -0 14 c12 -9 4.29497e+09 15 c13 9 4 16 c14 0 -0 = 17 c15 0 -0 = 18 c16 4.29497e+09 4.29497e+09 19 c17 -4.29497e+09 4 20 c18 4.29497e+09 4.29497e+09 21 c19 -4.29497e+09 5 22 c20 8 4.29497e+09 23 c21 -8 -5 24 c22 0 -0 = 25 c23 0 -0 = 26 c24 9 4.29497e+09 27 c25 -9 -5 28 c26 1 4.29497e+09 29 c27 -8 -4 30 c28 0 -0 = 31 c29 0 -0 = 32 c30 0 -0 = 33 c31 0 -0 = 34 c32 1 1 35 c33 -1 -0 36 c34 0 -0 = 37 c35 1 1 38 c36 -1 -0 39 c37 0 -0 = 40 c38 0 -0 41 c39 0 -0 42 c40 0 -0 43 c41 0 -0 44 c42 0 -0 = 45 c43 0 -0 = 46 c44 0 -0 = 47 c45 0 -0 = 48 c46 0 -0 = 49 c47 0 -0 50 c48 0 -0 51 c49 0 -0 52 c50 0 -0 53 c51 0 -0 = 54 c52 0 -0 = 55 c53 0 -0 = 56 c54 0 -0 = 57 c55 0 -0 58 c56 0 -0 59 c57 0 -0 = 60 c58 0 -0 = 61 c59 0 -0 = 62 c60 0 -0 = 63 c61 0 -0 = 64 c62 8 8 = 65 c63 9 9 = 66 c64 0 -0 = 67 c65 4.29497e+09 4.29497e+09 = 68 c66 1 1 = 69 c67 0 -0 = 70 c68 -8 4.29497e+09 71 c69 9 4.29497e+09 72 c70 0 4.29497e+09 73 c71 4.29497e+09 4.29497e+09 74 c72 0 -0 = 75 c73 -8 4.29497e+09 76 c74 8 4.29497e+09 77 c75 0 4.29497e+09 78 c76 4.29497e+09 4.29497e+09 No. Column name Activity Lower bound Upper bound ------ ------------ ------------- ------------- ------------- 1 u_EBX_4008e5_blk_ex 0 0 4.29497e+09 2 u_EAX_4008e0_blk_ex_T 9 0 4.29497e+09 3 u_EBX_4008e7_blk_ex 0 0 4.29497e+09 4 l_EAX_4008e0 8 0 4.29497e+09 5 l_EAX_4008e3 8 0 4.29497e+09 6 l_EAX_4008e5 0 0 4.29497e+09 7 l_EAX_4008e7 0 0 4.29497e+09 8 l_EAX_4008e6 0 0 4.29497e+09 9 u_EAX_4008e0_blk_ex_F 8 0 4.29497e+09 10 rch_blk_4008e0_ent * 1 0 1 11 u_EAX_4008e5_blk_ex 0 0 4.29497e+09 12 u_EBX_4008e0_blk_ex_F 4.29497e+09 0 4.29497e+09 13 l_EAX_4008e0_blk_ex_T 8 0 4.29497e+09 14 l_EAX_4008e7_blk_ex 0 0 4.29497e+09 15 dcsn_lte_3 * 0 0 1 16 dcsn_lte_2 * 0 0 1 17 dcsn_lte_1 * 1 0 1 18 dcsn_lte_0 * 0 0 1 19 l_EAX_4008e0_blk_ex_F 8 0 4.29497e+09 20 u_EBX_4008e0_blk_ex_T 4.29497e+09 0 4.29497e+09 21 l_EBX_4008e5_blk_ex 0 0 4.29497e+09 22 rch_blk_4008e0_ex_F * 0 0 1 23 u_EBX_4008e0 4.29497e+09 0 4.29497e+09 24 u_EBX_4008e3 4.29497e+09 0 4.29497e+09 25 u_EBX_4008e5 0 0 4.29497e+09 26 u_EBX_4008e7 0 0 4.29497e+09 27 u_EBX_4008e6 0 0 4.29497e+09 28 rch_blk_4008e0_ex_T * 0 0 1 29 u_EAX_4008e5 0 0 4.29497e+09 30 rch_blk_4008e0_pred_T * 0 0 1 31 l_EBX_4008e7_blk_ex 0 0 4.29497e+09 32 rch_blk_4008e5_ex * 0 0 1 33 rch_blk_4008e5_ent * 0 0 1 34 u_EAX_4008e3 9 0 4.29497e+09 35 u_EAX_4008e0 9 0 4.29497e+09 36 u_EAX_4008e6 0 0 4.29497e+09 37 u_EAX_4008e7 0 0 4.29497e+09 38 rch_blk_4008e0_pred_F * 0 0 1 39 l_EAX_4008e5_blk_ex 0 0 4.29497e+09 40 rch_blk_4008e7_ex * 0 0 1 41 l_EBX_4008e0_blk_ex_F 0 0 4.29497e+09 42 l_EBX_4008e3 0 0 4.29497e+09 43 l_EBX_4008e0 0 0 4.29497e+09 44 l_EBX_4008e6 0 0 4.29497e+09 45 l_EBX_4008e7 0 0 4.29497e+09 46 rch_blk_4008e7_ent * 0 0 1 47 l_EBX_4008e5 0 0 4.29497e+09 48 u_EAX_4008e7_blk_ex 0 0 4.29497e+09 49 dcsn_and_5 * 0 0 1 50 dcsn_and_4 * 0 0 1 51 l_EBX_4008e0_blk_ex_T 0 0 4.29497e+09 Integer feasibility conditions: KKT.PE: max.abs.err = 0.00e+00 on row 0 max.rel.err = 0.00e+00 on row 0 High quality KKT.PB: max.abs.err = 5.00e+00 on row 15 max.rel.err = 1.00e+00 on row 15 SOLUTION IS INFEASIBLE End of output