We obtain slightly improved upper bounds on efficient approximability of the MAXIMUM INDEPENDENT SET problem in graphs of maximum degree at most B (shortly, B-MAXIS), for small B ≥ 3. The degree-three case plays a role of the central problem, as many of the results for the other problems use reductions to it. Our careful analysis of approximation algorithms of Berman and Fujito for 3-MAXIS shows that one can achieve approximation ratio arbitrarily close to 3 -(13)~(1/2)/2. Improvements of an approximation ratio below 6/5 for this case translate to improvements below (B+3)/5 of approximation factors for JB-MAXIS for all odd B. Consequently, for any odd B ≥ 3, polynomial time algorithms for JS-MAXIS exist with approximation ratios arbitrarily close to (B+3)/5-(4(5(13)~(1/2)-18))/5 ((B-2)!!)/((B+1)!!). This is currently the best upper bound for B-MAXIS for any odd B, 3 ≤ B ≤ 613.
展开▼
