TY - GEN
T1 - Geometric Computations on Indecisive Points
AU - Jørgensen, Allan
AU - Löffler, Maarten
AU - Phillips, Jeff
PY - 2011
Y1 - 2011
N2 - We study computing with indecisive point sets. Such points have spatial uncertainty where the true location is one of a finite number of possible locations. This data arises from probing distributions a few times or when the location is one of a few locations from a known database. In particular, we study computing distributions of geometric functions such as the radius of the smallest enclosing ball and the diameter. Surprisingly, we can compute the distribution of the radius of the smallest enclosing ball exactly in polynomial time, but computing the same distribution for the diameter is P-hard. We generalize our polynomial-time algorithm to all LP-type problems. We also utilize our indecisive framework to deterministically and approximately compute on a more general class of uncertain data where the location of each point is given by a probability distribution.
AB - We study computing with indecisive point sets. Such points have spatial uncertainty where the true location is one of a finite number of possible locations. This data arises from probing distributions a few times or when the location is one of a few locations from a known database. In particular, we study computing distributions of geometric functions such as the radius of the smallest enclosing ball and the diameter. Surprisingly, we can compute the distribution of the radius of the smallest enclosing ball exactly in polynomial time, but computing the same distribution for the diameter is P-hard. We generalize our polynomial-time algorithm to all LP-type problems. We also utilize our indecisive framework to deterministically and approximately compute on a more general class of uncertain data where the location of each point is given by a probability distribution.
KW - CG, IMP
U2 - 10.1007/978-3-642-22300-6_45
DO - 10.1007/978-3-642-22300-6_45
M3 - Conference contribution
T3 - LNCS 6844
SP - 536
EP - 547
BT - Proc. 12th Algorithms and Data Structures Symposium
ER -