We give an alternate implementation of the fractional cascading data-structure of Chazelle and Guibas to do iterative search for a key in multiple ordered lists. The construction of our data-structure uses randomization and simplifies the algorithm of Chazelle and Guibas vastly making it practical to implement. Although our bounds are asymptotically similar to the earlier ones, there are improvements in the constant factors. Our analysis is novel and captures some of the inherent difficulties associated with the fractional casading data structure. In particular, we use tools from branching process theory and derive some useful asymptotic bounds. The probability of deviation from the expected performance bounds decreases rapidly with number ...
This paper analyzes the performance of IDA* using additive heuristics. We show that the reduction in...
Many problems, such as the sliding-tile puzzles, gen-erate search trees where different nodes have d...
We address methods for selecting the branching variable in an enumerative algorithm for Mixed-Intege...
Fractional cascading is a technique designed to allow efficient sequential search in a graph with ca...
The problem of searching for a key in many ordered lists arises frequently in computational geometry...
Fractional cascading is a technique designed to allow efficient sequential search in a graph with ca...
Using the notions of Q-heaps and fusion trees developed by Fredman and Willard, we develop a faster ...
Using the notions of Q-heaps and fusion trees developed by Fredman and Willard, we develop a faster...
AbstractGiven an n-edge convex subdivision of the plane, is it possible to report its k intersection...
The dynamic partial sorting problem asks for an algorithm that maintains lists of numbers under the...
Dehne, F., A. Ferreira and A. Rau-Chaplin, Parallel fractional cascading on hypercube multiprocessor...
In many problems that require extensive searching, the solution can be described as satisfying two c...
Biclustering is a simultaneous partitioning of the set of samples and the set of their attributes (f...
We present an exact mixed-integer programming (MIP) solution scheme where a set-covering model is us...
We consider the problem of partial order production: arrange the elements of an unknown totally orde...
This paper analyzes the performance of IDA* using additive heuristics. We show that the reduction in...
Many problems, such as the sliding-tile puzzles, gen-erate search trees where different nodes have d...
We address methods for selecting the branching variable in an enumerative algorithm for Mixed-Intege...
Fractional cascading is a technique designed to allow efficient sequential search in a graph with ca...
The problem of searching for a key in many ordered lists arises frequently in computational geometry...
Fractional cascading is a technique designed to allow efficient sequential search in a graph with ca...
Using the notions of Q-heaps and fusion trees developed by Fredman and Willard, we develop a faster ...
Using the notions of Q-heaps and fusion trees developed by Fredman and Willard, we develop a faster...
AbstractGiven an n-edge convex subdivision of the plane, is it possible to report its k intersection...
The dynamic partial sorting problem asks for an algorithm that maintains lists of numbers under the...
Dehne, F., A. Ferreira and A. Rau-Chaplin, Parallel fractional cascading on hypercube multiprocessor...
In many problems that require extensive searching, the solution can be described as satisfying two c...
Biclustering is a simultaneous partitioning of the set of samples and the set of their attributes (f...
We present an exact mixed-integer programming (MIP) solution scheme where a set-covering model is us...
We consider the problem of partial order production: arrange the elements of an unknown totally orde...
This paper analyzes the performance of IDA* using additive heuristics. We show that the reduction in...
Many problems, such as the sliding-tile puzzles, gen-erate search trees where different nodes have d...
We address methods for selecting the branching variable in an enumerative algorithm for Mixed-Intege...