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COCO
2005
Springer
2005
Springer
New Results on the Complexity of the Middle Bit of Multiplication
It is well known that the hardest bit of integer multiplication is the middle bit, i.e. MULn−1,n. This paper contains several new results on its complexity. First, the size s of randomized read-k branching programs, or, equivalently, their space (log s) is investigated. A randomized algorithm for MULn−1,n with k = O(log n) (implying time O(n log n)), space O(log n) and error probability n−c for arbitrarily chosen constants c is presented. Second, the size of general branching programs and formulas is investigated. Applying Nechiporuk’s technique, lower bounds of Ω n3/2/ log n and Ω n3/2 , respectively, are obtained. Moreover, by bounding the number of subfunctions of MULn−1,n, it is proven that Nechiporuk’s technique cannot provide larger lower bounds than O(n5/3/ log n) and O(n5/3), respectively. ∗ Supported in part by DFG grant WO 1232/1-1
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| Added | 26 Jun 2010 |
| Updated | 26 Jun 2010 |
| Type | Conference |
| Year | 2005 |
| Where | COCO |
| Authors | Ingo Wegener, Philipp Woelfel |
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