Even–odd analysis on a complex shoreline

Communicated by R.E. Burkard Asymptotic results for the sum-of-digits function with respect to Standard-Gray-code representation of positive integers are established. These estimates yield two bounds for the average case complexity of Batcher's odd-even -merge.

We present an efficient \(\theta(\log N)\) implementation of Batcher's odd-even merge on a SIMD hypercube. (The hypercube model assumes that all communications are restricted to one fixed dimension at a time.) The best previously known implementation of odd-even merge on a SIMD hypercube requires \(

It is shown that given an odd prime p, the number of even latin squares of order p+1 is not equal to the number of odd latin squares of order p+1. This result is a special case of a conjecture of Alon and Tarsi and has implications for various other combinatorial problems, including conjectures of R