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Title: Rank of Redheffer Matrix Post by Aryabhatta on Apr 11th, 2007, 4:54pm Let RHn be the nxn RedHeffer matrix (http://mathworld.wolfram.com/RedhefferMatrix.html) defined as: RHn(i,j) = 1 if i divides j or j = 1 RHn(i,j) = 0 otherwise. For instance RH4 is [1 1 1 1] [1 1 0 1] [1 0 1 0] [1 0 0 1] Prove that the rank of RHn is atleast n-1. |
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Title: Re: Rank of Redheffer Matrix Post by Eigenray on Apr 11th, 2007, 6:48pm The [hide]lower-right (n-1)x(n-1) submatrix is upper unitriangular[/hide]. 2) Show that det(RHn) = http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/sum.gifk=1n http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/mu.gif(k). Hence RHn is invertible except for n=2, 39, 40, 58, 65, 93, .... 3) Is the above set infinite? |
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Title: Re: Rank of Redheffer Matrix Post by Aryabhatta on Apr 12th, 2007, 12:39am on 04/11/07 at 18:48:23, Eigenray wrote:
Is this known? |
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Title: Re: Rank of Redheffer Matrix Post by Eigenray on Apr 12th, 2007, 3:48pm No idea. You'd think they would say one way or the other on [link=http://mathworld.wolfram.com/MertensFunction.html]Mathworld[/link], but [link=http://www.research.att.com/~njas/sequences/A028442]Sloane[/link] usually says when a sequence is not known to be infinite. It seems likely though. Here's a graph of M(n)/http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/surd.gifn. It looks roughly like a random walk. But it's not as a random as it looks -- on the right is a graph of A(A(A(M))), where A(F)(n) = 1/n http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/sum.gifk=1n F(k) is the averaging operator. The position of the n-th maxima fits Ce.45 n pretty well. |
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