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Hi Urs,
The formula in our code is the one quoted in the very right term of eq. 14
in the description Ric sent out yesterday.

It reads:
(N_nr[i] - N_r[i] * e_R)
-----------------------
   (N_r[i] * e_R)

were
        N_nr
e_r ==  -----
      N_r (R+1)


hope that clears any confusion.
Concerning the weight change: can you point me to the files you're
comparing. I'll explain the differences...

Alessio

______________________________________________________
Alessio Sarti     Universita' & I.N.F.N. Ferrara
 tel  +39-0532-974328  Ferrara
roma  +39-06-49914338
SLAC +001-650-926-2972

"... e a un Dio 'fatti il culo' non credere mai..."
(F. De Andre')

"He was turning over in his mind an intresting new concept in
Thau-dimensional physics which unified time, space, magnetism, gravity
and, for some reason, broccoli".  (T. Pratchett: "Pyramids")

On Wed, 12 Feb 2003, Urs Langenegger wrote:

>
> Hoi Alessio and Daniele,
>
> the weights changed quite a bit (apart from the binning) in the low mX
> region wrt  to the  initial version of  Alessio.  In  particular, bin1
> even changed the  direction of the weight (>1  -> <1). Furthermore, is
> it still  true that  eq 14 is  implemented in  the \xi form  (which is
> right) and not the middle form (which is wrong)?
>
> Cheers,
> --U.
>
>
>
> New                      Old
> ----------------------------------------------------
> bin0    1                bin0    1
> bin1    0.636768  	 bin1    4.09971
> bin2    1.01957   	 bin2    1.30544
> bin3    1.19293   	 bin3    1.763
> bin4    1.49278   	 bin4    1.39208
> bin5    1.66824   	 bin5    1.70889
> bin6    1.85889   	 bin6    1.87091
> bin7    1.84273   	 bin7    2.18299
> bin8    1.89469   	 bin8    1.62982
> bin9    1.94351   	 bin9    1.42043
> bin10    1.99724  	 bin10    2.34514
> bin11    1.93445  	 bin11    2.41272
> bin12    2.05699  	 bin12    2.01187
> bin13    2.05112  	 bin13    1.90189
> bin14    2.04044  	 bin14    2.45736
> bin15    2.00212  	 bin15    1.64077
> bin16    1.92181  	 bin16    1
> bin17    1.97053  	 bin17    1
> bin18    1.94157
> bin19    1
> bin20    1.09792
> bin0    1                bin0    1
> bin1    0.690106  	 bin1    5.20933
> bin2    1.39781   	 bin2    2.30252
> bin3    0.987893  	 bin3    1.34659
> bin4    1.34145   	 bin4    1.45464
> bin5    1.17816   	 bin5    1.45958
> bin6    1.75503   	 bin6    1.64968
> bin7    1.89179   	 bin7    1.52691
> bin8    1.95983   	 bin8    1.99392
> bin9    2.01284   	 bin9    1.57907
> bin10    2.03704  	 bin10    1.70728
> bin11    1.97187  	 bin11    1.86048
> bin12    2.05301  	 bin12    1.77522
> bin13    1.99579  	 bin13    1.80239
> bin14    2.02767  	 bin14    1.49867
> bin15    2.06574  	 bin15    2.56872
> bin16    1.94922  	 bin16    1
> bin17    1.95801  	 bin17    1.38739
> bin18    1.67451
> bin19    2.13989
> bin20    2.13989
>
>