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 > >