Fou 1978

Performance0-Rank  0-Score1-Rank  1-Score2-Rank  2-Score3-Rank  3-Score3R-Rank  3R-Score4-Rank  4-Score  NED
Ashkenazy 1981   22  0.8938  0.0027  0.1028  0.1036  0.0834  0.09
Bacha 1997   47  0.8228  0.0047  0.0643  0.0644  0.0643  0.06
Barbosa 1983   4  0.947  0.033  0.283  0.679  0.475  0.56
Biret 1990   49  0.8242  0.0048  0.0450  0.0447  0.0652  0.05
Block 1995   34  0.8726  0.0033  0.0739  0.0715  0.3419  0.15
Brailowsky 1960   31  0.8830  0.0032  0.0931  0.0932  0.0933  0.09
Chiu 1999   13  0.919  0.0222  0.1024  0.2247  0.0531  0.10
Clidat 1994   17  0.9023  0.0011  0.1415  0.3650  0.0425  0.12
Cohen 1997   12  0.9124  0.0014  0.1113  0.3844  0.0621  0.15
Cortot 1951   50  0.8146  0.0049  0.0547  0.0547  0.0553  0.05
Csalog 1996   38  0.8625  0.0044  0.0933  0.0946  0.0642  0.07
Czerny 1990   18  0.902  0.089  0.179  0.5126  0.1712  0.29
Ezaki 2006   3  0.943  0.064  0.255  0.5813  0.348  0.44
Ferenczy 1958   8  0.9221  0.0112  0.1010  0.4830  0.0914  0.21
Fliere 1977   9  0.9232  0.0019  0.0722  0.2438  0.0724  0.13
Fou 1978   target  targettarget  targettarget  targettarget  targettarget  targettarget  target
Francois 1956   42  0.8549  0.0046  0.0932  0.0933  0.0936  0.09
Grinberg 1951   41  0.8527  0.0040  0.0645  0.0647  0.0645  0.06
Hatto 1993   35  0.8750  0.0034  0.0835  0.0849  0.0549  0.06
Hatto 1997   36  0.8644  0.0037  0.0644  0.0649  0.0550  0.05
Indjic 2001   37  0.8647  0.0038  0.0738  0.0749  0.0547  0.06
Jonas 1947   29  0.8819  0.0124  0.0923  0.2345  0.0626  0.12
Kapell 1951   28  0.8813  0.0118  0.0825  0.2246  0.0628  0.11
Kiepura 1999   11  0.9148  0.007  0.1911  0.472  0.606  0.53
Kushner 1989   48  0.8251  0.0050  0.0740  0.0750  0.0451  0.05
Luisada 1991   33  0.8745  0.0036  0.0548  0.0542  0.0744  0.06
Lushtak 2004   26  0.8914  0.0126  0.0826  0.1646  0.0437  0.08
Magaloff 1978   20  0.9010  0.0213  0.1012  0.4210  0.449  0.43
Meguri 1997   40  0.8534  0.0045  0.0834  0.0835  0.1035  0.09
Milkina 1970   10  0.9129  0.0021  0.0819  0.2719  0.3211  0.29
Mohovich 1999   32  0.8831  0.0015  0.1016  0.3034  0.0820  0.15
Niedzielski 1931   45  0.8440  0.0043  0.0741  0.0736  0.0738  0.07
Ohlsson 1999   16  0.9033  0.0029  0.0737  0.0737  0.0648  0.06
Olejniczak 1990   19  0.9035  0.0020  0.0921  0.2536  0.0823  0.14
Osinska 1989   5  0.9411  0.025  0.204  0.618  0.573  0.59
Rangell 2001   39  0.8515  0.0139  0.0449  0.0411  0.3927  0.12
Richter 1976   6  0.934  0.066  0.277  0.569  0.457  0.50
Rubinstein 1938   46  0.8318  0.0135  0.0642  0.0624  0.2229  0.11
Rubinstein 1952   15  0.916  0.0310  0.118  0.531  0.644  0.58
Rubinstein 1961   43  0.8416  0.0141  0.0646  0.065  0.6116  0.19
Rubinstein 1966   44  0.8422  0.0142  0.0836  0.085  0.5913  0.22
Shebanova 2002   2  0.955  0.052  0.212  0.716  0.572  0.64
Smidowicz 1948   23  0.8941  0.0030  0.0930  0.0950  0.0540  0.07
Smidowicz 1948b   25  0.8936  0.0031  0.1127  0.1150  0.0539  0.07
Smith 1975   27  0.8943  0.0025  0.1320  0.263  0.6310  0.40
Sofronitsky 1949   30  0.8839  0.0016  0.1018  0.2842  0.0722  0.14
Sztompka 1959   1  0.971  0.471  0.461  0.771  0.721  0.74
Tomsic 1995   24  0.8917  0.0123  0.0917  0.3032  0.0918  0.16
Uninsky 1971   21  0.8920  0.0128  0.1029  0.1048  0.0541  0.07
Wasowski 1980   14  0.9112  0.0117  0.1014  0.3729  0.0917  0.18
Average Tempo   7  0.938  0.028  0.206  0.5839  0.0715  0.20
Random 1   52  0.0052  0.0052  0.0252  0.0221  0.1646  0.06
Random 2   53  -0.0237  0.0053  0.0253  0.025  0.4630  0.10
Random 3   51  0.0553  0.0051  0.0351  0.0314  0.3432  0.10

Note: To load data table give above into Excel, copy and paste the data into a text editor (such as WordPad) first, then copy the text in the editor and past into Excel. You should remove the "target" line from the data before pasting into Excel so that plotting graphs of the data is done properly.

Column descriptions

  • Performance:
  • 0-Rank/0-Score: 0-Score is equivalent to Pearson correlation of the entire data sequence between the reference performance and a test performance. 0-Rank is the sorting order of the 0-scores (highest score has a rank of 1).
  • 1-Rank/1-Score: 1-Score is the area fraction covered by a particular performance in the scape plot (see image above). These values should not be taken literally, since they are sensitive to the Hatto Effect.
  • 2-Rank/2-Score: 2-Score values are equivalent to 1-Score values with all higher-ranking performances removed before the calculation of the area of coverage in the scape is calculated. Improvment over the 1-Rank scores, but still somewhat sensitive to the Hatto Effect.
  • 3-Rank/3-Score: Similar to 2-Rank calculations. The bottom 1/2 of the 2-rank performances are kept constant as a noise floor for the similarity measurement. Then one-by-one the top 1/2 of the 2-rank performances are superimposed with the noise-floor performances, and a 3-score is measured as the area covered in the scape. This measure is not sentisive to the Hatto Effect.
  • 3R-Rank/3R-Score: Reverse 3-rank/3-scores. 3-rankings and scores are not symmetric (A->B values are different from B->A values). So this column represents similarity measures in the opposite direction.
  • 4-Rank/4-Score: The geometric mean between 3-scores and 3R-scores. This column gives the best overall similarity ranking between the various performances (see color codes below).
  • NED: Noise Equivalient Distance (not yet implemented)

Color codes for 3-rank listings:

  • red = strongly similar performance to target
  • orange = moderately similar performance
  • yellow = weakly similar performance
  • green = marginally similar/dissimilar performance
  • white = dissimilar to target
  • blue = false positive (has high 3-rank score but low 3R-rank score)

3-rank/scores are not symmetric, so the 3R-rank/score columns give the 3-rank/scores going in the opposite direction. More matches in the 3-rank column than in the 3R-rank column indicates an individualistic performance, while more matches in the 3R-rank column indicates a mainstream performance.

If a 3-rank and a 3R-rank are both marked as similar to each other, then there is a possible direct relation between the performances. If one is similar to the other but not in the reverse direction, then the similarity is more likely to be by chance (performers randomly chose a similar interpretation).