I'm trying to find a matching match function for the following record:
xyzValues = Import["nC_Q4.csv", "Data"][[8 ;;, {6, 9, 38}]]{{0, 0, 2,0004}, {0, 100, 0}, {0, 40, 0}, {0, 140, 0}, {0, 60, 0}, {0,
80, 0}, {0, 120, 0}, {0, 20, 0}, {0, 160, 0}, {0, 180, 0}, {0, 240,
0}, {0, 220, 0}, {0, 200, 0}, {0, 260, 0}, {0, 280, 0}, {0, 300,
0}, {0, 320, 0}, {0, 340, 0}, {0, 360, 0}, {0, 400, 0}, {0, 380,
0}, {0, 440, 0}, {0, 420, 0}, {0, 460, 0}, {5, 0, 1.1607}, {5, 20,
0}, {5, 40, 0}, {5, 60, 0}, {5, 80, 0}, {5, 100, 0}, {0, 480,
0}, {0, 500, 0}, {5, 120, 0}, {5, 140, 0}, {5, 160, 0}, {5, 180,
0}, {5, 200, 0}, {5, 240, 0}, {5, 220, 0}, {5, 260, 0}, {5, 280,
0}, {5, 300, 0}, {5, 320, 0}, {5, 340, 0}, {5, 360, 0}, {5, 380,
0}, {5, 400, 0}, {5, 420, 0}, {10, 20, 0}, {5, 440, 0}, {10, 0,
0.480288}, {5, 460, 0}, {10, 60, 0}, {5, 480, 0}, {5, 500, 0}, {10
40, 0}, {10, 80, 0}, {10, 100, 0}, {10, 120, 0}, {10, 140, 0}, {10
160, 0}, {10, 180, 0}, {10, 200, 0}, {10, 220, 0}, {10, 240,
0}, {10, 260, 0}, {10, 280, 0}, {10, 300, 0}, {10, 320, 0}, {10,
340, 0}, {10, 360, 0}, {10, 380, 0}, {10, 400, 0}, {10, 420,
0}, {10, 460, 0}, {10, 480, 0}, {10, 440, 0}, {15, 0, 0.5003}, {10
500, 0}, {15, 20, 0}, {15, 40, 0}, {15, 60, 0}, {15, 100, 0}, {15,
80, 0}, {15, 120, 0}, {15, 140, 0}, {15, 160, 0}, {15, 180, 0}, {15,
200, 0}, {15, 220, 0}, {15, 240, 0}, {15, 260, 0}, {15, 280,
0}, {15, 300, 0}, {15, 320, 0}, {15, 340, 0}, {15, 360, 0}, {15
380, 0}, {15, 400, 0}, {15, 420, 0}, {15, 460, 0}, {15, 440,
0}, {15, 480, 0}, {15, 500, 0}, {20, 0, 0.520104}, {20, 20, 0}, {20
40, 0}, {20, 60, 0}, {20, 80, 0}, {20, 100, 0}, {20, 120, 0}, {20,
140, 0}, {20, 160, 0}, {20, 180, 0}, {20, 200, 0}, {20, 220,
0}, {20, 240, 0}, {20, 260, 0}, {20, 280, 0}, {20, 300, 0}, {20,
320, 0}, {20, 340, 0}, {20, 360, 0}, {20, 380, 0}, {20, 400,
0}, {20, 420, 0}, {20, 440, 0}, {20, 460, 0}, {20, 480, 0}, {20,
500, 0}, {25, 0, 0.998039}, {25, 20, 0}, {25, 40, 0}, {25, 80,
0}, {25, 60, 0}, {25, 100, 0}, {25, 120, 0}, {25, 140, 0}, {25, 160,
0}, {25, 180, 0}, {25, 200, 0}, {25, 220, 0}, {25, 240, 0}, {25
260, 0}, {25, 280, 0}, {25, 300, 0}, {25, 320, 0}, {25, 340,
0}, {25, 360, 0}, {25, 380, 0}, {25, 400, 0}, {25, 420, 0}, {25
440, 0}, {25, 480, 0}, {25, 460, 0}, {25, 500, 0}, {30, 0,
2.36047}, {30, 20, 0}, {30, 40, 0}, {30, 60, 0}, {30, 80, 0}, {30
100, 0}, {30, 120, 0}, {30, 140, 0}, {30, 160, 0}, {30, 180,
0}, {30, 200, 0}, {30, 220, 0}, {30, 240, 0}, {30, 260, 0}, {30
280, 0}, {30, 300, 0}, {30, 320, 0}, {30, 340, 0}, {30, 360,
0}, {30, 380, 0}, {30, 400, 0}, {30, 420, 0}, {30, 440, 0}, {30
460, 0}, {30, 480, 0}, {30, 500, 0}, {35, 0, 14, 943}, {35, 20,
0}, {35, 40, 0}, {35, 60, 0}, {35, 80, 0}, {35, 100, 0}, {35, 120,
0}, {35, 140, 0}, {35, 160, 0}, {35, 180, 0}, {35, 200, 0}, {35,
220, 0}, {35, 240, 0}, {35, 260, 0}, {35, 280, 0}, {35, 300,
0}, {35, 320, 0}, {35, 340, 0}, {35, 360, 0}, {35, 380, 0}, {35,
400, 0}, {35, 420, 0}, {35, 440, 0}, {35, 460, 0}, {35, 480,
0}, {35, 500, 0}, {40, 0, 28.6972}, {40, 20, 0}, {40, 40, 0}, {40,
60, 0}, {40, 80, 0}, {40, 100, 0}, {40, 120, 0}, {40, 140, 0}, {40,
160, 0}, {40, 180, 0}, {40, 200, 0}, {40, 220, 0}, {40, 240,
0}, {40, 260, 0}, {40, 280, 0}, {40, 320, 0}, {40, 300, 0}, {40,
340, 0}, {40, 360, 0}, {40, 380, 0}, {40, 400, 0}, {40, 420,
0}, {40, 440, 0}, {40, 460, 0}, {40, 480, 0}, {40, 500, 0}, {45, 0,
34.7878}, {45, 20, 0}, {45, 40, 0}, {45, 60, 0}, {45, 80, 0}, {45,
100, 0}, {45, 120, 0}, {45, 140, 0}, {45, 160, 0}, {45, 180,
0}, {45, 200, 0}, {45, 220, 0}, {45, 240, 0}, {45, 260, 0}, {45,
280, 0}, {45, 300, 0}, {45, 320, 0}, {45, 340, 0}, {45, 360,
0}, {45, 380, 0}, {45, 400, 0}, {45, 420, 0}, {45, 440, 0}, {45,
460, 0}, {45, 480, 0}, {45, 500, 0}, {50, 0, 39.7718}, {50, 20,
0}, {50, 40, 0}, {50, 60, 0}, {50, 80, 0}, {50, 100, 0}, {50, 120,
0}, {50, 140, 0}, {50, 160, 0}, {50, 180, 0}, {50, 200, 0}, {50,
220, 0}, {50, 260, 0}, {50, 240, 0}, {50, 280, 0}, {50, 300,
0}, {50, 320, 0}, {50, 340, 0}, {50, 360, 0}, {50, 380, 0}, {50,
400, 0}, {50, 420, 0}, {50, 440, 0}, {50, 460, 0}, {50, 480,
0}, {50, 500, 0}, {55, 0, 47.2884}, {55, 20, 0}, {55, 40, 0}, {55,
60, 0}, {55, 80, 0}, {55, 100, 0}, {55, 120, 0}, {55, 140, 0}, {55,
160, 0}, {55, 180, 0}, {55, 200, 0}, {55, 220, 0}, {55, 240,
0}, {55, 260, 0}, {55, 280, 0}, {55, 300, 0}, {55, 320, 0}, {55,
340, 0}, {55, 360, 0}, {55, 400, 0}, {55, 380, 0}, {55, 420,
0}, {55, 440, 0}, {55, 460, 0}, {55, 480, 0}, {55, 500, 0}, {60, 0,
62,3125}, {60, 20, 0,22022}, {60, 40, 0}, {60, 60, 0}, {60, 80,
0}, {60, 100, 0}, {60, 120, 0}, {60, 140, 0}, {60, 160, 0}, {60
180, 0}, {60, 200, 0}, {60, 220, 0}, {60, 240, 0}, {60, 260,
0}, {60, 280, 0}, {60, 300, 0}, {60, 320, 0}, {60, 340, 0}, {60
360, 0}, {60, 380, 0}, {60, 400, 0}, {60, 420, 0}, {60, 460,
0}, {60, 440, 0}, {60, 480, 0}, {60, 500, 0}, {65, 0, 74.2594}, {65,
20, 0,26026}, {65, 40, 0,020016}, {65, 60, 0}, {65, 80, 0}, {65
100, 0}, {65, 120, 0}, {65, 140, 0}, {65, 160, 0}, {65, 180,
0}, {65, 200, 0}, {65, 220, 0}, {65, 240, 0}, {65, 260, 0}, {65,
280, 0}, {65, 300, 0}, {65, 320, 0}, {65, 340, 0}, {65, 360,
0}, {65, 380, 0}, {65, 400, 0}, {65, 420, 0}, {65, 440, 0}, {65,
460, 0}, {65, 480, 0}, {65, 500, 0}, {70, 0, 79, 4559}, {70, 20,
1.60128}, {70, 40, 0.0800641}, {70, 60, 0.020004}, {70, 80, 0}, {70,
100, 0}, {70, 140, 0}, {70, 120, 0}, {70, 160, 0}, {70, 200,
0}, {70, 180, 0}, {70, 220, 0}, {70, 240, 0}, {70, 260, 0}, {70,
280, 0}, {70, 320, 0}, {70, 300, 0}, {70, 340, 0}, {70, 360,
0}, {70, 380, 0}, {70, 400, 0}, {70, 420, 0}, {70, 440, 0}, {70,
460, 0}, {70, 480, 0}, {70, 500, 0}, {75, 0, 86, 9348}, {75, 20,
7,30146}, {75, 40, 1,96196}, {75, 60, 0,720144}, {75, 80,
0.46046}, {75, 100, 0.160096}, {75, 120, 0.080016}, {75, 140,
0.020008}, {75, 160, 0.020008}, {75, 180, 0.020012}, {75, 200,
0,020012}, {75, 220, 0,020012}, {75, 240, 0}, {75, 260, 0}, {75,
300, 0}, {75, 280, 0}, {75, 320, 0}, {75, 340, 0}, {75, 360,
0}, {75, 380, 0}, {75, 400, 0}, {75, 420, 0}, {75, 440, 0}, {75,
460, 0}, {75, 480, 0}, {75, 500, 0}, {80, 0, 91, 4783}, {80, 20,
13, 1653}, {80, 40, 7, 70308}, {80, 80, 4.0208}, {80, 60,
5, 48439}, {80, 120, 2,84114}, {80, 100, 3,22064}, {80, 140,
2.60104}, {80, 160, 1.80216}, {80, 180, 1.86037}, {80, 200,
1,36054}, {80, 220, 1,24149}, {80, 240, 1,08065}, {80, 260
1,04021}, {80, 280, 0,960,384}, {80, 300, 0,860,861}, {80, 320,
1,0004}, {80, 340, 0,80016}, {80, 360, 0,720432}, {80, 380
0.540432}, {80, 400, 0.480673}, {80, 420, 0.40032}, {80, 440,
0.20008}, {80, 480, 0.380076}, {80, 460, 0.460184}, {80, 500
0,460,276}, {85, 0, 94,2188}, {85, 20, 22.0332}, {85, 40
12,2649}, {85, 60, 9,26371}, {85, 80, 7,78156}, {85, 100
7,14572}, {85, 120, 5,84117}, {85, 140, 5, 58447}, {85, 180
4,90,196}, {85, 160, 5,32106}, {85, 200, 4,5209}, {85, 220
4,5209}, {85, 240, 4,74095}, {85, 260, 4,18167}, {85, 280,
3.80076}, {85, 300, 3.92392}, {85, 320, 3.72223}, {85, 340,
3,64073}, {85, 360, 3,38068}, {85, 380, 3.5007}, {85, 400,
3.36336}, {85, 420, 3.14126}, {85, 440, 3.02181}, {85, 460,
2,70054}, {85, 480, 3,02242}, {85, 500, 2,90174}, {90, 0,
95, 7592}, {90, 20, 33, 13333}, {90, 60, 18, 1709}, {90, 40,
22.1689}, {90, 80, 15.8358}, {90, 100, 13.9856}, {90, 120,
12,7826}, {90, 140, 12,0272}, {90, 160, 10,024}, {90, 180
10,8643}, {90, 200, 9,60192}, {90, 220, 8,80528}, {90, 240
8.30332}, {90, 260, 8.64173}, {90, 280, 7.74465}, {90, 300
7,40148}, {90, 320, 7,92317}, {90, 340, 7,48899}, {90, 360,
6,7427}, {90, 380, 6,82546}, {90, 400, 6,2425}, {90, 420
6,76135}, {90, 440, 6,40512}, {90, 460, 6,84137}, {90, 480
5, 54222}, {90, 500, 6, 16246}, {95, 0, 97, 4795}, {95, 20,
42.9972}, {95, 40, 31.8191}, {95, 60, 28.6657}, {95, 80,
25,6903}, {95, 100, 22,8337}, {95, 120, 21,733}, {95, 140,
20, 1201}, {95, 160, 18, 6074}, {95, 180, 18, 6875}, {95, 200,
17.3635}, {95, 220, 17.1869}, {95, 240, 16.6433}, {95, 260,
15,6062}, {95, 280, 15,3954}, {95, 300, 14,8118}, {95, 320
15.3985}, {95, 340, 14.1657}, {95, 360, 14.9439}, {95, 380,
14,5229}, {95, 400, 14 8684}, {95, 420, 13, 56681}, {95, 440,
13,4454}, {95, 460, 12.7051}, {95, 480, 13.5227}, {100, 0,
98,3397}, {95, 500, 13,2653}, {100, 20, 52.0416}, {100, 40
43, 1773}, {100, 60, 38, 2153}, {100, 80, 34, 9079}, {100, 100
32,0328}, {100, 120, 30,5506}, {100, 140, 29,3729}, {100, 160
29,0407}, {100, 180, 27,0908}, {100, 200, 26,4853}, {100, 220
25,8252}, {100, 240, 25,245}, {100, 280, 24,1697}, {100, 260
25,4152}, {100, 300, 25,2752}, {100, 320, 22,8646}, {100, 340
23,0246}, {100, 360, 22,0888}, {100, 380, 22,2467}, {100, 400
23,3247}, {100, 420, 22,9892}, {100, 440, 21,0242}, {100, 460,
20.9284}, {100, 480, 21.8775}, {100, 500, 19.6035}}
Which has dimensions
Dimensions[xyzValues]
{546, 3}
At first I tried to show this point in a contour diagram:
ListContourPlot[xyzValues, PlotLegends -> Automatic,
ColorFunction -> "Rainbow", PlotRange -> {{0, 100}, {0, 150}}]
However, this result does not reflect the data points (see, for example, data in the empty area of the diagram). I'm probably missing something, but the plot should be different.
Draw these points with a different mathematical framework:
If I observe these two graphs, I do not know how to calculate a good mathematical function to match these data points. I have made an approach
Model = a + bx + cx ^ 2 + d Exp[-x] + ey + fy ^ 2 + gxy + exp[-y] H;
fit
FindFit[xyzValues, model, {a, b, c, d, e, f, g, h}, {x, y}]
{a -> -2.75705, b -> -0.196263, c -> 0.00570384,
d -> -4.9015, e -> 0.01131326, f -> 0.0000346097, g -> -0.000773403,
h -> 38,7327}
and plot this feature:
show[{Plot3D[Evaluate[model /. fit], {x, 0, 100}, {y, 0, 150},
PlotStyle -> Opacity[0.8]],
Graphics3D[{Red, PointSize[.025], Map[Point, xyzValues]}]}]
However, there seems to be a rapprochement with many mistakes. I want to get a function with fewer errors, if possible an expression that interpolates the data points.
greetings
