Template:ResponseSurface: Difference between revisions

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{|
|-
|{{#if:{{{link|}}}|Download the response surface here: {{{link}}} }}
|-
|{{#if:{{{comments1|}}}|{{{comments1}}} }}
|-
|{{#if:{{{polynomial_coefficient_vector|}}}|The polynomial coefficient vector is given by:
{{{polynomial_coefficient_vector}}}
}}
|-
|{{#if:{{{polynomial_powers_matrix|}}}|The polynomial powers matrix corresponding to the polynomial coefficient vector is given by:
{{{polynomial_powers_matrix|}}}
}}
|-
|{{#if:{{{comments2|}}}|{{{comments2}}} }}
|-
|{{#if:{{{image|}}}|The following is a visualization of the response surface (non-visualized dimensions are kept constant at their mean value):
{{{image}}}
}}
|-
|{{#if:{{{comments3|}}}| {{{comments3}}} }}
|-
|{{#if:{{{statistics|}}}|Some key statistics for this response surface are given below:
{{{statistics}}}
}}
|-
|{{#if:{{{comments4|}}}| {{{comments4}}} }}
|-
|{{#if:{{{text|}}}| {{{text}}} }}
|}
<noinclude>
<noinclude>
This template creates/organizes information about response surfaces.
This template creates/organizes information about response surfaces.
Line 6: Line 44:
<pre>
<pre>
{{{ResponseSurface
{{{ResponseSurface
|title =
|link=
|link=
|comments1=
|comments1=
Line 19: Line 58:
</pre>
</pre>


</noinclude><!--
=Example=


-->{{#if:{{{link|}}}|Download the response surface here: {{{link}}} }}<!--
{|class="wikitable"
|-
|{{ResponseSurface


-->{{#if:{{{comments1|}}}|
|title=Quartic Response Surface, 6 Dimensions


{{{comments1}}}
|link=http://files.charlesmartinreid.com/ExperimentalDesign/MCResponseSurface_Yp_exit_6dim_4deg.mat


}}<!--
|comments1=Some thoughts about this response surface?


-->{{#if:{{{polynomial_coefficient_vector|}}}|The polynomial coefficient vector is given by:
|polynomial_coefficient_vector=
<pre>
b(1) = 9.4335e+04
b(2) = -7.1360e+04
b(3) = -1.3930e+04
b(4) = 2.4439e+04
b(5) = 6.3177e+01
b(6) = -7.3399e-01
b(7) = -4.7962e+04
b(8) = 2.5084e+04
b(9) = 1.2428e+04
b(10) = 9.7792e+02
b(11) = -9.2480e+03
b(12) = -5.1276e+03
b(13) = -5.7739e+03
b(14) = -1.3153e+02
b(15) = 1.5852e+01
b(16) = -1.7894e+01
b(17) = 7.7344e-01
b(18) = -1.1606e+00
b(19) = -1.8691e+00
b(20) = 5.6333e+00
b(21) = 5.4130e-02
b(22) = -3.5192e-03
b(23) = 1.7109e+03
b(24) = -1.8055e+03
b(25) = -6.1622e+03
b(26) = 9.2918e+01
b(27) = 2.2992e+00
b(28) = 2.4321e+04
b(29) = -3.2712e+03
b(30) = -2.0094e+03
b(31) = -8.4970e+02
b(32) = 6.7127e+02
b(33) = 5.4902e+02
b(34) = 1.6649e+03
b(35) = 3.9418e+01
b(36) = -8.6106e+01
b(37) = 2.8060e+03
b(38) = 8.4698e+02
b(39) = 4.0922e+01
b(40) = -4.1602e+01
b(41) = 3.6996e+01
b(42) = 2.7639e+01
b(43) = -3.6318e+01
b(44) = 1.9221e+01
b(45) = -1.3503e-01
b(46) = 4.1899e-01
b(47) = 3.5445e-02
b(48) = 3.4742e-03
b(49) = 1.0020e-01
b(50) = 9.6863e-01
b(51) = 1.0226e-01
b(52) = -1.0614e+00
b(53) = -7.4942e-01
b(54) = -6.7971e-01
b(55) = -2.5682e-02
b(56) = 1.6590e-03
b(57) = 6.0159e-04
b(58) = -3.3300e-04
b(59) = 6.4587e-04
b(60) = 4.1078e-04
b(61) = 8.1751e-04
b(62) = -4.3508e-06
b(63) = 1.0649e-05
b(64) = 1.0716e+03
b(65) = -3.1054e+02
b(66) = -9.7221e+02
b(67) = 2.0289e+03
b(68) = -9.5553e+02
b(69) = 2.5068e+02
b(70) = -1.2136e+01
b(71) = -2.9474e+00
b(72) = -8.2761e+00
b(73) = -5.5199e-01
b(74) = -1.3527e-01
b(75) = -2.5765e-01
b(76) = -6.1860e-01
b(77) = 4.1224e-03
b(78) = -3.8697e-04
b(79) = -1.8981e+03
b(80) = 1.5007e+03
b(81) = 5.7488e+02
b(82) = -1.3082e+01
b(83) = -3.1649e-01
b(84) = -3.6841e+03
</pre>


{{{polynomial_coefficient_vector}}}
|polynomial_powers_matrix=
<pre>
    0    0    0    0    0    0
    0    0    0    0    0    1
    0    0    0    0    1    0
    0    0    0    1    0    0
    0    0    1    0    0    0
    0    1    0    0    0    0
    1    0    0    0    0    0
    0    0    0    0    0    2
    0    0    0    0    1    1
    0    0    0    0    2    0
    0    0    0    1    0    1
    0    0    0    1    1    0
    0    0    0    2    0    0
    0    0    1    0    0    1
    0    0    1    0    1    0
    0    0    1    1    0    0
    0    0    2    0    0    0
    0    1    0    0    0    1
    0    1    0    0    1    0
    0    1    0    1    0    0
    0    1    1    0    0    0
    0    2    0    0    0    0
    1    0    0    0    0    1
    1    0    0    0    1    0
    1    0    0    1    0    0
    1    0    1    0    0    0
    1    1    0    0    0    0
    2    0    0    0    0    0
    0    0    0    0    0    3
    0    0    0    0    1    2
    0    0    0    0    2    1
    0    0    0    0    3    0
    0    0    0    1    0    2
    0    0    0    1    1    1
    0    0    0    1    2    0
    0    0    0    2    0    1
    0    0    0    2    1    0
    0    0    0    3    0    0
    0    0    1    0    0    2
    0    0    1    0    1    1
    0    0    1    0    2    0
    0    0    1    1    0    1
    0    0    1    1    1    0
    0    0    1    2    0    0
    0    0    2    0    0    1
    0    0    2    0    1    0
    0    0    2    1    0    0
    0    0    3    0    0    0
    0    1    0    0    0    2
    0    1    0    0    1    1
    0    1    0    0    2    0
    0    1    0    1    0    1
    0    1    0    1    1    0
    0    1    0    2    0    0
    0    1    1    0    0    1
    0    1    1    0    1    0
    0    1    1    1    0    0
    0    1    2    0    0    0
    0    2    0    0    0    1
    0    2    0    0    1    0
    0    2    0    1    0    0
    0    2    1    0    0    0
    0    3    0    0    0    0
    1    0    0    0    0    2
    1    0    0    0    1    1
    1    0    0    0    2    0
    1    0    0    1    0    1
    1    0    0    1    1    0
    1    0    0    2    0    0
    1    0    1    0    0    1
    1    0    1    0    1    0
    1    0    1    1    0    0
    1    0    2    0    0    0
    1    1    0    0    0    1
    1    1    0    0    1    0
    1    1    0    1    0    0
    1    1    1    0    0    0
    1    2    0    0    0    0
    2    0    0    0    0    1
    2    0    0    0    1    0
    2    0    0    1    0    0
    2    0    1    0    0    0
    2    1    0    0    0    0
    3    0    0    0    0    0
</pre>


}}<!--
|comments2=
 
-->{{#if:{{{polynomial_powers_matrix|}}}|The polynomial powers matrix corresponding to the polynomial coefficient vector is given by:


{{{polynomial_powers_matrix|}}}
|image=MCResponseSurface_Yp_exit_6dim_4deg.png


}}<!--
|comments3=Some comments about the image


-->{{#if:{{{comments2|}}}|
|statistics=
<pre>
---------------------------------------------------
Response surface summary of information:
Number of variables in response surface is 6.
Number of terms in polynomial is 210.
Degree of response surface is 4.


{{{comments2}}}
MSE = 0.02069806
MSE DoF = 9790


}}<!--
L-inf norm resid = 0.37829408


-->{{#if:{{{image|}}}|The following is a visualization of the response surface (non-visualized dimensions are kept constant at their mean value):
R^2 = 0.85452284
 
adjusted R^2 = 0.85141715
{{{image}}}
---------------------------------------------------
 
</pre>
}}<!--
-->{{#if:{{{comments3|}}}|
 
{{{comments3}}} }}<!--
 
-->{{#if:{{{statistics|}}}|Some key statistics for this response surface are given below:
 
{{{statistics}}}
 
}}<!--
-->{{#if:{{{comments4|}}}|


{{{comments4}}} }}<!--
|comments4=Comments about the statistics?


-->{{#if:{{{text|}}}|
|text=Some final thoughts here.
}}


{{{text}}} }}<!--
|}


-->
</noinclude>

Revision as of 23:18, 3 July 2011


This template creates/organizes information about response surfaces.

The usage is like this: 

{{{ResponseSurface
|title =
|link=
|comments1=
|polynomial_coefficient_vector=
|polynomial_powers_matrix=
|comments2=
|image=
|comments3=
|statistics=
|comments4=
|text=
}}}

Example

Download the response surface here: http://files.charlesmartinreid.com/ExperimentalDesign/MCResponseSurface_Yp_exit_6dim_4deg.mat
Some thoughts about this response surface?
The polynomial coefficient vector is given by: 
b(1) = 9.4335e+04 
b(2) = -7.1360e+04 
b(3) = -1.3930e+04 
b(4) = 2.4439e+04 
b(5) = 6.3177e+01 
b(6) = -7.3399e-01 
b(7) = -4.7962e+04 
b(8) = 2.5084e+04 
b(9) = 1.2428e+04 
b(10) = 9.7792e+02 
b(11) = -9.2480e+03 
b(12) = -5.1276e+03 
b(13) = -5.7739e+03 
b(14) = -1.3153e+02 
b(15) = 1.5852e+01 
b(16) = -1.7894e+01 
b(17) = 7.7344e-01 
b(18) = -1.1606e+00 
b(19) = -1.8691e+00 
b(20) = 5.6333e+00 
b(21) = 5.4130e-02 
b(22) = -3.5192e-03 
b(23) = 1.7109e+03 
b(24) = -1.8055e+03 
b(25) = -6.1622e+03 
b(26) = 9.2918e+01 
b(27) = 2.2992e+00 
b(28) = 2.4321e+04 
b(29) = -3.2712e+03 
b(30) = -2.0094e+03 
b(31) = -8.4970e+02 
b(32) = 6.7127e+02 
b(33) = 5.4902e+02 
b(34) = 1.6649e+03 
b(35) = 3.9418e+01 
b(36) = -8.6106e+01 
b(37) = 2.8060e+03 
b(38) = 8.4698e+02 
b(39) = 4.0922e+01 
b(40) = -4.1602e+01 
b(41) = 3.6996e+01 
b(42) = 2.7639e+01 
b(43) = -3.6318e+01 
b(44) = 1.9221e+01 
b(45) = -1.3503e-01 
b(46) = 4.1899e-01 
b(47) = 3.5445e-02 
b(48) = 3.4742e-03 
b(49) = 1.0020e-01 
b(50) = 9.6863e-01 
b(51) = 1.0226e-01 
b(52) = -1.0614e+00 
b(53) = -7.4942e-01 
b(54) = -6.7971e-01 
b(55) = -2.5682e-02 
b(56) = 1.6590e-03 
b(57) = 6.0159e-04 
b(58) = -3.3300e-04 
b(59) = 6.4587e-04 
b(60) = 4.1078e-04 
b(61) = 8.1751e-04 
b(62) = -4.3508e-06 
b(63) = 1.0649e-05 
b(64) = 1.0716e+03 
b(65) = -3.1054e+02 
b(66) = -9.7221e+02 
b(67) = 2.0289e+03 
b(68) = -9.5553e+02 
b(69) = 2.5068e+02 
b(70) = -1.2136e+01 
b(71) = -2.9474e+00 
b(72) = -8.2761e+00 
b(73) = -5.5199e-01 
b(74) = -1.3527e-01 
b(75) = -2.5765e-01 
b(76) = -6.1860e-01 
b(77) = 4.1224e-03 
b(78) = -3.8697e-04 
b(79) = -1.8981e+03 
b(80) = 1.5007e+03 
b(81) = 5.7488e+02 
b(82) = -1.3082e+01 
b(83) = -3.1649e-01 
b(84) = -3.6841e+03
The polynomial powers matrix corresponding to the polynomial coefficient vector is given by: 
     0     0     0     0     0     0
     0     0     0     0     0     1
     0     0     0     0     1     0
     0     0     0     1     0     0
     0     0     1     0     0     0
     0     1     0     0     0     0
     1     0     0     0     0     0
     0     0     0     0     0     2
     0     0     0     0     1     1
     0     0     0     0     2     0
     0     0     0     1     0     1
     0     0     0     1     1     0
     0     0     0     2     0     0
     0     0     1     0     0     1
     0     0     1     0     1     0
     0     0     1     1     0     0
     0     0     2     0     0     0
     0     1     0     0     0     1
     0     1     0     0     1     0
     0     1     0     1     0     0
     0     1     1     0     0     0
     0     2     0     0     0     0
     1     0     0     0     0     1
     1     0     0     0     1     0
     1     0     0     1     0     0
     1     0     1     0     0     0
     1     1     0     0     0     0
     2     0     0     0     0     0
     0     0     0     0     0     3
     0     0     0     0     1     2
     0     0     0     0     2     1
     0     0     0     0     3     0
     0     0     0     1     0     2
     0     0     0     1     1     1
     0     0     0     1     2     0
     0     0     0     2     0     1
     0     0     0     2     1     0
     0     0     0     3     0     0
     0     0     1     0     0     2
     0     0     1     0     1     1
     0     0     1     0     2     0
     0     0     1     1     0     1
     0     0     1     1     1     0
     0     0     1     2     0     0
     0     0     2     0     0     1
     0     0     2     0     1     0
     0     0     2     1     0     0
     0     0     3     0     0     0
     0     1     0     0     0     2
     0     1     0     0     1     1
     0     1     0     0     2     0
     0     1     0     1     0     1
     0     1     0     1     1     0
     0     1     0     2     0     0
     0     1     1     0     0     1
     0     1     1     0     1     0
     0     1     1     1     0     0
     0     1     2     0     0     0
     0     2     0     0     0     1
     0     2     0     0     1     0
     0     2     0     1     0     0
     0     2     1     0     0     0
     0     3     0     0     0     0
     1     0     0     0     0     2
     1     0     0     0     1     1
     1     0     0     0     2     0
     1     0     0     1     0     1
     1     0     0     1     1     0
     1     0     0     2     0     0
     1     0     1     0     0     1
     1     0     1     0     1     0
     1     0     1     1     0     0
     1     0     2     0     0     0
     1     1     0     0     0     1
     1     1     0     0     1     0
     1     1     0     1     0     0
     1     1     1     0     0     0
     1     2     0     0     0     0
     2     0     0     0     0     1
     2     0     0     0     1     0
     2     0     0     1     0     0
     2     0     1     0     0     0
     2     1     0     0     0     0
     3     0     0     0     0     0
The following is a visualization of the response surface (non-visualized dimensions are kept constant at their mean value):

MCResponseSurface_Yp_exit_6dim_4deg.png

Some comments about the image
Some key statistics for this response surface are given below: 
---------------------------------------------------
Response surface summary of information:
Number of variables in response surface is 6. 
Number of terms in polynomial is 210. 
Degree of response surface is 4.

MSE =			 0.02069806 
MSE DoF = 		 9790 

L-inf norm resid = 	 0.37829408 

R^2 =			 0.85452284 
adjusted R^2 =		 0.85141715 
---------------------------------------------------
Comments about the statistics?
Some final thoughts here.



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