Programmer Guide/Command Reference/EVAL/rpolyreg: Difference between revisions

Latest revision as of 12:38, 21 April 2011

Linear, multivariant and polynominal regression.

Usage 1

rpolyreg(x_vector, y_vector {, m}):

Result 1

Approximate the function y using polynominal regression. The result is the vector r with the m+1 coefficients of the regression polynom.

y_REG[i] = r[0] + r[1]*x[i] {+ r[2]*x[i]^2 + .. + r[m]*x[i]^m}

Usage 2

rpolyreg(x_matrix, y_vector {, m}):

x: x data matrix, the regression order is the number of independent variables m=ncol(x)
y: y data vector: y[i] = f(x[i,*])

Result 2

Approximate the function y using multivariant linear regression. The result is the vector r with the m+1 regression coefficients.

y_REG[i] = r[0] + r[1]*x[i,0] + .. + r[m]*x[i,m-1]

@@ Line 12: / Line 12: @@
 :;<var>x</var>: ''x'' data matrix, the regression order is the number of independent variables <code>''m''=ncol(''x'')</code>
 :;<var>y</var>: ''y'' data vector: <code>''y''[i] = f(''x''[i,*])</code>
-;Result 2: Approximate the function ''y'' using a multivariant linear regression. The result is the vector ''r'' with the ''m''+1 regression coefficients.
+;Result 2: Approximate the function ''y'' using multivariant linear regression. The result is the vector ''r'' with the ''m''+1 regression coefficients.
 ::<code>''y''<sub>REG</sub>[i] = ''r''[0] + ''r''[1]*''x''[i,0] + .. + ''r''[''m'']*''x''[i,''m''-1]</code>
 ----
-;See also: [[Programmer_Guide/Command_Reference/EVAL/rpoly|rpoly]], [[Programmer_Guide/Command_Reference/EVAL/interp|interp]]
+;See also: [[../rpoly|rpoly]], [[../interp|interp]], [[../rleqs|rleqs, cleqs]], [[../svd|svd]]
-[[Programmer_Guide/Command_Reference/EVAL#Functions|<function list>]]
+[[../#Functions|<function list>]]