format version = 1.0
 
 
 begin solution of problem gma_bifeedb1                  
 
 date = 20100925 0223
 url = http://www.odeidentification.org
 
 // Settings for the Gennemark & Wedelin (2007) algorithm
 randomStarts_ =           30             1
 smoothingParameter =   1.000000000000000E-008
 randomSeed =            1
 
 
 
 // VARIABLE            1
  
reaction_1 of variable_1
has type = GMAterm1Variable              
has variable X1 = variable_1
has parameter k1 =  -0.499095660974D+00
has parameter k2 =   0.200274898918D+01
  
reaction_2 of variable_1
has type = GMAterm0Variables             
has parameter k1 =   0.492423862176D+01
  
reaction_3 of variable_1
has type = GMAterm1Variable              
has variable X1 = variable_3
has parameter k1 =  -0.484019847510D+01
has parameter k2 =   0.557752014569D-01
  
 
 
 // VARIABLE            2
  
reaction_1 of variable_2
has type = GMAterm1Variable              
has variable X1 = variable_1
has parameter k1 =   0.349506116489D+00
has parameter k2 =   0.217096089094D+01
  
reaction_2 of variable_2
has type = GMAterm1Variable              
has variable X1 = variable_1
has parameter k1 =  -0.153947242480D+01
has parameter k2 =   0.914516770777D+00
  
reaction_3 of variable_2
has type = GMAterm1Variable              
has variable X1 = variable_4
has parameter k1 =   0.467806782573D+00
has parameter k2 =   0.622294880859D+00
  
reaction_4 of variable_2
has type = GMAterm2Variables             
has variable X1 = variable_1
has variable X2 = variable_2
has parameter k1 =   0.886915495060D+00
has parameter k2 =   0.987322438053D+00
has parameter k3 =  -0.225232120012D+00
  
 
 
 // VARIABLE            3
  
reaction_1 of variable_3
has type = GMAterm0Variables             
has parameter k1 =  -0.145739488083D+01
  
reaction_2 of variable_3
has type = GMAterm2Variables             
has variable X1 = variable_1
has variable X2 = variable_2
has parameter k1 =  -0.911482666143D+00
has parameter k2 =   0.990573980460D+00
has parameter k3 =  -0.219953096024D+00
  
reaction_3 of variable_3
has type = GMAterm1Variable              
has variable X1 = variable_3
has parameter k1 =   0.507701619145D+00
has parameter k2 =  -0.276793082927D+00
  
reaction_4 of variable_3
has type = GMAterm1Variable              
has variable X1 = variable_1
has parameter k1 =   0.168502476127D+01
has parameter k2 =   0.995239519256D+00
  
 
 
 // VARIABLE            4
  
reaction_1 of variable_4
has type = GMAterm1Variable              
has variable X1 = variable_4
has parameter k1 =  -0.464670062861D+00
has parameter k2 =   0.612526829322D+00
  
reaction_2 of variable_4
has type = GMAterm0Variables             
has parameter k1 =   0.130015218151D+00
  
 
 
 // INITIAL VALUES
 // Perfect data, not required
 
 
 // ERROR 
 // error = -L + lambda * K
 // residual = -L
 error =   0.254702921494655     
 residual =   4.702927082590735E-003
  
 end of solution of problem gma_bifeedb1