Difference between revisions of "Methanol to Hydrocarbons problem (TACO)"

From mintOC
Jump to: navigation, search
m (Text replacement - "<bibreferences/>" to "<biblist />")
m (Text replacement - "\<bibref\>(.*)\<\/bibref\>" to "<bib id="$1" />")
 
Line 1: Line 1:
This page contains a model of the [[Methanol to Hydrocarbons problem]] in [http://www.ampl.org AMPL] format, making use of the TACO toolkit for AMPL control optimization extensions. This problem is due to <bibref>Floudas1999</bibref> and <bibref>Maria1989</bibref>. The original model using a collocation formulation can be found in the [http://www.mcs.anl.gov/~more/cops/ COPS library].
+
This page contains a model of the [[Methanol to Hydrocarbons problem]] in [http://www.ampl.org AMPL] format, making use of the TACO toolkit for AMPL control optimization extensions. This problem is due to <bib id="Floudas1999" /> and <bib id="Maria1989" />. The original model using a collocation formulation can be found in the [http://www.mcs.anl.gov/~more/cops/ COPS library].
 
Note that you will need to include a generic [[support AMPL files|AMPL/TACO support file]], OptimalControl.mod.
 
Note that you will need to include a generic [[support AMPL files|AMPL/TACO support file]], OptimalControl.mod.
 
To solve this model, you require an optimal control or NLP code that uses the TACO toolkit to support the AMPL optimal control extensions.
 
To solve this model, you require an optimal control or NLP code that uses the TACO toolkit to support the AMPL optimal control extensions.

Latest revision as of 21:32, 30 December 2015

This page contains a model of the Methanol to Hydrocarbons problem in AMPL format, making use of the TACO toolkit for AMPL control optimization extensions. This problem is due to [Floudas1999]Author: C.A. Floudas; P.M. Pardalos; C.S. Adjiman; W.R. Esposito; Z.H. Gumus; S.T. Harding; J.L. Klepeis; C.A. Meyer; C.A. Schweiger
Publisher: Kluwer Academic Publishers
Title: Handbook of Test Problems for Local and Global Optimization
Year: 1999
Link to Google Scholar
and [Maria1989]Author: G. Maria
Journal: Can. J. Chem. Eng.
Pages: 825
Title: An adaptive strategy for solving kinetic model concomitant estimation-reduction problems
Volume: 67
Year: 1989
Link to Google Scholar
. The original model using a collocation formulation can be found in the COPS library. Note that you will need to include a generic AMPL/TACO support file, OptimalControl.mod. To solve this model, you require an optimal control or NLP code that uses the TACO toolkit to support the AMPL optimal control extensions.

AMPL

This is the source file methanol_taco.mod

# ----------------------------------------------------------------
# Methanol to Hydrocarbons problem using AMPL and TACO
# (c) Christian Kirches, Sven Leyffer
#
# Source: COPS 3.1 collocation formulation - March 2004
#         Michael Merritt - Summer 2000
# ----------------------------------------------------------------
include OptimalControl.mod;
 
var t;
 
param ne := 3;                       # number of differential equations
param np := 5;                       # number of ODE parameters
param nm > 0, integer;               # number of measurements
 
param bc {1..ne};                    # ODE initial conditions
param tau {1..nm};                   # times at which observations made
 
param z {1..nm, 1..ne};              # observations
var theta {1..np} := 1.0;            #  ODE parameters
 
var u {s in 1..ne};
 
minimize l2error{j in 1..nm}:
  eval (sum {s in 1..ne}(u[s] - z[j,s])^2, tau[j]);
 
subject to theta_bounds {i in 1..np}: theta[i] >= 0.0;      
 
subject to bc_cond {s in 1..ne}:  eval (u[s], 0) = bc[s];
 
subject to eqn1:
  diff(u[1],t) = - (2*theta[2] - 
                 (theta[1]*u[2])/((theta[2]+theta[5])*u[1]+u[2]) +
                 theta[3] + theta[4])*u[1];
 
subject to eqn2:
  diff(u[2],t) = (theta[1]*u[1]*(theta[2]*u[1]-u[2]))/
               ((theta[2]+theta[5])*u[1]+u[2]) +
               theta[3]*u[1];
 
subject to eqn3:
  diff(u[3],t) = (theta[1]*u[1]*(u[2]+theta[5]*u[1]))/
               ((theta[2]+theta[5])*u[1]+u[2]) +
               theta[4]*u[1];
 
data methanol_taco.dat;
 
option solver ...;
 
solve;

This is the data file methanol_taco.dat

# Time measurements
 
param tau := 
      1  0
      2  0.050
      3  0.065
      4  0.080
      5  0.123
      6  0.233
      7  0.273
      8  0.354
      9  0.397
     10  0.418
     11  0.502
     12  0.553
     13  0.681
     14  0.750
     15  0.916
     16  0.937
     17  1.122;
 
# Concentrations
 
param z: 1        2         3   :=
 1    1.0000         0         0
 2    0.7085    0.1621    0.0811
 3    0.5971    0.1855    0.0965
 4    0.5537    0.1989    0.1198
 5    0.3684    0.2845    0.1535
 6    0.1712    0.3491    0.2097
 7    0.1198    0.3098    0.2628
 8    0.0747    0.3576    0.2467
 9    0.0529    0.3347    0.2884
10    0.0415    0.3388    0.2757
11    0.0261    0.3557    0.3167
12    0.0208    0.3483    0.2954
13    0.0085    0.3836    0.2950
14    0.0053    0.3611    0.2937
15    0.0019    0.3609    0.2831
16    0.0018    0.3485    0.2846
17    0.0006    0.3698    0.2899;
 
param bc := 1 1 2 0 3 0;

Other Descriptions

Other descriptions of this problem are available in

References

There were no citations found in the article.