Example selectivity

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Introduction

In this example, we show how to calculate selectivities and how to perform a degree of selectivity control analysis. We perform a calculation on a relatively simple chemokinetic network wherein a product A can be converted to product E or F. We wish to analyze which elementary reaction steps control the selectivity to E or F.

Input

In this example, the following input file is used:

&compounds
A;		0;	1
E;		0;	0
F;		0;	0
A*;		1;	0 ; 1
B*;		1;	0 ; 1
C*;		1;	0 ; 1
D*;		1;	0 ; 1
E*;		1;	0 ; 1
F*;		1;	0 ; 1
*;		1;	1.0
&reactions
#						m^2		amu			K	sigma	sticking	J/mol
HK; {A} + {*} => {A*};	1e-20;	  1;	   1;	 1;		1;			 80e3 ; 1
HK; {E} + {*} => {E*};	1e-20;	  1;	   1;	 1;		1;			 80e3 ; 1
HK; {F} + {*} => {F*};	1e-20;	  1;	   1;	 1;		1;			 80e3 ; 1
#									vf		vb		Eaf		Eab
AR; {A*}	     => {B*};			1e13;	1e13;	 90e3;	 90e3 ;1
AR; {B*}	     => {C*};			1e13;	1e13;	 80e3;	 90e3 ;1
AR; {B*}             => {D*};	1e13;	1e13;	 70e3;	 80e3 ;1
AR; {C*}	     => {E*};			1e13;	1e13;	 70e3;	120e3 ;1
AR; {D*}	     => {F*};			1e13;	1e13;	 70e3;	 90e3 ;1
&settings
TYPE = SEQUENCERUN
PRESSURE = 1
REAGENTS = {A}
KEYCOMPONENT = {F}
EACT=1
ORDERS=1
DRC=1
TDRC=0
DEBUG=1
USETIMESTAMP=0
&runs
300;	1e6;	1e-10;	1e-10
350;	1e6;	1e-10;	1e-10
400;	1e6;	1e-10;	1e-10
450;	1e5;	1e-10;	1e-10
500;	1e4;	1e-10;	1e-10
550;	1e3;	1e-10;	1e-10
600;	1e2;	1e-10;	1e-10
650;	1e1;	1e-10;	1e-10
700;	1e1;	1e-10;	1e-10
750;	1e1;	1e-10;	1e-10
800;	1e0;	1e-10;	1e-10
850;	1e0;	1e-10;	1e-10
900;	1e0;	1e-10;	1e-10
950;	1e0;	1e-10;	1e-10
1000;	1e0;	1e-10;	1e-10
1100;	1e0;	1e-10;	1e-10
1200;	1e0;	1e-10;	1e-10
1300;	1e0;	1e-10;	1e-10
1400;	1e0;	1e-10;	1e-10
1500;	1e0;	1e-10;	1e-10
1600;	1e0;	1e-10;	1e-10
1700;	1e0;	1e-10;	1e-10
1800;	1e0;	1e-10;	1e-10
1900;	1e0;	1e-10;	1e-10
2000;	1e0;	1e-10;	1e-10

Running the calculation

The first step is to perform a regular calculation.

./mkmcxx -i input.mkm
Turn-over-frequencies as a function of temperature.

This results in the creation of a run folder wherein all the raw data is written. A plot of the turn-over frequencies is given on the right. We can easily see that there is a distinct selectivity pattern for E over F.

Performing the selectivity analysis

From the above calculation, we have seen that products E and F are both presents at all temperatures. Here, we wish to calculate the selectivity towards E and F using A as our key component. To do so, we have to add the following lines to our input file:

&selectivity
species_balance; {A}; {E},{F}

If we would now rerun the simulation, we would obtain the graphs we are interested in. However, all the data relevant to calculate the selectivity and the degree of selectivity control is already done in the previous calculation and it would be a waste of time to re-calculate these. Luckily, we can make use of a short-cut. In every calculation wherein a DRC analysis is performed, the raw data is written to a file termed drcrates.bin. We are going to load the rates and the drc analysis of the previous calculation from this file and perform the selectivity analysis on this data. The command to do so is as follows:

./mkmcxx -i input.mkm -o run/ -s

Note that the first part stays the same. We have added two additional directives, -o run and -s. The first directive tells the program to look for drcrates.bin in the run. The second directive indicates that we wish to perform a sensitivity analysis.

The result should look something like this

Writing graphs for sensitivity analysis...
Writing run/graphs/pdf/selectivity_bar_species_balance.pdf
Writing run/graphs/png/selectivity_bar_species_balance.png
Writing run/graphs/pdf/selectivity_line_species_balance.pdf
Writing run/graphs/png/selectivity_line_species_balance.png
Writing run/graphs/pdf/dsc_species_balance_E.pdf
Writing run/graphs/png/dsc_species_balance_E.png
Writing run/graphs/pdf/dsc_species_balance_F.pdf
Writing run/graphs/png/dsc_species_balance_F.png

For each line in the selectivity block, a bar and a line graph for the selectivity is made. Furthermore, for each product in these blocks, an additional degree of selectivity control graph is made.

Selectivity between E and F as a function of temperature.
Selectivity between E and F as a function of temperature.