Data and Codes for 
Keller-Segel type approximation for nonlocal Fokker-Planck equations in one-dimensional bounded domain
by
Hideki Murakawa, Yoshitaro Tanaka

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We used the visualization software, GLSC3D to visualize the data.
GLSC3D (Japanese):
http://www3.u-toyama.ac.jp/akiyama/
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Figure 2 (a) and (b)
(a) code/nfp.c
To obtain the numerical solution, choose the integral kernel at line 56,
modify the parameters and domain size as in manuscript, and execute the program. 

(b) code/mks.c
To obtain the numerical solution, modify the parameters and domain size as in manuscript,
and execute the program. 

Figure 4
code/nfp.c
To obtain the numerical solution, choose the integral kernel at line 59,
modify the parameters and domain size as in manuscript, and execute the program. 

Figure 6
code/nfp.c
To obtain the numerical solution, choose the integral kernel at line 63,
modify the parameters and domain size as in manuscript, and execute the program. 

Figure 8
code/mks.c
To obtain the numerical solution, change the value of M into 2 at line 30,
use the lines 35-39 and 509-512 instead of 501-506, 
modify the parameters and domain size as in manuscript, and execute the program. 





