how to find integral absolute error

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bhanu kiran vandrangi
bhanu kiran vandrangi el 8 de Ag. de 2021
Comentada: Walter Roberson el 8 de Ag. de 2021
i need to derive a cost function from one of performance indices ( i took IAE as my performance index)
my reference value(steady state) is 7.5 and my output is a function of (t,d,e) where d,e constants vary between (0.1)
how to do the integration to find integral absolute error

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Walter Roberson
Walter Roberson el 8 de Ag. de 2021
Ran in:
syms d e t
f(t) = d*exp(-t^2*e)
f(t) = 
reference = 7.5;
final_time = 10
final_time = 10
IAE = int(abs(f(t) - reference), t, 0, final_time)
IAE = 
subs(IAE, [d, e], [1/5, 2/3])
ans = 
  2 comentarios
bhanu kiran vandrangi
bhanu kiran vandrangi el 8 de Ag. de 2021
thanks
instead of substituting the values of d,e can i use 'IAE' that we got ,as cost function to optimize the values of 'd' , 'e'
Walter Roberson
Walter Roberson el 8 de Ag. de 2021
Ran in:
syms d e t
f(t) = d*exp(-t^2*e)
f(t) = 
reference = 7.5;
final_time = 10
final_time = 10
diff_function = f(t) - reference;
IAE = int(abs(diff_function), t, 0, final_time)
IAE = 
best_d = solve(diff_function,d)
best_d = 
diff_function2 = subs(diff_function, d, best_d)
diff_function2 = 
0
best_e = solve(diff(diff_function2, e), e)
best_e = 
0
best_d = subs(best_d, e, best_e)
best_d = 
best_f = subs(f, [d, e], [best_d, best_e])
best_f(t) = 
Which is to say that for this particular function, f(t), with d and e in that particular relationship to the function, that the best function (smallest IAE) occurs when the function is the constant function equal to the reference value.
The approach used here is the standard calculus approach: the critical points of a function are the points at which the derivative of the function are equal to 0. When the function to be optimized is an integral, then the derivative is the thing that was being integrated... so solve f(t)-reference == 0 for d and e. If the function never equals the reference over the permitted range of d and e, then the best IAE occurs at one of the boundary points.

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