I'm trying to make a parameters estimation on Lotka-Volterra model with Scilab (I am a total neophyte). When I try to run the script, Scilab warns about incoherent subtraction. I guess my problem is the same as in this topic, but the solution there uses a Matlab function.
Here is my script:
// 1. Create Lotka Volterra function function [dY]=LotkaVolterra(t,X,c,n,m,e) IngestC = c * X(1) * X(2) GrowthP = n * X(1) MortC = m * X(2) dY(1) = GrowthP - IngestC dY(2) = IngestC * e - MortC endfunction // 2. Define the Nonlinear Least Squares functions function f = Differences ( x ) // Returns the difference between the simulated differential // equation and the experimental data. c = x(1) ;n = x(2);m = x(3);e = x(4);y0 = y_exp(1,:);t0 = 0 y_calc=ode(y0',t0,t,list(LotkaVolterra,c,n,m,e)) diffmat = y_calc' - y_exp f = diffmat(:) endfunction function val = L_Squares ( x ) // Computes the sum of squares of the differences. f = Differences ( x ) val = sum(f.^2) endfunction // Experimental data t = [0:19]'; H=[20,20,20,12,28,58,75,75,88,61,75,88,69,32,13,21,30,2,153,148]; L=[30,45,49,40,21,8,6,5,10,20,33,34,30,21,14,8,4,4,14,38]; y_exp=[H',L']; // compute the model cost function function [f, g, ind] = modelCost (x, ind) f = L_Squares ( x ) g = derivative ( L_Squares , x ) endfunction // use of optim function with loops to avoid local minimum tic i=0 fitminx=zeros(4,100); fitminy=zeros(1,100); for c=[0:0.1:1] for n=[0:0.1:1] for m=[0:0.1:1] for e=[0:0.1:1] i=i+1 x0 = [c;n;m;e] [ fopt , xopt , gopt ] = optim ( modelCost , x0 ) fitminx(:,i)=xopt; fitminy(:,i)=fopt; end end end end [a,b]=min(fitminy) fitminx(:,a) toc
the error message is :
lsoda-- at t (=r1), mxstep (=i1) steps needed before reaching tout where i1 is : 500 where r1 is : 0.4145715729197D+01 Attention : Le résultat est peut être inexact. !--error 9 Soustraction incohérente. at line 4 of function Differences called by : at line 2 of function L_Squares called by : at line 16 of function %R_ called by : at line 15 of function %deriv1_ called by : at line 58 of function derivative called by : at line 3 of function modelCost called by : [ fopt , xopt , gopt ] = optim ( modelCost , x0 )
thanks for the interest and the time you give to my problem (and sorry for my english)