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How do I write a recursive Function in matlab, it basically being a Markov chain! I tried writing a pseudo code for it and new to MATLAB:

The function goes this way:

   P= Probability
    x= status(0,1)
    Dij= probability to pick a site
    P(Status of Site(i) being x at next time step)= Summation[P(Status of Site(i) being x   at previous time step)*Dij]

I have tried code, can anyone tel me whether its right:

 function [t,index]= CopyingInfluenceModel
%%Define constants

% Initializing the variables
%assigining the initial conditions
%set index no i to 1(initial condition for i=1)
%% If the probability is zero, terminate while loop
while p(i)>=0
%calculate time step for given index no
t(i+1)= t(i);
%calculate the status_probability at given time t=(i+1)

%index i increases by 1 to calculate next probability
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If I may be so bold (and probably incorrect), it seems to me that this would be more cleanly done without recursion as in the linear solution for generating the fibonacci sequence (which is what you seem to be attempting to do) – im so confused Nov 9 '12 at 17:51
not a fibonnacci!! – happyme Nov 9 '12 at 19:03

1 Answer 1

up vote 2 down vote accepted

First the recursive "Hello World" factorial function in matlab:

function result=f(x)
if (x<=0)


It can be called like this:

>> f(4)
ans =

Not knowing much about Markov chains, I am making a guess here at what your function is supposed to do. First the code:

function yourmainscript
    % state 1 -> state 1: 50%
    % state 1 -> state 2: 50%
    % state 2 -> state 1: 25%
    % state 2 -> state 2: 75%
    D=[0.5 0.5; 0.25 0.75];
    p0=[1; 0];

    % Get probability that the system is in state number 1 at time step number 4
    % given the transition matrix D and the initial probabilities p0

function result=P(state, t, D, p0)
if t==0
    result=D(state,:)*arrayfun(@(x) P(x, t-1, D, p0), possible_states);

The parameters D and p0 describe the system and are just passed through unmodified. Using global variables or playing with function nesting will work for them, too, as long as they are accessible.

state is an integer between 1 and the total number of states that you deal with, t is an integer that represents the time step.

At t==0 we can use state as an index into p0 to get the probability. For t>0 I have rewritten the sum as a matrix multiplication:

We need the row of Dij (which is D(state,:) given by the current state and multiply it with the vector of the probabilities of all possible states at the last time step.

The line


is a column vector containing 1,2,3,...,last state and is needed in the next line. Arrayfun calls a function (first argument) for each element of an array (second argument) and stuffs the result into a vector. The first argument is a shorthand for defining the following function:

function result=wrapperfunction(x)
    % Assume t, D and p0 are in scope and the function P is known
    result=P(x, t-1, D, p0);

Please note that matlab is case sensitive, so if you define a function "Markov" then matlab still doesn't now about "markov".

Edit: Sorry, you have updated your code while I was composing this answer, so it may or may not apply to the updated version.

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