function res=chowlin_fix(Y,x,ta,s,type,rho)
% PURPOSE: Temporal disaggregation using the Chow-Lin method
%          rho parameter is fixed (supplied by the user)
% ------------------------------------------------------------
% SYNTAX: res=chowlin_fix(Y,x,ta,s,type,rho);
% ------------------------------------------------------------
% OUTPUT: res: a structure
%           res.meth    ='Chow-Lin';
%           res.ta      = type of disaggregation
%           res.type    = method of estimation
%           res.N       = nobs. of low frequency data
%           res.n       = nobs. of high-frequency data
%           res.pred    = number of extrapolations
%           res.s       = frequency conversion between low and high freq.
%           res.p       = number of regressors (including intercept)
%           res.Y       = low frequency data
%           res.x       = high frequency indicators
%           res.y       = high frequency estimate
%           res.y_dt    = high frequency estimate: standard deviation
%           res.y_lo    = high frequency estimate: sd - sigma
%           res.y_up    = high frequency estimate: sd + sigma
%           res.u       = high frequency residuals
%           res.U       = low frequency residuals
%           res.beta    = estimated model parameters
%           res.beta_sd = estimated model parameters: standard deviation
%           res.beta_t  = estimated model parameters: t ratios
%           res.rho     = innovational parameter
%           res.aic     = Information criterion: AIC
%           res.bic     = Information criterion: BIC
%           res.val     = Objective function used by the estimation method
%           res.r       = grid of innovational parameters used by the estimation method
% ------------------------------------------------------------
% INPUT: Y: Nx1 ---> vector of low frequency data
%        x: nxp ---> matrix of high frequency indicators (without intercept)
%        ta: type of disaggregation
%            ta=1 ---> sum (flow)
%            ta=2 ---> average (index)
%            ta=3 ---> last element (stock) ---> interpolation
%            ta=4 ---> first element (stock) ---> interpolation
%        s: number of high frequency data points for each low frequency data points 
%            s= 4 ---> annual to quarterly
%            s=12 ---> annual to monthly
%            s= 3 ---> quarterly to monthly
%        type: estimation method: 
%            type=0 ---> weighted least squares 
%            type=1 ---> maximum likelihood
%        rho: innovational parameter 0 < rho < 1
% ------------------------------------------------------------
% LIBRARY: aggreg
% ------------------------------------------------------------
% SEE ALSO: chowlin, litterman, fernandez, td_plot, td_print
% ------------------------------------------------------------
% REFERENCE: Chow, G. y Lin, A.L. (1971) "Best linear unbiased 
% distribution and extrapolation of economic time series by related 
% series", Review of Economic and Statistics, vol. 53, n. 4, p. 372-375. 

% written by:
% Enrique M. Quilis
% Instituto Nacional de Estadistica
% Paseo de la Castellana, 183
% 28046 - Madrid (SPAIN)

t0=clock;

% ------------------------------------------------------------
% Initital check

if ((rho <= -1) | (rho >=1))
   error (' *** INNOVATIONAL PARAMETER OUTSIDE OF ACCEPTABLE RANGE *** ');
end

% ------------------------------------------------------------
% Size of the problem

[N,M] = size(Y);    % Size of low-frequency input
[n,p] = size(x);    % Size of p high-frequency inputs (without intercept)

% ------------------------------------------------------------
% Preparing the X matrix: including an intercept

e=ones(n,1);   
x=[e x];       % Expanding the regressor matrix
p=p+1;         % Number of p high-frequency inputs (plus intercept)

% ------------------------------------------------------------
% Generating the aggregation matrix

C = aggreg(ta,N,s);

% -----------------------------------------------------------
% Expanding the aggregation matrix to perform
% extrapolation if needed.

if (n > s * N)
   pred=n-s*N;           % Number of required extrapolations 
   C=[C zeros(N,pred)];
else
   pred=0;
end

% -----------------------------------------------------------
% Temporal aggregation of the indicators

X=C*x;

% -----------------------------------------------------------
% Final estimation with fixed rho

I=eye(n); w=I;
LL=zeros(n,n);
for i=2:n
   LL(i,i-1)=-1; % Auxiliary matrix useful to simplify computations
end

Aux=I+rho*LL;
Aux(1,1)=sqrt(1-rho^2);
w=inv(Aux'*Aux);           % High frequency VCV matrix (without sigma_a)
W=C*w*C';                  % Low frequency VCV matrix (without sigma_a)
Wi=inv(W);
beta=(X'*Wi*X)\(X'*Wi*Y);  % beta estimator
U=Y-X*beta;                % Low frequency residuals
scp=U'*Wi*U;               % Weighted least squares
sigma_a=scp/(N-p);         % sigma_a estimator
L=w*C'*Wi;                 % Filtering matrix
u=L*U;                     % High frequency residuals

% -----------------------------------------------------------
% Temporally disaggregated time series

y=x*beta+u;

% -----------------------------------------------------------
% Information criteria
% Note: p is expanded to include the innovational parameter

aic=log(sigma_a)+2*(p+1)/N;
bic=log(sigma_a)+log(N)*(p+1)/N;

% -----------------------------------------------------------
% VCV matrix of high frequency estimates

sigma_beta=sigma_a*inv(X'*Wi*X);

VCV_y=sigma_a*(eye(n)-L*C)*w+(x-L*X)*sigma_beta*(x-L*X)';

d_y=sqrt((diag(VCV_y)));   % Std. dev. of high frequency estimates
y_li=y-d_y;           % Lower lim. of high frequency estimates
y_ls=y+d_y;           % Upper lim. of high frequency estimates

% -----------------------------------------------------------
% -----------------------------------------------------------
% Loading the structure

res.meth='Chow-Lin';

% -----------------------------------------------------------
% Basic parameters 

res.ta        = ta;
res.type      = type;
res.N         = N;
res.n         = n;
res.pred      = pred;
res.s         = s;
res.p         = p;

% -----------------------------------------------------------
% Series

res.Y         = Y;
res.x         = x;
res.y         = y;
res.y_dt      = d_y;
res.y_lo      = y_li;
res.y_up      = y_ls;

% -----------------------------------------------------------
% Residuals

res.u         = u;
res.U         = U;

% -----------------------------------------------------------
% Parameters

res.beta      = beta;
res.beta_sd   = sqrt(diag(sigma_beta));
res.beta_t    = beta./sqrt(diag(sigma_beta));
res.rho       = rho;

% -----------------------------------------------------------
% Information criteria

res.aic       = aic;
res.bic       = bic;

% -----------------------------------------------------------
% Objective function (constant)

h_lim=199;        % Number of grid points
inc_rho=0.01;     % Step between grid points
r(1:h_lim)=0;
val(1:h_lim)=0;
r(1)=-0.99;
for h=2:h_lim
   r(h)=r(h-1)+inc_rho;
end

res.val=val;
res.r=r;

% -----------------------------------------------------------
% Elapsed time

res.et        = etime(clock,t0);


res.w=sigma_a*w;  %<== TO BE DELETED