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Chapter Contents
Chapter Introduction
NAG Toolbox

NAG Toolbox: nag_tsa_uni_garch_gjr_forecast (g13ff)

 Contents

    1  Purpose
    2  Syntax
    7  Accuracy
    9  Example

Purpose

nag_tsa_uni_garch_gjr_forecast (g13ff) forecasts the conditional variances, ht, for t=T+1,,T+ξ from a GJR GARCHp,q sequence, where ξ is the forecast horizon and T is the current time (see Glosten et al. (1993)).

Syntax

[fht, ifail] = g13ff(nt, ip, iq, theta, gamma, ht, et, 'num', num)
[fht, ifail] = nag_tsa_uni_garch_gjr_forecast(nt, ip, iq, theta, gamma, ht, et, 'num', num)

Description

Assume the GARCHp,q process can be represented by:
ht = α0 + i=1 q αi + γ It-i ε t-i 2 + i=1 p βi ht-i ,   t=1,2,,T .  
where εtψt-1=N0,ht or εtψt-1=Stdf,ht, and It=1, if εt<0, or It=0, if εt0, has been modelled by nag_tsa_uni_garch_gjr_estim (g13fe), and the estimated conditional variances and residuals are contained in the arrays ht and et respectively.
nag_tsa_uni_garch_gjr_forecast (g13ff) will then use the last maxp,q elements of the arrays ht and et to estimate the conditional variance forecasts, htψT, where t=T+1,,T+ξ and ξ is the forecast horizon.

References

Bollerslev T (1986) Generalised autoregressive conditional heteroskedasticity Journal of Econometrics 31 307–327
Engle R (1982) Autoregressive conditional heteroskedasticity with estimates of the variance of United Kingdom inflation Econometrica 50 987–1008
Engle R and Ng V (1993) Measuring and testing the impact of news on volatility Journal of Finance 48 1749–1777
Glosten L, Jagannathan R and Runkle D (1993) Relationship between the expected value and the volatility of nominal excess return on stocks Journal of Finance 48 1779–1801
Hamilton J (1994) Time Series Analysis Princeton University Press

Parameters

Compulsory Input Parameters

1:     nt int64int32nag_int scalar
ξ, the forecast horizon.
Constraint: nt>0.
2:     ip int64int32nag_int scalar
The number of coefficients, βi, for i=1,2,,p.
Constraints:
  • maxip,iq20;
  • ip0.
3:     iq int64int32nag_int scalar
The number of coefficients, αi, for i=1,2,,q.
Constraints:
  • maxip,iq20;
  • iq1.
4:     thetaiq+ip+1 – double array
The first element must contain the coefficient αo and the next iq elements must contain the coefficients αi, for i=1,2,,q. The remaining ip elements must contain the coefficients βj, for j=1,2,,p.
5:     gamma – double scalar
The asymmetry parameter γ for the GARCHp,q sequence.
6:     htnum – double array
The sequence of past conditional variances for the GARCHp,q process, ht, for t=1,2,,T.
7:     etnum – double array
The sequence of past residuals for the GARCHp,q process, εt, for t=1,2,,T.

Optional Input Parameters

1:     num int64int32nag_int scalar
Default: the dimension of the arrays ht, et. (An error is raised if these dimensions are not equal.)
The number of terms in the arrays ht and et from the modelled sequence.
Constraint: maxip,iqnum.

Output Parameters

1:     fhtnt – double array
The forecast values of the conditional variance, ht, for t=T+1,,T+ξ.
2:     ifail int64int32nag_int scalar
ifail=0 unless the function detects an error (see Error Indicators and Warnings).

Error Indicators and Warnings

Errors or warnings detected by the function:
   ifail=1
On entry,num<maxip,iq,
oriq<1,
orip<0,
ormaxip,iq>20,
ornt0.
   ifail=-99
An unexpected error has been triggered by this routine. Please contact NAG.
   ifail=-399
Your licence key may have expired or may not have been installed correctly.
   ifail=-999
Dynamic memory allocation failed.

Accuracy

Not applicable

Further Comments

None.

Example

See Example in nag_tsa_uni_garch_gjr_estim (g13fe).
function g13ff_example


fprintf('g13ff example results\n\n');

mn  = int64(1);
nreg = int64(2);
yt = [7.23; 6.75; 7.21; 7.08; 6.60;
      6.59; 7.00; 7.06; 6.82; 6.99;
      7.05; 6.12; 7.47; 6.99; 7.26;
      6.42; 7.12; 6.77; 7.32; 6.03;
      6.78; 7.04; 6.27; 7.30; 7.71;
      6.62; 8.13; 7.69; 7.62; 6.64;
      8.16; 6.95; 7.15; 7.61; 7.42;
      7.56; 8.25; 7.43; 7.84; 7.24;
      7.63; 8.45; 8.17; 7.40; 7.62;
      8.89; 8.14; 8.90; 7.79; 7.19;
      7.55; 7.41; 7.93; 7.43; 8.87;
      7.27; 8.09; 7.15; 8.21; 8.19;
      7.84; 7.99; 8.90; 8.24; 7.97;
      8.30; 8.23; 7.98; 7.73; 8.50;
      7.71; 7.70; 8.61; 7.68; 8.66;
      8.85; 8.09; 7.45; 6.15; 6.28;
      7.59; 6.78; 9.32; 9.16; 8.77;
      8.27; 7.24; 7.73; 9.01; 9.09;
      7.55; 8.64; 7.97; 8.20; 7.72;
      8.47; 8.06; 5.55; 8.75; 10.15];
x = [2.40, 0.12;  2.40, 0.12; 2.40, 0.13; 2.40, 0.14;
     2.40, 0.14;  2.40, 0.15; 2.40, 0.16; 2.40, 0.16;
     2.40, 0.17;  2.41, 0.18; 2.41, 0.19; 2.41, 0.19;
     2.41, 0.20;  2.41, 0.21; 2.41, 0.21; 2.41, 0.22;
     2.41, 0.23;  2.41, 0.23; 2.41, 0.24; 2.42, 0.25;
     2.42, 0.25;  2.42, 0.26; 2.42, 0.26; 2.42, 0.27;
     2.42, 0.28;  2.42, 0.28; 2.42, 0.29; 2.42, 0.30;
     2.42, 0.30;  2.43, 0.31; 2.43, 0.32; 2.43, 0.32;
     2.43, 0.33;  2.43, 0.33; 2.43, 0.34; 2.43, 0.35;
     2.43, 0.35;  2.43, 0.36; 2.43, 0.37; 2.44, 0.37;
     2.44, 0.38;  2.44, 0.38; 2.44, 0.39; 2.44, 0.39;
     2.44, 0.40;  2.44, 0.41; 2.44, 0.41; 2.44, 0.42;
     2.44, 0.42;  2.45, 0.43; 2.45, 0.43; 2.45, 0.44;
     2.45, 0.45;  2.45, 0.45; 2.45, 0.46; 2.45, 0.46;
     2.45, 0.47;  2.45, 0.47; 2.45, 0.48; 2.46, 0.48;
     2.46, 0.49;  2.46, 0.49; 2.46, 0.50; 2.46, 0.50;
     2.46, 0.51;  2.46, 0.51; 2.46, 0.52; 2.46, 0.52;
     2.46, 0.53;  2.47, 0.53; 2.47, 0.54; 2.47, 0.54;
     2.47, 0.54;  2.47, 0.55; 2.47, 0.55; 2.47, 0.56;
     2.47, 0.56;  2.47, 0.57; 2.47, 0.57; 2.48, 0.57;
     2.48, 0.58;  2.48, 0.58; 2.48, 0.59; 2.48, 0.59;
     2.48, 0.59;  2.48, 0.60; 2.48, 0.60; 2.48, 0.61;
     2.48, 0.61;  2.49, 0.61; 2.49, 0.62; 2.49, 0.62;
     2.49, 0.62;  2.49, 0.63; 2.49, 0.63; 2.49, 0.63;
     2.49, 0.64;  2.49, 0.64; 2.49, 0.64; 2.50, 0.64];
dist = 't';
ip = int64(1);
iq = int64(1);
copts = [true; true];
maxit = int64(200);
tol = 0.00001;
hp = 0;
% Theta is [alpha_0; alpha_1; beta_1; gamma; df; b_0]
theta = [0.025; 0.05; 0.4; 0.045; 3.25; 1.5; 0; 0];
nt = int64(4);
% Fit the GARCH model
[theta, se, sc, covr, hp, et, ht, lgf, ifail] = ...
  g13fe( ...
         dist, yt, x, ip, iq, mn, theta, hp, copts, maxit, tol);

% Extract the estimate of the asymmetry parameter from theta
gamma = theta(4);

% Calculate the volatility forecast
[fht, ifail] = g13ff( ...
                      nt, ip, iq, theta, gamma, ht, et);

% Output the results
fprintf('\n               Parameter        Standard\n');
fprintf('               estimates         errors\n');

% Output the coefficient alpha_0
fprintf('Alpha0 %16.2f%16.2f\n', theta(1), se(1));
l = 2;

% Output the coefficients alpha_i
for i = l:l+iq-1
  fprintf('Alpha%d %16.2f%16.2f\n', i-1, theta(i), se(i));
end
l = l+iq;

% Output the coefficients beta_j
fprintf('\n');
for i = l:l+ip-1
  fprintf(' Beta%d %16.2f%16.2f\n', i-l+1, theta(i), se(i));
end
l = l+ip;

% Output the estimated asymmetry parameter, gamma
fprintf('\n Gamma %16.2f%16.2f\n', theta(l), se(l));
l = l+1;

% Output the estimated degrees of freedom, df
if (dist == 't')
  fprintf('\n    DF %16.2f%16.2f\n', theta(l), se(l));
  l = l + 1;
end

% Output the estimated mean term, b_0
if (mn == 1)
  fprintf('\n    B0 %16.2f%16.2f\n', theta(l), se(l));
  l = l + 1;
end

% Output the estimated linear regression coefficients, b_i
for i = l:l+nreg-1
  fprintf('    B%d %16.2f%16.2f\n', i-l+1, theta(i), se(i));
end

% Display the volatility forecast
fprintf('\nVolatility forecast = %12.2f\n', fht(nt));


g13ff example results


               Parameter        Standard
               estimates         errors
Alpha0             0.08            0.12
Alpha1             0.00            0.85

 Beta1             0.67            0.19

 Gamma             0.35            0.63

    DF             5.03            5.13

    B0            50.22            3.33
    B1           -18.48            1.43
    B2             6.45            0.54

Volatility forecast =         0.61

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Chapter Contents
Chapter Introduction
NAG Toolbox

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