introduction to time series regression and forecasting sw chapter 14

1. 1 Introduction to Time Series Regression and Forecasting(SW Chapter 14)

2. 2

3. 3 Example #2: US rate of unemployment

4. 4 Why use time series data?

5. 5 Time series data raises new technical issues

6. 6 Using Regression Models for Forecasting (SW Section 14.1)

7. 7 Introduction to Time Series Data and Serial Correlation (SW Section 14.2)

8. 8 We will transform time series variables using lags, first differences, logarithms, & growth rates

9. 9 Example: Quarterly rate of inflation at an annual rate (U.S.)

10. 10 Example: US CPI inflation � its first lag and its change

11. 11 Autocorrelation

12. 12

13. 13 Sample autocorrelations

14. 14 Example:

15. 15

16. 16 Other economic time series:

17. 17 Other economic time series, ctd:

18. 18 Stationarity: a key requirement for external validity of time series regression

19. 19 Autoregressions(SW Section 14.3)

20. 20 The First Order Autoregressive (AR(1)) Model

21. 21 Example: AR(1) model of the change in inflation

22. 22 Example: AR(1) model of inflation � STATA

23. 23 Example: AR(1) model of inflation � STATA, ctd.

24. 24 Example: AR(1) model of inflation � STATA, ctd

25. 25 Forecasts: terminology and notation

26. 26 Forecast errors

27. 27 Example: forecasting inflation using an AR(1)

28. 28 The AR(p) model: using multiple lags for forecasting

29. 29 Example: AR(4) model of inflation

30. 30 Example: AR(4) model of inflation � STATA

31. 31 Example: AR(4) model of inflation � STATA, ctd.

32. 32 Digression: we used ?Inf, not Inf, in the AR�s. Why?

33. 33 So why use ?Inft, not Inft?

34. 34 Time Series Regression with Additional Predictors and the Autoregressive Distributed Lag (ADL) Model (SW Section 14.4)

35. 35 Example: inflation and unemployment

36. 36 The empirical U.S. �Phillips Curve,� 1962 � 2004 (annual)

37. 37 The empirical (backwards-looking) Phillips Curve, ctd.

38. 38 Example: dinf and unem � STATA

39. 39 Example: ADL(4,4) model of inflation � STATA, ctd.

40. 40 The test of the joint hypothesis that none of the X�s is a useful predictor, above and beyond lagged values of Y, is called a Granger causality test

41. 41 Forecast uncertainty and forecast intervals

42. 42 The mean squared forecast error (MSFE) is,

43. 43 The root mean squared forecast error (RMSFE)

44. 44 Three ways to estimate the RMSFE

45. 45 The method of pseudo out-of-sample forecasting

46. 46 Using the RMSFE to construct forecast intervals

47. 47 Example #1: the Bank of England �Fan Chart�, 11/05

48. 48 Example #2: Monthly Bulletin of the European Central Bank, Dec. 2005, Staff macroeconomic projections

49. 49 Example #3: Fed, Semiannual Report to Congress, 7/04

50. 50 Lag Length Selection Using Information Criteria (SW Section 14.5)

51. 51 The Bayes Information Criterion (BIC)

52. 52 Another information criterion: Akaike Information Criterion (AIC)

53. 53 Example: AR model of inflation, lags 0�6:

54. 54 Generalization of BIC to multivariate (ADL) models

55. 55 Nonstationarity I: Trends(SW Section 14.6)

56. 56 Outline of discussion of trends in time series data:

57. 57 1. What is a trend?

58. 58

59. 59

60. 60 What is a trend, ctd.

61. 61 Deterministic and stochastic trends

62. 62 Deterministic and stochastic trends, ctd.

63. 63 Deterministic and stochastic trends, ctd.

64. 64 Deterministic and stochastic trends, ctd.

65. 65 Stochastic trends and unit autoregressive roots

66. 66 Unit roots in an AR(2)

67. 67 Unit roots in an AR(2), ctd.

68. 68 Unit roots in the AR(p) model

69. 69 Unit roots in the AR(p) model, ctd.

70. 70 2. What problems are caused by trends?

71. 71 Log Japan gdp (smooth line) and US inflation (both rescaled), 1965-1981

72. 72 Log Japan gdp (smooth line) and US inflation (both rescaled), 1982-1999

73. 73 3. How do you detect trends?

74. 74 DF test in AR(1), ctd.

75. 75 Table of DF critical values

76. 76 The Dickey-Fuller test in an AR(p)

77. 77 When should you include a time trend in the DF test?

78. 78 Example: Does U.S. inflation have a unit root?

79. 79 Example: Does U.S. inflation have a unit root? ctd

80. 80 DF t-statstic = �2.69 (intercept-only):

81. 81 4. How to address and mitigate problems raised by trends

82. 82 Summary: detecting and addressing stochastic trends

83. 83 Nonstationarity II: Breaks and Model Stability (SW Section 14.7)

84. 84 A. Tests for a break (change) in regression coefficients

85. 85

86. 86 Case II: The break date is unknown

87. 87 The Quandt Likelihod Ratio (QLR) Statistic (also called the �sup-Wald� statistic)

88. 88 The QLR test, ctd.

89. 89

90. 90

91. 91 Has the postwar U.S. Phillips Curve been stable?

92. 92 QLR tests of the stability of the U.S. Phillips curve.

93. 93

94. 94 B. Assessing Model Stability using Pseudo Out-of-Sample Forecasts

95. 95 Application to the U.S. Phillips Curve:

96. 96 POOS forecasts of ?Inf using ADL(4,4) model with Unemp

97. 97 poos forecasts using the Phillips curve, ctd.

98. 98 Summary: Time Series Forecasting Models (SW Section 14.8)

99. 99 Summary, ctd.