Show that strictly stationary time series is not always weakly stationary time series (with counter example...

what is weakly dependent time series.

what is weakly dependent time series.

Time Series transformation Let an annual series Yt be stationary. However, the series transformed and differentiated...

Time Series transformation Let an annual series Yt be stationary. However, the series transformed and differentiated Dt = ln(Yt) - ln(Yt-1) is stationary. Moreover, we suppose that it obeys the following theoretical model: Dt = -0.12 + 0.75 Dt-1 + et, in which the error term and is a white noise of variance σ2 = 0.012. How can I transform this model to get the original one before the transformation?

1. General features of economic time series: trends, cycles, seasonality. 2. Simple linear regression model and...

1. General features of economic time series: trends, cycles, seasonality. 2. Simple linear regression model and multiple regression model: dependent variable, regressor, error term; fitted value, residuals; interpretation. 3. Population VS sample: a sample is a subset of a population. 4. Estimator VS estimate. 5. For what kind of models can we use OLS? 6. R-squared VS Adjusted R-squared. 7. Model selection criteria: R-squared/Adjusted R-squared; residual variance; AIC, BIC. 8. Hypothesis testing: p-value, confidence interval (CI), (null hypothesis , significance...

ECONOMETRICS 2 a) What are the 3 conditions for a time series to be Covariance Stationary?...

ECONOMETRICS 2 a) What are the 3 conditions for a time series to be Covariance Stationary? b) What is meant by detrending a time series variable? Assume that we detrend all variables (both the dependent and all independent variables) in a regression equation and then run an OLS estimation. What is this estimated regression equation equivalent to? How you interpret the estimated coefficient of this equation?                                                                                                                                               

Why use autocorrelation instead of autocovariance when examining stationary time series? Please explain specifically. Thanks.

Why use autocorrelation instead of autocovariance when examining stationary time series? Please explain specifically. Thanks.

Are any of the following implications always true? Prove or give a counter-example. a) f(n) =...

Are any of the following implications always true? Prove or give a counter-example. a) f(n) = Θ(g(n)) -> f(n) = cg(n) + o(g(n)), for some real constant c > 0. *(little o in here) b) f(n) = Θ(g(n)) -> f(n) = cg(n) + O(g(n)), for some real constant c > 0. *(big O in here)

A stationary time series of length 121 produced sample partial autocorrelation of φ^11 = 0.8, φ^22...

A stationary time series of length 121 produced sample partial autocorrelation of φ^11 = 0.8, φ^22 = −0.6, φ^33 = 0.08, and φ^44 = 0.00. Based on this information alone, what model would we tentatively specify for the series?

What are the defining characteristics of the time series design. Give an example of a topic...

What are the defining characteristics of the time series design. Give an example of a topic that would be appropriate to study using the interrupted time series design.

Prove this statement or show why it's false (provide a counter example) ∀x(R(x) ∨ S(x)) →...

Prove this statement or show why it's false (provide a counter example) ∀x(R(x) ∨ S(x)) → (∃xR(x) ∨ ∃yS(y))

Which of the following is an example of a time series? A) the balances of all...

Which of the following is an example of a time series? A) the balances of all checking accounts at wells fargo B) the heights of players on the Orlando magic basetball team C) the mobthly sales of Ford F-150 pick up trucks D) the current average prices of regular gasoline in different states of the U.S.