Answer to Question 1
Answer:
(a) To test for cointegration requires that the two variables have the same stochastic trend. If one variable is I(1) while the other is I(0), then obviously they do not have the same stochastic trend and therefore cannot be cointegrated.
(b) In this case there would possibly be cointegration between the two I(1) variables, but not between all three variables. This does not imply that the third variable could not enter into the relationship. Think, for example, about a money demand relationship between the (log of) real money balances, income, and the nominal interest rate. It may well be that in some samples the nominal interest rate is I(0), while real money balances and income are I(1). Finding real money balances and income to be cointegrated does not imply that the nominal interest rate does not enter the money demand function. There is simply no need for the interest rate to enter the cointegrating relation because it is I(0). The cointegrating relation only involves zero-frequency relationships between the first differences of real money balances and income, and the zero-frequency component of the first difference of the interest rate is non-existent.
Answer to Question 2
Merci beaucoup <3
Geoffroy's tamarin has been considered a subspecies of the similar cottontop tamarin, shown abo
An example of an EHR screen used to order a laboratory test.
Aging is more than biology. In some cultures, Jennifer Lopez, 43, would be considered elderly. Lopez ...
Metastasis Cancer Order
How to evaluate third-order determinants by Minors Method (Question 1)
First-order sensory neuron with encapsulated nerve endings