Time-varying threshold cointegration with an application to the Fisher hypothesis

Definition 1

W(s, u) is a two-parameter Brownian motion on (s, u) ∈ [0,1]² if W(s, u) ∼ N(0, su) and

Lemma 1

Under Assumptions 1–3, W _T (s, u) ⇒ W(s, u) on (s, u) ∈ [0,1]² as T → ∞.

Proof

This result follows Theorem 1 of Caner and Hansen (2001). □

Lemma 2

If the joint probability density function of (q _t , z _t ) is f(q, z), then q t * ≡ q t − γ 1 ′ z t has a cumulative distribution function F γ 1 ( q * ) = ∫ − ∞ q * f γ 1 ( u ) d u , where the probability density function f γ 1 ( q * ) = ∫ · · · ∫ − ∞ + ∞ f ( q * + γ 1 ′ z , z ) d z 1 … d z k , in which z = (z ₁, …, z _k )′.

Proof

Lemma 3

Under Assumptions 1–4, for any γ ∈ Γ, we have 1 T ∑ t = 1 [ T s ] 1 ( q t ≤ γ t ) e t ⇒ σ e 2 W ( s , F γ 1 ( γ 0 ) ) .

Proof

This result follows Lemma 1 by replacing u with F γ 1 ( γ 0 ) . □

Lemma 4

Under Assumptions 1–4, for γ ∈ Γ, we have

in which 1 T ∑ t = 1 [ T s ] v t ⇒ B v ( s ) is a Brownian motion with a positive definite long-run covariance matrix.

Proof

The results follows Theorem 2 of Caner and Hansen (2001), Lemma A.2 Chen (2015). □

Lemma 5

Under Assumptions 1–4, for any γ ∈ Γ, as T → ∞, define x t ( γ t ) = [ x ′ t , x ′ t 1 ( q t ≤ γ t ) ] ′ , we have

Proof

The result follows Lemma 3 of Chen (2015). □

Lemma 6

Under Assumptions 1–5, β = [ β ′₂, β ′₁ − β ′₂]′ = [ β ′₂, δ ′]′, in which δ = δ _T = δ ₀ T ^−1/2−α . When γ t = γ t 0 , we have T β ̂ − β = O ( 1 ) . When γ t ≠ γ t 0 , we have T α + 1 / 2 β ̂ − β = O ( 1 ) .

Proof

When γ t = γ t 0 ,

When γ t ≠ γ t 0 and − 1 2 < α < 1 2 , we note that

hence we have

□

Lemma 7

Under Assumptions 1–5, ( γ ̂ 0 , γ ̂ 1 ) → ( γ 0 0 , γ 1 0 ) .

Proof

For notational simplicity, we rewrite the model y _t = β ′₂ x _t + δ ′x _t 1(γ _t ) + e _t in matrix form Y = β ′₂ X + δ ′X(γ _t ) + e, in which X ( γ t ) = X 1 ( γ t ) .

Define X*(γ _t ) = [X(γ _t ), X − X(γ _t )], and P γ t * = X * ( γ t ) [ X * ( γ t ) ′ X * ( γ t ) ] − 1 X * ( γ t ) ′ . Then Y and X lies in the space spanned by P γ t * , and we have

When γ t = γ t 0 , we have SS R T ( γ t 0 ) = e ′ ( I − P γ t 0 * ) e . Using Lemmas 3 and 4, we have

Using a similar argument of Theorem 1 in Chen (2015), we can show, for any γ t ≥ γ t 0 ,

Since F γ 1 0 ( γ 0 0 ) − F γ 1 0 ( γ 0 0 ) F γ 1 ( γ 0 ) − 1 F γ 1 0 ( γ 0 0 ) > 0 , and ∫ B v ( s ) B ′ v ( s ) d s is a positive definite matrix, hence b ₁(γ ₀, γ ₁) ≥ 0 and the equality holds if and only if ( γ 0 , γ 1 ) = ( γ 0 0 , γ 1 0 ) (i.e., γ t = γ t 0 ).

Similarly, for γ t ≤ γ t 0 we have

in which b ₂(γ ₀, γ ₁) ≥ 0 and the equality holds if and only if γ t = γ t 0 since F γ 1 0 ( γ 0 0 ) − F γ 1 ( γ 0 ) ≥ 0 .

Define b ( γ 0 , γ 1 ) = b 1 ( γ 0 , γ 1 ) 1 ( γ t ≥ γ t 0 ) + b 2 ( γ 0 , γ 1 ) 1 ( γ t ≤ γ t 0 ) . Combining the above results we have T 2 α − 1 SS R T ( γ t ) − SS R T ( γ t 0 ) → p b ( γ 0 , γ 1 ) . Also, noting that γ ̂ t = arg min γ 0 , γ 1 ∈ Γ SS R T ( γ t ) , we have γ ̂ t = γ ̂ 0 + γ ̂ 1 ′ z t minimizes SSR _T (γ _t ), and hence γ ̂ 0 + γ ̂ 1 ′ z t → p γ 0 0 + γ 1 0 ′ z t . For any z _t , define λ = ( 1 ‖ z t ‖ 2 + 1 , z t ‖ z t ‖ 2 + 1 ) ′ . Clearly we have λ ′ λ = 1, λ ′ ( γ ̂ 0 , γ ̂ 1 ) ′ → p λ ′ ( γ ̂ 0 0 , γ ̂ 1 0 ) ′ . By the Cramér–Wold device theorem, we have ( γ ̂ 0 , γ ̂ 1 ) → p ( γ 0 0 , γ 1 0 ) . □

Proof of Theorem 1

We first prove the following result a T ( γ ̂ 0 , γ ̂ ′ 1 ) ′ − γ 0 0 , γ 1 0 ′ ′ = O p ( 1 ) , in which a _T = T ^1−2α .

To prove this, we need to prove that, for any v ̄ > 0 , we have

For any B > 0, define V B = { γ 0 , γ 1 ′ : ‖ ( γ 0 , γ 1 ′ ) − ( γ 0 0 , γ 1 0 ′ ) ‖ < B } . When the sample size T is large enough, we have v ̄ / a T < B . Since ( γ ̂ 0 , γ ̂ 1 ′ ) → p ( γ 0 0 , γ 1 0 ′ ) as proved before, we have lim T → ∞ Pr ( γ ̂ 0 , γ ̂ ′ 1 ) ∈ V B → p 1 . Therefore, we only need to consider the limiting behavior of ( γ ̂ 0 , γ ̂ 1 ′ ) in V _B . Define a subset of V _B : V B ( v ̄ ) = { γ 0 , γ 1 ′ : v ̄ / a T < ‖ ( γ 0 , γ 1 ′ ) − ( γ 0 0 , γ 1 0 ′ ) ‖ < B } . Thus, to prove Pr ‖ ( γ ̂ 0 , γ ̂ ′ 1 ) − γ 0 , γ 1 ′ ‖ ≤ v ̄ / a T = 1 , we just need to prove Pr ( γ ̂ 0 , γ ̂ ′ 1 ) ∈ V B ( ν ̄ ) = 0 .

Let S T * ( γ t ) = SSR T ( β ̂ , δ ̂ , γ t ) and S T * ( γ t 0 ) = SSR T ( β ̂ , δ ̂ , γ t 0 ) , where SSR _T (.) is the sum of squared errors function (6) defined in the paper. From the estimation of ( γ ̂ 0 , γ ̂ 1 ′ ) , we have S T * ( γ ̂ t ) ≤ S T * ( γ t 0 ) . Thus, to prove Pr ( γ ̂ 0 , γ ̂ ′ 1 ) ∈ V B ( ν ̄ ) = 0 , it suffices to prove that for any ( γ 0 , γ 1 ′ ) ∈ V B ( ν ̄ ) , we have

To this end, we first consider the case of γ t ≥ γ t 0 . In this case, it is equivalent to prove

Since Y = X β + X ( γ t 0 ) δ + e , we have

in which Δ X γ = X ( γ t ) − X ( γ t 0 ) . We next prove S 1 − S 2 + S 3 + S 4 a T ( γ t − γ t 0 ) converges to a positive random variable with probability one.

For the first term, we have

And the second term

By Lemma 5, T α + 1 / 2 δ ̂ = O ( 1 ) and T α + 1 / 2 ( β ̂ − β ) = O p ( 1 ) . Hence, for the third and fourth terms we have

Thus, when γ t ≥ γ t 0 we have

Using a similar procedure, it is easily to show that, when γ t ≤ γ t 0 and ( γ 0 , γ 1 ′ ) ∈ V B ( ν ̄ ) , we also have lim T → ∞ Pr S T ( β ̂ , δ ̂ , γ t ) > S T ( β ̂ , δ ̂ , γ t 0 ) = 1 . As discussed above, this is sufficient to establish the consistency in Theorem 1.

We next derive the asymptotic distribution:

and

Since the threshold parameters are consistent with convergence rate T ^1−2α , thus we can study their asymptotic behavior in the neighborhood of the true thresholds.

Let γ t = γ t 0 + w a T . By definition of threshold estimates, we have

Since γ _t = γ ₀ + γ ′₁ z _t , we can rewrite the above results as