ψ-Exponential Stability of Nonlinear Impulsive Dynamic Equations on Time Scales

Definition 1. The trivial solution to (1) is ψ exponentially stable on [0, ∞) if any solution x(t, t₀, x₀) of the system (1) satisfies for all t ∈ [t_k−1, t_k), k = 1,2, …, n,

where d is a positive constant and $$ is a nonnegative increasing function, M > 0. If the function C is independent of t₀, then the trivial solution to system (1) is said to be ψ uniformly exponentially stable on [0, ∞).

Definition 2. The trivial solution to (1) is ψ globally exponentially stable on [0, ∞) if there exist some constants δ > 0 and M ≥ 1 such that any solution x(t, t₀, x₀) of (1), for all t ∈ [t_k−1, t_k), k = 1,2, …, n, we have

Theorem 3. Assume that D ⊂ ℝⁿ contains the origin and there exists a type I Lyapunov function $$ such that, for all $$ and t ∈ [t_k−1, t_k), k = 1,2, …, n,

where λ₁(t), λ₂(t), and λ₃(t) are positive functions, where λ₁(t) is nondecreasing; p, q, r, and γ are positive constants; L is a nonnegative constant, and $$. Then the trivial solution to (1) is ψ exponentially stable on [0, ∞).

Proof. Let x be a solution to (1) that stays in D for all t ≥ t₀. As $$,  e_M(t, t₀) is well defined and positive. Thus $$. Consider

Integrating both sides of above inequality from t₀ to t with x₀ = x(t₀), we obtain, for t ∈ [t_k−1, t_k), From condition $$ Letting we get, By condition (11), we have And by the fact that λ₁(t) ≥ λ₁(t₀), we obtain From (18) and (20) we obtain the result for all, t ∈ [t_k−1, t_k), k = 1,2, …, n, By Definition 1 system (1) is ψ exponentially stable.

Theorem 4. In Theorem 3 if ψ is a constant function independent of t and λ_i(t) = λ_i, i = 1,2, 3, are positive constants, then the trivial solution to system (1) is ψ uniformly exponentially stable on [0, ∞).

Proof. The proof is similar to proof of Theorem 3 by taking $$ and $$, hence omitted.

Theorem 5. Assume that D ⊂ ℝⁿ contains the origin and there exists a type I Lyapunov function $$ such that, for all $$ and t ∈ [t_k−1, t_k), k = 1,2, …, n,

where ψ is a constant function independent of t. λ₁, λ₂, p, δ > 0,  L ≥ 0 are constants and 0 < M < min  {λ₂, δ}. Then the trivial solution to (1) is ψ uniformly exponentially stable on [0, ∞).

Proof. Let x be a solution to (1) that stays in D for all t ≥ t₀. Since M ∈ ℜ⁺, e_M(t, 0) is well defined and positive. Now consider

Integrating both sides of the above inequality from t₀ to t, we obtain, for t ∈ [t_k−1, t_k), This implies that From (26) and by invoking condition (22) we obtain, for all t ∈ [t_k−1, t_k), k = 1,2, …, n, By Definition 1 system (1) is ψ uniformly exponentially stable.

Theorem 6. Assume that D ⊂ ℝⁿ contains the origin and there exists a type I Lyapunov function $$ such that, for all $$ and t ∈ [t_k−1, t_k), k = 1,2, …, n,

where λ₁, λ₂, λ₃, and p are positive constants, K = λ₃/λ₂, L ≥ λ₁ is a nonnegative constant, and δ > λ₃/λ₂. Then the trivial solution to (1) is ψ globally exponentially stable on [0, ∞).

Proof. Let x be a solution to (1) that stays in D for all t ≥ t₀. Since K = λ₃/λ₂, e_K(t, 0) is well defined and positive. For all t ∈ [t_k−1, t_k), k = 1,2, …, n, consider

Integrating both sides of the above inequality from t₀ to t, t ≠ t_k, with x₀ = x(t₀), we obtain, This implies that From (32), and by invoking condition (28), we obtain, for all t ∈ [t_k−1, t_k), k = 1,2, …, n, If we set $$, then (33) can be written as Since M ≥ 1, by Definition 2 system (1) is ψ globally exponentially stable.

Example 7. We consider Example (35) in [7] and extend the example by using impulse condition,

where δ > 0 is a constant x₀ ∈ ℝ. If there is a constant 0 < M < δ such that for some constant L ≥ 0 and all t ≠ k, (35) is ψ uniformly exponentially stable.

Under above assumptions, we will show that the conditions of Theorem 4 are satisfied. Let ψ(t) = 1/2, choose D = ℝ and V(x) = x², t ≠ k, then (11) holds with p = q = 2, λ₁ = λ₂ = 4. If we calculate V^Δ, for all t ≠ k,

we have the following comparison: Dividing and multiplying the right-hand side by (1 + Mμ(t)), we see that (12) holds under the above assumptions with r = 2 and λ₃ = 4M. Also, since p = q = 2, we have for all t ≠ k. Therefore (13) is satisfied. Hence, all hypotheses of Theorem 4 are satisfied and we conclude that the trivial solution to (35) is ψ uniformly exponentially stable. We consider following two special cases of (35).

Case 1. If 𝕋 = ℝ, then μ(t) = 0. It is easy to see that (37) holds for M = 1. Also for L = 8/[375(δ − M)], condition (38) is satisfied. Hence, we conclude that if δ > 1, then the trivial solution to (35) is ψ uniformly exponentially stable.

Case 2. If 𝕋 = (1/2)ℤ, then μ(t) = 1/2. In this case rewriting (37) we have

then (37) holds for 2/3 > M > 0. Also for $$, condition (38) is satisfied. Therefore for δ > 2/3, then the trivial solution to (35) is ψ uniformly exponentially stable.