| 1. | Various inverse shadowing properties of diffeomorphism on the hyperbolic invariant set
在双曲不变集上的各种反跟踪性 |
| 2. | Invariance principle and state feedback stabilization of invariant sets of switched systems
切换系统的不变性原理与不变集的状态反馈镇定 |
| 3. | / has the limit shadowing property with respect to some 8 > 0 on a neighborhood of the hyperbolic set ; ( 2 )
F在其双曲不变集的一个邻域上关于某个0有极限跟踪性; ( 2 ) |
| 4. | The invariant set and attractor for a class of non - autonomous delay differential system are investigated in this paper
摘要研究了一类非自治时滞微分系统的解的不变集与吸引集。 |
| 5. | By the control lemma of chart - radius and through using the method of integrating , the author estimates the existence range of the invariant set and its attractor
由谱半径的控制引理,利用积分的方法,得到其解的不变集与吸引集的存在条件及存在范围。 |
| 6. | Recently , xie jianhua ~ [ 14 ] obtained there is a hyperbolic invariant set when mm = 4 . 0318 on the basis of the symmetry of the model for = 1
最近,谢建华在1998年利用对称性给出了= 1时弹跳球模型存在双曲不变集的条件( _ ( min ) 4 . 0318 ) 。 |
| 7. | In contrast to the similar robust model predictive control approach , the feasible domain of optimization can be remarkably enlarged with the application of set invariance theory
与同类方法相比,鲁棒不变集理论的应用能够显著扩大鲁棒预测控制的状态可行域。 |
| 8. | The paper discusses the invariant set and attractor for a class of non - autonomous delay differential system . we estimate the existence range of the invariant set and its attractor
摘要研究了一类非自治时滞微分系统的解的不变集与吸引集的存在性,得到了其解的不变集与吸引集的存在的范围。 |
| 9. | We define a type of hyperbolicity on the full measure invariant set which is given by the oseledec ' s multiplicative ergodic theorem and prove that the system has the lipschitz shadowing property on it
对于由oseledec乘法遍历定理得到的满测度( fullmeasure )不变集定义了双曲性,并证明了系统在这个不变集上具有lipschitz跟踪性。 |
| 10. | In this paper it is proved that the invariant sets of the expansive flows with the shadowing property show the continuity with perturbation and the weakly invariant sets of c ^ 0 flows have the generic property of continuous change with perturbation
摘要证明紧致流形上具有跟踪性的可扩流的不变集随扰动的连续性及c ^ 0流的弱不变集随扰动而连续变化的通有性。 |
