样式: 排序: IF: - GO 导出 标记为已读
-
A two-player game representation for a class of infinite horizon control problems under state constraints Math. Control Signals Syst. (IF 1.2) Pub Date : 2024-03-16
Abstract In this paper, feedback laws for a class of infinite horizon control problems under state constraints are investigated. We provide a two-player game representation for such control problems assuming time-dependent dynamics and Lagrangian and the set constraints merely compact. Using viability results recently investigated for state constrained problems in an infinite horizon setting, we extend
-
Averaging of a class of singularly perturbed control systems: a non-asymptotic result Math. Control Signals Syst. (IF 1.2) Pub Date : 2024-03-13
Abstract We study a singularly perturbed control system whose variables are decomposed into groups that change their values with rates of different orders of magnitude. We establish that the slow trajectories of this system are dense in the set of solutions of a certain differential inclusion and discuss an implication of this result for optimal control.
-
Editorial to the collection of papers dedicated to Eduardo D. Sontag on the occasion of his 70th birthday Math. Control Signals Syst. (IF 1.2) Pub Date : 2024-02-23 Murat Arcak, Yacine Chitour, Patrick De Leenheer, Lars Grüne
This paper provides an editorial to the Collection of MCSS Papers dedicated to Eduardo D. Sontag on the occasion of his 70th birthday.
-
Eigenvalue assignment of second-order singular systems by acceleration–velocity–displacement feedback Math. Control Signals Syst. (IF 1.2) Pub Date : 2024-01-27
Abstract The eigenvalue assignment problem of second-order singular system is investigated by using acceleration–velocity–displacement feedback. The conditions are established to ensure the solvability of partial eigenvalue assignment problem of second-order singular system. The derived results are extended to complete eigenvalue assignment problem of second-order singular system. The presented solvability
-
Well-posedness and properties of the flow for semilinear evolution equations Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-12-07 Andrii Mironchenko
We derive conditions for well-posedness of semilinear evolution equations with unbounded input operators. Based on this, we provide sufficient conditions for such properties of the flow map as Lipschitz continuity, bounded-implies-continuation property, boundedness of reachability sets, etc. These properties represent a basic toolbox for stability and robustness analysis of semilinear boundary control
-
State observation for heterogeneous quasilinear traffic flow system with disturbances Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-12-07 Lina Guan, Christophe Prieur, Liguo Zhang, Rafael Vazquez
-
On discrete-time dissipative port-Hamiltonian (descriptor) systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-12-06 Karim Cherifi, Hannes Gernandt, Dorothea Hinsen, Volker Mehrmann
-
The minimum principle of hybrid optimal control theory Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-11-10 Ali Pakniyat, Peter E. Caines
-
The difference between port-Hamiltonian, passive and positive real descriptor systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-11-11 Karim Cherifi, Hannes Gernandt, Dorothea Hinsen
-
On the admissibility and input–output representation for a class of Volterra integro-differential systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-11-10 H. Bounit, M. Tismane
This article studies a class of controlled–observed Volterra integro-differential systems in the case where the operator of the associated Cauchy problem generates a semigroup on a Banach space, and the integral part is given by a convolution with an \(L^p\)-admissible observation operators kernel with \(p\in [1,\infty )\). Sufficient and/or necessary conditions for \(L^p\)-admissibility of control
-
Control problems on infinite horizon subject to time-dependent pure state constraints Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-10-25 Vincenzo Basco
In the last decades, control problems with infinite horizons and discount factors have become increasingly central not only for economics but also for applications in artificial intelligence and machine learning. The strong links between reinforcement learning and control theory have led to major efforts toward the development of algorithms to learn how to solve constrained control problems. In particular
-
Newton and interior-point methods for (constrained) nonconvex–nonconcave minmax optimization with stability and instability guarantees Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-10-10 Raphael Chinchilla, Guosong Yang, João P. Hespanha
-
Controllability of periodic linear systems, the Poincaré sphere, and quasi-affine systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-10-04 Fritz Colonius, Alexandre Santana, Juliana Setti
-
Estimates of the size of the domain of the implicit function theorem: a mapping degree-based approach Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-09-26 Ashutosh Jindal, Debasish Chatterjee, Ravi Banavar
-
Characterization, verification and computation of robust controlled invariants for monotone dynamical systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-09-19 Adnane Saoud, Murat Arcak
-
Polynomial methods to construct inputs for uniformly ensemble reachable linear systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-09-07 Michael Schönlein
This paper is concerned with linear parameter-dependent systems and considers the notion of uniform ensemble reachability. The focus of this work is on constructive methods to compute suitable parameter-independent open-loop inputs for such systems. In contrast to necessary and sufficient conditions for ensemble reachability, computational methods have to distinguish between continuous-time and discrete-time
-
Impulse-controllability of system classes of switched differential algebraic equations Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-08-21 Paul Wijnbergen, Stephan Trenn
In this paper, impulse-controllability of system classes containing switched DAEs is studied. We introduce several notions of impulse-controllability of system classes and provide a characterization of strong impulse-controllability of system classes generated by arbitrary switching signals. For a system class generated by switching signals with a fixed-mode sequence, it is shown that either almost
-
A survey on compressed sensing approach to systems and control Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-08-18 Masaaki Nagahara, Yutaka Yamamoto
-
A look at endemic equilibria of compartmental epidemiological models and model control via vaccination and mitigation Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-08-09 Monique Chyba, Taylor Klotz, Yuriy Mileyko, Corey Shanbrom
-
Cytokine storm mitigation for exogenous immune agonists Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-08-03 Irina Kareva, Jana L. Gevertz
-
On stable solution of the problem of disturbance reduction in a linear dynamical system Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-07-29 V. Maksimov
-
Balancing at the edge of excitability: implications for cell movement Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-07-22 Debojyoti Biswas, Parijat Banerjee, Pablo A. Iglesias
-
Multi-omic integrated curvature study on pan-cancer genomic data Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-07-12 Jiening Zhu, Anh Phong Tran, Joseph O. Deasy, Allen Tannenbaum
-
Some global topological properties of a free boundary problem appearing in a two dimensional controlled ruin problem Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-06-30 Peter Grandits
-
Stabilization of Bresse system with thermodiffusion effects Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-06-16 Wael Youssef, Toufic E. L. Arwadi
We consider the Bresse beam with thermodiffusion effects act on the bending moment and axial force together. An exponential stability is obtained in the case of equal speeds of propagation. Otherwise, a polynomial stability is proved. Using the frequency domain method together with some multiplier techniques, we prove these results.
-
On the mathematical theory of ensemble (linear-Gaussian) Kalman–Bucy filtering Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-05-19 Adrian N. Bishop, Pierre Del Moral
-
Robust stability for implicit dynamic equations with causal operators on time scales Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-05-12 Nguyen Thu Ha
In this paper, we study the robust stability of implicit dynamic equations with causal operators on time scales. First, we investigate the solvability of these dynamic equations and then consider the preservation of stability under small perturbations. An \(L_p\) version of Bohl–Perron principle for implicit dynamic equations is also studied.
-
Oscillator death in coupled biochemical oscillators Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-04-21 Tomáš Gedeon, Breschine Cummins
-
ISS-based robustness to various neglected damping mechanisms for the 1-D wave PDE Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-04-15 Iasson Karafyllis, Miroslav Krstic
This paper is devoted to the study of the robustness properties of the 1-D wave equation for an elastic vibrating string under four different damping mechanisms that are usually neglected in the study of the wave equation: (i) friction with the surrounding medium of the string (or viscous damping), (ii) thermoelastic phenomena (or thermal damping), (iii) internal friction of the string (or Kelvin-Voigt
-
-
Topological entropy of switched nonlinear and interconnected systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-04-02 Guosong Yang, Daniel Liberzon, João P. Hespanha
-
Compound matrices in systems and control theory: a tutorial Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-03-15 Eyal Bar-Shalom, Omri Dalin, Michael Margaliot
-
New tests for the stability of 3D Roesser models Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-03-14 Olivier Bachelier, Thomas Cluzeau, Driss Mehdi, Alexandre Rigaud, Nima Yeganefar
-
Graphical characterizations of robust stability in biological interaction networks Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-03-13 M. Ali Al-Radhawi
-
Differential–algebraic systems with dissipative Hamiltonian structure Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-03-03 Volker Mehrmann, Arjan van der Schaft
-
Input-to-state stability of soft-reset systems with nonlinear data Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-02-18 Matina Baradaran Hosseini, Justin H. Le, Andrew R. Teel
-
Admissibility of retarded diagonal systems with one-dimensional input space Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-02-09 Rafał Kapica, Jonathan R. Partington, Radosław Zawiski
-
Mathematical analysis of the limiting behaviors of a chromatin modification circuit Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-02-06 Simone Bruno, Ruth J. Williams, Domitilla Del Vecchio
-
The exponential input-to-state stability property: characterisations and feedback connections Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-01-31 Chris Guiver, Hartmut Logemann
-
The ISS framework for time-delay systems: a survey Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-01-27 Antoine Chaillet, Iasson Karafyllis, Pierdomenico Pepe, Yuan Wang
-
Convergence of stochastic approximation via martingale and converse Lyapunov methods Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-01-23 M. Vidyasagar
In this paper, we study the almost sure boundedness and the convergence of the stochastic approximation (SA) algorithm. At present, most available convergence proofs are based on the ODE method, and the almost sure boundedness of the iterations is an assumption and not a conclusion. In Borkar and Meyn (SIAM J Control Optim 38:447–469, 2000), it is shown that if the ODE has only one globally attractive
-
Stabilization of the complex double integrator by means of a saturated linear feedback Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-01-05 Yacine Chitour
Consider the saturated complex double integrator, i.e., the linear control system \(\dot{x}=Ax+B\sigma (u)\), where \(x\in {\mathbb {R}}^4\), \(u\in {\mathbb {R}}\), \(B\in {\mathbb {R}}^4\), the \(4\times 4\) matrix A is not diagonalizable and admits a nonzero purely imaginary eigenvalue of multiplicity two, the pair (A, B) is controllable and \(\sigma :{\mathbb {R}}\rightarrow {\mathbb {R}}\) is
-
Controllability of networked systems with heterogeneous dynamics Math. Control Signals Syst. (IF 1.2) Pub Date : 2023-01-04 Abhijith Ajayakumar, Raju K. George
-
On state estimation for nonlinear systems under random access wireless protocols Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-12-31 Alejandro I. Maass, Dragan Nešić, Romain Postoyan, Ying Tan
-
Design of finite-/fixed-time ISS-Lyapunov functions for mechanical systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-12-19 Alexander Aleksandrov, Denis Efimov, Sergey Dashkovskiy
For a canonical form of mechanical systems defined through gradients of potential energy and dissipative terms, the conditions of finite-time and fixed-time (integral) input-to-state stability are derived by finding suitable Lyapunov functions. The proposed stability conditions are constructive, which is demonstrated in several applications.
-
Diffusion and robustness of boundary feedback stabilization of hyperbolic systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-12-10 Georges Bastin, Jean-Michel Coron, Amaury Hayat
-
Optimal dichotomy of temporal scales and boundedness/stability of time-varying multidimensional nonlinear systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-12-03 Mark A. Pinsky
-
Neural network architectures using min-plus algebra for solving certain high-dimensional optimal control problems and Hamilton–Jacobi PDEs Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-11-23 Jérôme Darbon, Peter M. Dower, Tingwei Meng
-
Relative genericity of controllablity and stabilizability for differential-algebraic systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-11-17 Achim Ilchmann, Jonas Kirchhoff
The present note is a successor of Ilchmann and Kirchhoff (Math Control Signals Syst 33:359–377, 2021) on generic controllability and stabilizability of linear differential-algebraic equations. We resolve the drawback that genericity is considered in the unrestricted set of system matrices \((E,A,B)\in \mathbb {R}^{\ell \times }\times \mathbb {R}^{\ell \times n}\times \mathbb {R}^{\ell \times m}\)
-
Are delay-differential systems generically controllable? Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-11-12 D. Hinrichsen, E. Oeljeklaus
In this paper, we study controllability properties of time-invariant linear delay-differential (d-d) systems with a single delay in the pseudo-state. We adopt a topological and geometric point of view and derive a formula for the distance of an approximately controllable system from uncontrollability. We demonstrate by examples that approximately controllable d-d systems may have zero distance from
-
Exact boundary controllability of 1D semilinear wave equations through a constructive approach Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-10-15 Kuntal Bhandari, Jérôme Lemoine, Arnaud Münch
-
Implementation of the algorithm for constructing homogeneous approximations of nonlinear control systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-09-14 Grigory Sklyar, Pavel Barkhayev, Svetlana Ignatovich, Viktor Rusakov
-
Gramian-based model reduction for unstable stochastic systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-07-10 Martin Redmann, Nahid Jamshidi
-
The turnpike property and the longtime behavior of the Hamilton–Jacobi–Bellman equation for finite-dimensional LQ control problems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-06-16 Carlos Esteve, Hicham Kouhkouh, Dario Pighin, Enrique Zuazua
-
Semi-uniform input-to-state stability of infinite-dimensional systems Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-06-15 Masashi Wakaiki
We introduce the notions of semi-uniform input-to-state stability and its subclass, polynomial input-to-state stability, for infinite-dimensional systems. We establish a characterization of semi-uniform input-to-state stability based on attractivity properties as in the uniform case. Sufficient conditions for linear systems to be polynomially input-to-state stable are provided, which restrict the range
-
Manifold turnpikes, trims, and symmetries Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-05-03 Timm Faulwasser, Kathrin Flaßkamp, Sina Ober-Blöbaum, Manuel Schaller, Karl Worthmann
-
Output feedback control with prescribed performance via funnel pre-compensator Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-04-27 Lukas Lanza
-
The circle criterion for a class of sector-bounded dynamic nonlinearities Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-04-18 C. Guiver, H. Logemann
-
Logarithmic regret in online linear quadratic control using Riccati updates Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-04-07 Mohammad Akbari, Bahman Gharesifard, Tamas Linder
-
Optimal portfolio and certainty equivalence estimator for the appreciation rate Math. Control Signals Syst. (IF 1.2) Pub Date : 2022-03-19 Nikolai Dokuchaev
We study the optimal portfolio selection problem for the class of strategies which do not use direct observations of the appreciation rates of the prices, but rather use historical prices. We consider a multi-stock incomplete diffusion market model with random coefficients. An explicit solution exploring a modification of certainty equivalence principle is found for case of power utilities and for