QPmR - Quasi-Polynomial Root-Finder: Algorithm Update and Examples
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Publication:2863203
DOI10.1007/978-3-319-01695-5_22zbMath1275.93033OpenAlexW2172321118MaRDI QIDQ2863203
Publication date: 21 November 2013
Published in: Delay Systems (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-319-01695-5_22
exponential polynomialcomplex planeMatlab implementationquasi-polynomialmapping based root finderspectrum distribution diagram
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Related Items (13)
Dissipative delay range analysis of coupled differential-difference delay systems with distributed delays ⋮ Cooperative synchronization control for agents with control delays: a synchronizing region approach ⋮ Eigenvalue optimisation-based centralised and decentralised stabilisation of time-delay systems ⋮ Parameterization of input shapers with delays of various distribution ⋮ Delay-based stabilisation and strong stabilisation of LTI systems by nonsmooth constrained optimisation ⋮ PID and low‐order controller design for guaranteed delay margin and pole placement ⋮ Stabilization of decentralized descriptor-type neutral time-delay systems by time-delay controllers ⋮ A Unified Approach for the $H_\infty$-Stability Analysis of Classical and Fractional Neutral Systems with Commensurate Delays ⋮ Dissipative stabilization of linear systems with time-varying general distributed delays ⋮ On strong stabilizability of MIMO infinite-dimensional systems ⋮ $H_\infty$-Stability Analysis of Fractional Delay Systems of Neutral Type ⋮ Calculating characteristic roots of multi-delayed systems with accumulation points via a definite integral method ⋮ QPmR
Uses Software
Cites Work
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- Differential-difference equations
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- On Stability of LMS Methods and Characteristic Roots of Delay Differential Equations
- Mapping Based Algorithm for Large-Scale Computation of Quasi-Polynomial Zeros
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- Pseudospectral Differencing Methods for Characteristic Roots of Delay Differential Equations
- A Numerical Method for Locating the Zeros of an Analytic Function
- Locating all the zeros of an analytic function in one complex variable
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