Extends Scaled Relative Graphs to non-square MIMO nonlinear systems via operator embedding, providing stability theorems, well-posedness guarantees, and SRG computation formulas for LTI and static nonlinear operators.
On phase in scaled graphs
2 Pith papers cite this work. Polarity classification is still indexing.
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Mirror symmetry of SRG uncertainty regions about the theta-axis gives necessary and sufficient conditions for robust nonsingularity and stability of LTI systems via the Davis-Wielandt shell.
citing papers explorer
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Analysis of Non-Square Nonlinear MIMO Systems using Scaled Relative Graphs
Extends Scaled Relative Graphs to non-square MIMO nonlinear systems via operator embedding, providing stability theorems, well-posedness guarantees, and SRG computation formulas for LTI and static nonlinear operators.
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Symmetry Is Almost All You Need: Robust Stability with Uncertainty Induced by Symmetric SRG Regions
Mirror symmetry of SRG uncertainty regions about the theta-axis gives necessary and sufficient conditions for robust nonsingularity and stability of LTI systems via the Davis-Wielandt shell.