Analog circuits and DAQ systems experimentally produce spectral bifurcation diagrams that qualitatively match numerical predictions for period-doubling, two- and three-frequency quasiperiodicity, and torus length-doubling.
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Derives explicit reconstruction error bounds for inverse problems on Riemannian manifolds from Marcinkiewicz-Zygmund point samples, with detailed results for convolutions on two-point homogeneous spaces including the sphere.
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Experimental Acquisition and Verification of Spectral Signatures of Dynamic Bifurcations
Analog circuits and DAQ systems experimentally produce spectral bifurcation diagrams that qualitatively match numerical predictions for period-doubling, two- and three-frequency quasiperiodicity, and torus length-doubling.
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Sampling theorems for inverse problems on Riemannian manifolds
Derives explicit reconstruction error bounds for inverse problems on Riemannian manifolds from Marcinkiewicz-Zygmund point samples, with detailed results for convolutions on two-point homogeneous spaces including the sphere.