Stephen D. Casey scite author profile

Abstract. We discuss the twistor correspondence between path geometries in three dimensions with vanishing Wilczynski invariants and anti-self-dual conformal structures of signature (2, 2). We show how to reconstruct a system of ODEs with vanishing invariants for a given conformal structure, highlighting the Ricci-flat case in particular. Using this framework, we give a new derivation of the Wilczynski invariants for a system of ODEs whose solution space is endowed with a conformal structure. We explain how to reconstruct the conformal structure directly from the integral curves, and present new examples of systems of ODEs with point symmetry algebra of dimension four and greater which give rise to anti-self-dual structures with conformal symmetry algebra of the same dimension. Some of these examples are (2, 2) analogues of plane wave space-times in General Relativity. Finally we discuss a variational principle for twistor curves arising from the Finsler structures with scalar flag curvature.

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On periodic pulse interval analysis with outliers and missing observations

Sadler

Casey

1998

IEEE Trans. Signal Process.

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Modifications of the Euclidean algorithm for isolating periodicities from a sparse set of noisy measurements

Casey

Sadler

1996

IEEE Trans. Signal Process.

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Stephen D. Casey

Systems of Convolution Equations, Deconvolution, Shannon Sampling, and the Wavelet and Gabor Transforms

Twistor Geometry of a Pair of Second Order ODEs

On periodic pulse interval analysis with outliers and missing observations

Modifications of the Euclidean algorithm for isolating periodicities from a sparse set of noisy measurements

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