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Main Authors: Hall, Layton A., Alperin, Samuel
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2601.08020
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author Hall, Layton A.
Alperin, Samuel
author_facet Hall, Layton A.
Alperin, Samuel
contents Self-imaging represents a core hallmark of paraxial (quadratic)-wave evolution; yet, across its many realizations and generalizations over the past two centuries, the uniformity of recurrence planes along the propagation axis has been considered fundamental. However, by reframing the general phenomenon of self-imaging within its natural symplectic framework, we show that all self-imaging effects are necessarily tied to uniformly periodic recurrences in the canonical evolution coordinate -- metaplectic time -- and that the correspondence of that coordinate to the physical propagation axis represents an unexplored degree of freedom, which can be engineered arbitrarily by the initial transverse phase structure. Using a single programmable spatial light modulator, we demonstrate the construction of Talbot carpets characterized by recurrence spacings that accelerate and decelerate along the propagation axis, as well as those that follow polynomial, exponential, and sinusoidal axial trajectories, all of which preserve exact reconstruction in the canonical metaplectic time. These results establish metaplectic time as the fundamental invariant of self-imaging and reveal a regime of controllable axial dynamics previously thought to be fixed.
format Preprint
id arxiv_https___arxiv_org_abs_2601_08020
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Canonical Clocks and Hidden Geometric Freedom in Self-Imaging
Hall, Layton A.
Alperin, Samuel
Optics
Self-imaging represents a core hallmark of paraxial (quadratic)-wave evolution; yet, across its many realizations and generalizations over the past two centuries, the uniformity of recurrence planes along the propagation axis has been considered fundamental. However, by reframing the general phenomenon of self-imaging within its natural symplectic framework, we show that all self-imaging effects are necessarily tied to uniformly periodic recurrences in the canonical evolution coordinate -- metaplectic time -- and that the correspondence of that coordinate to the physical propagation axis represents an unexplored degree of freedom, which can be engineered arbitrarily by the initial transverse phase structure. Using a single programmable spatial light modulator, we demonstrate the construction of Talbot carpets characterized by recurrence spacings that accelerate and decelerate along the propagation axis, as well as those that follow polynomial, exponential, and sinusoidal axial trajectories, all of which preserve exact reconstruction in the canonical metaplectic time. These results establish metaplectic time as the fundamental invariant of self-imaging and reveal a regime of controllable axial dynamics previously thought to be fixed.
title Canonical Clocks and Hidden Geometric Freedom in Self-Imaging
topic Optics
url https://arxiv.org/abs/2601.08020