The InSAR absolute phase amid singularities

TL;DR

This paper introduces a universal definition of the InSAR absolute phase based on temporal unwrapping, addressing complexities like phase singularities and cyclic target changes, thereby improving interpretation and processing of interferometric data.

Contribution

It proposes a new observational definition of absolute phase applicable to complex targets and analyzes conditions affecting phase unwrapping and singularities in InSAR data.

Findings

Absolute phase is proportional to range difference for point targets.

Phase singularities occur at coherence vanishing points, complicating unwrapping.

Mathematical conditions for phase reconstruction are established.

Abstract

The radar interferometric absolute phase is essential for estimating topography and displacements. However, its conventional definition based on the range difference is idealized in that it cannot be applied to complex, dynamic targets. Here, a universal observational definition is proposed, which is easiest to describe for differential interferometry: The absolute phase is determined by temporally unwrapping the phase while continuously varying the intermediate acquisition time between primary and secondary acquisitions. This absolute phase is typically not directly observable because a continuous series of observations is required. The absolute phase of a point target is proportional to the range difference, matching the conventional definition. For general targets undergoing a cyclic change, the absolute phase may be nonzero and then cannot be interpreted as a range difference. When a phase singularity (vanishing coherence) occurs at an intermediate time, the absolute phase becomes undefined, a situation termed an absolute phase singularity. Absolute phase singularities complicate absolute phase reconstruction through multifrequency techniques and through unwrapping multidimensional interferograms. They leave no trace in an interferogram, but unwrapping paths need to avoid those across which the absolute phase jumps by nonzero integer multiples of $2 \pi$. Mathematical analyses identify conditions for unwrapping-based reconstruction up to a constant, accounting for absolute phase singularities, undersampling and noise. The general definition of the absolute phase and the mathematical analyses enable a comprehensive appraisal of InSAR processing chains and support the interpretation of observations whenever low coherence engenders phase and absolute phase singularities.