We investigate the Strong Unique Continuation Property (SUCP) for elliptic equations with piecewise Lipschitz coefficients exhibiting jump discontinuities across a regular interface. We prove SUCP at the interface using a doubling inequality derived from a Carleman estimate with a singular weight. This result is intended as a first step toward solving the inverse problem of estimating the size of an unknown, merely measurable, inclusion inside a conductor from boundary measurements.
Doubling Inequality and Strong Unique Continuation for an Elliptic Transmission Problem / Tianrui Dai; Elisa Francini; Sergio Vessella. - In: INVERSE PROBLEMS. - ISSN 0266-5611. - STAMPA. - 41:(2025), pp. 115002.0-115002.0. [10.1088/1361-6420/ae16ce]
Doubling Inequality and Strong Unique Continuation for an Elliptic Transmission Problem
Tianrui Dai;Elisa Francini
;Sergio Vessella
2025
Abstract
We investigate the Strong Unique Continuation Property (SUCP) for elliptic equations with piecewise Lipschitz coefficients exhibiting jump discontinuities across a regular interface. We prove SUCP at the interface using a doubling inequality derived from a Carleman estimate with a singular weight. This result is intended as a first step toward solving the inverse problem of estimating the size of an unknown, merely measurable, inclusion inside a conductor from boundary measurements.
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DaiFranciniVessella2005.pdf
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DaiFranciniVessella2005VOR.pdf
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