We consider quantitative unique continuation estimates for solutions of second-order parabolic equations. Our approach provides a substan- tial simplification of the proof of the three-cylinder inequality, which is a key tool in deriving optimal stability estimates in inverse problems with a time-independent unknown boundary. The simplification is achieved by proving a Carleman estimate with a suitable singular weight, leading to what we call the three-spindle inequality which directly implies the three-cylinder inequality.
Three-Spindle Inequality for Parabolic Equations: A Simplified Approach to the Three-Cylinder Inequality / Luisella Verdi; Sergio Vessella. - In: JOURNAL OF INVERSE AND ILL-POSED PROBLEMS. - ISSN 0928-0219. - ELETTRONICO. - (2025), pp. 0-0.
Three-Spindle Inequality for Parabolic Equations: A Simplified Approach to the Three-Cylinder Inequality
Luisella Verdi;Sergio Vessella
2025
Abstract
We consider quantitative unique continuation estimates for solutions of second-order parabolic equations. Our approach provides a substan- tial simplification of the proof of the three-cylinder inequality, which is a key tool in deriving optimal stability estimates in inverse problems with a time-independent unknown boundary. The simplification is achieved by proving a Carleman estimate with a suitable singular weight, leading to what we call the three-spindle inequality which directly implies the three-cylinder inequality.
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