Wiktoria Zatoń scite author profile

Wiktoria Zatoń

3Publications

12Citation Statements Received

179Citation Statements Given

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169

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University of Zurich

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Runge approximation and stability improvement for a partial data Calderón problem for the acoustic Helmholtz equation

García-Ferrero¹,

Rüland²,

Zatoń³

2022

IPI

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<p style='text-indent:20px;'>In this article, we discuss quantitative Runge approximation properties for the acoustic Helmholtz equation and prove stability improvement results in the high frequency limit for an associated partial data inverse problem modelled on [<xref ref-type="bibr" rid="b3">3</xref>,<xref ref-type="bibr" rid="b35">35</xref>]. The results rely on quantitative unique continuation estimates in suitable function spaces with explicit frequency dependence. We contrast the frequency dependence of interior Runge approximation results from non-convex and convex sets.</p>

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Tent space well-posedness for parabolic Cauchy problems with rough coefficients

Zatoń

2020

Journal of Differential Equations

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$C^\infty$ partial regularity of the singular set in the obstacle problem

Franceschini¹,

Zatoń²

2021

Preprint

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We show that the singular set Σ in the classical obstacle problem can be locally covered by a C ∞ hypersurface, up to an "exceptional" set E, which has Hausdorff dimension at most n − 2 (countable, in the n = 2 case). Outside this exceptional set, the solution admits a polynomial expansion of arbitrarily large order. We also prove that Σ \ E is extremely unstable with respect to monotone perturbations of the boundary datum. We apply this result to the planar Hele-Shaw flow, showing that the free boundary can have singular points for at most countable many times.

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Wiktoria Zatoń

Runge approximation and stability improvement for a partial data Calderón problem for the acoustic Helmholtz equation

Tent space well-posedness for parabolic Cauchy problems with rough coefficients

$C^\infty$ partial regularity of the singular set in the obstacle problem

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