[PDF][PDF] On L 3, Infinity-solutions to the Navier-Stokes equations and backward uniqueness
L Escauriaza, G Seregin, V Sverak - 2002 - conservancy.umn.edu
On -Solutions to the Navier-Stokes Equations and Backward Uniqueness 1 Introduction
Page 1 On ¢¡¤£¦¥ -Solutions to the Navier-Stokes Equations and Backward Uniqueness L …
Page 1 On ¢¡¤£¦¥ -Solutions to the Navier-Stokes Equations and Backward Uniqueness L …
Backward uniqueness for parabolic equations
L Escauriaza, G Seregin, V Šverák - Archive for rational mechanics and …, 2003 - Springer
Backward Uniqueness for Parabolic Equations Page 1 Digital Object Identifier (DOI)
10.1007/s00205-003-0263-8 Arch. Rational Mech. Anal. 169 (2003) 147–157 Backward …
10.1007/s00205-003-0263-8 Arch. Rational Mech. Anal. 169 (2003) 147–157 Backward …
Quantitative estimates of unique continuation for parabolic equations, determination of unknown time-varying boundaries and optimal stability estimates
S Vessella - Inverse Problems, 2008 - iopscience.iop.org
In this article, we review the main results concerning the issue of stability for the
determination of unknown boundary portions of a thermic conducting body from Cauchy …
determination of unknown boundary portions of a thermic conducting body from Cauchy …
Observability inequalities and measurable sets.
This paper presents two observability inequalities for the heat equation over×(0, T). In the
first one, the observation is from a subset of positive measure in×(0, T), while in the second …
first one, the observation is from a subset of positive measure in×(0, T), while in the second …
Doubling properties of caloric functions
Full article: Doubling properties of caloric functions Skip to Main Content Taylor and Francis Online
homepage Taylor and Francis Online homepage Log in | Register Cart 1.Home 2.All Journals …
homepage Taylor and Francis Online homepage Log in | Register Cart 1.Home 2.All Journals …
[HTML][HTML] Monotonicity of generalized frequencies and the strong unique continuation property for fractional parabolic equations
A Banerjee, N Garofalo - Advances in Mathematics, 2018 - Elsevier
We study the strong unique continuation property backwards in time for the nonlocal
equation in R n+ 1 (0.1)(∂ t− Δ) su= V (x, t) u, s∈(0, 1). Our main result Theorem 1.2 can be …
equation in R n+ 1 (0.1)(∂ t− Δ) su= V (x, t) u, s∈(0, 1). Our main result Theorem 1.2 can be …
Rigidity of asymptotically conical shrinking gradient Ricci solitons
B Kotschwar, L Wang - Journal of Differential Geometry, 2015 - projecteuclid.org
We show that if two gradient shrinking Ricci solitons are asymptotic along some end of each
to the same regular cone $((0,\infty)\times\Sigma, dr^ 2+ r^ 2 g_ {\Sigma}) $, then the soliton …
to the same regular cone $((0,\infty)\times\Sigma, dr^ 2+ r^ 2 g_ {\Sigma}) $, then the soliton …
The Calderón problem for space-time fractional parabolic operators with variable coefficients
A Banerjee, S Senapati - SIAM Journal on Mathematical Analysis, 2024 - SIAM
We study an inverse problem for variable coefficient fractional parabolic operators of the
form for and show the unique recovery of from exterior measured data. Similar to the …
form for and show the unique recovery of from exterior measured data. Similar to the …
An alternative approach to regularity for the Navier–Stokes equations in critical spaces
CE Kenig, GS Koch - Annales de l'IHP Analyse non linéaire, 2011 - numdam.org
An alternative approach to regularity for the Navier–Stokes equations in critical spaces Page 1
Ann. IH Poincaré – AN 28 (2011) 159–187 www.elsevier.com/locate/anihpc An alternative …
Ann. IH Poincaré – AN 28 (2011) 159–187 www.elsevier.com/locate/anihpc An alternative …
Backwards uniqueness for the Ricci flow
BL Kotschwar - International Mathematics Research Notices, 2010 - ieeexplore.ieee.org
Backwards Uniqueness for the Ricci Flow Page 1 Kotschwar, BL (2010) “Backwards
Uniqueness for the Ricci Flow,” International Mathematics Research Notices, Vol. 2010, No. 21 …
Uniqueness for the Ricci Flow,” International Mathematics Research Notices, Vol. 2010, No. 21 …