Unique continuation for parabolic operators
Arkiv för matematik2003Vol. 41(1), pp. 35–60
Citations Over TimeTop 10% of 2003 papers
Abstract
It is shown that if a function u satisfies a backward parabolic inequality in an open set Ω∉Rn+1 and vanishes to infinite order at a point (x0·t0) in Ω, then u(x, t0)=0 for all x in the connected component of x0 in Ω⌢(Rn×{t0}).
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