Uniqueness of solutions of the Cauchy problem for parabolic equations degenerating at infinity

S. Eidelman; S. Kamin; F. Porper

Uniqueness of solutions of the Cauchy problem for parabolic equations degenerating at infinity

S. Eidelman, S. Kamin, F. Porper

School of Mathematical Sciences

Research output: Contribution to journal › Article › peer-review

Abstract

This paper is devoted to the investigation of classes of uniqueness for classical solutions of the Cauchy problem ρ(t, x)∂_tu = ∑ⁿ_{i, j=1} a_ij(t, x)∂_xi∂_xju + ∑ⁿ_i=1 b_i(t, x)∂_xi + c(t, x)u, u/_t=0 = u₀(x), x ∈ Rⁿ. We study how the behaviour of the function ρ(t, x) as \x\ → ∞ influences the classes of uniqueness of the Cauchy problem. In particular the dependence of such classes on the number of the space coordinates is clarified. We also discuss the sharpness of the obtained results.

Original language	English
Pages (from-to)	349-358
Number of pages	10
Journal	Asymptotic Analysis
Volume	22
Issue number	3-4
State	Published - Apr 2000

Cite this

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abstract = "This paper is devoted to the investigation of classes of uniqueness for classical solutions of the Cauchy problem ρ(t, x)∂tu = ∑ni, j=1 aij(t, x)∂xi∂xju + ∑ni=1 bi(t, x)∂xi + c(t, x)u, u/t=0 = u0(x), x ∈ Rn. We study how the behaviour of the function ρ(t, x) as \x\ → ∞ influences the classes of uniqueness of the Cauchy problem. In particular the dependence of such classes on the number of the space coordinates is clarified. We also discuss the sharpness of the obtained results.",

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AB - This paper is devoted to the investigation of classes of uniqueness for classical solutions of the Cauchy problem ρ(t, x)∂tu = ∑ni, j=1 aij(t, x)∂xi∂xju + ∑ni=1 bi(t, x)∂xi + c(t, x)u, u/t=0 = u0(x), x ∈ Rn. We study how the behaviour of the function ρ(t, x) as \x\ → ∞ influences the classes of uniqueness of the Cauchy problem. In particular the dependence of such classes on the number of the space coordinates is clarified. We also discuss the sharpness of the obtained results.

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Uniqueness of solutions of the Cauchy problem for parabolic equations degenerating at infinity

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