Research in viscosity solutions using the method of Functional Analysis.
Project/Area Number  10640169 
Research Category 
GrantinAid for Scientific Research (C)

Allocation Type  Singleyear Grants 
Section  一般 
Research Field 
Basic analysis

Research Institution  Kobe University of Mercantile Marine 
Principal Investigator 
MARUO Kenji Kobe Univ. Mercan. Marine, Faculty of Mercan. Marine, Professor, 商船学部, 教授 (90028225)

CoInvestigator(Kenkyūbuntansha) 
INOUE Tetuo Kobe Univ. Mercan. Marine, Faculty of Mercan. Marine, Professor, 商船学部, 教授 (50031448)
ISHII Katsuyuki Kobe Univ. Mercan. Marine, Faculty of Mercan. Marine, Assistant Professor, 商船学部, 助教授 (40232227)
TOMITA Yoshihito Kobe Univ. Mercan. Marine, Faculty of Mercan. Marine, Professor, 商船学部, 教授 (50031456)
MIYAKODA Tuyako Osaka Univ., Faculty of Technology, Assistant, 工学部, 助手 (80174150)
INOUE Ysuo Kobe Univ. Mercan. Marine, Faculty of Mercan. Marine, Assistant, 商船学部, 助手 (70304136)

Project Period (FY) 
1998 – 1999

Project Status 
Completed(Fiscal Year 1999)

Budget Amount *help 
¥1,500,000 (Direct Cost : ¥1,500,000)
Fiscal Year 1999 : ¥800,000 (Direct Cost : ¥800,000)
Fiscal Year 1998 : ¥700,000 (Direct Cost : ¥700,000)

Keywords  Viscosity Solution / Degenerate Elliptic Equation / Existence Theorem / Uniqueness Theorem / Semilinear / Quasilinear / Radial Solution / 退化楕円型偏微分方程式 / 退化楕円型半線型方程式 / radial solution / standard solution / unbounded solution / 退化型二階常微分方程式 
Research Abstract 
We consider the Dirichelet problem for a semilinear degenerate elliptic equation (DP) : g(x)Δu+f(x, u(x)) = 0, and Boundary Condition where N【greater than or equal】2 and g(x), f(x, u) are continuous. We discuss the problem (DP) under the following assumption : 1)g is nonnegative. 2)f is strictly monotone for u. We first define a standard viscosity solution by the viscosity solution such that if g(x) = 0 then f(x, u(x)) = 0. Then we can prove that the any continuous standard viscosity solution is the radial solution and it is unique. We add an assumption : 3)∫ィイD1a0ィエD1gィイD11ィエD1(s)ds = ∞ or ∫ィイD2a+0ィエD2gィイD11ィエD1(s)ds = ∞ for any a : g(a) = 0. Then We obtain that any continuous viscosity solution is the radial solution and it is unique. If the assumption 3) is not satisfied there exist examples such that the continuous viscosity solutions are not unique. Here, the domain is a bounded boall in ndimension space. We next state the existence and uniqueness of the continuous unbounded viscosity solution in RィイD12ィエD1. We use the order of the infinite neighborhood of the solution as the boundary condition. We know that the existence or nonexistence of the solution are dependent on a kind of the order of the solution. Moreover, we get the results which the uniqueness or nonuniqueness are also dependent on a kind of the order of the solution. In case, we assume that g, f is sufficiently smooth. We now show the existence of a continuous viscosity solution to quasisemilinear degenerate elliptic problem. Here, g(x, u), f(x, u) are continuous and f is strictly monotone for u. Moreover, we assume there exists an implicite function of f = 0 and the implicite function holds some smoothness. Then we can prove the existence of the continuous viscosity solution. But it is difficult to prove the uniqueness of the solution.

Report
(3results)
Research Products
(7results)