Mieko Tanaka

タナカミエコ | Mieko Tanaka

Affiliation and department：
Job title： Assistant Professor

Research field (1)： Mathematical analysis

Research keywords (1)：変分的手法による偏微分方程式の解の存在について

Research theme for competitive and other funds (2)：

変分的手法による偏微分方程式の解の存在について
existence of solutions of partial differential equations via variational methods

Papers (35)：

Vladimir Bobkov and Mieko Tanaka. On subhomogeneous indefinite p-Laplace equations in the supercritical spectral interval. CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS. 2023. 62. 1
Vladimir Bobkov and Mieko Tanaka. Multiplicity of positive solutions for (p,q)-Laplace equations with two parameters. COMMUNICATIONS IN CONTEMPORARY MATHEMATICS. 2022. 24. 3. 2150008
Vladimir Bobkov and Mieko Tanaka. Generalized Picone inequalities and their applications to (p,q)-Laplace equations. Open Mathematics. 2020. 2020. 18. 1030-1044
Vladimir Bobkov and Mieko Tanaka. On the Fredholm-type theorems and sign properties of solutions for (p,q)-Laplace equations with two parameters. Annali di Matematica Pure ed Applicata. 2019. 198. 5. 1651-1673
Vladimir Bobkov and Mieko Tanaka. On sign-changing solutions for (p,q)-Laplace equations with two parameters. Advances in Nonlinear Analysis. 2019. 8. 1. 101-129

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MISC (3)：

Mieko Tanaka. Existence and non-existence results of the Fucik type spectrum for the generalized p-Laplace operators. 数理解析研究所講究録. 2012. 1779. 1-10
Mieko Tanaka. Existence of a non-trivial periodic weak solution to an asymptotically linear wave equation. 数理解析研講究録. 2004. 1405. 1. 175-186
Mieko Tanaka. Existence of a non-trivial periodic weak solution to an asymptotically linear wave equation. 数理解析研講究録. 2004. 1405. 1. 175-186

Lectures and oral presentations (65)：

Maximum principle and Anti-Maximum principle type results for the p-Laplacian with indefinite weights
(大阪公立大学における微分方程式セミナー 2022)
The least energy solutions for subhomogeneous indefinite p-Laplace equations
(International Workshop on Nonlinear Elliptic Equations and Its Applications 2022)
符号変化する重み関数付き p-劣線形項を持つ p-ラプラス方程式の最小エネルギー解について
(応用解析研究会 2021)
Remarks on ground states for p-Laplace equations with indefinite weight
(オンラインによる微分方程式セミナー 2021)
Some remarks on positive solutions for $(p,q)$-Laplace equations with two parameters
(南大阪応用数学セミナー 2019)

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Education (2)：

- 2005 Tokyo University of Science Graduate School, Division of Natural Science Mathematics
- 2000 Tokyo University of Science Faculty of Science Mathematics

Professional career (1)：

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