Mean value theorem and a maximum principle for Kolmogorov's equation
From MaRDI portal
Publication:1228737
DOI10.1007/BF01438384zbMath0333.35040MaRDI QIDQ1228737
Publication date: 1974
Published in: Mathematical Notes (Search for Journal in Brave)
Oscillation, zeros of solutions, mean value theorems, etc. in context of PDEs (35B05) Second-order parabolic equations (35K10) Fundamental solutions to PDEs and systems of PDEs with constant coefficients (35E05)
Related Items (5)
Global Hölder estimates via Morrey norms for hypoelliptic operators with drift ⋮ Appell Type Transformation for the Kolmogorov Operator ⋮ Gaussian lower bounds for non-homogeneous Kolmogorov equations with measurable coefficients ⋮ Local Sobolev-Morrey estimates for nondivergence operators with drift on homogeneous groups ⋮ Level Sets of the Fundamental Solution and Harnack Inequality for Degenerate Equations of Kolmogorov Type
Cites Work
- Unnamed Item
- Zufällige Bewegungen. (Zur Theorie der Brownschen Bewegung.)
- Hypoelliptic second order differential equations
- Maggioranti e minoranti delle soluzioni delle equazioni paraboliche
- A Mean Value Theorem for the Heat Equation
- The Fundamental Solution of a Degenerate Partial Differential Equation of Parabolic Type
- A strong maximum principle for parabolic equations
This page was built for publication: Mean value theorem and a maximum principle for Kolmogorov's equation
