Abstract
In this paper, we establish several Liouville type theorems for entire solutions to fractional parabolic equations.
We first obtain the key ingredients needed in the proof of Liouville theorems, such as narrow region principles and maximum principles for antisymmetric functions in unbounded domains, in which we remarkably weaken the usual decay condition
u
→
0
u\to 0
at infinity to a polynomial growth on 𝑢 by constructing proper auxiliary functions.
Then we derive monotonicity for the solutions in a half space
R
+
n
×
R
\mathbb{R}_{+}^{n}\times\mathbb{R}
and obtain some new connections between the nonexistence of solutions in a half space
R
+
n
×
R
\mathbb{R}_{+}^{n}\times\mathbb{R}
and in the whole space
R
n
-
1
×
R
\mathbb{R}^{n-1}\times\mathbb{R}
and therefore prove the corresponding Liouville type theorems.
To overcome the difficulty caused by the nonlocality of the fractional Laplacian, we introduce several new ideas which will become useful tools in investigating qualitative properties of solutions for a variety of nonlocal parabolic problems.
Symmetry of components, Liouville-type theorems and classification results for some nonlinear elliptic systems
