TY - JOUR
T1 - A characteristic of local existence for nonlinear fractional heat equations in Lebesgue spaces
AU - Li, Kexue
N1 - Publisher Copyright:
© 2017 Elsevier Ltd
PY - 2017/2/15
Y1 - 2017/2/15
N2 - In this paper, we consider the fractional heat equation ut=△α/2u+f(u) with Dirichlet conditions on the ball BR⊂Rd, where △α/2 is the fractional Laplacian, f:[0,∞)→[0,∞) is continuous and non-decreasing. We present the characterisations of f to ensure the equation has a local solution in Lq(BR) provided that the non-negative initial data u0∈Lq(BR). For q>1 and 1<α<2, we show that the equation has a local solution in Lq(BR) if and only if lims→∞sups−(1+αq/d)f(s)=∞ and for q=1 and 1<α<2 if and only if ∫1∞s−(1+α/d)F(s)ds<∞, where F(s)=sup1≤t≤sf(t)/t. When lims→0f(s)/s<∞, the same characterisations holds for the fractional heat equation on the whole space Rd.
AB - In this paper, we consider the fractional heat equation ut=△α/2u+f(u) with Dirichlet conditions on the ball BR⊂Rd, where △α/2 is the fractional Laplacian, f:[0,∞)→[0,∞) is continuous and non-decreasing. We present the characterisations of f to ensure the equation has a local solution in Lq(BR) provided that the non-negative initial data u0∈Lq(BR). For q>1 and 1<α<2, we show that the equation has a local solution in Lq(BR) if and only if lims→∞sups−(1+αq/d)f(s)=∞ and for q=1 and 1<α<2 if and only if ∫1∞s−(1+α/d)F(s)ds<∞, where F(s)=sup1≤t≤sf(t)/t. When lims→0f(s)/s<∞, the same characterisations holds for the fractional heat equation on the whole space Rd.
KW - Dirichlet fractional heat kernel
KW - Fractional heat equation
KW - Local existence
KW - Non-existence
UR - https://www.scopus.com/pages/publications/85009817202
U2 - 10.1016/j.camwa.2016.12.031
DO - 10.1016/j.camwa.2016.12.031
M3 - 文章
AN - SCOPUS:85009817202
SN - 0898-1221
VL - 73
SP - 653
EP - 665
JO - Computers and Mathematics with Applications
JF - Computers and Mathematics with Applications
IS - 4
ER -