TY - JOUR
T1 - Hopf-Lax Formulas for Semicontinuous Data
AU - Alvarez, O.
AU - Barron, E. N.
AU - Ishii, Hitoshi
PY - 1999/9
Y1 - 1999/9
N2 - The equations ut + H(Du) = 0 and ut + H(u, Du) = 0, with initial condition u(0, x) = g(x) have an explicit solution when the hamiltonian is convex in the gradient variable (Lax formula) or the initial data is convex, or quasiconvex (Hopf formula). This paper extends these formulas to initial functions g which are only lower semicontinuous (lsc), and possibly infinite. It is proved that the Lax formulas give a lsc viscosity solution, and the Hopf formulas result in the minimal supersolution. A level set approach is used to give the most general results.
AB - The equations ut + H(Du) = 0 and ut + H(u, Du) = 0, with initial condition u(0, x) = g(x) have an explicit solution when the hamiltonian is convex in the gradient variable (Lax formula) or the initial data is convex, or quasiconvex (Hopf formula). This paper extends these formulas to initial functions g which are only lower semicontinuous (lsc), and possibly infinite. It is proved that the Lax formulas give a lsc viscosity solution, and the Hopf formulas result in the minimal supersolution. A level set approach is used to give the most general results.
KW - Hopf and Lax formulas
KW - Level sets
KW - lsc viscosity solutions
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M3 - Article
AN - SCOPUS:0001262246
SN - 0022-2518
VL - 48
SP - 993
EP - 1035
JO - Indiana University Mathematics Journal
JF - Indiana University Mathematics Journal
IS - 3
ER -