References
- Barles , G. 1983 . Control impulsionnel deterministe, inequations quasi-variationnelles de Hamilton-Jacobi du premier ordre , Universite de Paris-Dauphine . Ann. I.H.P. Anal. nonlin
- Benilan , P. and Crandall , M.G. Regularizing effects of homogeneous evolution equations , Univ. of Wisconsin-Madison . M.R.C. Techn. Sum. Rep. 2076
- Brizis , H. Operateurs maximaux monotones , Amsterdam : North-Holland .
- Crandail , M.G. , Evans , L.C. and Lions , P.L. 1984 . Some properties of viscosity solutions of Hamilton-Jacob! equations . Trans. Amer, Math, Soc , 282 : 487 – 502 .
- Crandall , M.G. and Lions , P.L. 1981 . Conditions d'unicite pour lessolutions generalisees des equations de Hamilton-Jacobi du premier ordre , 183 – 186 . Paris : C.R. Acad. Sci. .
- Crandail , M.G. and Lions , P.L. 1983 . Viscosity solutions of Hamilton Jacobi equations . Trans. Amer, Math, Soc , 277 : 1 – 42 .
- Crandail , M.G. and Lions , P.L. 1984 . Solutions de viscbsite non bornees des equations de Hamilton-Jacobi du premier ordre . C.R, Acad, Sci, Paris , 298 : 217 – 220 .
- Crandail , M.G. and Lions , P.L. 1984 . Qn existence and uniqueness of solutions of Hamilton-Jacob| equations, Nonlin . Anal. T.M,A , 298
- Crandail , M.G. and Lions , P.L. Remarks on the existence and unipueness of unbounded viscosity solutions of Hamilton , To appear
- Crandall , M.G. , Lions , P.L. and Souganidis , P.E. In preparation
- Crandall , M.G. and Pierre , M. Regularizing effects for [d] , Univ. of Wisconsin-Madison .
- Ifehii , H. 1984 . Uniquenessof unbounded solutions of Hamilton-Jacobi equations . Ind. Univ. Math. J , 298
- Ishii , H. 1983 . Remarks on the existence of viscosity solutions of Hamilton-Jacobi equations . Bull, Facul, Sci. Eng,, Chuo Univ , 26 : 5 – 24 .
- Lions , P.L. 1982 . Generalized solutions of Hamilton-Jacobi equations , London : Pitman .
- Lions , P.L. 1983 . Existence results for first-order Hamilton-Jacobi equations . Ricerche di Mat , 32 : 3 – 23 .
- Lions , P.L. 1983 . On Hamilton-Jacobi semigroups. Proc, Conf , Graz : on Semigroups .