-
1
-
-
0000049356
-
p approach to the Dirichlet problem
-
p approach to the Dirichlet problem. Ann. Scuola Norm. Sup. Pisa III-13 (1960), 405-448.
-
(1960)
Ann. Scuola Norm. Sup. Pisa
, vol.3-13
, pp. 405-448
-
-
Agmon, S.1
-
2
-
-
0004081844
-
Linear and quasilinear parabolic problems
-
Basel: Birkhäuser
-
Amann, H.: Linear and Quasilinear Parabolic Problems. Volume 1: Abstract Linear Theory. Basel: Birkhäuser 1995.
-
(1995)
Abstract Linear Theory
, vol.1
-
-
Amann, H.1
-
4
-
-
0001452319
-
Generation of analytic semigroups by elliptic operators with unbounded coefficients
-
Cannarsa, P. and V. Vespri: Generation of analytic semigroups by elliptic operators with unbounded coefficients. SIAM J. Math. Anal. 18 (1987), 857 - 872.
-
(1987)
SIAM J. Math. Anal.
, vol.18
, pp. 857-872
-
-
Cannarsa, P.1
Vespri, V.2
-
6
-
-
0002969970
-
Completely positive measures and Feller semigroups
-
Clément, P. and J. Prüss: Completely positive measures and Feller semigroups. Math. Ann. 287 (1990), 73 - 105.
-
(1990)
Math. Ann.
, vol.287
, pp. 73-105
-
-
Clément, P.1
Prüss, J.2
-
7
-
-
29844457982
-
N) for a class of elliptic operators with unbounded coefficients
-
N) for a class of elliptic operators with unbounded coefficients. Differential Integral Equations 17 (2004), 259 - 296.
-
(2004)
Differential Integral Equations
, vol.17
, pp. 259-296
-
-
Cupini, G.1
Fornaro, S.2
-
8
-
-
1542511259
-
Elliptic operators with unbounded drift coefficients and Neumann boundary condition
-
Da Prato, G. and A. Lunardi: Elliptic operators with unbounded drift coefficients and Neumann boundary condition. J. Differential Equations 198 (2004), 35 - 52.
-
(2004)
J. Differential Equations
, vol.198
, pp. 35-52
-
-
Da Prato, G.1
Lunardi, A.2
-
9
-
-
0036604799
-
p regularity for elliptic equations with unbounded coefficients
-
p regularity for elliptic equations with unbounded coefficients. Nonlinear Analysis 49 (2002), 747 - 755.
-
(2002)
Nonlinear Analysis
, vol.49
, pp. 747-755
-
-
Da Prato, G.1
Vespri, V.2
-
11
-
-
0001201473
-
1 properties of second order elliptic operators
-
1 properties of second order elliptic operators. Bull. London Math. Soc. 17 (1985), 417 - 436.
-
(1985)
Bull. London Math. Soc.
, vol.17
, pp. 417-436
-
-
Davies, E.B.1
-
12
-
-
32144431807
-
Some norm bounds and quadratic form inequalities for Schrödinger operators
-
Davies, E. B.: Some norm bounds and quadratic form inequalities for Schrödinger operators. J. Operator Theory 9 (1983), 147 - 162.
-
(1983)
J. Operator Theory
, vol.9
, pp. 147-162
-
-
Davies, E.B.1
-
13
-
-
4344695386
-
Some norm bounds and quadratic form inequalities for Schrödinger operators II
-
Davies, E. B.: Some norm bounds and quadratic form inequalities for Schrödinger operators II. J. Operator Theory 12 (1984), 177 - 196.
-
(1984)
J. Operator Theory
, vol.12
, pp. 177-196
-
-
Davies, E.B.1
-
14
-
-
0242287337
-
R-boundedness, Fourier multipliers, and problems of elliptic and parabolic type
-
Denk, R., M. Hieber and J. Prüss: R-boundedness, Fourier multipliers, and problems of elliptic and parabolic type. Memoirs AMS 166 (2003), no. 788.
-
(2003)
Memoirs AMS
, vol.166
, Issue.788
-
-
Denk, R.1
Hieber, M.2
Prüss, J.3
-
15
-
-
0003200995
-
Uniqueness and non-uniqueness of semigroups generated by singular diffusion operators
-
Berlin: Springer
-
Eberle, A.: Uniqueness and Non-Uniqueness of Semigroups Generated by Singular Diffusion Operators. Lecture Notes in Mathematics 1718. Berlin: Springer 1999.
-
(1999)
Lecture Notes in Mathematics
, vol.1718
-
-
Eberle, A.1
-
19
-
-
10844287757
-
Generation of analytic semigroups and domain characterization for degenerate elliptic operators with unbounded coefficients arising in financial mathematics. Part I
-
Gozzi, F., R. Monte and V. Vespri: Generation of analytic semigroups and domain characterization for degenerate elliptic operators with unbounded coefficients arising in financial mathematics. Part I. Differential Integral Equations 15 (2002), 1085 - 1128.
-
(2002)
Differential Integral Equations
, vol.15
, pp. 1085-1128
-
-
Gozzi, F.1
Monte, R.2
Vespri, V.3
-
20
-
-
84972498479
-
Fractional Powers of dissipative operators II
-
Kato, T.: Fractional Powers of dissipative operators II. J. Math. Soc. Japan 14 (1962), 242 - 248.
-
(1962)
J. Math. Soc. Japan
, vol.14
, pp. 242-248
-
-
Kato, T.1
-
21
-
-
77956949218
-
Remarks on the self-adjointness and related problems for differential operators
-
(eds.: I. W. Knowles and R. Lewis). Amsterdam: North Holland
-
Kato, T.: Remarks on the self-adjointness and related problems for differential operators. In: Spectral Theory of Differential Operators (eds.: I. W. Knowles and R. Lewis). Amsterdam: North Holland 1981, pp. 253 - 266.
-
(1981)
Spectral Theory of Differential Operators
, pp. 253-266
-
-
Kato, T.1
-
22
-
-
17044413547
-
∞ functional calculus
-
Functional Analytic Methods for Evolution Equations (eds.: M. Iannelli, R. Nagel, S. Piazzera). Berlin: Springer
-
∞ functional calculus. In: Functional Analytic Methods for Evolution Equations (eds.: M. Iannelli, R. Nagel, S. Piazzera). Lecture Notes in Mathematics 1855. Berlin: Springer 2004, pp. 65 - 311.
-
(2004)
Lecture Notes in Mathematics
, vol.1855
, pp. 65-311
-
-
Kunstmann, P.1
Weis, L.2
-
23
-
-
0036695915
-
0 semigroups associated with second-order elliptic operators II
-
0 semigroups associated with second-order elliptic operators II. J. Funct. Anal. 193 (2002), 55 - 76.
-
(2002)
J. Funct. Anal.
, vol.193
, pp. 55-76
-
-
Liskevich, V.1
Sobol, Z.2
Vogt, H.3
-
26
-
-
84972530280
-
p theory for Schrödinger operators with nonnegative potentials
-
p theory for Schrödinger operators with nonnegative potentials. J. Math. Soc. Japan 36 (1984), 675 - 688.
-
(1984)
J. Math. Soc. Japan
, vol.36
, pp. 675-688
-
-
Okazawa, N.1
-
27
-
-
0039462149
-
p-theory of Schrödinger operators with strongly singular potentials
-
p-theory of Schrödinger operators with strongly singular potentials. Japan J. Math. 22 (1996), 199 - 239.
-
(1996)
Japan J. Math.
, vol.22
, pp. 199-239
-
-
Okazawa, N.1
-
28
-
-
0036696744
-
0-semigroups associated with second order elliptic operators I
-
0-semigroups associated with second order elliptic operators I. J. Funct. Anal. 193 (2002), 24 - 54.
-
(2002)
J. Funct. Anal.
, vol.193
, pp. 24-54
-
-
Sobol, Z.1
Vogt, H.2
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