◆ 論文リスト ◆
1. T.
Yokota,
Invariance of closed convex sets under semigroups of nonlinear
operators
in
complex Hilbert
spaces,
SUT J. Math. 37 (2001), 91-104.
2. N. Okazawa and T.
Yokota,
Monotonicity method for the complex Ginzburg-Landau equation,
including smoothing
effect,
Nonlinear Anal.
47 (2001), 79-88.
3. N. Okazawa and T.
Yokota,
Monotonicity
method applied to the
complex Ginzburg-Landau and related
equations,
J. Math. Anal. Appl.
267 (2002), 247-263.
4. N. Okazawa and T.
Yokota,
Perturbation
theory for m-accretive operators and
generalized complex
Ginzburg-Landau
equations,
J. Math. Soc.
Japan 54 (2002),
1-19.
5. N. Okazawa and
T.
Yokota,
Global existence and smoothing effect for the complex Ginzburg-Landau
equation with p-Laplacian,
J. Differential
Equations 182 (2002), 541-576.
6. S. Takeuchi and T.
Yokota,
Global attractors for a class of degenerate diffusion
equations,
Electron. J. Differential Equations
2003 (2003), No. 76, 1-13.
7. T. Ogawa
and T.
Yokota,
Uniqueness and inviscid limits of solutions for the
complex
Ginzburg-Landau
equation in a two-dimensional domain,
Comm. Math. Phys.
245 (2004), 105-121.
8. T.
Yokota,
Smoothing effect
for the complex Ginzburg-Landau equation (general case),
Dynamics of Continuous Discrete and Impulsive Systems-Series A 13B (2006), 305-316.
9. N. Okazawa and T.
Yokota,
Quasi-m-accretivity of Schrödinger operators
with singular first-order coefficients,
Discrete Contin. Dynam. Systems
22 (2008), 1081-1090.
10. T. Kojima and T.
Yokota,
Generation of analytic semigroups by generalized Ornstein–Uhlenbeck
operators with
potentials,
J. Math. Anal. Appl.
364 (2010), 618-629.
11. N. Okazawa and T.
Yokota,
Subdifferential operator approach to strong wellposedness of
the complex Ginzburg-Landau equation,
Discrete Contin. Dynam. Systems
28 (2010), 311-341.
12. N. Okazawa and T.
Yokota,
Smoothing effect for generalized
complex Ginzburg-Landau equations
in unbounded
domains,
Discrete Contin. Dynam. Systems
2001, Added Volume, 280-288.
13. S. Takeuchi and T.
Yokota,
A
note on stability for stationary solutions of nonlinear parabolic
equations,
GAKUTO Internat. Ser. Math. Sci.
Appl. 17, Gakkotosho, Tokyo, 2001, 119-129.
14. T.
Yokota,
Monotonicity
and compactness methods applied to
the nonlinear
Schrödinger
and related
equations,
Nonlinear Analysis and Applications: To V. Lakshmikantham on his 80th
Birthday,
Volume
II, Kluwer Academic Publishers, 2003.
15. T. Yokota and N. Okazawa,
The complex Ginzburg-Landau
equation (an improvement),
GAKUTO Internat. Ser. Math. Sci.
Appl. 29, Gakkotosho, Tokyo, 2008, 463-475.
16. N. Okazawa and T.
Yokota,
Perturbations
of maximal monotone operators applied to the nonlinear
Schrödinger and
complex Ginzburg-Landau equations,
京都大学数理解析研究所講究録 1105 (1999),
102-120.
17. T. Yokota,
Invariance of closed
convex sets under semigroups of nonlinear
operators,
Ulmer Seminare über Funktionalanalysis
und Differentialgleichungen 5
(2000),
396-406.
18. T.
Yokota,
Common
construction of solutions for the complex Ginzburg-Landau
and
nonlinear
Schrödinger equations,
Ulmer
Seminare über Funktionalanalysis und Differentialgleichungen
6 (2001),
394-408.
19. T. Yokota and N.
Okazawa,
Nonlinear
p-heat equations with singular potentials,
Semigroups of
Operators: Theory and Applications, Optimization
Software,
Los
Angeles, 2002,
357-367.
20. S. Takeuchi, H. Asakawa and T. Yokota,
Complex Ginzburg-Landau
type equations with nonlinear Laplacian,
GAKUTO Internat. Ser. Math. Sci.
Appl. 20, Gakkotosho, Tokyo, 2004, 315-332.
21. N. Okazawa and T. Yokota,
Non-contraction semigroups generated by the complex
Ginzburg-Landau equation,
GAKUTO Internat. Ser. Math. Sci.
Appl. 20, Gakkotosho, Tokyo, 2004, 490-504.
22. N. Okazawa and T.
Yokota,
The complex
Ginzburg-Landau equation on general domain,
京都大学数理解析研究所講究録 1436 (2005), 107-116.