References
- Keller EF, Segel LA. Initiation of slime mold aggregation viewed as an instability. J Theor Biol. 1970;26:399–415. doi: 10.1016/0022-5193(70)90092-5
- Horstmann D. From 1970 until present: the Keller Segel model in chemotaxis and its consequences. I Jahresber Deutsch Math Verien. 2003;105:103–165.
- Hillen T, Painter KJ. A user's guide to PDE models for chemotaxis. J Math Biol. 2009;58:183–217. doi: 10.1007/s00285-008-0201-3
- Gajewski H, Zacharias K. Global behaviour of a reaction–diffusion system modelling chemotaxis. Math Nachr. 1998;195:77–114. doi: 10.1002/mana.19981950106
- Aïssa N, Alexandre R. Global existence of weak solutions to an angiogenesis model. J Evol Equ. 2016;16:877–894. doi: 10.1007/s00028-016-0323-9
- Cieślak T, Stinner C. Finite-time blow up and global-in-time unbounded solutions to a parabolic-parabolic quasilinear Keller–Segel system in higher dimensions. J Differ Equ. 2012;252:5832–5851. doi: 10.1016/j.jde.2012.01.045
- Cieślak T, Stinner C. Finite-time blow up in a supercritical quasilinear parabolic-parabolic Keller–Segel system in dimension 2. Acta Appl Math. 2014. doi:10.1007/s10440-013-9832-5
- Cieślak T, Winkler M. Finite-time blow-up in a quasilinear system of chemotaxis. Nonlinearity. 2008;21:1057–1076. doi: 10.1088/0951-7715/21/5/009
- Elissar N. Global existence of solutions to a parabolic-elliptic chemotaxis system with critical degenerate diffusion. J Math Anal Appl. 2014;417:144–163. doi: 10.1016/j.jmaa.2014.02.069
- Jäger W, Luckhaus S. On explosions of solutions to a system of partial differential equations modelling chemotaxis. Trans Am Math Soc. 1992;329:819–824. doi: 10.1090/S0002-9947-1992-1046835-6
- Kowalczyk R. Preventing blow-up in a chemotaxis model. J Math Anal Appl. 2005;305:566–588. doi: 10.1016/j.jmaa.2004.12.009
- Bellomo N, Belloquid A, Tao Y, et al. Toward a mathematical theory of Keller–Segel models of pattern formation in biological tissues. Math Models Methods Appl Sci. 2015;25(9):1663–1763. doi: 10.1142/S021820251550044X
- Winkler M. Aggregation vs global diffusive behavior in the higher-dimensional Keller–Segel model. J Diff Equ. 2010;248:2889–2905. doi: 10.1016/j.jde.2010.02.008
- Winkler M. Finite-time blow-up in the higher-dimensional parabolic-parabolic Keller–Segel system (English, with English and French summaries). J Math Pures Appl (9). 2013;100(5):748–767. doi: 10.1016/j.matpur.2013.01.020
- Horstmann D, Winkler M. Boundedness vs. blow-up in a chemotaxis system. J Differ Equ. 2005;215:52–107. doi: 10.1016/j.jde.2004.10.022
- Cieślak T, Laurençot P. Finite time blow-up for radially symmetric solutions to a critical quasilinear Smoluchowski-Poisson system. CR Math Acad Sci Paris Sér. 2009;I347:237–242. doi: 10.1016/j.crma.2009.01.016
- Tao Y, Winkler M. Winkler: Boundedness in a quasilinear parabolic-parabolic Keller–Segel system with subcritical sensitivity. J Diff Equ. 2012;252:692–715. doi: 10.1016/j.jde.2011.08.019
- Ishida S, Seki K, Yokota T. Boundedness in quasilinear Keller–Segel systems of parabolic-parabolic type on non-convex bounded domains. J Diff Equ. 2014;256:2993–3010. doi: 10.1016/j.jde.2014.01.028
- Cieślak T, Winkler M. Stabilization in a higher-dimensional quasilinear Keller–Segel system with exponentially decaying diffusivity and subcritical sensitivity. Nonlinear Anal. 2017;159:129–144. doi: 10.1016/j.na.2016.04.013
- Cieślak T, Winkler M. Global bounded solutions in a two-dimensional quasilinear Keller–Segel system with exponentially decaying diffusivity and subcritical sensitivity. Nonlinear Anal Real World Appl. 2017;35:1–19. doi: 10.1016/j.nonrwa.2016.10.002
- Winkler M. Global existence and slow grow-up in a quasilinear Keller–Segel system with exponentially decaying diffusivity. Nonlinearity. 2017;30:735. doi: 10.1088/1361-6544/aa565b
- Levine HA, Boushaba K, Nilsen-Hamilton M. A mathematical model for the regulation of tumor dormancy based on enzyme kinetics. Bull Math Biol. 2006;68:1495–1526. doi: 10.1007/s11538-005-9042-z
- Kowalczyk R, Szymańska Z. On the global existence of solutions to an aggregation model. J Math Anal Appl. 2008;343:379–398. doi: 10.1016/j.jmaa.2008.01.005
- Diaz JI, Galiano G, Jüngel A. On a quasilinear degenerate system arising in semiconductor theory. Part I: existence and uniqueness of solutions. Nonlinear Anal Real World Appl. 2001;2:305–336. doi: 10.1016/S0362-546X(00)00102-4
- Porzio MM, Vespri V. Hölder estimates for local solutions of some doubly nonlinear degenerate parabolic equations. J Diff Equ. 1993;103(1):146–178. doi: 10.1006/jdeq.1993.1045
- Ladyzenskaja OA, Solonnikov VA, Uralćeva NN. Linear and quasilinear equations of parabolic type. Translated from the Russian by S. Smith Transl. Math. Monogr., vol. 23. Providence (RI): American Mathematical Society; 1968.
- Lankeit J. Locally bounded global solutions to a chemotaxis consumption model with singular sensitivity and nonlinear diffusion. J Diff Equ. 2017;262:4052–4084. doi: 10.1016/j.jde.2016.12.007
- Temam R. Infinite-dimensional dynamical systems in mechanics and physics. 2nd ed. Applied Mathematical Sciences, Vol. 68. New York: Springer-Verlag; 1997.
- Alikakos ND. Lp bounds of solutions of reaction-diffusion equations. Comm Partial Diferentialf Equations. 1979;4:827–868. doi: 10.1080/03605307908820113
- Wang L, Mu C, Zheng P, et al. Global existence and boundedness of classical solutions to a parabolic–parabolic chemotaxis system. Nonlinear Anal Real World Appl. 2013;14:1634–1642. doi: 10.1016/j.nonrwa.2012.10.022
- Winkler M. Absence of collapse in a parabolic chemotaxis system with signal-dependent sensitivity. Math Nachr. 2010;283:1664–1673. doi: 10.1002/mana.200810838
- Tao Y. Boundedness in a chemotaxis model with oxygen consumption by bacteria. J Math Anal Appl. 2011;381:521–529. doi: 10.1016/j.jmaa.2011.02.041
- Stinner C, Winkler AM. Global weak solutions in a chemotaxis system with large singular sensitivity. Nonlinear Anal Real World Appl. 2011;12:3727–3740.
- Lankeit J. Long-term behaviour in a chemotaxis-fluid system with logistic source. Math Models Methods Appl Sci. 2016;26(11):2071–2109. doi: 10.1142/S021820251640008X
- Winkler M. Stabilization in a two-dimensional chemotaxis-Navier–Stokes system. Arch Rational Mech Anal. 2014;211:455–487. doi: 10.1007/s00205-013-0678-9
- Winkler M. How far do chemotaxis-driven forces influence regularity in the Navier–Stokes system? Trans Am Math Soc. 2016;369(5):3067–3125. doi: 10.1090/tran/6733
- Adams R. Sobolev spaces. New York: Academic Press; 1975.