This work is licensed under the Creative Commons Attribution 4.0 International License.
Adams, R. A., Sobolev Spaces. New York: Academic Press, 1975.AdamsR. A.New YorkAcademic Press1975Search in Google Scholar
Anderson, A.R.A., A hybrid mathematical model of solid tumour invasion: the importance of cell adhesion. Math. Med. Biol. 22, (2005) 163–186.AndersonA.R.A.A hybrid mathematical model of solid tumour invasion: the importance of cell adhesion22200516318610.1093/imammb/dqi005Search in Google Scholar
Benzerky, S.; Pasquier, E.; Barbolosi, D.; Lacarelle, B.; Barlesi, F.; Andre, N.; Ciccolini, J., Metronomic reloaded: theoretical models bringing chemotherapy into the era of precision medicine. In: ELSEVIER. Seminars in Cancer Biology. [S.l.], 2015. v. 35, p. 53–61.BenzerkyS.PasquierE.BarbolosiD.LacarelleB.BarlesiF.AndreN.CiccoliniJ.Metronomic reloaded: theoretical models bringing chemotherapy into the era of precision medicineIn: ELSEVIER[S.l.],201535536110.1016/j.semcancer.2015.09.002Search in Google Scholar
Daniel, N.N.; Korsmeyer, S.J., Cell death: critical control points. Cell 116 (2), (2004) 205–219.DanielN.N.KorsmeyerS.J.Cell death: critical control points1162200420521910.1016/S0092-8674(04)00046-7Search in Google Scholar
Eftimie, R.; Bramson, J.L.; Earn, D.J.D., Interactions between the immune system and cancer: a brief review of non-spatial mathematical models. Bull. Math. Biol. 73 (1), (2011) 2–32.EftimieR.BramsonJ.L.EarnD.J.D.Interactions between the immune system and cancer: a brief review of non-spatial mathematical models731201123210.1007/s11538-010-9526-320225137Search in Google Scholar
Fassoni, A. C., Mathematical modeling in cancer addressing the early stage and treatment of avascular tumors. PhD thesis, University of Campinas, 2016.FassoniA. C.PhD thesis,University of Campinas2016Search in Google Scholar
Fedi, P.; Tronick, S.R.; Aaronson, S.A., Growth factors. Cancer Med. 4, (1997) 1–64.FediP.TronickS.R.AaronsonS.A.Growth factors41997164Search in Google Scholar
Friedman, A., Partial Differential Equations of Parabolic Type. New York: Mineola, Dover Publications, 2008FriedmanA.New YorkMineola, Dover Publications2008Search in Google Scholar
Hanahan, D.; Weinberg, R.A., Hallmarks of cancer: the next generation. Cell 144(5), (2011), 646–674.HanahanD.WeinbergR.A.Hallmarks of cancer: the next generation1445201164667410.1016/j.cell.2011.02.01321376230Search in Google Scholar
Ladyzhenskaya, O.; Solonikov, V.; Uraltseva, N., Linear and Quasilinear Equations of Parabolic Type. Amer. Math. Soc., 1968LadyzhenskayaO.SolonikovV.UraltsevaN.Linear and Quasilinear Equations of Parabolic Type1968Search in Google Scholar
Lions, Jacques-Louis., Contrôle des Systèmes Distribués Singuliers. Méthodes Mathématiques de L’informatique, Gautier-Villars, 1983.LionsJacques-LouisMéthodes Mathématiques de L’informatiqueGautier-Villars1983Search in Google Scholar
Mcgillen, J.B.; Gaffney, E.A.; Martin, N.K.; Maini, P.K., A general reaction-diffusion model of acidity in cancer invasion. J. Math. Biol. 68 (5), (2014) 1199–1224.McgillenJ.B.GaffneyE.A.MartinN.K.MainiP.K.A general reaction-diffusion model of acidity in cancer invasion68520141199122410.1007/s00285-013-0665-723536240Search in Google Scholar
Sarapata, E.A.; Pillis, L.G. de., A comparison and catalog of intrinsic tumor growth models. Bull. Math. Biol. 76 (8), (2014) 2010–2024.SarapataE.A.PillisL.G. de.A comparison and catalog of intrinsic tumor growth models76820142010202410.1007/s11538-014-9986-y25081547Search in Google Scholar
Simons, B.D.; Clevers, H., Strategies for homeostatic stem cell self-renewal in adult tissues. Cell 145 (6), (2011) 851–862.SimonsB.D.CleversH.Strategies for homeostatic stem cell self-renewal in adult tissues1456201185186210.1016/j.cell.2011.05.03321663791Search in Google Scholar
Mikhaylov, V. P., Partial Differential Equations, Mir Publishers, Moscow, 1978.MikhaylovV. P.Mir PublishersMoscow1978Search in Google Scholar