• Baigent, S. A. (2013). Geometry of carrying simplices of 3-species competitive Lotka-Volterra systems. Nonlinearity, 26(4), 1001-1029. doi:10.1088/0951-7715/26/4/1001
  • Hou, Z., & Baigent, S. A. (2013). Heteroclinic cycles in competitive Kolmogorov systems. Discrete and Continuous Dynamical Systems Series A, 33(9), 4071-4093. doi:10.3934/dcds.2013.33.4071
  • Noiret, L., Baigent, S. A., Cobos, M. J., & Jalan, R. (2012). Computational model predicts that portosystemic shunting is key to the development of hyper ammonaemia in liver cirrhosis. In Gut Pathogens Vol. 61 (pp. A186-A187). B M J Publishing Group.
  • Noiret, L., Baigent, S. A., & Jalan, R. (2011). Progression of hemodynamic changes in liver cirrhosis. A mathematical approach. In Journal of Hepatology Vol. 54 (pp. S248). Amsterdam: Elsevier Science BV.
  • Nattrass, S., Baigent, S. A., & Murrell, D. J. (2012). Quantifying the likelihood of coexistence for communities with asymmetric competition. Bulletin of Mathematical Biology, 74(10), 2315-2338. doi:10.1007/s11538-012-9755-8
  • Baigent, S. A., & Hou, Z. (2012). Global stability of interior and boundary fixed points for Lotka-Volterra systems. Differential Equations and Dynamical Systems: an international journal for theory and applications, 20(1), 53-66. doi:10.1007/s12591-012-0103-0
  • Baigent, S. A. (2012). Convexity-preserving flows of totally competitive planar Lotka-Volterra equations and the geometry of the carrying simplex. Proceedings of the Edinburgh Mathematical Society, 55(1), 53-63. doi:10.1017/S0013091510000684
  • Hou, Z., & Baigent, S. (2011). Fixed Point Global Attractors and Repellors in Competitive Lotka-Volterra Systems. Dynamical Systems: An International Journal, 26(4), 367-390. doi:10.1080/14689367.2011.554384
  • Donnell, P., Banaji, M., & Baigent, S. (2009). Stability in generic mitochondrial models. Journal of Mathematical Chemistry, 46(2), 322-339. doi:10.1007/s10910-008-9464-6
  • Donnell, P., Baigent, S., & Banaji, M. (2009). Monotone dynamics of two cells dynamically coupled by a voltage-dependent gap junction. Journal of Theoretical Biology, 261, 120-125. doi:10.1016/j.jtbi.2009.07.012
  • Banaji, M., & Baigent, S. A. (2008). Electron transfer networks. Journal of Mathematical Chemistry, 43(4), 1355-1370. doi:10.1007/s10910-007-9257-3
  • Li, L., Seymour, R., & Baigent, S. (2008). Integrating Biosystem Models using Waveform Relaxation. EURASIP Journal on Bioinformatics and Systems Biology, 2008, 1-18. doi:10.1155/2008/308623
  • Banaji, M., Donnell, P., & Baigent, S. A. (2007). P matrix properties, injectivity and stability in chemical reaction systems. SIAM Journal on Applied Mathematics, 67(6), 1523-1547. doi:10.1137/060673412
  • Hetherington, J., Bogle, I. D. L., Saffrey, P., Margoninski, O., Li, L., Varela Rey, M., Warner, A. (2007). Addressing the challenges of multiscale model management in systems biology. In Computers and Chemical Engineering Vol. 31 (pp. 962-979). Glasgow, Scotland: Pergamon-Elsevier Science Ltd. doi:10.1016/j.compchemeng.2006.10.004
  • Banaji, M., Tachtsidis, I., Delpy, D. T., & Baigent, S. A. (2005). A Physiological Model of Cerebral Blood Flow Control. Mathematical Biosciences, 194(2), 125-173. doi:10.1016/j.mbs.2004.10.005
  • Banaji, M., & Baigent, S. (2005). A flexible, iterative, approach to physiological modelling. In R. Paton, & L. A. McNamara (Eds.), Multidisciplinary approaches to theory in medicine. Elsevier.
  • Skeldon, A. C., Baigent, S., Fitt, A., Greenhalgh, D., McKee, S., Mulholland, A. J., Hunter, J. J. (2004). A Mathematical Model of the Mother and Child attachment System: 4th Mathematical Medicine Study Group, Strathclyde 2004.
  • Wattis, J. A. D., Byrne, H. M., Baigent, S. A., Geddes, C. C., Katsikanis, N., King, J. R., . Sherratt, J. (2004). Modelling the Loss of Kidney Function: 4th Mathematical Medicine Study Group, Strathclyde 2004.
  • Baigent, S. (2004). CoMPLEX: Bringing models to life. In UCL Science (Iss. 18). London: UCL.
  • Baigent, S. A. (2003). Cells coupled by voltage-dependent gap junctions: the asymptotic dynamical limit. Biosystems, 68(2-3), 213-222. doi:10.1016/S0303-2647(02)00097-7
  • Baigent, S., & Norbury, J. (2002). Statistical methods in atmospheric dynamics: probability metrics and discrepancy measures as a means of defining balance. In Large-scale atmosphere-ocean dynamics I. Cambridge University Press.
  • Baigent, S. A., Stark, J., & Warner, A. (2001). Convergent dynamics of two cells coupled by a nonlinear gap junction. Nonlinear Analysis: Theory, Methods and Applications, 47(1), 257-268. doi:10.1016/S0362-546X(01)00174-2
  • Baigent, S. A., Unwin, R., & Yeng, C. C. (2001). Mathematical modelling of profiled haemodialysis: a simplified approach. Journal of Theoretical Medicine, 3(2), 143-160. doi:10.1080/10273660108833070
  • Stark, J., Iannelli, P., & Baigent, S. (2001). A nonlinear dynamics perspective of moment closure for stochastic processes. Nonlinear Analysis: Theory, Methods and Applications, 47(2), 753-764. doi:10.1016/S0362-546X(01)00220-6
  • Baigent, S. (2001). Software Review: Gepasi 3.0. Briefings in Bioinformatics, 2008(3), 300-302. doi:10.1093/bib/2.3.300
  • Baigent, S. (2001). Modelling cell systems-the post-genomic challenge (Editorial). Briefings in Bioinformatics, 2(3), 321-322.
  • Baigent, S. (2000). Regulation of intercellular fluxes by gap junctions: Department of Computer Science Technical Report (345). University of Hertfordshire, UK.
  • Baigent, S., Stark, J., & Warner, A. E. (1998). Some aspects of gap junction dynamics in embryonic systems. In M. Holcombe, & R. Paton (Eds.), Information Processing in Cells and Tissues (pp. 7-15). New York: Plenum.
  • Baigent, S. (1998). Book review: "Dynamics of Cell and Tissue Motion" by Alt, W., Deutsch, A. and Dunn, G. In UK Nonlinear News (Vol. 13).
  • Iannelli, P., Baigent, S., & Stark, J. (1998). Inertial Manifolds for Dynamics of Cells Coupled by Gap Junctions. Dynamics and Stability of Systems, 13(2), 187-213.
  • Baigent, S. A., Stark, J., & Warner, A. E. (1997). Modelling the effect of gap junction nonlinearities in systems of coupled cells. Journal of Theoretical Biology, 186, 223-239.
  • Baigent, S., & Norbury, J. (1997). Two discrete models for semi-geostrophic dynamics. Physica D: Nonlinear Phenomena, 109, 333-342. doi:10.1016/S0167-2789(97)00073-0
  • Moroz, I. M., Baigent, S. A., Clayton, F. M., & Lever, K. V. (1992). Bifurcation analysis of the control of an adaptive equalizer. P. Roy Soc Lond A, 437(1901), 501-515.