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Blueprints for dodecahedral DNA cages . Journal of Physics A: Mathematical and Theoretical. 41(30):304043-304057.. 2008.
The Protein Stoichiometry of Viral Capsids via Tiling Theory. WSEAS Transactions on Biology and Biomedicine. 1:68-72.. 2004.
Representations for selected types of Diffusion algebras. Proceedings of Quantum Theory and Symmetries, Krakow, 2001.. 2002.
Mathematical Virology: A mathematical physicist's approach to the protein stoichiometry and bonding structure of viral capsids. Proceedings IX. International Conference on Symmetry Methods in Physics, Mexico, 2004.. 2005.
The architecture of viral capsids based on tiling theory. J. Theor. Medicine. 6:87--90.. 2005.
Quadratic algebras in simple exclusion models. Proceedings of Group-24: Physical and Mathematical Aspects of Symmetries.. 2003.
A Mathematical Physicist's Approach to the Structure and Assembly of Viruses. Phil. Trans. A. 364:3357-3374.. 2006.
Dynamical implications of Viral Tiling Theory . Journal of Theoretical Biology. 252(2):357-369.. 2008.
Recurrence times in dynamical systems via a quasicrystal approach. Physics of Particles and Nuclei. 33:114-117.. 2002.
All-atom normal-mode analysis reveals an RNA-induced allostery in a bacteriophage coat protein. Physical Review E. 81(3):1-10.. 2010.
Quadratic algebras in traffic flow models. Rep. Math. Phys.. 51:381-389.. 2003.
Polyomaviridae assembly polymorphism from an energy landscape perspective . Computational and Mathematical Methods in Medicine. 9(3-4):245-256.. 2008.
DNA duplex cage structures with icosahedral symmetry. Theoretical Computer Science. 410(15):1440-1447.. 2009.
A tiling approach to virus capsid assembly explaining a structural puzzle in virology. J. Theor. Biol.. 226:477-482.. 2004.
Structural constraints on the three-dimensional geometry of simple viruses: case studies of a new predictive tool. Acta Crystallographica Section A: Foundations of Crystallography. 69(2). 2013.
Mathematical models for tubular structures in the family of Papovaviridae. Bull. Math. Biol.. 67:973-987.. 2005.
Simple Rules for Efficient Assembly Predict the Layout of a Packaged Viral RNA. Journal of Mathematical Biology. 408(3):399-407.. 2011.
Structural description of viral particles based on affine extensions of non-crystallographic Coxeter groups. Proceedings of the IV-th International Symposium on Quantum Theory and Symmetry, Varna, 2005... 2006.
Construction of diffusion algebras. J. Math. Phys.. 43:3268-3279.. 2002.
Tiles in Quasicrystals with Cubic Irrationality. J. Phys. A. 36:4363-4373.. 2003.
Affine extension of noncrystallographic Coxeter groups and quasicrystals. J. Phys. A. 35:1551-1574.. 2002.
Virasoro-type algebras associated with a Penrose tiling. J. Phys. A. 36:4091-4111.. 2003.
Virasoro-type algebras associated with higher-rank aperiodic point sets. Proceedings of the Third International Symposium on Quantum Theory and Symmetries.. 2004.
Department of Mathematics, University of York, Heslington, York, UK. YO10 5DD