@article { , title = {Asymptotic analysis of breather modes in a two-dimensional mechanical lattice}, abstract = {We consider a two-dimensional square lattice in which each node is restricted to the plane of the lattice, but is permitted to move in both directions of the lattice. We assume nodes are connected to nearest neighbours along the lattice directions with nonlinear springs, and to diagonal neighbours with linear springs. We consider a generalised Klein-Gordon system, that is, where there is an onsite potential at each node in addition to the (nonlinear) nearest-neighbour interactions. We derive the equations of motion for the displacements from the Hamiltonian. We use asymp-totic techniques to derive the form of small amplitude breather solutions, and find necessary conditions required for their existence. We find two types of mode, which we term 'optical' and 'acoustic', based on the analysis of other lattices which support dispersion relations with multiple branches. In addition to the usual inequality on the sign of the nonlinearity in order for the NLS to be of the focusing type, we obtain an additional ellipticity constraint, that is a restriction in the two-dimensional wavenumber space, required for the spatial differential operator to be elliptic. Highlights • we consider a 2D square lattice with in-plane motion of nodes • we use a weakly nonlinear asymptotic expansion to derive envelope equation • we find breather solutions of an associated 2D NLS • two conditions for breathers: usual focusing, additional ellipticity constraint}, doi = {10.1016/j.physd.2019.132207}, eissn = {0167-2789}, issn = {0167-2789}, journal = {Physica D}, publicationstatus = {Published}, publisher = {Elsevier}, url = {https://nottingham-repository.worktribe.com/output/2641437}, volume = {401}, keyword = {breathers, nonlinear waves, discrete systems, asymptotic analysis}, year = {2020}, author = {Wattis, Jonathan and Alzaidi, Ahmed} }