Universality and asymptotics of graph counting problems in non-orientable surfaces

Potential flows in a system consisting of compressible barotropic ideal fluids -a liquid and a gas with an interface and an acoustic high-frequency vibrator, placed in the gas, are considered. The system of two media completely occupies a bounded absolutely rigid vessel. The two-scale expansion meth

Erdős has conjectured that every subgraph of the n-cube Q n having more than (1/2+o(1))e(Q n ) edges will contain a 4-cycle. In this note we consider 'layer' graphs, namely, subgraphs of the cube spanned by the subsets of sizes k -1, k and k + 1, where we are thinking of the vertices of Q n as being

Solutions of the non-linear hyperbolic equations describing quasi-transverse waves in composite elastic media are investigated within the framework of a previously proposed model, which takes into account small dissipative and dispersion processes. It is well known for this model that if a solution