Entire solutions of the Monge-Ampère equation

This paper deals with the solutions defined for all time of the KPP equation where f is a KPP-type nonlinearity defined in [0, 1]: . This equation admits infinitely many traveling-wave-type solutions, increasing or decreasing in x. It also admits solutions that depend only on t. In this paper, we

We prove that for certain classes of compactly supported C ∞ initial data, smooth solutions of the unsteady Prandtl's equation blow up in finite time.

Our earlier paper incorporated linear basis functions for the representation of the distribution of the primary variable (velocity) into a model of the Green element method (GEM) for the solution of Burgers' equation. GEM is an element-by-element numerical procedure of implementing the singular boun

The genuine multireference approaches, including multireference coupled-cluster (MRCC) methods of the state-universal and valence-universal type, are based on the generalized Bloch equation. Unlike the Schrödinger equation, the Bloch equation is nonlinear and has multiple solutions. In this study, t