Add to ORKGAbstract. We study the completeness and connectedness of asymptotic behaviours of solutions of the first Painleve ́ equation d2 y/dx2 = 6 y2 + x, in the limit x→∞, x ∈ C. This problem arises in various physical contexts including the critical behaviour near gradient catastrophe for the focusing nonlinear Schrödinger equation. We prove that the complex limit set of solutions is non-empty, compact and invariant under the flow of the limiting autonomous Hamiltonian system, that the infinity set of the vector field is a repellor for the dynamics and obtain new proofs for solutions near the equilibrium points of the autonomous flow. The results rely on a realization of Okamoto’s space, i.e., the space of initial values compactified and regulari...
We develop a general compactification framework to facilitate analysis of nonautonomous ODEs where n...
We develop a general compactification framework to facilitate analysis of nonautonomous ODEs where n...
The semiclassical (zero-dispersion) limit of the one-dimensional focusing Nonlinear Schroedinger equ...
We study the completeness and connectedness of asymptotic behaviours of solutions of the first Painl...
We study dynamics of solutions in the initial value space of the sixth Painlev\'e equation as the in...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems considered as ...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems obtained as pe...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems obtained as pe...
We argue that the critical behavior near the point of "gradient catastrophe" of the solution to the ...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems obtained as pe...
A. Moro We study the critical behaviour of solutions to weakly dispersive Hamilto-nian systems consi...
There are two main approaches to the perturbative study of integrable PDEs: 1) perturbations of line...
The semiclassical (zero-dispersion) limit of solutions $q=q(x,t,\epsilon)$ to the one-dimensional fo...
The semiclassical (zero-dispersion) limit of solutions $q=q(x,t,\epsilon)$ to the one-dimensional fo...
A special asymptotic solution of the Painlevé-2 equation with small parameter is stu-died. This sol...
We develop a general compactification framework to facilitate analysis of nonautonomous ODEs where n...
We develop a general compactification framework to facilitate analysis of nonautonomous ODEs where n...
The semiclassical (zero-dispersion) limit of the one-dimensional focusing Nonlinear Schroedinger equ...
We study the completeness and connectedness of asymptotic behaviours of solutions of the first Painl...
We study dynamics of solutions in the initial value space of the sixth Painlev\'e equation as the in...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems considered as ...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems obtained as pe...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems obtained as pe...
We argue that the critical behavior near the point of "gradient catastrophe" of the solution to the ...
We study the critical behaviour of solutions to weakly dispersive Hamiltonian systems obtained as pe...
A. Moro We study the critical behaviour of solutions to weakly dispersive Hamilto-nian systems consi...
There are two main approaches to the perturbative study of integrable PDEs: 1) perturbations of line...
The semiclassical (zero-dispersion) limit of solutions $q=q(x,t,\epsilon)$ to the one-dimensional fo...
The semiclassical (zero-dispersion) limit of solutions $q=q(x,t,\epsilon)$ to the one-dimensional fo...
A special asymptotic solution of the Painlevé-2 equation with small parameter is stu-died. This sol...
We develop a general compactification framework to facilitate analysis of nonautonomous ODEs where n...
We develop a general compactification framework to facilitate analysis of nonautonomous ODEs where n...
The semiclassical (zero-dispersion) limit of the one-dimensional focusing Nonlinear Schroedinger equ...