Add to ORKGSpatial dynamics of time periodic solutions for the Ginzburg-Landau equation / by T. Kapitula and S. Maier-Paape. - Augsburg : Inst. für Mathematik, 1994. - 28 S. - (Report / Institut für Mathematik ; 305
Numerical evidence is presented for the existence of stable heteroclinic cycles in large parameter r...
AbstractFor αβ>−1, stable time periodic solutions A(X,T)=AqeiqX+iωqT are the locally preferred planf...
In this paper we use a traveling wave reduction or a so-called spatial approximation to comprehensiv...
The phenomenon of time-periodic evolution of spatial chaos is investigated in the frames of one- and...
In this paper we study the behaviour of solutions of the form if(z, t) = q~(z) e- i~wt (e << 1) of t...
AbstractThis paper deals with the time dependent Ginzburg-Landau equations of superconductivity with...
Spatially periodic equilibria A(X, T) = 1 - q2 eiqX+i0 are the locally preferred planform for the Gi...
Spatially periodic equilibria A(X, T) = 1 - q2 eiqX+i0 are the locally preferred planform for the Gi...
In this paper we nd asymptotic behaviour of solutions of the Ginzburg{Landau equation at the spatial...
Abstract. We consider the following system of equations{ At = Axx + A−A3 −AB, x ∈ R, t> 0, Bt = σ...
The Ginzburg-Landau (GL) equation with real coefficients is a model equation appearing in supercondu...
Numerical simulations of the complex Ginzburg-Landau equation in one spatial dimension on periodic d...
For stable time periodic solutions ff flfiffi ! "fl # are the locally preferred planf...
The structure of periodic solutions to the Ginzburg{Landau equations in R2 is studied in the critica...
In this paper, we use a traveling wave reduction or a so-called spatial approximation to comprehensi...
Numerical evidence is presented for the existence of stable heteroclinic cycles in large parameter r...
AbstractFor αβ>−1, stable time periodic solutions A(X,T)=AqeiqX+iωqT are the locally preferred planf...
In this paper we use a traveling wave reduction or a so-called spatial approximation to comprehensiv...
The phenomenon of time-periodic evolution of spatial chaos is investigated in the frames of one- and...
In this paper we study the behaviour of solutions of the form if(z, t) = q~(z) e- i~wt (e << 1) of t...
AbstractThis paper deals with the time dependent Ginzburg-Landau equations of superconductivity with...
Spatially periodic equilibria A(X, T) = 1 - q2 eiqX+i0 are the locally preferred planform for the Gi...
Spatially periodic equilibria A(X, T) = 1 - q2 eiqX+i0 are the locally preferred planform for the Gi...
In this paper we nd asymptotic behaviour of solutions of the Ginzburg{Landau equation at the spatial...
Abstract. We consider the following system of equations{ At = Axx + A−A3 −AB, x ∈ R, t> 0, Bt = σ...
The Ginzburg-Landau (GL) equation with real coefficients is a model equation appearing in supercondu...
Numerical simulations of the complex Ginzburg-Landau equation in one spatial dimension on periodic d...
For stable time periodic solutions ff flfiffi ! "fl # are the locally preferred planf...
The structure of periodic solutions to the Ginzburg{Landau equations in R2 is studied in the critica...
In this paper, we use a traveling wave reduction or a so-called spatial approximation to comprehensi...
Numerical evidence is presented for the existence of stable heteroclinic cycles in large parameter r...
AbstractFor αβ>−1, stable time periodic solutions A(X,T)=AqeiqX+iωqT are the locally preferred planf...
In this paper we use a traveling wave reduction or a so-called spatial approximation to comprehensiv...