Stochasticity in the Josephson map

Abstract: The Josephson map describes the nonlinear dynamics of systems characterized by the standard map with a uniform external bias superposed. The intricate structures of the phase-space portrait of the Josephson map are examined here on the basis of the associated tangent map. A numerical investigation of stochastic diffusion in the Josephson map is compared with the renormalized diffusion coefficient calculated using the characteristic function. The global stochasticity of the Josephson map occurs at far smaller v… Show more

“…In this section we will consider the discrete 0-π sine-Gordon equation (2.3) when the lattice parameter a is large. The time independent version of (2.3) is well-known: when γ = 0, it corresponds to the so-called Standard or Taylor-Greene-Chirikov map [9] and when γ = 0, it is called the Josephson map [23]. Since we are interested in the case that the lattice spacing a is large, we introduce the coupling parameter ε as ε = 1 a 2 and the equation becomes…”

Stability Analysis of π‐Kinks in a 0‐π Josephson Junction

“…In this section we will consider the discrete 0-π sine-Gordon equation (2.3) when the lattice parameter a is large. The time independent version of (2.3) is well-known: when γ = 0, it corresponds to the so-called Standard or Taylor-Greene-Chirikov map [9] and when γ = 0, it is called the Josephson map [23]. Since we are interested in the case that the lattice spacing a is large, we introduce the coupling parameter ε as ε = 1 a 2 and the equation becomes…”

Stability Analysis of π‐Kinks in a 0‐π Josephson Junction

Stability Analysis of π-Kinks in a 0-π Josephson Junction