Averaged equations for distributed Josephson junction arrays

vortices, as quantum objects, can interfere constructively or destructively after following two different paths enclosing a We develop fast algorithms for the numerical study of two-dimensional triangular Josephson junction arrays. The Dirac bra-ket for-charge placed at the center of the hexagon [2

We calculate the current and magnetic-flux distributions in a square network of Josephson junctions subject to an external magnetic field. Magnetic fields due to the superconducting currents induced in the system are taken into account via selfand long-range mutual inductance coefficients. Similarit

In this paper we study the existence of single waveform solutions to system of equations governing the dynamics of series arrays of identical current biased Josephson junctions which are coupled through a shared LRC-load. We use a homotopy argument and degree theory to prove the existence of single