Abstract
In this paper, we focus on a \( (2+1)\)-dimensional generalized breaking soliton equation, which describes the \( (2+1)\)-dimensional interaction of a Riemann wave propagating along the y -direction with a long wave along the x-direction. Based on a multidimensional Riemann theta function, the quasiperiodic wave solutions of a \( (2+1)\)-dimensional generalized breaking soliton equation are investigated by means of the bilinear Backlund transformation. The relations between the quasiperiodic wave solutions and the soliton solutions are rigorously established by a limiting procedure. The dynamical behaviors of the quasiperiodic wave solutions are discussed by presenting the numerical figures.
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