Abundant Exact Travelling Wave Solutions for a Fractional Massive Thirring Model Using Extended Jacobi Elliptic Function Method

The fractional massive Thirring model is a coupled system of nonlinear PDEs emerging in the study complex ultrashort pulse propagation analysis wave functions. This article considers NFMT terms modified Riemann–Liouville derivative. novel travelling solutions considered are investigated by employing an effective analytic approach based on transformation and Jacobi elliptic extended function method systematic tool for restoring many well-known results systems identifying suitable options arbitrary To understand physical characteristics NFMT, 3D graphical representations obtained some free parameters randomly drawn different order derivatives. indicate that proposed reliable, simple, powerful enough to handle more complicated partial differential equations quantum mechanics.