Fourth-order finite difference scheme and efficient algorithm for nonlinear fractional Schrödinger equations

We are concerned with the existence and nonexistence of global weak solutions for a certain class of time-fractional inhomogeneous pseudo-parabolic-type equations involving a nonlinearity of the form $|u|^{p}+\iota |\nabla u|^{q}$ | u | p + ι | ∇ u | q , where $p,q>1$ p , q > 1 , and $\iota \geq 0$ ι ≥ 0 is a constant. The cases $\iota =0$ ι = 0 and $\iota >0$ ι > 0 are discussed separately. For each case, the critical exponent in the Fujita sense is obtained. We point out two interesting phenomena. First, the obtained critical exponents are independent of the fractional orders of the time derivative. Secondly, in the case $\iota >0$ ι > 0 , we show that the gradient term induces a discontinuity phenomenon of the critical exponent.

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Fourth-order finite difference scheme and efficient algorithm for nonlinear fractional Schrödinger equations

Cited by 2 publications

References 30 publications

A fast implicit difference scheme for solving high-dimensional time-space fractional nonlinear Schrödinger equation

A fast implicit difference scheme for solving high-dimensional time-space fractional nonlinear Schrödinger equation

On the critical behavior for time-fractional pseudo-parabolic-type equations with combined nonlinearities

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