Well-posedness for Cauchy fractional problems involving discrete convolution operators

Abstract

This work is focused on establishing sufficient conditions to guarantee the well-posedness of the following nonlinear fractional semidiscrete model equation* cases Dβt u(n,t)= B u(n,t) + f(n-ct,u(n,t)),\, &n∈Z, \;t>0, u(n,0)=(n),\; &n∈Z, cases equation* under the assumptions that β ∈ (0,1], c>0 some constant, B is a discrete convolution operator with kernel b∈1(), which is the infinitesimal generator of the Markovian C0-semigroup and suitable nonlinearity f. We present results concerning the existence and uniqueness of solution, as well as establishing a comparison principle of solutions according to respective initial values.

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