Strong solutions to the nonlinear heat equation in homogeneous Besov spaces

The generalized Burgers equation @tu -@xxu + @xu k+1 = 0, with initial data u0 in homogeneous Sobolev spaces are investigated. The starting point of this work is the construction of solutions in . If in addition, the initial data belongs to Lp;s then the obtained solution is actually in L ∞ ([0; ∞)

## Abstract In this paper we study the Cauchy problem in pseudomeasure spaces for some nonlinear parabolic equations including nonlinear heat equations, nonlinear hyper‐dissipative equations, generalized nonlinear Hamilton–Jacobi equations, nonlinear hyper‐dissipative equations with convective term

The possible continuation of solutions of the nonlinear heat equation in after the blowup time is studied and the different continuation modes are discussed in terms of the exponents m and p. Thus, for m + p ≤ 2 we find a phenomenon of nontrivial continuation where the region {x : u(x, t) = ∞} is b

In this paper, we study the initial value problem for the nonlinear heat equation for the initial data belonging to the Triebel-Lizorkin spaces.