Supersolutions for a class of semilinear heat equations

Abstract

A semilinear heat equation ut= u+f(u) with nonnegative initial data in a subset of L1() is considered under the assumption that f is nonnegative and nondecreasing and ⊂eq n. A simple technique for proving existence and regularity based on the existence of supersolutions is presented, then a method of construction of local and global supersolutions is proposed. This approach is applied to the model case f(s)=sp, φ∈ Lq(): new sufficient conditions for the existence of local and global classical solutions are derived in the critical and subcritical range of parameters. Some possible generalisations of the method to a broader class of equations are discussed.