Prescribing Oscillation Behavior of Solutions to the Heat Equation on Rn via the Initial Data and its Average Integral

Abstract

abstract Motivated by a classical stabilization result for solution to the Cauchy problem of the heat equation\ ∂tu= u\ on Rn, we consider its oscillation behavior with radial initial data ( x) =( x ) ∈ C0( Rn) L∞( Rn) .\ Given four arbitrary finite numbers r<α <β<s, one can construct a radial ∈ C0( R% n) L∞( Rn) so that \ together with its corresponding solution\ u( x,t) satisfy the oscillation behavior: align* τ→∞( τ) & =r< t→∞u( 0,t) =α & <t→∞u( 0,t) =β< τ→∞( τ) =s. align* Another related topic concerning the oscillation behavior of the average integral of the initial data is also discussed. abstract