Sharp pointwise estimates for the gradients of solutions to linear parabolic second order equation in the layer

Abstract

We deal with solutions of the Cauchy problem to linear both homogeneous and nonhomogeneous parabolic second order equations with real constant coefficients in the layer Rn+1T= Rn× (0, T), where n≥ 1 and T<∞. The homogeneous equation is considered with initial data in Lp( Rn), 1≤ p ≤ ∞ . For the nonhomogeneous equation we suppose that initial function is equal to zero and the function in the right-hand side belongs to f∈ Lp( Rn+1T) Cα ( Rn+1T ) , p>n+2 and α ∈ (0, 1). Explicit formulas for the sharp coefficients in pointwise estimates for the length of the gradient to solutions to these problems are obtained.