In this paper we consider the linear second order partial differential equation with non-constant coefficients; then by using the double convolution product we produce new equations with polynomials coefficients and we classify the new equations. It is shown that the classifications of hyperbolic and elliptic new equations are similar to the original equations that is the classification is invariant after finite double convolutions product.
Remarks on the uniqueness of comparable renormalized solutions of elliptic equations with measure data
The stability for the Cauchy problem for elliptic equations
Elliptic Equations with Critical Growth and a Large Set of Boundary Singularities
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