Generalized study of the operator α ∂k ∂k + β ∂k +γ ∂k + c in weighted Hilbert space L2(C, e-|z|2)

Abstract

By H\"ormander's L2-method, we study the operator α ∂k ∂k + β ∂k +γ ∂k + c for any order k with α, β, γ ∈ R such that (α, β, γ) ≠(0,0,0) in the weighted Hilbert space L2(C, e-|z|2). We prove the existence of its right inverse which is also a bounded operator. Subsequently we will study two cases that arise from this operator, namely: (1) Case where α= γ=0: The operator β ∂k + c with β ≥ 1. (2) Case where β= γ=0: The operator α ∂k ∂k + c with α ≥ 1.

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