2014 Abstract: We consider the true∂¯‐equation in double-struckC1 in classes of functions with Gaussian decay at infinity. We prove that if the right‐hand side of the equation is majorated by exp(−q|zfalse|2), with some positive q, together with derivatives up to some order, and is orthogonal, as a distribution, to all analytical polynomials, then there exists a solution with decays, together with derivatives, as exp(−q′|zfalse|2), for any q�′
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Some weighted estimates for the ∂̅-equation and a finite rank theorem for Toeplitz operators in the Fock space
Abstract: We consider the true∂¯‐equation in double-struckC1 in classes of functions with Gaussian decay at infinity. We prove that if the right‐hand side of the equation is majorated by exp(−q|zfalse|2), with some positive q, together with derivatives up to some order, and is orthogonal, as a distribution, to all analytical polynomials, then there exists a solution with decays, together with derivatives, as exp(−q′|zfalse|2), for any q�′
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