Boundary values of analytic functions
Abstract
Let D be a connected bounded domain in 2, S be its boundary which is closed, connected and smooth. Let (z)= 1 2π i∫Sf(s)dss-z, f∈ L1(S), z=x+iy. Boundary values of (z) on S are studied. The function (t), t∈ S, is defined in a new way. Necessary and sufficient conditions are given for f∈ L1(S) to be boundary value of an analytic in D function. The Sokhotsky-Plemelj formulas are derived for f∈ L1(S).
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