Answer to Question #164918 in Functional Analysis for Ebenezer

First of all, we need to have "\\bar M \\neq V, v\\notin \\bar M", otherwise it would not be possible to construct such a form.

Define "N=M\\oplus \\mathbb{K}v" and now for any "w \\in N, w=\\lambda_M\\cdot m+\\lambda_v\\cdot v", where "m\\in M". Now we can define a linear form "\\phi_N :(\\lambda_M \\cdot m + \\lambda_v \\cdot v)\\mapsto \\lambda_v". Let's prove that it is continuous by calculating it's norm "||\\phi_N|| = \\sup_{w\\in N}\\frac{|\\lambda_v |}{||\\lambda_M\\cdot m + \\lambda_v \\cdot v||}", "||\\phi_N|| =\\sup_{w\\in N} \\frac{1}{||v+\\frac{\\lambda_M \\cdot m}{|\\lambda_v|}||}" , the vector "\\frac{\\lambda_M}{|\\lambda_v|}m" is in "M" and as "v\\notin \\bar M", the expression below is bounded below by some constant (as otherwise the vector "v" could be approached by "-\\frac{\\lambda_M}{|\\lambda_v|}m" as closely, as we want and thus "v\\in \\bar M"). Therefore the norm "||\\phi_N||" is bounded, so "\\phi_N" is continuous. Now by Hahn-Banach's theorem we can extend "\\phi_N" on "V" such that the extension "\\phi|_M=0, \\phi(v)=1, \\phi" is continuous.