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6 Feb 2023
L(h, z, s) = f(h'z, z'z, s) for some function f. (Equivariance under translations.) Show that a function satisfies L(h, z + a, s) = L(h, z, s) + a'h for all h, z, s, and all a R^p if and only if L(h, z, s) = h'z + g(s) for some function g.
L(h, z, s) = f(h'z, z'z, s) for some function f. (Equivariance under translations.) Show that a function satisfies L(h, z + a, s) = L(h, z, s) + a'h for all h, z, s, and all a R^p if and only if L(h, z, s) = h'z + g(s) for some function g.
6 Feb 2023
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karmLv5
6 Feb 2023
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