Orthogonally additive polynomials on non-commutative Lp-spaces
Abstract
Let M be a von Neumann algebra with a normal semifinite faithful trace τ. We prove that every continuous m-homogeneous polynomial P from Lp(M,τ), with 0<p<∞, into each topological linear space X with the property that P(x+y)=P(x)+P(y) whenever x and y are mutually orthogonal positive elements of Lp(M,τ) can be represented in the form P(x)=(xm) (x∈ Lp(M,τ)) for some continuous linear map Lp/m(M,τ) X.
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