Mixed Hodge structures and Weierstrass σ-function
Abstract
A σ-operator on a complexification V of an -vector space V is an operator A ∈ End (V) such that σ (A) = 0 where σ (z) denotes the Weierstrass σ-function. In this paper we define the notion of the strongly pseudo-real σ-operator and prove that there is one to one correspondence between real mixed Hodge structures and strongly pseudo-real σ-operators.
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