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Deformation coproducts and differential maps

R. L. HudsonS. Pulmannová — 2008

Studia Mathematica

Let 𝒯 be the Itô Hopf algebra over an associative algebra 𝓛 into which the universal enveloping algebra 𝓤 of the commutator Lie algebra 𝓛 is embedded as the subalgebra of symmetric tensors. We show that there is a one-to-one correspondence between deformations Δ[h] of the coproduct in 𝒯 and pairs (d⃗[h],d⃖[h]) of right and left differential maps which are deformations of the differential maps for 𝒯 [Hudson and Pulmannová, J. Math. Phys. 45 (2004)]. Corresponding to the multiplicativity and...

Explicit construction of a unitary double product integral

R. L. HudsonPaul Jones — 2011

Banach Center Publications

In analogy with earlier work on the forward-backward case, we consider an explicit construction of the forward-forward double stochastic product integral ( 1 + d r ) with generator d r = λ ( d A d A - d A d A ) . The method of construction is to approximate the product integral by a discrete double product ( j , k ) m × Γ ( R m , n ( j , k ) ) = Γ ( ( j , k ) m × ( R m , n ( j , k ) ) ) of second quantised rotations R m , n ( j , k ) in different planes using the embedding of m into L²(ℝ) ⊕ L²(ℝ) in which the standard orthonormal bases of m and ℂⁿ are mapped to the orthonormal sets consisting of normalised indicator functions of...

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