Abstract
M. Van den Bergh \[20] defined the notion of a double Lie algebroid and showed that a double quasi-Poisson algebra gives rise to a double Lie algebroid.We give new examples of double Lie algebroids and develop a differential calculus in that context. We recover the non commutative Karoubi–de Rham complex \[7, 9] and the double Poisson–Lichnerowicz cohomology \[16] as particular cases of our construction.
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