Matthew Strom Borman, Mohamed El Alami, Nick Sheridan
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We construct the $L_\infty$ structure on symplectic cohomology of a Liouville
domain, together with an enhancement of the closed--open map to an $L_\infty$
homomorphism from symplectic cochains to Hochschild cochains on the wrapped
Fukaya category. Features of our construction are that it respects a modified
action filtration (in contrast to Pomerleano--Seidel's construction); it uses a
compact telescope model (in contrast to Abouzaid--Groman--Varolgunes'
construction); and it is adapted to the purposes of our follow-up work where we
construct Maurer--Cartan elements in symplectic cochains which are associated
to a normal-crossings compactification of the Liouville domain.
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