By Definitions 11.5 and 12.10 we have that AncEmb(τ,y1,y )(0) = sq_pos(τ.ctx(y1)) ⊛ 0 = sq_pos(τ.ctx(y1))

Consider some binary nodey (so thaty1∈τ

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A Factorization Theorem for Forest Algebras

cs.FL · 2026-05-11 · unverdicted · novelty 7.0

Under an R-alignment restriction on morphisms to finite semigroups, every morphism into forest algebras admits bounded-depth factorizations of forests, with a counterexample showing the condition is necessary.

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A Factorization Theorem for Forest Algebras cs.FL · 2026-05-11 · unverdicted · none · ref 18
Under an R-alignment restriction on morphisms to finite semigroups, every morphism into forest algebras admits bounded-depth factorizations of forests, with a counterexample showing the condition is necessary.

By Definitions 11.5 and 12.10 we have that AncEmb(τ,y1,y )(0) = sq_pos(τ.ctx(y1)) ⊛ 0 = sq_pos(τ.ctx(y1))

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