The Identity Problem in the special affine group of β€^2
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We consider semigroup algorithmic problems in the Special Affine group π²π (2, β€) = β€^2 βπ²π«(2, β€), which is the group of affine transformations of the lattice β€^2 that preserve orientation. Our paper focuses on two decision problems introduced by Choffrut and KarhumΓ€ki (2005): the Identity Problem (does a semigroup contain a neutral element?) and the Group Problem (is a semigroup a group?) for finitely generated sub-semigroups of π²π (2, β€). We show that both problems are decidable and NP-complete. Since π²π«(2, β€) β€π²π (2, β€) β€π²π«(3, β€), our result extends that of Bell, Hirvensalo and Potapov (SODA 2017) on the NP-completeness of both problems in π²π«(2, β€), and contributes a first step towards the open problems in π²π«(3, β€).
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