Complexity and speed of semi-algebraic multi-persistence

Abstract

Let R be a real closed field, S ⊂ Rn a closed and bounded semi-algebraic set, and f=(f1,…,fp):S → Rp a continuous semi-algebraic map inducing a p-parameter semi-algebraic filtration by sublevel sets. We introduce a barcode invariant for such filtrations that directly extends the classical (p=1) barcode. After scaling of the parameter space, in each homological degree the invariant is encoded by a Z 0-valued function \[ μ(S,f):\ ((-1,1)p×((-1,1)p \(1,…,1)\) )\ \ \( a, b) a b\ \ \ Z 0, \] where denotes the product order on Rp. We prove that μ(S,f) is semi-algebraically constructible and establish a singly exponential upper bound on its description complexity. Moreover, we give a singly exponential-time algorithm to compute μ(S,f), extending to arbitrary p the corresponding result for p=1 by Basu and Karisani. Finally, for semi-algebraic filtrations of bounded description complexity we bound the number of equivalence classes of finite poset modules realizable in this way, yielding a tight analogue of "speed" bounds for algebraically defined graph classes.

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