On Topological Complexity of (r,(R))-mild spaces

Abstract

In this paper, we first prove the existence of relative free models of morphisms (resp. relative commutative models) in the category of DGA(R) (resp. CDGA(R)), where R is a principal ideal domain containing 12. Next, we restrict to the category of (r,(R))-H-mild algebras and we introduce, following Carrasquel's characterization, secat(-, R), the sectional category for surjective morphisms. We then apply this to the n-fold product of the commutative model of an (r,(R))-mild CW-complex of finite type to introduce TCn(X,R), mTCn(X,R) and HTCn(X,R) which extend well known rational topological complexities. We do the same for sc(-, Q) to introduce analogous algebraic sc(-,R) in terms of their commutative models over R and prove that it is an upper bound for secat(-, R). This also yields, for any (r,(R))-mild CW-complex, the algebraic tcn(X,R), mtcn(X,R) and Htcn(X,R) whose relation to the homology nilpotency is investigated. In the last section, in the same spirit, we introduce in DGA(R), secat(-, R), sc(-,R) and their topological correspondents. We then prove, in particular, that ATCn(X,R)≤ TCn(X,R) and Atcn(X,R)≤ tcn(X,R).

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