A Controlled Hahn-Mazurkiewicz Theorem and its Applications

Abstract

For a metric Peano continuum X, let SX be a Sierpi\'nski function assigning to each >0 the smallest cardinality of a cover of X by connected subsets of diameter . We prove that for any increasing function : R+ R+ with (0,1]⊂eq[ R+] and s:=Σn=1∞ SX(2-n)Σm=n∞ SX(2-m)\,-1(\1,26-m\)<∞ there exists a continuous surjective function f:[0,s] X with continuity modulus ωf. This controlled version of the classical Hahn-Mazurkiewicz Theorem implies that SDim(X) HDim(X) 2·SDim(X), where SDim(X)= 0(SX())(1/) is the S-dimension of X, and HDim(X)=∈f\α∈ (0,∞]: there is a~surjective 1α-H\"older map f:[0,1] X\ is the H older dimension of X.