大小为1的阿贝尔格序群谱的谱子空间

IF 0.5 Q3 MATHEMATICS ACTA SCIENTIARUM MATHEMATICARUM Pub Date : 2023-04-27 DOI:10.1007/s44146-023-00080-z

Miroslav Ploščica, Friedrich Wehrung

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引用次数: 2

摘要

众所周知，任意阿贝尔\(\ell \) -群G的所有主\(\ell \) -理想的格\({{\,\mathrm{Id_c}\,}}{G}\)是完全正态分布的0-格;然而，并不是每一个完全正态分布的0格都是一些\({{\,\mathrm{Id_c}\,}}{G}\)的同态象，通过一个基数\(\aleph _2\)的反例。证明了每一个最多有\(\aleph _1\)个元素的完全正态分布0格是某个\({{\,\mathrm{Id_c}\,}}{G}\)的同态象。通过Stone对偶，这意味着每一个不超过\(\aleph _1\)紧开集的完全正规广义谱空间都同胚于某个阿贝尔\(\ell \) -群的\(\ell \) -谱的谱子空间。

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Spectral subspaces of spectra of Abelian lattice-ordered groups in size aleph one

It is well known that the lattice \({{\,\mathrm{Id_c}\,}}{G}\) of all principal \(\ell \)-ideals of any Abelian \(\ell \)-group G is a completely normal distributive 0-lattice; yet not every completely normal distributive 0-lattice is a homomorphic image of some \({{\,\mathrm{Id_c}\,}}{G}\), via a counterexample of cardinality \(\aleph _2\). We prove that every completely normal distributive 0-lattice with at most \(\aleph _1\) elements is a homomorphic image of some \({{\,\mathrm{Id_c}\,}}{G}\). By Stone duality, this means that every completely normal generalized spectral space with at most \(\aleph _1\) compact open sets is homeomorphic to a spectral subspace of the \(\ell \)-spectrum of some Abelian \(\ell \)-group.