I submitted preprint of “Filters on Posets and Generalizations” article to Bulletin des Sciences Mathématiques math journal for peer review and publication. This version of preprint features adding this conjecture, compared to the previous version of this manuscript.
read moreConjecture $latex \mathrm{Cor}\bigcup^{\mathfrak{F}} S=\bigcup\langle \mathrm{Cor}\rangle S$ for any set $latex S$ of filter objects on a set. See this wiki site for definitions of used terms.
read more“Surveys in Mathematics and its Applications” math journal rejected my paper Filters on Posets and Generalizations, submitted to them, due it is too long (60 pages). They want not above 30 pages.
read moreI updated my preprint manuscript Filters on Posets and Generalizations. There are two changes: 1. Added new section “Distributivity of core part over lattice operations”. 2. Removed certain redundant theorem conditions: That a filtrator is with join-close core automatically follows from the…
read moreMy submission to “Geometry & Topology” journal was declined based on their judgment that my article is not on their topic (geometry & topology). As such, I submitted the same manuscript to an other journal “Surveys in Mathematics and its Applications”.
read moreDue my preprint of “Filters on Posets and Generalizations” article was rejected by “Topology and its Applications” journal, I submitted it into an another journal “Geometry & Topology”. Their server has said that I should receive email acknowledgment within a week.
read moreSome time ago I submitted my preprint of “Filters on Posets and Generalizations” article into “Topology and its Applications” journal. The manuscript was rejected by various reasons. Now I consider its submission to an other journal, maybe even into “Rejecta Mathematica” journal….
read moreIn revised preprint of “Filters on Posets and Generalizations” article (kindly received by the editor) submitted to “Topology and its Applications” journal are solved two problems which in an earlier preprint were marked as open problems: Strong and weak partitioning is the…
read moreMy problem whether weak partitioning and strong partitioning of a complete lattice are the same was solved by counter-example by François G. Dorais. Remains open whether strong and weak partitioning of a filter object is the same.
read moreI submitted to “Topology” math journal by email the manuscript Filters on Posets and Generalizations. In the email I asked them to confirm receipt of the email as soon as they receive it. Until now there were no response from “Topology” math…
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