Surface-Enhanced Raman Spectroscopy-Based Detection of Micro-RNA Biomarkers for Biomedical Diagnosis Using a Comparative Study of Interpretable Machine Learning Algorithms. [PDF]
Li JQ +6 more
europepmc +1 more source
Hybrid evolutionary machine learning model for advanced intrusion detection architecture for cyber threat identification. [PDF]
Sharma A, Rani S, Driss M.
europepmc +1 more source
Interval Advanced Adenomas and Neoplasia in Patients with Negative Colonoscopy Following Positive Stool-Based Colorectal Cancer Screening Test. [PDF]
Liu KS +10 more
europepmc +1 more source
Integration of LC-HRMS and 1H NMR metabolomics data fusion approaches for classification of Amarone wine based on withering time and yeast strain. [PDF]
Becchi PP +5 more
europepmc +1 more source
November 11-12, 2025, T1DX-QI Learning Session, Journal of Diabetes. [PDF]
europepmc +1 more source
Local dendrites with unique n-fold hyperspace
Let Z be a metric continuum and n be a positive integer. Let Cn(Z) be the hyperspace of the nonempty closed subsets of Z with at most n components. In this paper we prove the following result: Let X be a local dendrite such that every point of X has a ...
David Herrera-Carrasco +1 more
exaly +4 more sources
On the n-fold hyperspace suspension of continua
In 1979 Sam B. Nadler Jr, defined the Hyperspace Suspension of a continuum.
Sergio Macı́as, Macı́as, Sergio
exaly +3 more sources
On the n-fold hyperspace suspension of continua, II
We continue our study of n-fold hyperspace suspensions. We show that n-fold hyperspace suspensions of contractible continua are contractible. We prove that n-fold hyperspace suspensions are zero-dimensional aposyndetic.
Sérgio Macias
exaly +6 more sources
In 1979 Sam B. Nadler, Jr. introduced the hyperspace suspension of a continuum to present examples of disk-like continua with the fixed point property.
Sérgio Macias
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For a continuum \(X\) a general problem is the following one: Find conditions on \(X\) under which the following implication holds: If \(C_{n}(X)\) is a cone, then \(X\) is a cone, where \(C_{n}(X)\) denotes the hyperspace of all nonempty closed subsets with at most \(n\) components.
Alejandro Illanes, Daria Michalik
exaly +4 more sources

