Stanley conjecture in small embedding dimension

Abstract Introduction: Approximate Entropy is an extensively enforced metric to evaluate chaotic responses and irregularities of RR intervals sourced from an eletrocardiogram. However, to estimate their responses, it has one major problem – the accurate determination of tolerances and embedding dimensions. So, we aimed to overt this potential hazard by calculating numerous alternatives to detect their optimality in malnourished children. Materials and methods: We evaluated 70 subjects split equally: malnourished children and controls. To estimate autonomic modulation, the heart rate was measured lacking any physical, sensory or pharmacologic stimuli. In the time series attained, Approximate Entropy was computed for tolerance (0.1→0.5 in intervals of 0.1) and embedding dimension (1→5 in intervals of 1) and the statistical significances between the groups by their Cohen’s ds and Hedges’s gs were totalled. Results: The uppermost value of statistical significance accomplished for the effect sizes for any of the combinations was −0.2897 (Cohen’s ds) and −0.2865 (Hedges’s gs). This was achieved with embedding dimension = 5 and tolerance = 0.3. Conclusions: Approximate Entropy was able to identify a reduction in chaotic response via malnourished children. The best values of embedding dimension and tolerance of the Approximate Entropy to identify malnourished children were, respectively, embedding dimension = 5 and embedding tolerance = 0.3. Nevertheless, Approximate Entropy is still an unreliable mathematical marker to regulate this.

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On Stanley Depths of Certain Monomial Factor Algebras

Canadian Mathematical Bulletin ◽

10.4153/cmb-2015-001-x ◽

2015 ◽

Vol 58 (2) ◽

pp. 393-401

Author(s):

Zhongming Tang

Keyword(s):

Polynomial Ring ◽

Monomial Ideal ◽

Primary Decomposition ◽

Factor Algebra ◽

Stanley Depth ◽

Stanley Conjecture ◽

Stanley Decomposition

AbstractLet S = K[x1 , . . . , xn] be the polynomial ring in n-variables over a ûeld K and I a monomial ideal of S. According to one standard primary decomposition of I, we get a Stanley decomposition of the monomial factor algebra S/I. Using this Stanley decomposition, one can estimate the Stanley depth of S/I. It is proved that sdepthS(S/I) ≤ sizeS(I). When I is squarefree and bigsizeS(I) ≤ 2, the Stanley conjecture holds for S/I, i.e., sdepthS(S/I) ≥ depthS(S/I).

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On the numerical semigroup generated by {bn+1+i+bn+i−1b−1∣i∈N}$\begin{array}{} \{b^{n+1+i}+\frac{b^{n+i}-1}{b-1}\mid i\in\mathbb{N}\} \end{array}$

Discrete Mathematics and Applications ◽

10.1515/dma-2020-0022 ◽

2020 ◽

Vol 30 (4) ◽

pp. 257-264

Author(s):

Ze Gu

Keyword(s):

Numerical Semigroup ◽

Frobenius Number ◽

Embedding Dimension ◽

Order Relations ◽

Positive Integers

AbstractLet b, n be two positive integers such that b ≥ 2, and S(b, n) be the numerical semigroup generated by $\begin{array}{} \{b^{n+1+i}+\frac{b^{n+i}-1}{b-1}\mid i\in\mathbb{N}\} \end{array}$. Applying two order relations, we give formulas for computing the embedding dimension, the Frobenius number, the type and the genus of S(b, n).

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Principled approach to the selection of the embedding dimension of networks

Nature Communications ◽

10.1038/s41467-021-23795-5 ◽

2021 ◽

Vol 12 (1) ◽

Author(s):

Weiwei Gu ◽

Aditya Tandon ◽

Yong-Yeol Ahn ◽

Filippo Radicchi

Keyword(s):

Real World ◽

Structural Information ◽

General Purpose ◽

Embedding Dimension ◽

Network Embedding ◽

Machine Learning Technique ◽

Learning Technique ◽

Low Dimensional ◽

Large Corpus ◽

Selection Of

AbstractNetwork embedding is a general-purpose machine learning technique that encodes network structure in vector spaces with tunable dimension. Choosing an appropriate embedding dimension – small enough to be efficient and large enough to be effective – is challenging but necessary to generate embeddings applicable to a multitude of tasks. Existing strategies for the selection of the embedding dimension rely on performance maximization in downstream tasks. Here, we propose a principled method such that all structural information of a network is parsimoniously encoded. The method is validated on various embedding algorithms and a large corpus of real-world networks. The embedding dimension selected by our method in real-world networks suggest that efficient encoding in low-dimensional spaces is usually possible.

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Numerical semigroups whose fractions are of maximal embedding dimension

Semigroup Forum ◽

10.1007/s00233-010-9275-5 ◽

2010 ◽

Vol 82 (3) ◽

pp. 412-422 ◽

Cited By ~ 4

Author(s):

David E. Dobbs ◽

Harold J. Smith

Keyword(s):

Numerical Semigroups ◽

Embedding Dimension ◽

Maximal Embedding Dimension

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Non-linear dynamical analysis of the EEG in Alzheimer's disease with optimal embedding dimension

Electroencephalography and Clinical Neurophysiology ◽

10.1016/s0013-4694(97)00079-5 ◽

1998 ◽

Vol 106 (3) ◽

pp. 220-228 ◽

Cited By ~ 96

Author(s):

Jaeseung Jeong ◽

Soo Yong Kim ◽

Seol-Heui Han

Keyword(s):

Alzheimer’S Disease ◽

Alzheimer's Disease ◽

Dynamical Analysis ◽

Embedding Dimension ◽

Non Linear

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Thin algebras of embedding dimension three

Journal of Algebra ◽

10.1016/0021-8693(86)90076-1 ◽

1986 ◽

Vol 100 (1) ◽

pp. 235-259 ◽

Cited By ~ 25

Author(s):

David J. Anick

Keyword(s):

Embedding Dimension

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A Study On Methods for Determining Phase Space Reconstruction Parameters

Journal of Computational and Nonlinear Dynamics ◽

10.1115/1.4052721 ◽

2021 ◽

Author(s):

Shihui Lang ◽

Zhu Hua ◽

Guodong Sun ◽

Yu Jiang ◽

Chunling Wei

Keyword(s):

Time Delay ◽

Phase Space ◽

Correlation Dimension ◽

Nearest Neighbor ◽

Correlation Method ◽

Phase Space Reconstruction ◽

Lorenz Attractor ◽

Embedding Dimension ◽

Phase Trajectories ◽

Auto Correlation

Abstract Several pairs of algorithms were used to determine the phase space reconstruction parameters to analyze the dynamic characteristics of chaotic time series. The reconstructed phase trajectories were compared with the original phase trajectories of the Lorenz attractor, Rössler attractor, and Chens attractor to obtain the optimum method for determining the phase space reconstruction parameters with high precision and efficiency. The research results show that the false nearest neighbor method and the complex auto-correlation method provided the best results. The saturated embedding dimension method based on the saturated correlation dimension method is proposed to calculate the time delay. Different time delays are obtained by changing the embedding dimension parameters of the complex auto-correlation method. The optimum time delay occurs at the point where the time delay is stable. The validity of the method is verified through combing the application of correlation dimension, showing that the proposed method is suitable for the effective determination of the phase space reconstruction parameters.

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Patterns with Equal Values in Permutation Entropy: Do They Really Matter for Biosignal Classification?

Complexity ◽

10.1155/2018/1324696 ◽

2018 ◽

Vol 2018 ◽

pp. 1-15 ◽

Cited By ~ 11

Author(s):

David Cuesta–Frau ◽

Manuel Varela–Entrecanales ◽

Antonio Molina–Picó ◽

Borja Vargas

Keyword(s):

Body Temperature ◽

Sensitivity And Specificity ◽

Scientific Literature ◽

Statistical Significance ◽

Permutation Entropy ◽

Limiting Factor ◽

Embedding Dimension ◽

Class Segmentation ◽

Biosignal Classification

Two main weaknesses have been identified for permutation entropy (PE): the neglect of subsequence pattern differences in terms of amplitude and the possible ambiguities introduced by equal values in the subsequences. A number of variations or customizations to the original PE method to address these issues have been proposed in the scientific literature recently. Specifically for ties, methods have tried to remove the ambiguity by assigning different weighted or computed orders to equal values. Although these methods are able to circumvent such ambiguity, they can substantially increase the algorithm costs, and a general characterization of their practical effectiveness is still lacking. This paper analyses the performance of PE using several biomedical datasets (electroencephalogram, heartbeat interval, body temperature, and glucose records) in order to quantify the influence of ties on its signal class segmentation capability. This capability is assessed in terms of statistical significance of the PE differences between classes and classification sensitivity and specificity. Being obvious that ties modify the PE results, we hypothesize that equal values are intrinsic to the acquisition process, and therefore, they impact all the classes more or less equally. The experimental results confirm ties are often not the limiting factor for PE, even they can be beneficial as a sort of stochastic resonance, and it can be far more effective to focus on the embedding dimension instead.

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