Results 151 to 160 of about 60,835 (182)
On the Dimensions of Hermitian Subfield Subcodes from Higher-Degree Places. [PDF]
Entropy (Basel)El Khalfaoui S, Nagy GP.
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Concurrent Incipient Fault Diagnosis in Three-Phase Induction Motors Using Discriminative Band Energy Analysis of AM-Demodulated Vibration Envelopes. [PDF]
Sensors (Basel)de Godoy MB, Lucas GB, Andreoli AL.
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An Integrated Pixel-Level Reflectance Adjustment (IPRA) for Harmonizing GF-1/6 WFV and Sentinel-2 MSI Data. [PDF]
Sensors (Basel)Shi J +5 more
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Complex multi-affine polynomials and invariant circles
Journal of Mathematical Analysis and Applications, 2023This is a very interesting paper that extends the researches of B. and H. Sendov and J. Xiao, on the loci of the zeros of polynomials [\textit{B. Sendov} and \textit{H. Sendov}, Trans. Am. Math. Soc. 366, No. 10, 5155--5184 (2014; Zbl 1298.30005); \textit{B. Sendov} and \textit{H. Sendov}, Math. Proc. Camb. Philos. Soc. 159, No.
Sendov, Hristo, Xiao, Junquan
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International Journal of Control, 2015
The main goal of this paper is to compute a class of polynomial vector fields, whose associated dynamical system has a given affine variety as attractive and invariant set, a given point in such an affine variety as invariant and attractive and another given affine variety as invariant set, solving the application of this technique in the robotic area.
Possieri, Corrado, TornambeĢ, Antonio
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The main goal of this paper is to compute a class of polynomial vector fields, whose associated dynamical system has a given affine variety as attractive and invariant set, a given point in such an affine variety as invariant and attractive and another given affine variety as invariant set, solving the application of this technique in the robotic area.
Possieri, Corrado, TornambeĢ, Antonio
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53rd IEEE Conference on Decision and Control, 2014
The main objective of this paper is to describe a class of polynomial vector fields f, whose associated dynamic system has one or more affine varieties as f-invariant and attractive sets. This result can be used for robot motion planning, thus computing robot paths, avoiding collisions with obstacles and reaching a target point.
Possieri, Corrado, Tornambe, Antonio
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The main objective of this paper is to describe a class of polynomial vector fields f, whose associated dynamic system has one or more affine varieties as f-invariant and attractive sets. This result can be used for robot motion planning, thus computing robot paths, avoiding collisions with obstacles and reaching a target point.
Possieri, Corrado, Tornambe, Antonio
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The affine index polynomial invariant of flat virtual knots
Journal of Knot Theory and Its Ramifications, 2014We define the affine index polynomial of a flat virtual knot in a similar way as the case of a virtual knot, and show that it is described by the affine index polynomial of any overlying virtual knot. Let K be a virtual knot, and F the underlying flat virtual knot of K.
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An affine index polynomial invariant and the forbidden move of virtual knots
Journal of Knot Theory and Its Ramifications, 2016Kauffman defines an affine index polynomial invariant for virtual knots. The invariant is induced from a numerical invariant called an [Formula: see text]-writhe. In this paper, we provide the difference of the values obtained from invariants between two virtual knots which can be transformed into each other by a single forbidden move. As a result, we
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