Maximal Order and Order of Information for Numerical Quadrature

This work is concerned with the application of a new isometric mapping algorithm to hull plate expansion procedures for ships with all or portions of the hull consisting of developable surfaces. The expansion procedure is based on the relationship between the ruling lines r⇀(s) generating the developable surface S⇀(s,t) and one additional geodesic g⇀(s) constructed within the surface as the solution of the differential equation det(g⇀'g⇀"n⇀) = 0 where n⇀ is the unit normal to S⇀ at g⇀. Precise accuracy control is achieved through the use of adaptive numerical quadrature and a variable stepsize differential equation solving routine.

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Maximal Order of an NG-group

Libyan Journal of Basic Sciences ◽

10.36811/ljbs.2021.110063 ◽

2021 ◽

pp. 33-38

Author(s):

Faraj. A. Abdunabi

Keyword(s):

Permutation Group ◽

Equivalence Relation ◽

Maximal Order ◽

Quotient Set

This study was aimed to consider the NG-group that consisting of transformations on a nonempty set A has no bijection as its element. In addition, it tried to find the maximal order of these groups. It found the order of NG-group not greater than n. Our results proved by showing that any kind of NG-group in the theorem be isomorphic to a permutation group on a quotient set of A with respect to an equivalence relation on A. Keywords: NG-group; Permutation group; Equivalence relation; -subgroup

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On numerical quadrature forC1quadratic Powell–Sabin 6-split macro-triangles

Journal of Computational and Applied Mathematics ◽

10.1016/j.cam.2018.07.051 ◽

2019 ◽

Vol 349 ◽

pp. 239-250 ◽

Cited By ~ 2

Author(s):

Michael Bartoň ◽

Jiří Kosinka

Keyword(s):

Numerical Quadrature

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Numerical Quadrature for Probabilistic Policy Search

IEEE Transactions on Pattern Analysis and Machine Intelligence ◽

10.1109/tpami.2018.2879335 ◽

2020 ◽

Vol 42 (1) ◽

pp. 164-175 ◽

Cited By ~ 1

Author(s):

Julia Vinogradska ◽

Bastian Bischoff ◽

Jan Achterhold ◽

Torsten Koller ◽

Jan Peters

Keyword(s):

Numerical Quadrature ◽

Policy Search

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Automorphy factors for a Hilbert modular group

Glasgow Mathematical Journal ◽

10.1017/s0017089500007278 ◽

1988 ◽

Vol 30 (2) ◽

pp. 231-236

Author(s):

Shigeaki Tsuyumine

Keyword(s):

Number Field ◽

Algebraic Number ◽

Rational Number ◽

Modular Group ◽

Algebraic Number Field ◽

Maximal Order ◽

Hilbert Modular Group ◽

Hilbert Modular ◽

Totally Real

Let K be a totally real algebraic number field of degree n > 1, and let OK be the maximal order. We denote by гk, the Hilbert modular group SL2(OK) associated with K. On the extent of the weight of an automorphy factor for гK, some restrictions are imposed, not as in the elliptic modular case. Maass [5] showed that the weight is integral for K = ℚ(√5). It was shown by Christian [1] that for any Hilbert modular group it is a rational number with the bounded denominator depending on the group.

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