搜索结果: 1-15 共查到“Rogers”相关记录15条 . 查询时间(0.051 秒)
Professor Mark W. Rogers,Department of Physical Therapy & Rehabilitation Science at University of Maryland(图)
Department of Physical Therapy & Rehabilitation Science at University of Maryland Professor Physical Therapy Rehabilitation Science
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2016/1/12
Dr. Rogers graduated from the University of Connecticut, Storrs in 1973 with a B. S. in Physical Therapy. From 1972-1980 he practiced clinical physical therapy in rehabilitation and acute care medical...
Professor Terry B. Rogers,Department of Biochemistry & Molecular Biology at University of Maryland(图)
Professor Terry B. Rogers Department of Biochemistry & Molecular Biology at University of Maryland
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2015/12/22
Professor Terry B. Rogers,Department of Biochemistry & Molecular Biology at University of Maryland,I received my PhD from the University of California, Davis in Biochemistry. I then pursued postdocto...
南安普顿大学Eric Rogers教授访问中国科学院沈阳自动化研究所(图)
南安普顿大学 教授 中国科学院沈阳自动化研究所
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2015/1/15
2015年1月5日,应中国科学院沈阳自动化研究所海洋技术装备研究室邀请,英国南安普顿大学Eric Rogers教授和Bing Chu博士访问该所,并在“机器人前沿学术论坛”作报告。沈阳自动化所所长于海斌向Eric Rogers教授颁发了“机器人前沿学术论坛”讲座证书。研究所相关科研人员及研究生参加了此次活动。
Professor Hartley Rogers,Department of Mathematics at Massachusetts Institute of Technology(图)
Department of Mathematics at Massachusetts Institute of Technology Professor Partial Differential Equations Differential Geometry
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2014/8/21
Richard Melrose is a Simons Professor of Mathematics since 2006. A graduate of Australian National University, he completed the Ph.D. from Cambridge University under the direction of F. Gerard Friedla...
Professor Hartley Rogers,Department of Mathematics at Massachusetts Institute of Technology(图)
Department of Mathematics at Massachusetts Institute of Technology Professor Mathematical Logic
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2014/8/21
Hartley Rogers has been Professor of Mathematics since 1964. He received in B.A. in English from Yale in 1946. As a Henry fellow, he spent a year at Cambridge studying physics and mathematics, returni...
An Overpartition Analogue of Bressoud's Theorem of Rogers-Ramanujan-Gordon Type
the Rogers-Ramanujan-Gordon theorem overpartition Bressoud's theorem
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2014/6/3
For k ≥ 2 and k ≥ i ≥ 1, let Bk,i(n) denote the number of partitions of n such that part 1 appears at most i-1 times, two consecutive integers l and l+1 appear at most k-1 times and if l and l+1 appea...
The Rogers-Ramanujan-Gordon Theorem for Overpartitions
overpartition the Rogers-Ramanujan-Gordon theorem the Gordon marking of an overpartition
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2014/6/3
Let Bk,i(n) be the number of partitions of n with certain difference condition and let Ak,i(n) be the number of partitions of n with certain congruence condition. The Rogers-Ramanujan-Gordon theorem s...
Multivariate Rogers-Szegö polynomials and flags in finite vector spaces
Multivariate Rogers-Szegö polynomials flags in finite vector spaces
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2010/11/9
We give a recursion for the multivariate Rogers-Szeg\"o polynomials, along with another recursive functional equation, and apply them to compute special values. We also consider the sum of all $q$-mu...
Parametric Evaluations of the Rogers Ramanujan Continued Fraction
the Rogers Ramanujan Continued Fraction math
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2010/11/22
In this article with the help of the inverse function of the singular moduli we evaluate the Rogers Ranmanujan continued fraction and his first derivative.
Third party losses in a comparative perspective--Three short lectures in honour of W.H.V. Rogers
third party damages injury liability personal injury loss of income
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2009/11/27
In honour of Horton Rogers, as the holder of the rotational G.J. Wiarda chair at Utrecht University, a symposium was held on 13 June 2007 concerning the right of third parties to compensation in cases...
Gould-Hsu-Carlitz反演与Rogers-Ramanujan恒等式(Ⅰ)
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2007/12/13
本文将论述通过q-级数互反关系证明经典分拆恒等式的一般方法。应用Carlitz给出的Gould-Hsu反演的q-模拟,作者将建立一个重要的和式变换定理。作为例证:结合Jacobi三重积恒等式及组合计算技巧,给出Rogers-Ra-manujan恒等式一个新的简单推证。
The Bivariate Rogers-Szegö Polynomials
The bivariate Rogers-Szego polynomials the continuous big q-Hermite polynomials the Cauchy polynomials the q-exponential operator the homogeneous q-shift operator
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2014/6/3
We present an operator approach to deriving Mehler's formula and the Rogers formula for the bivariate Rogers-Szegö polynomials hn(x, y|q). The proof of Mehler's formula can be considered as a new...
The Edward S. Rogers Sr. Department of Electrical & Computer Engineering, University of Toronto
The Edward S. Rogers Sr. Department of Electrical & Computer Engineering University of Toronto 电子学 计算机科学
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2007/12/24
Welcome to The Edward S. Rogers Sr. Department of Electrical and Computer Engineering at the University of Toronto! We are engaged in the pursuit and dissemination of knowledge across a phenomenal ran...
Duke Energy CEO Rogers Calls For "Paradigm Shift" to Realize Full Potential of Energy Efficiency
Potential of Energy fuel source electric utilities
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2007/3/8
Washington, DC (February 12, 2007) - Declaring that energy efficiency should be viewed as a “fuel source” in its own right alongside conventional generating fuels, Duke Energy CEO Jim Rogers outlined ...
A Probabilistic Proof of the Rogers Ramanujan Identities
A Probabilistic Proof Rogers Ramanujan Identities
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2010/10/29
The asymptotic probability theory of conjugacy classes of the finite general linear and unitary groups leads to a probability measure on the set of all partitions of natural numbers. A simple method o...