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Asar, A.A.
International Centre for Theoretical Physics, Trieste (Italy)1983
International Centre for Theoretical Physics, Trieste (Italy)1983
AbstractAbstract
[en] The Diophantine equation 7y2=x3+γ5sup(n):γ=+-1 is solved. Note that if the above equation holds, then n>=0, since 5sup(n)=γ(x3-7y2). (author)
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Source
Aug 1983; 10 p
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Report
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Billings, M.P.
McDonnell Douglas Astronautics Co., Santa Monica, Calif. (USA)
National topical meeting on new developments in reactor physics and shielding1972
McDonnell Douglas Astronautics Co., Santa Monica, Calif. (USA)
National topical meeting on new developments in reactor physics and shielding1972
AbstractAbstract
No abstract available
Primary Subject
Source
American Nuclear Society (USA). Northeastern New York Section; p. 574-576; 1972; Meeting on new developments in reactor physics and shielding calculations; Kiamesha Lake, NY; 12 Sep 1972
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Report
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Conference
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Asar, A.A.
International Centre for Theoretical Physics, Trieste (Italy)1983
International Centre for Theoretical Physics, Trieste (Italy)1983
AbstractAbstract
[en] The Diophantine equation 7y2=x3+γ3sup(n):γ=+-1 is solved. Note that n>=0, since 3sup(n)=γ(7y2-x3)
Primary Subject
Source
Aug 1983; 10 p
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Report
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Reference NumberReference Number
INIS VolumeINIS Volume
INIS IssueINIS Issue
Kirane, M.; Di Liddo, A.
International Centre for Theoretical Physics, Trieste (Italy)1994
International Centre for Theoretical Physics, Trieste (Italy)1994
AbstractAbstract
[en] We present a system of reaction diffusion equations posed in R in which the diffusion terms are responsible for the finite time breakdown of its solutions. (author). 5 refs
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Source
Jan 1994; 5 p
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Report
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Hoffmann-Ostenhof, M.; Hoffmann-Ostenhof, T.
Vienna Univ. (Austria). Inst. fuer Theoretische Physik1989
Vienna Univ. (Austria). Inst. fuer Theoretische Physik1989
AbstractAbstract
[en] It is shown that the local properties of the wave-function in the neighbourhood of a zero are determined to a certain extent by global properties of the nodal set of the corresponding surface harmonic. 8 refs
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1989; 6 p
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Report
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Batista, Milan, E-mail: milan.batista@fpp.uni-lj.si2019
AbstractAbstract
[en] In this paper, we provide an analytical solution for the contact problem of an elastic belt extended by two equal smooth rigid pulleys. The belt is treated as a Bernoulli–Euler rod, and the expressions for pulley displacement and pulley reaction force are given in terms of Jacobi elliptical functions. Theoretical considerations are enhanced by examples in tabular and graphical form.
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Source
Copyright (c) 2019 Springer-Verlag GmbH Austria, part of Springer Nature; Country of input: International Atomic Energy Agency (IAEA)
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Journal Article
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AbstractAbstract
[en] We construct an explicit supergravity solution for a configuration of localized D4-brane ending on a D6-brane, restricted to the near horizon region of the latter. We generate this solution by dimensionally reducing the supergravity solution for a flat M5-brane in $R{1,7}xC2/ZN$ with the M5-brane partially embedded in $C2/ZN$. We describe the general class of localized intersections and overlaps whose supergravity solutions are constructable in this way. (author)
Primary Subject
Source
Available in electronic form only at the Web site of the Journal of High Energy Physics located at http://jhep.sissa.it/. E-print number: hep-th/9812159
Record Type
Journal Article
Journal
Journal of High Energy Physics (Online); ISSN 1029-8479; 
; v. 1(1999); p. vp
; v. 1(1999); p. vp
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External URLExternal URL
Lu Zhujia.
International Centre for Theoretical Physics, Trieste (Italy)1990
International Centre for Theoretical Physics, Trieste (Italy)1990
AbstractAbstract
[en] The three-surface theorem for uniformly elliptic differential inequalities with nonpositive coefficient of zero-order term in some domain D is a subset of Rn becomes trivial if the maximum of u on two separate boundary surfaces of D is nonpositive. We give a method in this paper for obtaining a nontrivial estimate of the maximum of u on a family of closed surfaces. (author). 2 refs
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Nov 1990; 6 p
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Report
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Cuperman, S.; Zoler, D.; Ashkenazi, J.; Caner, M.; Kaplan, Z.
Israel physical society 1993 annual meeting1993
Israel physical society 1993 annual meeting1993
AbstractAbstract
[en] Short communication
Primary Subject
Source
Israel Physical Society, Jerusalem (Israel); Bulletin of the IPS; v. 39; 175 p; Apr 1993; p. 89; Israel physical society 1993 annual meeting; Tel-Aviv (Israel); 4 Apr 1993
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Miscellaneous
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Asar, A.A.
International Centre for Theoretical Physics, Trieste (Italy)1983
International Centre for Theoretical Physics, Trieste (Italy)1983
AbstractAbstract
[en] The integral solutions of the Diophantine equations 7y2=x3+γ2sup(n), γ=+-1, n>=0 are found. Also solutions u, v and D are found for some particular pairs of equations of the form qv2-r=sD2, u2+γβ=Dsub(j) where q,r,s,α and β are positive integers, γ=+-1. (author)
Primary Subject
Source
Aug 1983; 14 p
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Report
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