Results 221 to 230 of about 1,251,305 (268)
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Characteristic Operators and Conditioned Random Elements*
Journal of Mathematical Sciences, 2014zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Special Trefftz Elements and Improvement of Their Conditioning
Communications in Numerical Methods in Engineering, 1997Summary: This paper proposes a new family of special Treffitz elements in which the boundary conditions on an internal curve (stiffener, hole, etc.) are fulfilled by the least squares procedure. The author anticipates difficulties with conditioning of such elements and therefore proposes a method to improve the aspect.
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Elemental and Configural Encoding of the Conditioned Stimulus
The Quarterly Journal of Experimental Psychology Section B, 2003Five experiments explored the effect of conditioning AB and CD compounds on responding to transfer AD and BC compounds and to elements. These experiments used several conditioning procedures: flavour aversion and instrumental discriminative learning in rats and autoshaping in pigeons.
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Rendering conditionals in mathematical discourse with conditional elements
Journal of Pragmatics, 2009We apply the theory of conditional elements to conditionals occurring in mathematical discourse to make the rendering of such conditionals more transparent.
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Thin flow element and the problem of ill‐conditioning
International Journal for Numerical and Analytical Methods in Geomechanics, 1989AbstractThe problem of ill‐conditioning in anisotropic and heterogeneous flow regions using plane and axisymmetric conditions is studied. A new concept, conditioning ratio, which covers all the possible factors significantly affecting the problem of ill‐conditioning (e.g. aspect ratio, heterogeneity and anisotropy) is proposed.
Valliappan, S. +2 more
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Acta Analytica, 2010
This paper presents a unified, more-or-less complete, and largely pragmatic theory of indicative conditionals as they occur in natural language, which is entirely truth-functional and does not involve probability. It includes material implication as a special—and the most important—case, but not as the only case.
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This paper presents a unified, more-or-less complete, and largely pragmatic theory of indicative conditionals as they occur in natural language, which is entirely truth-functional and does not involve probability. It includes material implication as a special—and the most important—case, but not as the only case.
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Ill-conditioning of finite element poroelasticity equations
International Journal of Solids and Structures, 2001zbMATH Open Web Interface contents unavailable due to conflicting licenses.
FERRONATO, MASSIMILIANO +2 more
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The elements of customer satisfaction model in Serbian conditions
International Journal of Services Technology and Management, 2012The objective of this paper is to present the research results in modelling the process for providing satisfaction of company's customers and their requirements - the key elements of the model which is the final result of the research. This model implies a process approach and acceptable marketing research in the beginning, as well as appropriate ...
Dragan Cockalo +4 more
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Rings with No Nilpotent Elements and with the Maximum Condition on Annihilators
Canadian Mathematical Bulletin, 1974Rings (all of which are assumed to be associative) with no non-zero nilpotent elements will be called reduced rings; R is a reduced ring if and only if x2=0 implies x=0, for all x∈R. In 2. we prove that the following conditions on an annihilator ideal I of a reduced ring are equivalent: I is a maximal annihilator, I is prime, I is a minimal prime, I is
Cornish, W. H., Stewart, P. N.
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On conditions of existence of sums of functions of conditioned random elements
Journal of Mathematical Sciences, 2005Let \((\Omega,\mathcal S,\mathbb P)\) and \((\mathcal F,\mathcal B)\) be probability and measurable spaces, respectively. Any \((\mathcal B,\mathcal S)\)-measurable mapping of a set \(\Omega\) into a set \(\mathcal F\) is called a random element. Let \(w_1,w_2,\dots,w_N\) be random elements given on a probability space \((\Omega_1,{\mathcal S}_1 ...
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