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Global convergence of the . . .

by Francisco J. Aragón Artacho
"... ..."
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An Extension of the Boolean Global Convergence

by Juei-ling Ho
"... Abstract. In 999, there is a global convergent theorem for boolean network that have been proved. Next, the global convergent theorem for XOR boolean network have been proved in 2007, it is a counterpart of the global convergent theorem for boolean network. This result, we extended the global conver ..."
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Abstract. In 999, there is a global convergent theorem for boolean network that have been proved. Next, the global convergent theorem for XOR boolean network have been proved in 2007, it is a counterpart of the global convergent theorem for boolean network. This result, we extended the global

Global convergence for Inverse Problems

by L. Beilina, M. V. Klibanov
"... Abstract. A globally convergent numerical method for a multidimensional Coefficient Inverse Problem for a hyperbolic equation is presented. It is shown that this technique provides a good starting point for the finite element adaptive method (adaptivity). This leads to a natural two-stage numerical ..."
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Abstract. A globally convergent numerical method for a multidimensional Coefficient Inverse Problem for a hyperbolic equation is presented. It is shown that this technique provides a good starting point for the finite element adaptive method (adaptivity). This leads to a natural two-stage numerical

On the Global Convergence of Stochastic Fictitious Play

by Josef Hofbauer, William H. Sandholm - ECONOMETRICA , 2002
"... We establish global convergence results for stochastic fictitious play for four classes of games: games with an interior ESS, zero sum games, potential games, and supermodular games. We do so by appealing to techniques from stochastic approximation theory, which relate the limit behavior of a stocha ..."
Abstract - Cited by 92 (16 self) - Add to MetaCart
We establish global convergence results for stochastic fictitious play for four classes of games: games with an interior ESS, zero sum games, potential games, and supermodular games. We do so by appealing to techniques from stochastic approximation theory, which relate the limit behavior of a

Globally Convergent Evolution Strategies

by Y. Diouane, S. Gratton, L. N. Vicente , 2014
"... In this paper we show how to modify a large class of evolution strategies (ES’s) for unconstrained optimization to rigorously achieve a form of global convergence, meaning convergence to stationary points independently of the starting point. The type of ES under consideration recombines the parent p ..."
Abstract - Cited by 2 (1 self) - Add to MetaCart
In this paper we show how to modify a large class of evolution strategies (ES’s) for unconstrained optimization to rigorously achieve a form of global convergence, meaning convergence to stationary points independently of the starting point. The type of ES under consideration recombines the parent

GLOBAL CONVERGENCE PROPERTIES OF CONJUGATE GRADIENT METHODS FOR OPTIMIZATION

by Jean Charles Gilbert, Jorge Nocedal , 1992
"... This paper explores the convergence ofnonlinear conjugate gradient methods without restarts, and with practical line searches. The analysis covers two classes ofmethods that are globally convergent on smooth, nonconvex functions. Some properties of the Fletcher-Reeves method play an important role ..."
Abstract - Cited by 129 (3 self) - Add to MetaCart
This paper explores the convergence ofnonlinear conjugate gradient methods without restarts, and with practical line searches. The analysis covers two classes ofmethods that are globally convergent on smooth, nonconvex functions. Some properties of the Fletcher-Reeves method play an important

Globally convergent autocalibration

by A. Benedetti, A. Busti, M. Farenzena, A. Fusiello - In Proceedings of the IEEE International Conference on Computer Vision , 2003
"... Existing autocalibration techniques use numerical optimization algorithms that are prone to the problem of local minima. To address this problem, we have developed a method where an interval branch-and-bound method is employed for numerical minimization. Thanks to the properties of Interval Analysis ..."
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Analysis this method is guaranteed to converge to the global solution with mathematical certainty and arbitrary accuracy, and the only input information it requires from the user is a set of point correspondences and a search box. The cost function is based on the Huang-Faugeras constraint

THE GLOBAL CONVERGENCE OF INCOME DISTRIBUTION

by John Luke Gallup , 2012
"... What happens to income distribution during the course of economic development? New higher quality international data show a marked pattern of inequality convergence, where inequality becomes more similar across countries as income levels rise. Inequality has tended to fall in high inequality countr ..."
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What happens to income distribution during the course of economic development? New higher quality international data show a marked pattern of inequality convergence, where inequality becomes more similar across countries as income levels rise. Inequality has tended to fall in high inequality

Financial globalization, convergence and growth ∗

by Delfim Gomesneto, Francisco José Veiga , 2009
"... Using a panel dataset covering the period 1970-2004 and 96 countries, we provide empirical evidence that the ratio foreign direct investment over total foreign liabilities has a positive effect on growth, directly and through convergence. Developing countries benefit relatively more as their initial ..."
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Using a panel dataset covering the period 1970-2004 and 96 countries, we provide empirical evidence that the ratio foreign direct investment over total foreign liabilities has a positive effect on growth, directly and through convergence. Developing countries benefit relatively more

A global convergence result . . .

by David Angeli, Eduardo D. Sontag , 2008
"... We show that strongly monotone systems of ordinary differential equations which have a certain translation-invariance property are so that all solutions converge to a unique equilibrium. The result may be seen as a dual of a well-known theorem of Mierczynski for systems that satisfy a conservation l ..."
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We show that strongly monotone systems of ordinary differential equations which have a certain translation-invariance property are so that all solutions converge to a unique equilibrium. The result may be seen as a dual of a well-known theorem of Mierczynski for systems that satisfy a conservation
Results 1 - 10 of 8,385