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Proceedings of 1994 37th Midwest Symposium on Circuits and Systems, 2002
This paper describes a network formula generation method in frequency or time domain for circuits allowing symbolic representation for some or all elements. Polynomial reduction method can be used for polyvariant analysis of both linear and nonlinear networks, which can consist of admittances, impedances and all four types of controlled sources.
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This paper describes a network formula generation method in frequency or time domain for circuits allowing symbolic representation for some or all elements. Polynomial reduction method can be used for polyvariant analysis of both linear and nonlinear networks, which can consist of admittances, impedances and all four types of controlled sources.
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2023
Abstract This chapter examines the role of reduction in phenomenological method. Reduction plays a number of significant roles in phenomenological method and thus in the phenomenology of music. The first section examines the relationship between phenomenology and science, arguing that phenomenology’s commitment to reduction is not to ...
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Abstract This chapter examines the role of reduction in phenomenological method. Reduction plays a number of significant roles in phenomenological method and thus in the phenomenology of music. The first section examines the relationship between phenomenology and science, arguing that phenomenology’s commitment to reduction is not to ...
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Journal of Dynamic Systems, Measurement, and Control, 1986
In this brief note, the effects of model reduction on the stability boundaries of control systems with parameter variations, and the limit-cycle characteristics of nonlinear control systems are investigated. In order to reduce these effects, a method of model reduction is used which can approximate the original transfer function at S=0, S=∞, and also ...
Lin, Jium-Ming, Han, Kuang-Wei
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In this brief note, the effects of model reduction on the stability boundaries of control systems with parameter variations, and the limit-cycle characteristics of nonlinear control systems are investigated. In order to reduce these effects, a method of model reduction is used which can approximate the original transfer function at S=0, S=∞, and also ...
Lin, Jium-Ming, Han, Kuang-Wei
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Generalized Petri Net Reduction Method
IEEE Transactions on Systems, Man, and Cybernetics, 1987A reduction method of generalized Petri nets is proposed. This method is a generalization of the reduction method which was previously given by the first two authors [ibid. 15, 272-280 (1985; Zbl 0564.68047)]. The proposed method is defined not on the basis of the dynamic behavior but of the structure of the net, and thus the test of reducible subnet ...
LEEKWANG, H Lee, Kwang-Hyung +2 more
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Matrix reduction—an efficient method
Communications of the ACM, 1975The paper describes an efficient method for reduction of the binary matrices which arise in some school time-tabling problems. It is a development of that described by John Lions. It has been generalized and adapted to fit into the complete timetabling process; to use a more compact data representation and more efficient processing techniques; to take ...
Johnston, H. C., Hoare, C. A. R.
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1992
In this chapter we shall describe several methods which allow a reduction in the variance of functionals of weak approximations of Ito diffusions. One method changes the underlying probability measure by means of a Girsanov transformation, another uses general principles of Monte-Carlo integration. Unbiased estimators are also constructed.
Peter E. Kloeden, Eckhard Platen
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In this chapter we shall describe several methods which allow a reduction in the variance of functionals of weak approximations of Ito diffusions. One method changes the underlying probability measure by means of a Girsanov transformation, another uses general principles of Monte-Carlo integration. Unbiased estimators are also constructed.
Peter E. Kloeden, Eckhard Platen
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2011
A method of reduction of finite spaces is a technique that allows one to reduce the number of points of a finite topological space preserving some properties of the space.
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A method of reduction of finite spaces is a technique that allows one to reduce the number of points of a finite topological space preserving some properties of the space.
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2008
REDUCTIONS OF CARBONYLES Hydrogenation Transfer-Hydrogenation Metal Hydrides Hydroboration Hydrosilylation Enzymatic REDUCTIONS OF ALKENES Hydrogenation Hydroboration Hydroalumination Hydrosilylation Organocatalysis REDUCTIONS OF IMINES Hydrogenation Transfer-Hydrogenation Hydroboration Hydrosilylation Organocatalysis Bronsted Lewis Base REDUCTIONS OF ...
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REDUCTIONS OF CARBONYLES Hydrogenation Transfer-Hydrogenation Metal Hydrides Hydroboration Hydrosilylation Enzymatic REDUCTIONS OF ALKENES Hydrogenation Hydroboration Hydroalumination Hydrosilylation Organocatalysis REDUCTIONS OF IMINES Hydrogenation Transfer-Hydrogenation Hydroboration Hydrosilylation Organocatalysis Bronsted Lewis Base REDUCTIONS OF ...
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1993
Here we give outlines of the proofs of some propositions from Chapters 4 and 5, which allow one to narrow the area in search for possible substitutions, describing minimizers of chiral Hamiltonians in question. In particular, one can always limit oneself with the class of static fields for the functionals with quadratic dependence on time derivatives ...
Vladmir G. Makhankov +2 more
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Here we give outlines of the proofs of some propositions from Chapters 4 and 5, which allow one to narrow the area in search for possible substitutions, describing minimizers of chiral Hamiltonians in question. In particular, one can always limit oneself with the class of static fields for the functionals with quadratic dependence on time derivatives ...
Vladmir G. Makhankov +2 more
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1984
Small-amplitude oscillations near the Hopf bifurcation point are generally governed by a simple evolution equation. If such oscillators form a field through diffusion-coupling, the governing equation is a simple partial differential equation called the Ginzburg-Landau equation.
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Small-amplitude oscillations near the Hopf bifurcation point are generally governed by a simple evolution equation. If such oscillators form a field through diffusion-coupling, the governing equation is a simple partial differential equation called the Ginzburg-Landau equation.
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