Results 341 to 350 of about 2,499,047 (376)
Some of the next articles are maybe not open access.
Discrete Power Devices and Power Modules
2016Methods devoted to electrothermal simulation are presented as a useful tool for both the analysis and characterization of behavior of power semiconductor devices standing alone, and/or coupled in integrated circuits or power modules. First of all the implementation of a devised flow to generate the layer-based electrothermal PSpice model of an IPEM ...
Chvála A +8 more
openaire +2 more sources
Discrete coactions on Hilbert C*-modules
Mathematical Proceedings of the Cambridge Philosophical Society, 1996In this paper, we will investigate discrete coactions on Hilbert C*-modules. In particular, we obtain a one-to-one correspondence between Hilbert C*-modules with discrete coactions and Hilbert C*-modules over the crossed products of the original C*-algebras which satisfies some nice properties (see 3·6 and 3·7).
openaire +1 more source
Discrete thin-film layer thickness modulation
Applied Optics, 1998A novel analytical thin-film design method is presented that is based on electrical engineering communication theory. The proposed thickness modulation describes the thickness modulation of discrete, homogeneous thin-film layers of a multilayer coating.
openaire +2 more sources
1993
The continuous nonlinear Schrodinger equation has both nonintegrable and integrable discretizations. In this paper we consider the question of whether these discretizations are equivalent as models for modulated waves on nonlinear lattices. The evolution equations for the envelope of discrete modulated waves on the sine-Gordon lattice are derived by ...
openaire +1 more source
The continuous nonlinear Schrodinger equation has both nonintegrable and integrable discretizations. In this paper we consider the question of whether these discretizations are equivalent as models for modulated waves on nonlinear lattices. The evolution equations for the envelope of discrete modulated waves on the sine-Gordon lattice are derived by ...
openaire +1 more source
Discrete Systems as Petri Modules
2021This chapter is about putting the Petri modules together in a modular Petri net. This chapter consists of three groups of sections. In the first section, nine blocks are introduced as the basic building blocks of a discrete system. The second section introduces six matrices, such as Adjacency, Laplacian, Reachability, Rader’s, Connection, and Component
openaire +1 more source
IEEE transactions on energy conversion, 2018
This paper proposes a deadbeat finite set model predictive current control based on discrete space vector modulation (DSVM) in order to achieve robust characteristics from the grid impedance variation while guaranteeing high performance of output current
Hyun-Cheol Moon +2 more
semanticscholar +1 more source
This paper proposes a deadbeat finite set model predictive current control based on discrete space vector modulation (DSVM) in order to achieve robust characteristics from the grid impedance variation while guaranteeing high performance of output current
Hyun-Cheol Moon +2 more
semanticscholar +1 more source
ON THE RELATIVE (QUASI-)DISCRETENESS OF MODULES
Ring Theory 2007, 2008In this paper we investigate the relative (quasi-) discreteness of any module M with respect to any module N. Let 0 -> N' -> N -> N '' -> 0 be an exact sequence and let M be an N-amply supplemented module. Assume that B(M/T, N) is closed under supplement submodules for every factor module M/T of M.
KESKİN TÜTÜNCÜ, DERYA +1 more
openaire +2 more sources
Discrete Multitone Modulation for Short-Reach Mode Division Multiplexing Transmission
Journal of Lightwave Technology, 2019Spatial division multiplexing (SDM) can support the capacity demand increase in short-range optical link, but the communication is affected by the intermodal crosstalk. In order to target a low-cost energy-efficient solution, we propose to exploit direct
A. Gatto +3 more
semanticscholar +1 more source
Singular vectors and discrete modules
Russian Mathematical Surveys, 1986Let \({\mathcal L}\) be a complete \({\mathbb{Z}}\)-graded Lie superalgebra (in particular, a Lie algebra): \({\mathcal L}=L_ n\times L_{n+1}\times...\), where \(n\leq -1\), \(L_ i\) is finite-dimensional for \(i\geq n\), and \([L_ i,L_ j]\subset L_{i+j}\). Let \({\mathcal L}_ j=L_ j\times L_{j+1}\times...\), \(j\geq n\). The ground field is \({\mathbb{
openaire +2 more sources
Convexity Theories VII. Discrete Γ-Convex Modules
Applied Categorical Structures, 2001zbMATH Open Web Interface contents unavailable due to conflicting licenses.
openaire +2 more sources