Physics

first courses on power electronic and drives by Ned Mohan

By Ned Mohan

Designed with undergraduate scholars in brain who're prone to take just one path in this topic:

-Prepare them for undefined -Impart basics and supply a roadmap for life-long studying -Provide breadth and intensity in lower than 250 pages -Based on suggestions from over 350 school contributors at workshops in 1991, 1994, 1997, 1998, 2002 and 2003.

The CD-ROM accompanying this textbook has the subsequent particular beneficial properties:

- ready Lecture Slides with Examples (great for college kids too!) - PSpice 9.1 scholar model ready-to-install (nothing to obtain or order) - PSpice-based real looking Examples and difficulties - Hardware-Lab-on-a-CD: comprises lab setups and the measured (NOT simulated ) waveforms.

Comparison with different Textbooks in this topic:

- in simple terms 248 pages permit insurance from front-to-back in a single semester - ready (ready-to-run) Examples at the CD might be simply changed for assigning reasonable homework difficulties - ready Lectures Slides store teachers helpful guidance time - real Lab measured waveforms make it genuine (next most sensible to having lab setups on your college) - overall adventure – what's strength with out keep watch over?

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Elements de Mécanique quantique - Tome 1

I Les origines de los angeles Th´eorie quantique
I. 1. Les techniques de los angeles body classique
(I. 1. 1) constitution corpusculaire de los angeles mati`ere
(I. 1. 2) Nature ondulatoire de l. a. lumi`ere
(I. 1. three) Le d´eterminisme de los angeles body classique
I. 2. Ondes ´electromagn´etiques et quanta de lumi`ere
I. three. l. a. nature ondulatoire de l. a. mati`ere
(I. three. 1) Les spectres de raies et les ondes de Louis de Broglie
(I. three. 2) Description quantique d’une particule libre : le paquet d’ondes
I. four. Dualit´e onde-corpuscule de los angeles lumi`ere et de l. a. mati`ere
I. five. Exercices sur les bases exp´erimentales de los angeles m´ecanique quantique
II Syst`emes quantiques simples
II. 1. Etat quantique d’une particule libre
(II. 1. 1) Fonction d’onde
(II. 1. 2) Courant de probabilit´e
(II. 1. three) Valeur moyenne et ´ecart quadratique moyen
(II. 1. four) Op´erateur “impulsion” dans l’espace des coordonn´ees
II. 2. Particule dans un potentiel ind´ependant du temps
(II. 2. 1) recommendations stationnaires
(II. 2. 2) Quantification de l’´energie
II. three. l. a. barri`ere de potentiel finie : l’effet tunnel
II. four. Le puits quantique
II. five. L’oscillateur harmonique
(II. five. 1) M´ethode de r´esolution polynˆomiale
(II. five. 2) M´ethode des op´erateurs de cr´eation et de destruction
II. 6. Appendice : Fonction g´en´eratrice des polynˆomes d’Hermite et oscillateur harmonique
(II. 6. 1) Orthonormalit´e des fonctions 'n(x) de l’oscillateur harmonique
(II. 6. 2) Valeurs moyennes et probabilit´e de transition
III Fondements de l. a. th´eorie quantique
III. 1. Equation de Schr¨odinger et ses propri´et´es
(III. 1. 1) Spectre de l’op´erateur hamiltonien et element de vue du calcul vectoriel
(III. 1. 2) Le vecteur d’´etat de l’espace d’Hilbert E et ses propri´et´es
(III. 1. three) Repr´esentation des coordonn´ees |ri
(III. 1. four) Repr´esentation des impulsions |pi
(III. 1. five) formula matricielle : Repr´esentation des ´etats d’´energie
(III. 1. 6) D´eg´en´erescence d’un niveau d’´energie
III. 2. constitution de l’espace de Hilbert "H et produits tensoriels d’espaces
III. three. Le processus de mesure et sa description quantique
(III. three. 1) Commutateurs et grandeurs physiques simultan´ement mesurables
(III. three. 2) Grandeurs physiques non simultan´ement mesurables : G´en´eralisation des family d’incertitude
de Heisenberg
III. four. L’´equation d’´evolution
III. five. Les diff´erents sch´emas en m´ecanique quantique
(III. five. 1) Le sch´ema de Schr¨odinger
(III. five. 2) Le sch´ema de Heisenberg
(III. five. three) Le sch´ema d’interaction
III. 6. L’op´erateur de densit´e
III. 7. Int´egrale premi`ere et sym´etrie
(III. 7. 1) Observables compatibles et constantes du mouvement
(III. 7. 2) Sym´etrie et constante du mouvement
(III. 7. three) G´en´erateur d’une transformation de sym´etrie
(III. 7. four) Sym´etrie de translation
III. eight. Sym´etrie par rapport aux diversifications de particules identiques, les “bosons” et les “fermions”
III. nine. M´ethodes d’approximation pour los angeles r´esolution de l’´equation de Schr¨odinger
(III. nine. 1) Th´eorie de perturbation
(III. nine. 2) M´ethode variationnelle lin´eaire
III. 10. Conclusions : Postulats de l. a. body quantique
III. eleven. Appendice : Le cadre math´ematique de l’espace de Hilbert "H
IV Les moments angulaires en th´eorie quantique
IV. 1. Fonctions propres et valeurs propres du second cin´etique orbital : M´ethode polynˆomiale
IV. 2. Sym´etrie de rotation et second angulaire
IV. three. M´ethode alg´ebrique : Les op´erateurs d’´echelle
IV. four. Repr´esentation matricielle des op´erateurs du second angulaire
IV. five. Le spin d’une particule
(IV. five. 1) Le second magn´etique de l’´electron
(IV. five. 2) Exp´erience de Stern et Gerlach
(IV. five. three) Vecteur d’´etat et op´erateur de spin
(IV. five. four) Pr´ecession du spin dans un champ magn´etique
(IV. five. five) Composition de deux moments angulaires
IV. 6. Appendice : Fonctions sp´eciales associ´ees au second angulaire
(IV. 6. 1) Polynˆomes de Legendre
(IV. 6. 2) Les harmoniques sph´eriques
V Particules dans un champ de strength central
V. 1. Le probl`eme de deux particules en th´eorie quantique
(V. 1. 1) Potentiel `a sym´etrie sph´erique
(V. 1. 2) Vibrations et rotations d’une mol´ecule
V. 2. L’atome hydrog´eno¨ıde
(V. 2. 1) Fonction d’onde totale et ses propri´et´es
V. three. constitution superb des atomes alcalins
(V. three. 1) Interactions spin-orbite
(V. three. 2) Corrections relativistes
V. four. Effet de Zeeman des atomes alcalins
(V. four. 1) Atome plac´e dans un champ magn´etique quelconque
(V. four. 2) Effet Zeeman anomal
(V. four. three) Effet Paschen-Back
V. five. Etats quantiques de los angeles mol´ecule diatomique
V. 6. Appendice : Propri´et´es des fonctions sp´eciales de l’atome hydrog´eno¨ıde
(V. 6. 1) Les polynˆomes de Laguerre associ´es
VI Transitions entre ´etats stationnaires
VI. 1. Mouvement d’une particule charg´ee soumise `a un champ ´electromagn´etique
(VI. 1. 1) Le hamiltonien du syst`eme
(VI. 1. 2) motion d’un champ magn´etique constant
(VI. 1. three) Invariance de jauge
VI. 2. Perturbations non stationnaires
(VI. 2. 1) R`egle d’or de Fermi
VI. three. Le rayonnement dipolaire
VI. four. Corrections multipolaires
VI. five. Expression quantique des coefficients d’Einstein
VI. 6. Coefficients d’absorption
VI. 7. R`egles de s´election et le spectre optique d’atome `a un ´electron
(VI. 7. 1) Les r`egles de s´election d’un oscillateur harmonique et d’un atome hydrog´eno¨ıde r´ealiste
VII creation `a l. a. th´eorie quantique non-relativiste des syst`emes
de particules identiques
VII. 1. Le formalisme g´en´eral
VII. 2. program `a l’atome d’h´elium
(VII. 2. 1) interplay d’´echange et magn´etisme
VII. three. L’approximation du champ self-consistant de Hartree et de Hartree-Fock
VIII advent `a los angeles th´eorie quantique de los angeles diffusion par un
potentiel
VIII. 1. part efficace de diffusion
(VIII. 1. 1) part efficace diff´erentielle dans le syst`eme du laboratoire
(VIII. 1. 2) Interpr´etation classique et loi de Rutherford
VIII. 2. Traitement stationnaire
(VIII. 2. 1) Equation int´egrale de los angeles diffusion et answer “approch´ee” : “Approximation de Born”
(VIII. 2. 2) Le r`egle d’Or de Fermi et l’approximation de Born
(VIII. 2. three) M´ethode des ondes partielles
Livres de r´ef´erence
– J. L. Basdevant, M´ecanique quantique, ellipses, 1986.
– J. Hladik, M´ecanique quantique, ´editions Masson, Paris, 1997.
Bibliographie
– D. Blokintsev, Principes de m´ecanique quantique, ´editions Mir, Moscou, 1981.
– J. M. L´evy-Leblond, F. Balibar, Quantique. Rudiments, Inter-Editions, Paris, 1984.
– Cl. Cohen-Tannoudji, B. Diu, F. Lalo¨e, M´ecanique quantique, tomes I & II, Hermann, 1980.
– E. Merzbacher, Quantum Mechanics, John Wiley, third ed. , 1998.
– S. Gasiorowicz, Quantum Physics, John Wiley, 1997.
– L. D. Landau, E. M. Lifshitz, Quantum Mechanics, Pergamon Press, third ed. , 1981.
– V. okay. Thankappan, Quantum Mechanics, John Wiley, second ed. , 1993.
– A. B. Wolbarst, Symmetry and Quantum Mechanics, Van Nostrand Reinhold Comp. , 1977.
– W. Louisell, Radiation and noise in Quantum Electronics, McGraw-Hill, 1964.
– A. Z. Capri, Nonrelativistic Quantum Mechanics, Benjamin/Cummings, 1985.
– J. J. Sakurai, sleek Quantum Mechanics, Benjamin/Cummings, 1985.
– W. Greiner, B. M¨uller, Quantum Mechanics, vol. I & II, Hermann, 1980.
– T. Fliessbach, Quantenmechanik, Spektrum Akademischer Verlag, 1995.
– R. W. Robinett, Quantum Mechanics, Oxford collage Press, 1997.

Extra info for first courses on power electronic and drives

Sample text

This subject is extremely important to atomic frequency standards. The reason is that the ground-state levels are displaced by the magnetic field. Consequently, the accuracy of the standards depends on our knowledge of the exact relation between the position of the levels and the magnetic field. Furthermore, the frequency stability of the standard depends on the size of the magnetic field perturbation and our ability to control this field. Finally, the magnetic field plays an essential role in the operation of microwave atomic frequency standards.

This choice of phase has a direct effect on the K,. All those for AmF = 0 transitions are negative. Had we chosen a representation { m J ,m I } ,they would be positive. This has the effect of introducing a phase factor and it has no consequences on actual measurements. 1 the absolute value of the Kk,. However, they could be taken as the K , for the representation { m J ,m l } . This is the phase used often in the literature. 3, we have treated the case of magnetic dipole transitions as an example.

5. If the rotating field is turned off at the time corresponding to colt = n/2, the magnetic moment finds itself in the xy plane and lc1I2=lc212= Such an RF pulse is called a n/2 pulse. If, on the other hand, w l t = n, the magnetic moment finds itself opposed to its original direction. Then, Ic2l2= 0 and lcl12 = 1, and we have a n pulse. These concepts will be used later in connection with the actual operation of frequency standards. For example, in masers it is possible to investigate atomic lifetimes with such pulses.

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