000 02430cam a22003495i 4500
001 23397737
005 20250804095312.0
008 231128s2024 mau 000 0 eng
010 _a2023951182
020 _a9783110672121
_q(paperback)
020 _z9783110672152
_q(pdf)
020 _z9783110672282
_q(epub)
040 _aDLC
_beng
_erda
_cDLC
042 _apcc
100 1 _aZhang, Guo-Ping,
_eauthor.
_9668
245 1 0 _aQuantum mechanics /
_cGuo-Ping Zhang, Thomas F. George, Mingsu Si.
263 _a1111
264 1 _aBoston :
_bDe Gruyter,
_c2024.
300 _axxii, 368 pages.
_b635 g;
_c16.51 x 2.54 x 23.5 cm
336 _atext
_btxt
_2rdacontent
337 _aunmediated
_bn
_2rdamedia
338 _avolume
_bnc
_2rdacarrier
490 0 _aDe Gruyter Textbook
520 _aThis textbook provides ample opportunities for practice and real experimental demonstrations. Conceptual understanding and mastering key techniques are enhanced by rigorous derivations, numerous worked examples, more than 300 exercises, about 150 problems and 16 computer codes. The preface summarizes all of the key concepts and formulas, along with a detailed schedule for teaching. The first three chapters introduce the quantum idea, wave-particle duality, operators and measurement. The Noether theorem is invoked to introduce the Schrödinger equation, followed by applications to infinite and finite quantum wells, quantum tunneling, harmonic oscillators, Heisenberg equation of motion, uncertainty principle, blackbody radiation and photoelectric effect. Chapters 4 and 5 are on angular momentum, the hydrogen atom and time-independent approximate methods. Chapters 6 and 7 are on spin and time-dependent perturbation theory. Chapters 8, 9 and 10 are on molecular orbitals, energy bands, quantum transport, scanning tunneling microscopy, lattice vibrations, Berry phase and quantum computing. The book is intended for a one-semester or one-year course and is also appropriate for researchers in related fields.
700 1 _aGeorge, Thomas F.,
_eauthor.
_9669
700 1 _aSi, Mingsu,
_eauthor.
_9670
906 _a0
_bibc
_corignew
_d2
_eepcn
_f20
_gy-gencatlg
942 _2udc
_cBK
_h530.145 ZHA
_k530.145
_mZHA
999 _c89206
_d89206