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HOW MANY QUANTUM NUMBERS?


How many quantum numbers are needed to describe any given system? There is no universal answer, although for each system, one must find the answer for a full analysis of the system. The dynamics of any quantum system is described by a quantum Hamiltonian , H. There is one quantum number of the system corresponding to the energy, i.e., the Eigenvalue of the Hamiltonian. There is also one quantum number for each operator O that commutes with the Hamiltonian (i.e. satisfies the relation OH = HO). These are all the quantum numbers that the system can have. Note that the operators O defining the quantum numbers should be independent of each other. Often there is more than one way to choose a set of independent operators. Consequently, in different situations different sets of quantum numbers may be used for the description of the same system.


SINGLE ELECTRON IN AN ATOM


This section is not meant to be a full description of this problem. For that, see the article on the Hydrogen-like Atom , Bohr Atom , Schrödinger Equation and the Dirac Equation .


The most widely studied set of quantum numbers is that for a single , being the basic notion behind the Periodic Table , Valence (chemistry) and a host of other properties, but also because it is a solvable and realistic problem, and, as such, finds widespread use in textbooks.

In non-relativistic Quantum Mechanics the Hamiltonian of this system consists of the Kinetic Energy of the electron and the Potential Energy due to the Coulomb Force between the nucleus and the electron. The kinetic energy can be separated into a piece which is due to angular momentum, J, of the electron around the Nucleus , and the remainder. Since the potential is spherically symmetric, the full Hamiltonian commutes with '''J2'''. '''J2''' itself commutes with any one of the components of the angular momentum vector, conventionally taken to be '''Jz'''. These are the only mutually commuting operators in this problem; hence, there are three quantum numbers.

These are conventionally known as

  • The Principal Quantum Number (''n'' = 1, 2, 3,...) denotes the eigenvalue of H with the '''J2''' part removed. This number therefore has a dependence only the distance between the electron and the nucleus (ie, the radial coordinate, '''r'''). The average distance increases with '''n''', and hence quantum states with different principal quantum numbers are said to belong to different shells.

  • The Azimuthal Quantum Number (''l'' = 0, 1 ... ''n''−1) (also known as the angular quantum number or '''orbital quantum number''') gives the angular momentum through the relation '''J2 = l(l+1) h/2π''', where '''h''' is the universal constant known as the Planck's Constant . In chemistry, this quantum number is very important, since it specifies the shape of an Atomic Orbital and strongly influences Chemical Bond s and Bond Angle s. In some contexts, '''l=0''' is called an s orbital, '''l=1''', a p orbital, '''l=2''', a d orbital and '''l=3''', an f orbital.

  • The Magnetic Quantum Number (''ml'' = −''l'', −''l''+1 ... 0 ... ''l''−1, ''l'') is the Eigenvalue , Jz=mlh/2π.

  • The Spin Quantum Number (''ms'' = −1/2 or +1/2) was found experimentally from Spectroscopy .


To summarize, the quantum state of an electron is determined by the quantum numbers:

Example: The quantum numbers used to refer to the outer most Valence Electron of the Fluorine (F) Atom , which is located in the 2p Atomic Orbital , are; ''n'' = 2, ''l'' = 1, ''ml'' = 1, or 0, or −1, ''ms'' = −1/2 or 1/2.

Note that Molecular Orbitals require totally different quantum numbers, because the Hamiltonian and its symmetries are quite different.


ELEMENTARY PARTICLES


For a more complete description of the quantum states of elementary particles see the articles on the Standard Model and Flavour (particle Physics) .

Elementary particles contain many quantum numbers which are usually said to be intrinsic to them. However, it should be understood that the elementary particles are Quantum State s of the Standard Model of Particle Physics , and hence the quantum numbers of these particles bear the same relation to the Hamiltonian of this model as the quantum numbers of the Bohr Atom does to its Hamiltonian. In other words, each quantum number denotes a symmetry of the problem. It is more useful in Field Theory to distinguish between Spacetime and Internal symmetries.

Typical quantum numbers related to spacetime symmetries are Spin (related to rotational symmetry), the Parity , C-parity and T-parity (related to the Poincare Symmetry of Spacetime ). Typical '''internal symmetries''' are Lepton Number and Baryon Number or the Electric Charge . For a full list of quantum numbers of this kind see the article on Flavour .

It is worth mentioning here a minor but often confusing point. Most conserved quantum numbers are additive. Thus, in an elementary particle reaction, the sum of the quantum numbers should be the same before and after the reaction. However, some, usually called a ''parity'', are multiplicative; ie, their product is conserved. All multiplicative quantum numbers belong to a symmetry (like parity) in which applying the symmetry transformation twice is equivalent to doing nothing. These are all examples of an abstract Group called Z2.


SEE ALSO



REFERENCES AND EXTERNAL LINKS



General principles



Atomic physics



Particle physics