Field (physics)

common physics term for a physical quantity, represented by a number or tensor, that has a value for each point in space-time

In physics, a field means that a physical quantity is assigned to every point in space (or, more generally, spacetime). A field is seen as extending throughout a large region of space so that it influences everything. The strength of a field usually varies over a region. Michael Faraday became the first to coin the term "field", in 1849.[1]

The magnitude of an electric field surrounding two equally charged (repelling) particles. Brighter areas have a greater magnitude. The direction of the field is not visible.
Oppositely charged (attracting) particles

For some fields, there is a number for each point in space. They are called scalar fields. For more complicated fields, there are more than one number for each point in space. They are called vector fields or tensor fields. For example, one can model a gravitational field by a vector field where a vector indicates the acceleration a mass would experience at each point in space. Other examples are temperature fields or air pressure fields, which are often illustrated on weather reports by isotherms and isobars by joining up the points of equal temperature or pressure respectively.

Types of fields change

Classical fields change

  • Newtonian gravitation: describes the gravitational force as a mutual interaction between two masses.
  • Electromagnetism: electric and magnetic fields are not only fields of force which dictate the motion of particles, but also have an independent physical reality because they carry energy.
  • Gravitation in general relativity: this is Einstein's theory of gravity.
  • Waves as fields

Quantum fields change

It is now believed that quantum mechanics should underlie all physical phenomena.

Field theory change

A field theory is a physical theory that describes how one or more physical fields interact with matter.

Related pages change

References change

  1. Weinberg, Steven 1977. The search for unity: notes for a history of quantum field theory. Daedalus 106 (4): 17–35.
  • Landau, Lev D. and Lifshitz, Evgeny M. 1971. Classical theory of fields. 3rd ed, London: Pergamon. ISBN 0-08-016019-0 Vol. 2 of the Course of Theoretical Physics.