Mutual assured destruction

Mutual assured destruction (MAD) is a doctrine of military strategy and national security policy which posits that a full-scale use of nuclear weapons by an attacker on a nuclear-armed defender with second-strike capabilities would result in the complete annihilation of both the attacker and the defender.[1] It is based on the theory of rational deterrence, which holds that the threat of using strong weapons against the enemy prevents the enemy's use of those same weapons. The strategy is a form of Nash equilibrium in which, once armed, neither side has any incentive to initiate a conflict or to disarm.

The result may be a nuclear peace, in which the presence of nuclear weapons decreases the risk of crisis escalation, since parties will seek to avoid situations that could lead to the use of nuclear weapons. Proponents of nuclear peace theory therefore believe that controlled nuclear proliferation may be beneficial for global stability. Critics argue that nuclear proliferation increases the chance of nuclear war through either deliberate or inadvertent use of nuclear weapons, as well as the likelihood of nuclear material falling into the hands of violent non-state actors.

The term "mutual assured destruction", commonly abbreviated "MAD", was coined by Donald Brennan, a strategist working in Herman Kahn's Hudson Institute in 1962.[2] Brennan conceived the acronym cynically, spelling out the English word "mad" to argue that holding weapons capable of destroying society was irrational.[3]

  1. ^ Mutual Assured Destruction Archived 2018-01-03 at the Wayback Machine; Col. Alan J. Parrington, USAF, Mutually Assured Destruction Revisited, Strategic Doctrine in Question Archived 2015-06-20 at the Wayback Machine, Airpower Journal, Winter 1997.
  2. ^ Daniel., Deudney (1983). Whole earth security : a geopolitics of peace. Washington: Worldwatch Institute. p. 80. ISBN 978-0-916468-54-5. OCLC 9833320.
  3. ^ Jervis, Robert (2002). "Mutual Assured Destruction". Foreign Policy (133): 40–42. doi:10.2307/3183553. ISSN 0015-7228. JSTOR 3183553.