Master theorem: Difference between revisions

Revision as of 20:08, 25 September 2014

Let a ≥ 1 and b > 1 be constants, let f(n) be a function, and let T(n) be defined on the nonnegative integers by the recurrence

T(n) = aT(n/b) + f(n),

where we interpret n/b to mean either ⌊n/b⌋ or ⌈n/b⌉. Then T(n) can be bounded asymptotically as follows.

1. If f(n) = O(n^{logba - ε}) for some constant ε > 0, then T(n) = Θ(n^^log)

Revision as of 20:07, 25 September 2014 (view source) Lkw (talk \| contribs) (→‎MASTER THEOREM) ← Older edit		Revision as of 20:08, 25 September 2014 (view source) Lkw (talk \| contribs) (→‎MASTER THEOREM) Newer edit →
Line 6:		Line 6:
	where we interpret ''n''/''b'' to mean either &lfloor;''n''/''b''&rfloor; or &lceil;''n''/''b''&rceil;. Then ''T''(''n'') can be bounded asymptotically as follows.		where we interpret ''n''/''b'' to mean either &lfloor;''n''/''b''&rfloor; or &lceil;''n''/''b''&rceil;. Then ''T''(''n'') can be bounded asymptotically as follows.

	1. If ''f''(''n'') = ''O''(''n^(logba - ε)) for some constant ε > 0, then ''T''(''n'') = Θ(n^log)		1. If ''f''(''n'') = ''O''(''n<sup>logba - ε</sup>) for some constant ε > 0, then ''T''(''n'') = Θ(n^<sup>log</sup>)