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Assume an arbitrary r

T(n) <= cn + T(n/r) + T (3n/4)

show T(n) <= Dcn for some constant D

by reworking the induction proof, use the expression to argue that:

T(n) <= Dcn does not hold for r=3.

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Is this homework? –  adamk Jul 14 '10 at 7:38
    
its from text which i cant figure it out and i have a exam coming up so i need to understand this –  Nick Jul 14 '10 at 7:40
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So we should show that T(n) <= Dcn for arbitrary r but at the same time argue that T(n) <= Dcn does not hold for r=3 ? –  Peter van der Heijden Jul 14 '10 at 7:44
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The base cases are missing in the question - when does the recursion stop? I assume it may be T(1) = c. Further note that n must be divisible by r and 4 in every step - this constraints valid values for n quite a bit. –  Daniel Brückner Jul 14 '10 at 8:03
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@Nick - Shouldn't that be: Argue that: T(n) <= Dcn does not hold for D=3 ? –  Peter van der Heijden Jul 14 '10 at 8:32

1 Answer 1

Have a look at the Akra-Bazzi theorem. This is a generalization of the master theorem that does not require subproblems of equal size.

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but we havent taught that by Prof. yet –  Nick Jul 14 '10 at 7:51
    
Yep. That's it. The induction method and a few examples here: mpi-inf.mpg.de/~mehlhorn/DatAlg2008/NewMasterTheorem.pdf –  belisarius Jul 14 '10 at 14:43

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