Multi-wires Removal and Rectification Using Interpolant

1. Multi-wires Removal and Rectification Using Interpolant Speaker: Guo-JhuHunag Advisor: Chun-Yao Wang 2009/11/20

2. Outline • Problem Formulation • How Interpolant Construct Rectified Network for Single Wire

3. Problem Formulation • Given a circuit, we want to remove many wires simultaneously and rectify the functionality.

4. MA to Boolean manipulation wt wt s-a-1 fault The fault activation –fwt(X) is the set of minterms to cause the different value at f between good circuit and bad circuit The fault propagation –ODCwt(X) is the set of minterms to propagate the different value to PO

5. MA to Boolean manipulation wt wt s-a-1 fault MA(wt) = –fwt(X)  –ODCwt(X)

6. Rectified Network Using Two-way RAR method • Two-way(one-stage) RAR method • MA(wt) -> <g,v> • MA(gd) -> <g,-v>

7. wt gt gd gs MA(wt)= -fgt(X)-ODCgt(X) MA(gd)= fgd(X)-ODCgd(X) = fgt(X)-ODCgt(X)

8. Rectified Network Using Interpolant • Interpolant • MA(wt) -> <g,0> • MA(gd) -> <g,1> • -fgt(X)-ODCgt(X)  -g(X) • fgt(X)-ODCgt(X)  g(X) wt gt gd gs 

9. Example wt a g1 gd b c g4 a g3 d -g1(X)  -ODCg1(X) = { a’b’cx, a’b’cd’} g1(X)  -ODCg1(X) = { axcd’, a’bcx, xbcd’ } -g1(X) = -(a+b) ={ a’b’xx } g1(X) = (a+b) = { axxx, xbxx } -ODCg1(X) = { a’xcx, xxcd’ }

10. Example -g1(X)  -ODCg1(X) = { a’b’cx, a’b’cd’} -g(X) g1(X)  -ODCg1(X) = { axcd’, a’xcx, bxcd’ }  g(X) K-map of g(X)

11. Example a b a g1 gd b c g4 a g3 d a+b

12. IRRA Example a b a g1 gd b c g4 a g3 d