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EE4271 VLSI Design Logic Synthesis EE 4271 VLSI Design
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Logic Synthesis Starts from RTL description in HDL or Boolean expressions Outputs a standard cell netlist EE 4271 VLSI Design
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Boolean Function f: Bm Yn
B = {‘0’, ‘1’}, Y = {‘0’, ‘1’, ‘-’} The function is incompletely specified, don’t care ‘-’ For each output, space of Bm can be partitioned into on-set: all inputs leading to output ‘1’ off-set: all inputs leading to output ‘0’ dc-set: all inputs leading to output ‘-’ EE 4271 VLSI Design
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Points in Input Space Assigning ‘1’ or ‘0’ to each of the m Boolean variables x1, x2, …, xm specifies a point in input space Bm Example (‘1’, ‘0’, ‘1’) in B3 x1=‘1’ Λ x2=‘0’ Λ x3=‘1’ x1•x2•x3 EE 4271 VLSI Design
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Terminology Literal: a Boolean variable or its complement
Minterm: a product of all input variables or their complements – a point in Bm Cube: a product of input variables or their complements The fewer number of variables, the bigger space covered EE 4271 VLSI Design
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Boolean Function Representation
A Boolean function can be specified by a sum of minterms The expression has a minterm for each point in the on-set EE 4271 VLSI Design
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Implicant and Cover An implicant is a cube whose points are either in the on-set or the dc-set A prime implicant is an implicant that is not included in any other implicant A set of prime implicants that together cover all points in the on-set (and some or all points of the dc-set) is called a prime cover EE 4271 VLSI Design
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Irredundant Cover An prime cover is irredundant when none of its prime implicants can be removed from the cover An irredundant prime cover is minimal when the cover has the minimal number of prime implicants EE 4271 VLSI Design
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Goal of Logic Synthesis
Find a minimum irredundant prime cover An irredundant prime cover is not necessarily a minimum EE 4271 VLSI Design
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Quine-McCluskey Algorithm
Calculate all prime implicants of the union of the on-set and dc-set, omitting prime implicants that only cover points of dc-set Finds the minimum cost cover of all minterms in the on-set by the obtained prime implicants EE 4271 VLSI Design
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Set Covering Problem Given a universe U={e1, …, en}, a collection of subsets {S1, …, Sm} where each subset contains some elements in universe cost wi is associated with each subset Si find a subcollection C (cover) such that C covers the entire universe Famous NP-complete problem On-set U, a prime implicant an S EE 4271 VLSI Design
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Example of Set Cover U={1,2,3,4} S1={1,2}, w=2 S2={1,3,4}, w=3
C={S3,S6} is the optimal solution S3 is redundant in C={S1,S2,S3} , and C={S1,S2} is not optimal EE 4271 VLSI Design
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Greedy Algorithm C = empty [the cover]
E= empty [record elements which have been covered] While there is uncovered element Find the subset Si which is most cost effective, that is, the Si with smallest w(Si)/|Si-E|. [weight of subset over the elements in the subset but not covered so far] For each e in Si-E, set price(e)=w(Si)/|Si-E| Put all e in Si to E Put Si in the current partial cover C EE 4271 VLSI Design
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Running Example (Iter 1)
S1={1,2}, w=10 S2={1,3,4}, w=9 S3={3}, w=7 S4={2,4}, w=4 S5={2,3}, w=2 Iteration 1, E = empty w(S1)/|S1-E|=10/2=5 w(S2)/|S2-E|=9/3=3 w(S3)/|S3-E|=7/1=7 w(S4)/|S4-E|=4/2=2 w(S5)/|S5-E|=2/2=1 Pick S5 E = {2,3} C = {S5} EE 4271 VLSI Design
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Running Example (Iter 2)
S1={1,2}, w=10 S2={1,3,4}, w=9 S3={3}, w=7 S4={2,4}, w=4 S5={2,3}, w=2 Iteration 2, E={2,3}, C = {S5} w(S1)/|S1-E|=10/1=10 w(S2)/|S2-E|=9/2=4.5 w(S3)/|S3-E|=7/0=+infty w(S4)/|S4-E|=4/1=4 Pick S4 E = {2,3,4} C = {S5,S4} EE 4271 VLSI Design
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Running Example (Iter 3)
S1={1,2}, w=10 S2={1,3,4}, w=9 S3={3}, w=7 S4={2,4}, w=4 S5={2,3}, w=2 Iteration 3, E={2,3,4}, C={S5,S4} w(S1)/|S1-E|=10/1=10 w(S2)/|S2-E|=9/1=9 w(S3)/|S3-E|=7/0=+infty Pick S2 E = {2,3,4,1} C = {S5,S4,S2} EE 4271 VLSI Design
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The Other Example n elements and a collection of m=n+1 subsets
U={1,2,…n} S1={1}, w(S1)=1/n S2={2}, w(S2)=1/(n-1) S3={3}, w(S3)=1/(n-2) … Sn={n}, w(Sn)=1 Sn+1={1,2,…,n}, w(Sn+1)=1.0001 Our solution {S1,S2,…,Sn}, weight = ln n Optimal solution {Sn+1}, weight = EE 4271 VLSI Design
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Summary Logic synthesis Primary implicant
Minimum cost irredundant prime cover Set Cover Greedy Algorithm EE 4271 VLSI Design 18
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