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Added new section on automated theorem proving
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@ -3,7 +3,7 @@ Title: Research
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Description: A list of my research Projects
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---
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**[Quick List of Publications](publications)**
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**[Quick List of Publications](/publications)**
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**Broad Research Interests:** Automated Reasoning, Artificial Intelligence, Formal Methods
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@ -15,6 +15,7 @@ design and implement artificial intelligent agents using computational logic. I'
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- Reasoning about agents and their cognitive states
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- Automated planning under ethical constraints
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[Notes on Automated Theorem Proving](atp)
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## Symbolic Methods for Cryptography
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Working with [Dr. Andrew Marshall](https://www.marshallandrew.net/) and others in applying term reasoning within computational logic
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content/research/atp/_index.md
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content/research/atp/_index.md
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---
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title: Automated Theorem Proving
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description: Notes about Automated Theorem Proving
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---
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More links coming soonish:
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- [Definitional CNF](definitional-cnf)
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- [Davis Putnam](davis-putnam)
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content/research/atp/davis-putnam.md
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content/research/atp/davis-putnam.md
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---
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title: "Davis Putnam Satisfiability Algorithm"
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math: false
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---
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The Davis Putnam (DP) algorithm is the first resolution based algorithm
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created in 1960 that checks whether or not a given formula is satisfiable.
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That is, there exists an assignment of propositions that can make the formula true.
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They later made a refinement of this algorithm in 1962 called the "Davis Putnam Logemann
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Loveland" (DPLL). In fact, the refinement is so widely used that it is difficult to find a clear
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document describing the earlier edition.
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This page will attempt to describe the origial DP algorithm. To obtain the DPLL algorithm replace the
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resolution rule with the splitting rule.
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The core idea of the algorithm is to transform the formula to a simpler but equisatisfiable one.
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This algorithm takes a list of clauses, which is considered to be in CNF.
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For example for the following list of clauses: `[[a, b, c], [d, e]]`
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we get the following formula `(a + b + c)(d + e)`
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The algorithm has three rules associated with it:
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- [Unit Propagation](#unit-propagation)
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- [Affirmative-Negative](#affirmative-negative)
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- [DP Resolution](#dp-resolution)
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- [Conclusion](#conclusion)
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## Unit Propagation
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If there is a clause that only contains one literal `p` then:
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1. Remove clauses containing `p`
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2. Remove all instances of `Not(p)`
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```python
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def _unit_propagation(x: List[Clause]) -> List[Clause]:
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"""
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Applies unit propagation.
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If there is a clause with one literal p then
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(1) Remove clauses containing p
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(2) Remove all instances of Not(p)
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"""
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# Find all unit clauses
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single_literals = (c[0] for c in x if len(c) == 1)
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# Only focus on one this rule application as
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# [[p], [Not(p)]] is an edge case
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single_literal = next(single_literals, None)
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# If there are no unit clauses, move onto the next rule.
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if single_literal is None:
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return x
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# (1) Remove clauses containing the unit clause
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new_x = [c for c in x if all((l != single_literal for l in c))]
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# (2) Remove all instances of Not(p)
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negated_single_literal = negate(single_literal)
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new_x = [[l for l in c if l != negated_single_literal] for c in new_x]
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return new_x
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```
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## Affirmative-Negative
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Remove clauses that contains literals that only occur positively in the list of clauses or negatively.
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```python
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def _affirmative_negative(x: List[Clause]) -> List[Clause]:
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"""
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Remove clauses containing a literal
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that only occurs positively or negatively
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"""
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literal_counts = _literal_counts(x)
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positive_literals, negative_literals = _pos_neg_lits(literal_counts)
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# Collect literals that are strictly positive or negative
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# but not both
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strict_literals = positive_literals ^ negative_literals
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# Only consider one strict literal
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strict_literal = next(iter(strict_literals), None)
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# If there are no strict literals,
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# move on to the next rule
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if strict_literal is None:
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return x
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# Remove clauses that contain the strict literal
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return [c for c in x
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if all(
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(l != strict_literal and negate(l) != strict_literal
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for l in c)
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)]
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```
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## DP Resolution
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- Find a literal `p` that occurs both positively and negatively in the list of clauses.
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- As a heuristic, choosing a `p` that is the least common to minimize the state size.
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- Create a list `C` containing clauses where `p` occurs positively; removing `p` from each clause.
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- Create a list `D` containing clauses where `p` occurs negatively; removing `Not(p)` from each clause.
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- Create a list `X` that contains clauses that do not contain `p` or `Not(p)` in them.
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- Return `X + C + D` as the new list of clauses.
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```python
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def _dp_resolution(x: List[Clause]) -> List[Clause]:
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"""
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Take a literal that occurs positvely and negatively
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and combine clauses that occur positively and
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negatively with p.
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"""
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# Find literals that occur both positively and negatively
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literal_counts = _literal_counts(x)
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positive_literals, negative_literals = _pos_neg_lits(literal_counts)
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polar_literals = positive_literals & negative_literals
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# If there are no such literals, then move
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# onto the next rule.
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if len(polar_literals) == 0:
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return x
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# Count the number of occurances of each of the polar
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# literals and choose the least common literal p as
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# a heuristic.
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polar_literal_counts = dict(filter(lambda y: y[0] in polar_literals, literal_counts.items()))
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p, _ = min(polar_literal_counts.items(), key=itemgetter(1))
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# Create a list C containing clauses where p occurs
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# positively; removing p from the clause
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C = [[l for l in c if l != p] for c in x if p in c]
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# Create a list D containing clauses where p occurs
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# negatively; removing Not(p) from the clause
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D = [[l for l in c if l != negate(p)] for c in x if negate(p) in c]
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# Combine C and D
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new_x: List[Clause] = []
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for ci in C:
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for di in D:
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# Or(ci, di) removing duplicate literals
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cdi = list(set(ci + di))
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# No point in adding a clause that already exists.
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if cdi not in new_x:
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new_x.append(cdi)
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# Clauses that don't contain p or not p in it
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x0 = [c for c in x if p not in c and negate(p) not in c]
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return new_x + x0
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```
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## Conclusion
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The complete DP algorithm is a recursive one with two base cases:
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- If the length of the list of clauses is zero, then it is satisfiable
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- If `[]` is in the list of clauses, then it is not satisfiable.
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Then it applies the first rule that matches out of the three:
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- [Unit Propagation](#unit-propagation)
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- [Affirmative-Negative](#affirmative-negative)
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- [DP Resolution](#dp-resolution)
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```python
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def davis_putnam(x: List[Clause]) -> bool:s
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"""
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Davis-Putnam procedure for deciding
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satisfiability from CNF clauses.
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This is called recursively and it applies
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the first rule that matches: Unit Propagation,
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Affirmative-Negative, Resolution.
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"""
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# Base Cases
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if len(x) == 0:
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return True
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if [] in x:
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return False
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# (1) Unit Propagation
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x_new = _unit_propagation(x)
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if x_new != x:
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return davis_putnam(x_new)
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# (2) Affirmative-Negative
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x_new = _affirmative_negative(x)
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if x_new != x:
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return davis_putnam(x_new)
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# (3) DP Resolution
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x_new = _dp_resolution(x)
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return davis_putnam(x_new)
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```
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content/research/atp/definitional-cnf.md
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---
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title: "Definitional CNF"
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math: true
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---
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Satisfiability algorithms have been optimized to accept formulas in Conjunctive Normal Form (CNF).
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One issue is that depending on the algorithm used to convert the formula, it can take either exponential
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time or space. To get around this we will use an algorithm to produce an equisatisfiable algorithm albeit
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non-equivalent. This will create a linear increase in the size of the formula, however, it also only
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takes linear time to compute.
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Procedure:
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1. First convert the formula to Negation Normal Form (NNF). This is done by making it so that negations are only applied to propositions and there is no implication or bi-implication symbols in the formula.
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2. Starting from the inner-most part of the expression to the outermost, define a new variable that describes the connective and add that definition to the expression.
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Consider the expression $b + ac$. Then,
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$$
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\begin{align*}
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\text{Define } x \iff ac \\\\
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(b + x) * (x \iff ac) \\\\
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\text{Define } y \iff b + x \\\\
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y * (x \iff ac) * (y \iff b + x)
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\end{align*}
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$$
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3. Finally, convert the bi-implifications using the following tautologies:
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$$
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\begin{align*}
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x \iff (y * z) &\equiv (-x + y) (-x + z)(x+-y+-z) \\\\
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x \iff (y + z) &\equiv (-x + y + z)(x + -y)(x + -z)
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\end{align*}
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$$
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Extending the example,
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$$
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y(-x + a)(-x + c)(x + -a + -c)(y \iff b + x) \\\\
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y(-x + a)(-x + c)(x + -a + -c)(-y + b + x)(y + -b)(y + -x)
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$$
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