Com S 228 Project 3: Prime Factor List solution

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1. Prime Factorization

A prime number is an integer greater than one and is divisible by one and itself only. The sequence of prime numbers starts with 2, 3, 5, 7, 11, 13, 17, 19, … You may check out the first 1,000 primes at the following site: https://en.wikipedia.org/wiki/List_of_prime_numbers#The_first_500_prime_numbers There are infinitely many primes. As of January 2019, the largest known prime is 2 82,589,933 – 1, which has 24,862,048 digits. An integer greater than one and divisible by a third natural number besides 1 and itself is called a composite number.

For example, 4 is a composite number because it is also divisible by 2 in addition to 1 and itself. The sequence of composite numbers starts with 4, 6, 8, 9, 10, 12, 14, 15, 16, 18, … By definition, 1 is neither a prime number nor a composite number. The Fundamental Theorem of Arithmetic states that every integer greater than one is either a prime or a product of primes. For example, the number 25480 is a product of 2, 2, 2, 5, 7, 7, 13, all prime numbers. In other words, it is factored as 25480 = 2 3 ∙ 5 ∙ 7 2 ∙ 13 In the above factorization, the prime 2 appears three times as a factor. It is said to have multiplicity 3. The prime factors 5, 7, and 13 have multiplicities 1, 2, 1, respectively.

Generally speaking, any integer 𝑛 ≥ 2 can be written as a product of powers of its prime factors. More specifically, it has the form 𝑛 = 𝑝1 𝛼1𝑝2 𝛼2 ∙∙∙ 𝑝𝑘 𝛼𝑘 where 𝑝1, 𝑝2, … , 𝑝𝑘 with 𝑝1 < 𝑝2 < ⋯ < 𝑝𝑘 are the prime factors, and 𝛼1, 𝛼2, … , 𝛼𝑘 > 0 are their respective multiplicities. The process of writing 𝑛 into the above product form is called prime factorization.

1.1 Factorization and Encryption

Prime factorization is a very difficult problem. In 2009, several researchers successfully concluded two years of effort to factor the following 232-digit number (named RSA-768) via the use of hundreds of machines: 123018668453011775513049495838496272077285356959533479219732245215172640050726 365751874520219978646938995647494277406384592519255732630345373154826850791702 6122142913461670429214311602221240479274737794080665351419597459856902143413 = 334780716989568987860441698482126908177047949837137685689124313889828837938780 02287614711652531743087737814467999489 × 367460436667995904282446337996279526322791581643430876426760322838157396665112 79233373417143396810270092798736308917

The CPU time spent on finding the two factors amounted to the equivalent of 75 years of work for a single 2.2 GHz Opteron-based computer. No efficient prime factorization algorithm for large numbers is known. More specifically, no algorithm is known to factor all integers in polynomial time, i.e., to factor 𝑏-bit numbers in time 𝑂(𝑏𝑘) for some constant 𝑘. The presumed difficulty of prime factorization lies at the foundation of cryptography algorithms such as RSA. A message receiver may publish a key — a large integer, referred to as the public key, while keeping another paired key, referred to as the private key, to his/her own knowledge.

Messages sent to the receiver are encrypted using the public key, but are impossible to decrypt without the knowledge of the private key. The decryption process comes down to prime factorization of very large numbers — even larger than RSA-768, a process without knowing the private key would be intractable given today’s computational power.

1.2 Direct Search Factorization

In this project we will use a brute force strategy named the direct search factorization. It is based on the observation that a number 𝑛, if composite, must have a prime factor less than or equal to √𝑛. Clearly, the number cannot have more than one prime factor greater than √𝑛. This method initializes 𝑚 ← 𝑛 and systematically tests divisors 𝑑 from 2 up to ⌊√𝑛⌋, where the floor operator ⌊ ⌋ gives the largest integer less than or equal to the operand √𝑛 . In your implementation, test the condition 𝑑 ∙ 𝑑 ≤ 𝑛 instead of 𝑑 ≤ √𝑛 for efficiency. If 𝑑 divides 𝑚, then set 𝑚 ← 𝑚/𝑑, and repeat so with the divisor 𝑑 until it no longer divides 𝑚. Then set 𝑑 ← 𝑑 + 1 to continue the testing until 𝑑 ∙ 𝑑 > 𝑚. For example, to factorize 25480. We try to divide the number by 2. Since 2 is a divisor, we record it and divide 25480 by 2 to obtain 12740.

We find that the number 12740 can be divided by 2 two more times. The original number thus contains the prime factor 2 with multiplicity 3. Now we work on 25480 / 8 = 3185. The next number to test is 3, which does not divide 3185. Neither does 4. The number 5 divides 3185 only one time, yielding the quotient 637. Moving on, 6 does not divide 637. We find that 7 divides 637 twice to yield 13.

The algorithm terminates since 8 ∙ 8 > 13. You can cut down the number of test candidates by half easily, by ignoring all the even numbers greater than 2 (because they are apparently not prime).

2. List Structure

The class PrimeFactorization houses a doubly-linked list structure to store the prime factors of a number. Every node on the list stores a distinct prime factor and its multiplicity, which are together packaged into an object of the PrimeFactor class as illustrated below. A node is implemented by the private class Node inside PrimeFactorization. The class Node also has two links previous and next to reference the preceding and succeeding nodes. private class Node { public PrimeFactor pFactor; public Node next; public Node previous; // constructors … } The node is illustrated below: For example, 25480 has the prime factor 2 with multiplicity

3. This leads to the creation of the following node:

In the linked list inside the class PrimeFactorization, the nodes are connected by the next link in the increasing order of prime factor. The list also has two dummy nodes: head and tail. The factorization of 25480 is represented by the list below with six nodes, four of which represent its prime factors 2, 5, 7, 13 with multiplicities 3, 1, 2, 1, respectively. The class PrimeFactorization also stores the factored number in the instance variable value of the long integer type (64-bit). If this number exceeds the maximum 2 63 − 1 representable by the type long, value is set to be −1 (defined to be a constant OVERFLOW in the template code). For this reason, we refer to the represented integer by this object to make a distinction from value.

The two integers are equal when value != -1. This class has four constructors: public PrimeFactorization() public PrimeFactorization(long n) throws IllegalArgumentException public PrimeFactorization(PrimeFactorization pf) public PrimeFactorization(PrimeFactor[] pfList) a) The first constructor is a default one that constructs an empty list to represent the number 1. b) The second constructor performs the direct search factorization described in Section 1.2 on the integer parameter n. An exception will be thrown if n is less than 1. c) The third one is a copy constructor which assumes that the argument object pf stores a correct prime factorization. d) The fourth one constructs over an array of PrimeFactor objects. This is especially useful for the case of an overflowing number.

3. Arithmetics

The list structure of this PrimeFactorization object needs to be updated when its represented integer is multiplied with or divided by another integer, either of type long or represented by another PrimeFactorization object. After every arithmetic operation, the nodes in the linked list must remain in the increasing order of the prime factors they store.

3.1 Multiplication

There are three methods to carry out multiplication, accepting a long integer, a PrimeFactorization object, and two such objects, respectively. The linked list of this PrimeFactorization object, will be updated. public void multiply(long n) throws IllegalArgumentException public void multiply(PrimeFactorization pf) public static PrimeFactorization multiply (PrimeFactorization pf1, PrimeFactorization pf2) The first method can be implemented via a traversal of the linked list referenced by head using an iterator (which is an object of the private class PrimeFactorizationIterator) as follows. Factor n using the direct search described in Section

1.2. For each prime factor found (with a multiplicity), move the iterator forward from its current position to the first node storing an equal or a larger prime. In the first case, increment the multiplicity field of that node. In the second case, create a new node for this factor and add it to the linked list before the larger prime. If the cursor reaches the end of the list, simply add the new node as the last node. The second method updates the linked list by traversing it and the linked list of the argument object pf simultaneously.

Essentially, it merges a copy of the second list into the first list by doing the following on the first list: a) Copy over the nodes from the second list for prime factors that do not appear in the first list. b) For each prime factor shared with the second list, increment the multiplicity field of the PrimeFactor object stored at the corresponding node in the first list. The implementation requires the use of two iterators, one for each list, and works in a way similar to merging two sorted arrays into one. For example, suppose a PrimeFactorization object for 25480 (with the linked list shown in Section 2) calls multiply() on another object storing the factorization of 405 shown below: After the call, the first linked list will become A new node (drawn in red) has been added, and the PrimeFactor object stored at an existing node has its multiplicity field updated from 1 to 2 (shown in red).

The first two multiply() methods also call Math.multiplyExact() to carry out multiplication of this.value, if not −1, with n or pf.value. An ArithmeticException will be thrown if an overflow happens. In this case, set the value field to −1. Otherwise, store the product in value. Note that this.value == – 1 only means that the number represented by the linked list cannot be represented in Java as a long integer. We can still perform arithmetic operations on the large number by this PrimeFactorization object. The third multiply() method is a static one that takes two PrimeFactorization objects, and returns a new object storing the product of the two numbers represented by the first two objects.

3.2 Division

The PrimeFactorization class provides three methods to perform division –- by an integer, by the integer encapsulated in another PrimeFactorization object, and of the first such object by a second object. It is updated to store the result. public boolean dividedBy(long n) public boolean dividedBy(PrimeFactorization pf) public static PrimeFactorization dividedBy (PrimeFactorization pf1, PrimeFactorization pf2) The first method immediately returns false if this.value != -1 and this.value < n. The second method immediately returns false in one of the following two situations: a) this.value != -1 and pf.value != -1 and this.value < pf.value b) this.value != -1 but pf.value == -1 If the dividend and the divisor have equal values, then remove all the nodes storing prime factors by calling the private method clearList().

In this case, set value to 1 and return true. The first dividedBy() method constructs a PrimeFactorization object for n, and then calls the second dividedBy() method with the constructed object as the argument. When the second divideBy() method is called to carry out the division, make a copy of the linked list of this object. Traverse the list copy and the list of the object pf using two separate iterators, say, iterCopy and iterPf, respectively. Advance iterCopy.cursor until iterCopy.cursor.pFactor.prime >= iterPf.cursor.pFactor.prime or (!iterCopy.cursor.hasNext() && iterPf.hasNext()). In the latter case, returns false immediately. In the former case, there are three possible situations: a) iterCopy.cursor.pFactor.prime > iterPf.cursor.pFactor.prime.

The number is not divisible by the number represented by pf. Return false immediately. b) iterCopy.cursor.pFactor.prime == iterPf.cursor.pFactor.prime but iterCopy.cursor.pFactor.multiplicity < iterPf.cursor.pFactor.multiplicity. The number is not divisible by the number represented by pf. Return false immediately. c) Otherwise, the following two conditions must hold: iterCopy.cursor.pFactor.prime = iterPf.cursor.pFactor.prime iterCopy.cursor.pFactor.multiplicity >= iterPf.cursor.pFactor.multiplicity Reset iterCopy.cursor.pFacor.multiplicity to the difference between itself and iterPf.cursor.pFactor.multiplicity. If the difference is zero, the node needs to be removed. Advance both iterators.

Repeat until either false is returned or iterPf.cursor == iterPf.tail eventually holds. If the latter happens, the integer of this object is divisible by that of pf. Set the copy list to be the linked list of this object by updating its head and tail. Also, update the object’s size and value fields accordingly. Return true after the updates. As an example, suppose the earlier PrimesFactors object representing 25480 calls divideBy(98). A PrimesFactors object for 98 is first constructed with a linked list illustrated below: Then, this temporary object is provided as the argument for a call to the second divideBy() method. The new linked list for the original object is shown below with the multiplicity of 2 decreased to 2 (colored red) and the node for the factor 7 deleted : In the case that this object represents a number that overflowed before the division, which is indicated by this.value == -1, the quotient to replace this number in the object may not overflow (i.e., less than or equal to 2 63 − 1). When that happens, the value field should store the quotient instead of −1. Checking can be done at the end of divideBy() using a method called updateValue(). Initialize a variable to have value 1. Keep multiplying it with the power of every prime factor (determined by its multiplicity) stored in the new linked list representing the quotient. Use Math.multiplyExact() to carry out the multiplications, which should stop as soon as the method throws an ArithmeticException.

The third dividedBy() method is a static one that takes two PrimeFactorization objects, and returns a new object storing the quotient of the first corresponding number divided by the second number, or null, if the first number is not divisible by the second one.

4. Greatest Common Divisor and Least Common Multiple

The class PrimeFactorization provides methods to compute the greatest common divisor and least common multiple of two positive numbers, and return the results as PrimeFactorization objects. The linked list in a returned PrimeFactorization object must have its nodes store prime factors in the increasing order.

4.1 The Euclidean Algorithm

A common divisor 𝑑 of two positive integers 𝑎 and 𝑏 is a positive integer that divides both 𝑎 and 𝑏. The greatest common divisor (GCD) of 𝑎 and 𝑏 is the biggest of all their common divisors. For example, 12 and 42 have four common divisors 1, 2, 3, 6. Their GCD is 6. The GCD of two numbers can be efficiently computed using the Euclidean algorithm, invented by the Greek mathematician Euclid in 300 B.C. Suppose we are to find the GCD of 184 and 69. Let us divide the bigger number by the smaller one, obtaining 184 = 2 ∙ 69 + 46. The remainder 46 is less than the divisor 69.

Any common divisor of 184 and 69 must also divide 46 = 184 − 2 ∙ 69. Therefore, the GCD of 184 and 69 is also the GCD of 69 and 46. Next, we divide 69 by 46, yielding 69 = 1 ∙ 46 + 23 The problem further boils down to finding the GCD of 46 and 23. One more round of division results in 46 = 2 ∙ 23 + 0 Since the remainder becomes 0, 23 divides 46. We have thus obtained the GCD: 𝐺𝐶𝐷(184, 69) = 𝐺𝐶𝐷(69, 46) = 𝐺𝐶𝐷(46, 23) = 23. Generally, suppose we want to find the GCD of two numbers 𝑎 and 𝑏. Let 𝑟0 = 𝑎 and 𝑟1 = 𝑏. The Euclidean algorithm carries out the following sequence of divisions: 𝑟0 = 𝑞1 ∙ 𝑟1 + 𝑟2 0 < 𝑟2 < 𝑟1 𝑟1 = 𝑞2 ∙ 𝑟2 + 𝑟3 0 < 𝑟3 < 𝑟2 𝑟2 = 𝑞3 ∙ 𝑟3 + 𝑟4 0 < 𝑟4 < 𝑟3 ⋮ 𝑟𝑘−1 = 𝑞𝑘 ∙ 𝑟𝑘 + 0 The dividend and divisor in a division were respectively the divisor and remainder in the previous division.

Since the remainder is always less than the divisor, it follows that 𝑟1 > 𝑟2 > ⋯ > 𝑟𝑘 > 𝑟𝑘+1 = 0 The algorithm will terminate because the remainder decreases by at least one after each division step. It holds that 𝐺𝐶𝐷(𝑟0, 𝑟1 ) = 𝐺𝐶𝐷(𝑟1, 𝑟2 ) = ⋯ = 𝐺𝐶𝐷(𝑟𝑘−1, 𝑟𝑘) = 𝑟𝑘. The following static method implements the Euclidean algorithm: public static long Euclidean(long m, long n) throws IllegalArgumentException The Euclidean() method must be used by the gcd() method below to compute the GCD of this.value and another number n when this.value != -1. public PrimeFactorization gcd(long n) throws IllegalArgumentException

4.2 Computing GCD from Prime Factorizations

If the second number is encapsulated in a PrimeFactorization object, the GCD computation is carried out as follows. a) Traverse the linked lists of the two objects to find the common prime factors of the two numbers. b) For every common prime factor 𝑝, create a new node to store 𝑝 and min(𝛼1, 𝛼2) , the minimum of the multiplicities 𝛼1 and 𝛼2 of 𝑝 stored in the two lists. c) Link all the new nodes together to construct a PrimeFactorization object to represent the GCD. The work can be done during one round of simultaneous traversals of the linked lists of both PrimeFactorization objects.

The above procedure is implemented by the method below: public PrimeFactorization gcd(PrimeFactorization pf) Even when one or both of the numbers cause overflows, their GCD may not. Thus, if this.value == -1 or pf.value == -1, call updateValue() to check if the GCD overflows, and set the value field of the generated PrimeFactorization object properly. When this.value ! = -1 and the second number for a GCD computation is provided as an integer, an alternative to calling the first gcd() method (described in Section 4.1) would be to construct a PrimeFactorization object pf over the second number, and call the second gcd() method above. However, it is more efficient to directly use the first gcd() method, even though it returns a PrimeFactorization object constructed through factoring the GCD.

This factorization is less expensive than factoring n, which has to be done to construct the object pf to call the second gcd() method with. The reason is that n could be significantly larger than the GCD. The third gcd method is static and takes two PrimeFactorization objects. public static PrimeFactorization gcd(PrimeFactorization pf1, PrimeFactorization pf2)

4.3 Least Common Multiple

A common multiple 𝑚 of two positive integers 𝑎 and 𝑏 is a positive integer that is divisible by both 𝑎 and 𝑏. The two numbers have infinitely many common multiples. The least common multiple (LCM) of 𝑎 and 𝑏 is the smallest of all their common multiples. For example, 12 and 42 have 84 as their least common multiple. Let us examine the prime factorizations of these two numbers: 12 = 2 2 ∙ 3 42 = 2 ∙ 3 ∙ 7 The LCM can be represented as 84 = 2 max(2,1) ∙ 3 max(1,1) ∙

7 We can generalize the above into a procedure for computing the LCM, to be implemented by the following method: public PrimeFactorization lcm(PrimeFactorization pf) The method computes the LCM and constructs a PrimeFactorization object representing it. If either this.value == -1 or pf.value == -1, that is, either of the two numbers overflows, the constructed object must have its value field set to −1. Otherwise, the lcm() method needs to call updateValue() to check the computed LCM for overflow and set the value field either to the LCM or −1. Traverse the two linked lists of this PrimeFactorization object and the object pf simultaneously with two cursors, comparing the prime factors housed by the two nodes at the cursor positions to decide which cursor to advance. (This is similar to merging two sorted arrays into one.) a) If the two prime factors are not equal, add a copy of the node storing the smaller prime to the list being constructed for the new PrimeFactorization object. Advance from this node in the corresponding original list. b) If the two prime factors are equal to, say, 𝑝, which has multiplicities 𝛼1 and 𝛼2 in the two nodes being compared, respectively, from the two lists. Generate a new node to store the information below and add it to the list under construction.

The algorithm terminates when one list is fully traversed. Then, simply copy the remaining nodes from the unfinished list onto the list under construction. You also need to implement a second version of lcm(), by simply calling the first version over a PrimeFactorization object constructed over the parameter n. public PrimeFactorization lcm(long n) throws IllegalArgumentException A third (and static) version of lcm() takes two PrimeFactorization objects as parameters and return a third object to store the result. public static PrimeFactorization lcm(PrimeFactorization pf1, PrimeFactorization pf2) 4. Iterators The iterator class PrimeFactorizationIterator implements ListIterator. Refer to the Javadocs of these methods, especially of add() and remove().

5. Submission

Write your classes in the edu.iastate.cs228.hw3 package. Turn in the zip file not your class files. Please follow the guideline posted under Documents & Links on Canvas. You are not required to submit any JUnit test cases. Nevertheless, you are encouraged to write JUnit tests for your code. Since these tests will not be submitted, feel free to share them with other students. Include the Javadoc tag @author in every class source file you have made changes to. Your zip file should be named Firstname_Lastname_HW3.zip.