Computation and Complexity

Lakukan tugas rumah & ujian kamu dengan baik sekarang menggunakan Quizwiz!

What are recursive languages

- A language for which a turing machine, given an input statement is always capable of saying yes or no in finite time, they are decidable and recognisable - An algorithm exists for these languages

How do you solve the reachability problem

- Any path within the graph that is longer than the number of vertices means there is a cycle in the path - A non-cyclic path must be shorter than the number of vertices and won't traverse 1 vertex twice - The machine guesses which vertex to traverse next, the machine also checks how many vertices have been traversed, if it becomes equal to the number of vertices we discard this path

How do you prove that if a language L is recursive its compliment is as well

- Create a Machine M1 that contains the machine for language L - All accepting states in machine ML are made un-accepting in M1 - Introduce a new accepting state r in M1 - For all combinationis (Q,S) for which there is no transition in ML, we put in M1 a transition to r - The result is a machine that accepts any string that ML would've rejected and rejects any string that ML would've accepted

What 3 elements make up each instantaneous description and how are they written

- Current state - Current head position - Current input symbol The current state label moves along the input showing where the head is located on the input tape

When does a non deterministic turing machine accept an input

- If there is at least 1 way of processing the input in the machine that halts in an accepting state - Vice versa, if there is no way of processing the input that halts in an accepting state, then the input is not accepted

How would you represent a Turing machine with multiple tracks with a Turing machine with memory in a state

- Putting characters that are on multiple tracks next to each other on a single track. You then move between all those characters, storing them in memory. Then you can make a decision and move one. - You could also encode all possible pairs/tuples of symbols as a more complex language, which we could interpret on a single track machine

How would you encode a transition function of a TM in a binary string

- Start encoding with 1 - Use a 1 to separate each step of the encoding - You need to encode the current state and input, then the new state, output and direction - Each rule is separate by two ones

What are recursively enumerable languages

- The set of languages that can be recognised by a Turing machine. - A TM will stop to say yes and accept the input, however there is no guarantee that it will stop in finite time to say no and reject the input - Therefore these languages can be recognised but not decided

Prove the existence of undecidable problems

- We can write a number of algorithms equal to the set of natural numbers - Because machines are enumerable that means that 1 number can be associated with 1 natural number - so they are the same size - Languages/Problems can be represented as a characteristic vector. There are 2^(set of natural numbers) possible characteristic vectors - as there are 2 choices for each character in the vector and the size of the string can be up to the size of the set of natural numbers. Therefore there are 2^(set of natural numbers) problems. Which can be proved to be the size of the set of real numbers - Therefore there are more problems that algorithms so there will always be decidable problems

Why is reachability an NLSpace problem

- We only need to store the current number of vertices and won't traverse 1 vertex twice (no need to store the path as if the current vertices becomes equal to the destination at any time we return true, the problem only requires us to know if a path is possible, not what the path is)

How can you convert a non deterministic TM to a deterministic TM

- We use 2 tapes - Copy the instantaneous description at the current state onto the second tape. If the current state is accepting you accept. If not then you add the instantaneous description of each possible next state transition from the current state onto tape 1. You then delete the current state from tape 2 and move the mark on tape 1 forwards to be just before the next state - This is essentially carrying out a breadth first search of all possible ways of traversing the non deterministic TM tree.

How can a multi-tape machine be represented by a multi-track machine

- You can do this by having a multi-track machine that has double the amount of tracks as you had tapes on your multi-tape machine - 2 tracks are needed for each tape as one track is used to keep track of where the head of that tape on the multi-tape machine would have been.

What is a Turing Machine with multiple tracks

A Turing machine where the tape has multiple columns in it

What is NP-Hardness

A language L is NP-Hard if for all languages L1 in NP there exists a polynomial reduction from L1 to L

What is a Co-NP problem

A language L is in Co-NP if L is the complement of a language in NP

How can we define NP languages using a binary relation

A language is in NP if a relation as such can be defined

What is the worst case performance scenario for when a multi-track machine performs 1 step.

A multi-track machine may have to perform 4m+2k steps. M is the maximum distance from the middle of the tape to the end. k is the total number of marks found on the tapes (the X marks used to mark the position of simulated heads). This is because if the machine has to move all the way from one end of the tape to the other and back again this takes 4m steps. Then if the mark has to be moved in the opposite direction to where it is travelling next it will move backwards then forwards, taking 2 moves. This may have to occur for each mark, so 2k.

How do we prove NP-Hardness

A problem L is NP-Hard, if there exists an NP-Complete problem L1 such that L1 polynomially reduces to L. This works as if every NP-Complete can be reduced to L1 (given it is NP-Complete) then showing that L1 can be reduced to L shows that L is at least as hard as all NP problems so is NP-Hard

Why is QBF Pspace complete

A recursive procedure can solve it which will try all required combinations, a polynomial number of recursive calls is required that can be store in a polynomial space.

What is the independent set problem

A set of vertices on a graph that aren't connected by any edge is an independent set

What is the Kernel problem

A set of vertices such that no vertices are adjacent. But all other vertices in the graph are adjacent to at least one vertex in the kernel

Compare a Turing machine to a Deterministic finite state automata

A turing machine is capable of moving forwards and backwards along the string. Unlike a deterministic finite state automate which can only move forwards A Turing Machine has memory in the form of its tape. Which a DFA does not

What is Logspace

All problems solvable in logarithmic space

What is the class PSpace

All problems that can be solved using a deterministic TM with a worktape of polynomial size.

What is the meaning of the most common characters used in turing machine transition graphs

Alpha is commonly used to represent any character (althrough you should define which characeters at the start of the graph e.g. alpha = {a,b,c,d}) a b with a slash through it is the blank character

What is Complexity

Among solvable problems, which problems are easy and which are hard to solve. How much time and space is needed to solve them

Show that NP is a subset of Pspace, do we know if there are equal

An ND TM takes a maximum of polynomial time. We can simulate one attempt on the non-det machine in polynomial space, if it doesn't work we can try again using the same space. Therefore NP is in Pspace. We don't know if these classes are equal

What are undecidable languages

Any languages that aren't recursive

What is the time complexity of the simulation of a multi-tape machine on a multi-track machine and how is it calculated

By showing that the complexity calculated be each successive function is greater than the previous, we can state that the time complexity is at maximum the complexity of the final function, O(N^2) - polynomial

What is the vertex cover problem

C is a vertex cover of a graph g if for all edges of the graph, one end of each edge is in the set C

What is the universal language

Each pair is M, a string encoding of a TM and a string w which a machine accepts. A machine for this language would be able to say whether or not a machine would accept a given string.

How would you prove that a language cannot be decided by a TM

Enumerate every possible TM and show that none of them accept the given language

How do you check if properties are non trivial

Essentially, in order to check if a property is trivial, just check if there is a TM that satisfies it and if there is a TM that does not satisfy it. If both kinds exist, then the property is nontrivial.

What are the consequences of P=NP

Every NP problem would be solvable by means of a polynomial time algorithm. Since finding the factors of a composite integer is NP, this means that currently secure cryptographic algorithms, which depend for their security on the impossibility of factoring large integers quickly, would become insecure. In general, in order to be able to find solutions effectively, it would be sufficient to be able to verify solutions efficiently (since this makes the problem NP and therefore P)

What is the Church-Turing thesis and has it been proved

Everything that can be computed can be computed by a Turing machine. It hasn't been proven

Give a Pspace complete problem that can be throught of as an instance of QBF

Generalised versions of games such as checkers where the board can be any size. Given that my opponent does any move, does an exist a move that allows me to win, this could be represented as a QBF instance

What is a polynomial reduction

Given 2 languages L1,L2 there is a polynomial reduction from L1 to L2 denoted by L1 ≤ L2, if there exists a function f() computable in polynomial time such that

What is the decision problem of an independent

Given a graph and a number k, is it true that a graph has an independent set of size at least k

What is the Halting Problem

Given a program and an input <P,I>. Is it true or not that this program P stops when given the input I. A program halts or stops when it enters a state where there is no move in that situation

What is the reachability problem

Given a source s and a destination vector t, determine whether a path between the 2 vectors exist

What is the design philosophy of ND TMs

Guess and Check. We guess a potential solution and then check if it is correct. If there is a guess that will fit the requirements then the machine will non deterministically choose that path and accept the input

Why are recursive languages called recursive languages

Historically a recursive algorithm was required to decide a language, if a recursive algorithm couldn't be found then they couldn't be decided

How do you prove that the diagonalisation language is undecidable

If there exists a Turing machine to decide Ld then the characteristic vector of the reversed diagonal would be found as a row in the table comparing all languages to all strings. However this is impossible because for every row of the table the ith character will be the opposite of the one found in the table, as Ld is the REVERSED diagonal.

What is the diagonalisation language

If we take the diagonal of the table comparing all languages to all strings and reverse it this can be interpreted as the characteristic vector of the language Ld.

How do you find the space used by a Turing machine in a calculation

In a Turing machine, the amount of cell used on the worktape is equal to the amount of space used

What is a complexity class

It is a set of languages

What is a binary relation

It is a set of pairs of strings

What is an instantaneous description

It is a way of representing the steps that a Turing machine would take when processing a specific input.

What is the complexity class of the simulation of a non det TM on a det TM

It is exponential, whereas the non det TM itself carries out the computation in polynomial time

What is the consensus on P=NP

It is generally believed that problems exist only in NP and not in P, however we cannot prove this

Is Ld's compliment in RE, and why

It is in RE. As you can simulate its computation using the universal machine which would answer yes in final time.

Is Lu's compliment in RE, and why not

It is not in RE. Given Lu is in RE, if both were in RE then the language would be recursive, as you could combine the 2 machines to get a yes or no answer in final time.

Is the halting problem comutable

It is not. We're unable to write an algorithm capable of checking whether a program will halt when given a specific input

What the QBF, quantified boolean formula problem

It is the Sat problem but with parameters placed onto finding satisfying assignments. e.g. the second instance in the example asks, regardless of what variable x is, y and z can be assigned in such a way to satify the formula

What is the compliment of a language

It is the inverse of a language, every sting accepted be the original language will be rejected by the compliment and vice versa

What does M |= w mean

It means that a machine accepts a string w

What is the benefit of encoding TM's as binary strings

It means that we're able to enumerate every possible machine be enumerating binary numbers

How would you define the halting problem as a language

LH : {<P,I>} P is a program where I is an input that causes the program to halt

Is Lu in RE

Lu is in RE, it is able to answer yes in final time

How can we characterize NP problems

NP problems can be solved using a guess + check method where the check can be carried out in linear time. All NP problems have a certification (correct solution) instance of the problem if their solvable. This certificate is concise and polynomially verifiable

What are the consequences of P != NP

No NP-complete problem would be solvable by means of a polynomial time algorithm. Currently secure cryptographic algorithms may remain secure (N.B integer factorisation is not currently known to be NP-complete, so this is not certain) Research effort should be devoted to looking for efficient algorithms which, while not guaranteed to deliver correct solutions in every case, are guaranteed either to deliver approximately correct solutions or to deliver correct solutions with high probability.

Can we prove that Pspace and Ptime aren't equal

No, a machine that solves a problem that is in Pspace but not in Ptime has never been found

Is the diagonalisation language RE

No, it isn't RE as no TM can accept it.

What is the space complexity of the reachability problem

Non deterministic log space problem

How does the definition of a non-det turing machine differ from a det turing machine

Non-det machines have a transition relation rather than a transition function. The different definitions are shown below

What is NPSpace, how does it relate to Pspace

Non-deterministic polynomial space. Problems decided by ND TMs using polynomial space. Pspace is a subset of NPSpace as ND TMs can always be simulated by deterministic TMs

What is the time complexity upper bound

O(f(n)) if there exists an algorithm A solving P such that TA(n) is O(f(n))

What does the fact we can simulate non-det TMs as det TMs say about P=NP

Our simulation takes exponential time. so it doesn't prove that P=NP. However it doesn't prove the opposite as a different det TM could be used to solve the problem in polynomial time, it just shows that our simulation of a ND TM isn't good enough.

What are 3 conclusions about CO-NP problems and NP problems that are widely believed but we can't prove

P != NP, P = NP n CO-NP, NP = CO-NP

What is the relation between P, NP and Pspace

P is a subset of NP which is a subset of Pspace

What is Savitch's Theroem and what is the intuition behind it

PSpace = NPSpace. We can keep trying different branches of the ND TM reusing the same space each time. It can be shown that the simulation of an ND TM can be done in O(P(n)^2) space where the ND TM takes up O(p(N)) space

What are Pspace complete problems and give an example

Problems that are at least as difficult as all other Pspace problems. Quantified Boolean formula

What are search problems

Problems where you need to compute solution

What is the relationship between Pspace and Ptime

Ptime is a subset of Pspace. Because in Ptime it would be impossible if only a polynomial operations are carried out to use up more than polynomial amount of space

Why should reductions be polynomial

So that we can draw conclusions about the complexity of the problems. This is because given all NP problems are in theory solvable in polynomial time, an exponential reduction doesn't allow us to easily compare the complexity of problems

What are decision problems

Something where 2 solutions are possible - yes or no

What is the property of transitivity of polynomial reductions

Taking 3 languages, if there is a reduction from 1 to 2, and 2 to 3 then there exists a reduction from 1 to 3.

Explain how you would build the TM for the universal language

Tape1: The machine and input pairs, distinguish between them by placing 3 1s between them Tape2: The input encoded as a series of 1s and 0s Tape3: The current state of the machine, in state qi there are i 0s after the first 1 Tape4: Temporary tape used for copying and other operations If the head on tape 3 is pointing to an accepting state then the input is accepted

What is the Antivirus problem

The Antivirus (A) problem is defined as follows: give a Java function C, decide whether C is a virus or not. In order to decide whether a piece of code is a virus or not, we need to define what a virus is. For simplicity, we assume that a virus is a piece of code doing something "nasty". In this case, the nasty behaviour will be formatting the system hard-drive C:.

When is a language NP-complete

The language is in NP - membership condition L is NP-Hard - (Hardness condition)

Define the diagonalisation language using standard notation

The language that doesn't accept its own encoding as an input string. Given its own encoding can't be accepted by any TM

What is the running time of a non det TM

The maximum number of steps that could be carried out while processing an input - the deepest branch of the computational tree

What is the running time of a machine M over an input string W

The number of steps that M performs while processing w before m stops. If M doesn't stop on W, then the running time of M over W is infinite

What is the property about the hardness of the problems in a reduction

The problem that the initial one is reduced to must be at least as hard as the initial problem. Note that this is not a reversable property. ONLY THE FINAL PROPERTY IS AT LEAST AS HARD AS THE INITIAL. The problems are not as hard as each otherq

What is important about logspace problems

The problems that can be solved efficiently by parallel machines are contained within Logspace. A very small subset of problems.

When is a binary relation polynomially balanced

The second column is at most a polynomial of the length of the item in the first column

How do we normally represent languages succinctly

The standard representation is infinite, so we use the Turing machine that accepts them instead

What is the time complexity of a machine M

The time complexity of a machine M is a function Tm(n) that is the maximum running time of M over any input string of length n

What are the advantages of multi-tape Turing machines

They are faster than standard machines

Can non-det turing machines exist

They cannot physically exist, they are simply a mathematical model of computation used to determine the computability of problems

What features defines Co-NP Problems

They have concise certificates where we can answer no in polynomial time. Rather than NP problems where we can answer yes

What do curly braces notate on Turing machine transition graph

They represent moves that are a valid transition and are mutually exclusive

What are multi-tape Turing machines

They support multiple tapes each with heads that can move independently. Tapes cannot be added during operations, they must be defined at design time.

How do you notate the transition graph for a Turing machine that stores a value in its state

This machine stores a value alpha, and only allows self-transitions within q1 is the value in the input is not equal to alpha. Then when the input is blank a final transition to the accepting state is made

What is the relation between vertex cover and independent set

Vertices not in a vertex cover form an independent set, as in order for a vertex cover to be valid, 2 vertices outside of the cover cannot be connected, otherwise an edge would exist that isn't within the vertex cover.

How can we exploit the properties of compliment languages. When does this exploit not work giving an example.

We can make recursively enumerable languages recursive. The machines for the compliment and base language can see if a string is accepted in final time. If the compliment's machine accepts the string then we can say that it is not a member of the base language. The fact we can say this makes the language decidable so it is recursive. Given both languages are recursively enumerable this guarantees that one of the machines will terminate. If a language is RE, it is not guaranteed that its compliment will be in RE as well. So this may not work, as is the case for the language Ld, where it is not RE, but its compliment is RE

What is the relation between Logspace and Pspace. What is important about this relation

We can say that logspace is a strict subset of Pspace, meaning that they are not equal to each other. Every other relation to reach this conclusion is not strict, or can't be proved to be strict. at some point in the image this relation becomes strict, but that point is unknown.

When does a deterministic turing machine accept an input

When a symbol halts in an accepting state after consuming all the input symbols

How do you write the transition graph for a turing machine with multiple tracks

Where each term within a square bracket is one track on the tape.

What is Computability

Whether a problem can be solved by an algorithm in feasible time. This allows us to distinguish between solvable and unsolvable problems

How do you define a language

Within a set of {} you initially define the elements of the language, then after a | you set out the rules that govern the language

If a language is recursive is its compliment

Yes it is recursive

Can a machine with memory in state be rewritten to a standard machine

Yes, both have the same computational power

How do you prove a reduction, giving an example

You need to prove that it works in both directions. For 3-col to SAT you need to prove: 1. given a 3-col graph, the reduction produces a satisfiable formula 2. if a sat formula is produced, prove that this must have been derived from a 3-col graph

When is a binary relation polynomially decidable

a pair (x,y) can be determined whether it is in R in polynomial time using a determinstic Turing machine

What is a property

a set of languages e.g. languages that can be defined by turing machines with 8 states

Explain the function of /s and arrows in Turing machines transition graphs

a slash represents a replacement, an arrow represents the head of the machine moving in a direction along a tape

How many steps can a Pspace machine support

an exponential amount of steps

What is the decision version of the vertex cover problem

is it true that there is a vertex cover smaller than size for graph g

What is the P complexity class

is the complexity class of decision problems that can be solved by deterministic TM in polynomial time, with respect to the size of the input

What is the NP (non-deterministic polynomial) complexity class

is the complexity class of decision problems that can be solved by non-deterministic TM in polynomial time, with respect to the size of the input

What is the characterisation vector of a language

it is a binary vector which states which strings (from the enumerated list of all possible strings) are contained within a language, a character is 0 if the string is contained and 1 if it isn't. e.g. string 1 in the example is not contained

What is the NLSpace complexity class

non deterministic log space, all problems solvable by ND TMs in logarithmic space.

How would we represent all possible strings and TMs and compare them.

plot them on a table, with machines on one axis and strings on another. put 1 in a cell if a machine accepts a string and a 0 if it doesn't

What are the trivial properties of RE

the empty property containing no languages and the property containing all languages

What does L(M) means

the language accepted by a turing machine M

What is the meaning of w ɛ L(M) <-> M |= w

w is a member of the language accepted by turing machine M. If and only if w is accepted by the machine M

Given Rice's Theorem what properties are non trivial

where {0} is the empty language

Can you represent all decision problems as a language

yes

Write the formal definition of a Turing machine and its transition function

{R,L} represents right and left

What is the Library Problem

· An instance of the library problem is a set of people, a set of books, and a wishlist of books for each person and an integer k. An instance is positive if and only if there is a set of k people where all of their requests on their wishlists can be met without any clashes

Give the formal definition of reduction

· Given Two languages L1 and L2, we say that there is a reduction from L1 to L2 or equivalently we say that L1 reduces to L2, if there exists a computable function f such that: where computable means we could design a turing machine to compute it

What is the time complexity lower bound

Ω(f(n)) if given any algorithm to solve P, TA(n) is Ω(f(n))


Set pelajaran terkait

Film: Chapter 22, Alternatives to the Symphonic Score

View Set

Chapter 06: Values, Ethics, and Advocacy

View Set

The Top 100 Most Common US DMV Questions

View Set

Abbreviations for surgical procedures

View Set