# Turing machine equivalents

A Turing machine is a hypothetical computing device, first conceived by Alan Turing in 1936. Turing machines manipulate symbols on a potentially infinite strip of tape according to a finite table of rules, and they provide the theoretical underpinnings for the notion of a computer algorithm.

While none of the following models have been shown to have more power than the single-tape, one-way infinite, multi-symbol Turing-machine model, their authors defined and used them to investigate questions and solve problems more easily than they could have if they had stayed with Turing's a-machine model.

## Machines equivalent to the Turing machine model

Turing equivalence

Many machines that might be thought to have more computational capability than a simple universal Turing machine can be shown to have no more power.[1] They might compute faster, perhaps, or use less memory, or their instruction set might be smaller, but they cannot compute more powerfully (i.e. more mathematical functions). (The Church–Turing thesis hypothesizes this to be true: that anything that can be "computed" can be computed by some Turing machine.)

The sequential-machine models

All of the following are called "sequential machine models" to distinguish them from "parallel machine models".[2]

## Tape-based Turing machines

Turing's a-machine model

Turing's a-machine (as he called it) was left-ended, right-end-infinite. He provided symbols əə to mark the left end. A finite number of tape symbols were permitted. The instructions (if a universal machine), and the "input" and "out" were written only on "F-squares", and markers were to appear on "E-squares". In essence he divided his machine into two tapes that always moved together. The instructions appeared in a tabular form called "5-tuples" and were not executed sequentially.

### Single-tape machines with restricted symbols and/or restricted instructions

The following models are single tape Turing machines but restricted with (i) restricted tape symbols { mark, blank }, and/or (ii) sequential, computer-like instructions, and/or (iii) machine-actions fully atomised.

#### Post's "Formulation 1" model of computation

Emil Post in an independent description of a computational process, reduced the symbols allowed to the equivalent binary set of marks on the tape { "mark", "blank"=not_mark }. He changed the notion of "tape" from 1-way infinite to the right to an infinite set of rooms each with a sheet of paper in both directions. He atomised the Turing 5-tuples into 4-tuples—motion instructions separate from print/erase instructions. Although his 1936 model is ambiguous about this, Post's 1947 model did not require sequential instruction execution.

His extremely simple model can emulate any Turing machine, and although his 1936 Formulation 1 does not use the word "program" or "machine", it is effectively a formulation of a very primitive programmable computer and associated programming language, with the boxes acting as an unbounded bitstring memory, and the set of instructions constituting a program.

#### Wang machines

In an influential paper, Hao Wang reduced Post's "formulation 1" to machines that still use a two-way infinite binary tape, but whose instructions are simpler – being the "atomic" components of Post's instructions – and are by default executed sequentially (like a "computer program"). His stated principal purpose was to offer, as an alternative to Turing's theory, one that "is more economical in the basic operations". His results were "program formulations" of a variety of such machines, including the 5-instruction Wang W-machine with the instruction-set

{ SHIFT-LEFT, SHIFT-RIGHT, MARK-SQUARE, ERASE-SQUARE, JUMP-IF-SQUARE-MARKED-to xxx }

and his most-severely reduced 4-instruction Wang B-machine ("B" for "basic") with the instruction-set

{ SHIFT-LEFT, SHIFT-RIGHT, MARK-SQUARE, JUMP-IF-SQUARE-MARKED-to xxx }

which has not even an ERASE-SQUARE instruction.

Many authors later introduced variants of the machines discussed by Wang:

Minsky evolved Wang's notion with his version of the (multi-tape) "counter machine" model that allowed SHIFT-LEFT and SHIFT-RIGHT motion of the separate heads but no printing at all.[3] In this case the tapes would be left-ended, each end marked with a single "mark" to indicate the end. He was able to reduce this to a single tape, but at the expense of introducing multi-tape-square motion equivalent to multiplication and division rather than the much simpler { SHIFT-LEFT = DECREMENT, SHIFT-RIGHT = INCREMENT }.

Davis, adding an explicit HALT instruction to one of the machines discussed by Wang, used a model with the instruction-set

{ SHIFT-LEFT, SHIFT-RIGHT, ERASE, MARK, JUMP-IF-SQUARE-MARKED-to xxx, JUMP-to xxx, HALT }

and also considered versions with tape-alphabets of size larger than 2.

#### Böhm's theoretical machine language P"

In keeping with Wang's project to seek a Turing-equivalent theory "economical in the basic operations", and wishing to avoid unconditional jumps, a notable theoretical language is the 4-instruction language P" introduced by Corrado Böhm in 1964 – the first "GOTO-less" imperative "structured programming" language to be proved Turing-complete.

### Multi-tape Turing machines

In practical analysis, various types of multi-tape Turing machines are often used. Multi-tape machines are similar to single-tape machines, but there is some constant k number of independent tapes.

### Deterministic and non-deterministic Turing machines

If the action table has at most one entry for each combination of symbol and state then the machine is a "deterministic Turing machine" (DTM). If the action table contains multiple entries for a combination of symbol and state then the machine is a "non-deterministic Turing machine" (NDTM). The two are computationally equivalent, that is, it is possible to turn any NDTM into a DTM (and vice versa), although they usually have different runtimes. This can be proved via construction.

### Oblivious Turing machines

An oblivious Turing machine is a Turing machine where, for each input length, movement of the various heads is a fixed function of time, independent of the input. In other words, there is a predetermined sequence in which the various tapes are scanned, advanced, and written to. The actual values that are written to the tape at any step can still be different for each input of that length. Pippenger and Fischer showed that any computation that can be performed by a multi-tape Turing machine in n steps can be performed by an oblivious two-tape Turing machine in ${\displaystyle O(n\log n)}$  steps.[4].

Oblivious machines correspond in a step-wise linear fashion with combinational logic circuits, when the complexity of the transition table is taken as constant. It is thus possible to realize computations as circuit problems in size ${\displaystyle O(n\log n)}$  and depth ${\displaystyle O(n)}$  (see Circuit complexity). This improves upon the original ${\displaystyle O(n^{3})}$  result by Cook and Levin.

## Register machine models

Peter van Emde Boas includes all machines of this type in one class, "the register machine".[2] However, historically the literature has also called the most primitive member of this group i.e. "the counter machine" – "the register machine". And the most primitive embodiment of a "counter machine" is sometimes called the "Minsky machine".

### The "counter machine", also called a "register machine" model

The primitive model register machine is, in effect, a multitape 2-symbol Post–Turing machine with its behaviour restricted so its tapes act like simple "counters".

By the time of Melzak, Lambek, and Minsky the notion of a "computer program" produced a different type of simple machine with many left-ended tapes cut from a Post–Turing tape. In all cases the models permit only two tape symbols { mark, blank }.[3]

Some versions represent the positive integers as only a strings/stack of marks allowed in a "register" (i.e. left-ended tape), and a blank tape represented by the count "0". Minsky eliminated the PRINT instruction at the expense of providing his model with a mandatory single mark at the left-end of each tape.[3]

In this model the single-ended tapes-as-registers are thought of as "counters", their instructions restricted to only two (or three if the TEST/DECREMENT instruction is atomised). Two common instruction sets are the following:

(1): { INC ( r ), DEC ( r ), JZ ( r,z ) }, i.e.
{ INCrement contents of register #r; DECrement contents of register #r; IF contents of #r=Zero THEN Jump-to Instruction #z}
(2): { CLR ( r ); INC ( r ); JE ( ri, rj, z ) }, i.e.
{ CLeaR contents of register r; INCrement contents of r; compare contents of ri to rj and if Equal then Jump to instruction z}

Although his model is more complicated than this simple description, the Melzak "pebble" model extended this notion of "counter" to permit multi- pebble adds and subtracts.

### The random-access machine (RAM) model

Melzak recognised a couple serious defects in his register/counter-machine model:[5] (i) Without a form of indirect addressing he would not be able to "easily" show the model is Turing equivalent, (ii) The program and registers were in different "spaces", so self-modifying programs would not be easy. When Melzak added indirect addressing to his model he created a random access machine model.

(However, with Gödel numbering of the instructions Minsky offered a proof that with such numbering the general recursive functions were indeed possible; he offers proof that μ recursion is indeed possible[3]).

Unlike the RASP model, the RAM model does not allow the machine's actions to modify its instructions. Sometimes the model works only register-to-register with no accumulator, but most models seem to include an accumulator.

van Emde Boas divides the various RAM models into a number of sub-types:[2]

• SRAM, the "successor RAM" with only one arithmetic instruction, the successor (INCREMENT h). The others include "CLEAR h", and an IF equality-between-register THEN jump-to xxx.
• RAM: the standard model with addition and subtraction
• MRAM: the RAM augmented with multiplication and division
• BRAM, MBRAM: Bitwise Boolean versions of the RAM and MRAM
• N****: Non-deterministic versions of any of the above with an N before the name

### The random-access stored program (RASP) machine model

The RASP is a RAM with the instructions stored together with their data in the same 'space' – i.e. sequence of registers. The notion of a RASP was described at least as early as Kiphengst. His model had a "mill"—an accumulator, but now the instructions were in the registers with the data—the so-called von Neumann architecture. When the RASP has alternating even and odd registers—the even holding the "operation code" (instruction) and the odd holding its "operand" (parameter), then indirect addressing is achieved by simply modifying an instruction's operand.[6]

The original RASP model of Elgot and Robinson had only three instructions in the fashion of the register-machine model,[7] but they placed them in the register space together with their data. (Here COPY takes the place of CLEAR when one register e.g. "z" or "0" starts with and always contains 0. This trick is not unusual. The unit 1 in register "unit" or "1" is also useful.)

{ INC ( r ), COPY ( ri, rj ), JE ( ri, ri, z ) }

The RASP models allow indirect as well as direct-addressing; some allow "immediate" instructions too, e.g. "Load accumulator with the constant 3". The instructions may be of a highly restricted set such as the following 16 instructions of Hartmanis.[8] This model uses an accumulator A. The mnemonics are those that the authors used (their CLA is "load accumulator" with constant or from register; STO is "store accumulator"). Their syntax is the following, excepting the jumps: "n, <n>, <<n>>" for "immediate", "direct" and "indirect"). Jumps are via two "Transfer instructions" TRA—unconditional jump by directly "n" or indirectly "< n >" jamming contents of register n into the instruction counter, TRZ (conditional jump if Accumulator is zero in the same manner as TRA):

{ ADD n , ADD < n >, ADD << n >>, SUB n, SUB < n >, SUB << n >>, CLA n, CLA < n >, CLA << n >>, STO < n >, STO << n >>, TRA n, TRA < n >, TRZ n, TRA < n >, HALT }

### The Pointer machine model

A relative latecomer is Schönhage's Storage Modification Machine or pointer machine. Another version is the Kolmogorov-Uspensky machine, and the Knuth "linking automaton" proposal. (For references see pointer machine). Like a state-machine diagram, a node emits at least two labelled "edges" (arrows) that point to another node or nodes which in turn point to other nodes, etc. The outside world points at the center node.

## Machines with input and output

Any of the above tape-based machines can be equipped with input and output tapes; any of the above register-based machines can be equipped with dedicated input and output registers. For example, the Schönhage pointer-machine model has two instructions called "input λ0,λ1" and "output β".

It is difficult to study sublinear space complexity on multi-tape machines with the traditional model, because an input of size n already takes up space n. Thus, to study small DSPACE classes, we must use a different model. In some sense, if we never "write to" the input tape, we don't want to charge ourself for this space. And if we never "read from" our output tape, we don't want to charge ourself for this space.

We solve this problem by introducing a k-string Turing machine with input and output. This is the same as an ordinary k-string Turing machine, except that the transition function δ is restricted so that the input tape can never be changed, and so that the output head can never move left. This model allows us to define deterministic space classes smaller than linear. Turing machines with input-and-output also have the same time complexity as other Turing machines; in the words of Papadimitriou 1994 Prop 2.2:

For any k-string Turing machine M operating within time bound ${\displaystyle f(n)}$  there is a ${\displaystyle (k+2)}$ -string Turing machine M' with input and output, which operates within time bound ${\displaystyle O(f(n))}$ .

k-string Turing machines with input and output can be used in the formal definition of the complexity resource DSPACE.[9]

## Other equivalent machines and methods

• Multidimensional Turing machine: For example, a model by Schönhage uses the four head-movement commands { North, South, East, West }.[10]
• Single-tape, multi-head Turing machine: In an undecidability proof of the "problem of tag", Minsky and Shepherdson and Sturgis described machines with a single tape that could read along the tape with one head and write further along the tape with another.[11][12]

## References

1. ^ John Hopcroft and Jeffrey Ullman (1979). Introduction to Automata Theory, Languages and Computation (1st ed.). Addison–Wesley, Reading Mass. ISBN 0-201-02988-X.
2. ^ a b c Peter van Emde Boas, Machine Models and Simulations; Jan van Leeuwen, ed. Handbook of Theoretical Computer Science. Volume A: Algorithms and Complexity, p. 3-66, The MIT Press/Elsevier, 1990. ISBN 0-262-72014-0 (volume A). QA76.H279 1990.
3. ^ a b c d Marvin Minsky, Computation: Finite and Infinite Machines, Prentice–Hall, Inc., N.J., 1967. See Chapter 8, Section 8.2 "Unsolvability of the Halting Problem."
4. ^ Pippenger, Nicholas; Fischer, Michael J. (1979), "Relations Among Complexity Measures", Journal of the ACM, 26 (3): 361–381, doi:10.1145/322123.322138
5. ^ Melzak, Z. A. (September 1961). "An informal Arithmetical Approach to Computability and Computation". Canadian Mathematical Bulletin. 4 (3): 279–293. doi:10.4153/CMB-1961-031-9.
6. ^ Stephen A. Cook and Robert A. Reckhow (1972), Time-bounded random access machines, Journal of Computer Systems Science 7 (1973), 354–375.
7. ^ Calvin Elgot and Abraham Robinson (1964), Random-Access Stored-Program Machines, an Approach to Programming Languages, Journal of the Association for Computing Machinery, Vol. 11, No. 4 (October 1964), pp. 365–399.
8. ^ J. Hartmanis (1971), "Computational Complexity of Random Access Stored Program Machines," Mathematical Systems Theory 5, 3 (1971) pp. 232–245.
9. ^ Christos Papadimitriou (1993). Computational Complexity (1st ed.). Addison Wesley. ISBN 0-201-53082-1. Chapter 2: Turing machines, pp. 19–56.
10. ^ A. Schōnhage (1980), Storage Modification Machines, Society for Industrial and Applied Mathematics, SIAM J. Comput. Vol. 9, No. 3, August 1980.
11. ^ Marvin Minsky (15 August 1960). "Recursive Unsolvability of Post's Problem of 'Tag' and Other Topics in Theory of Turing Machines". Annals of Mathematics. Annals of Mathematics. 74 (3): 437–455. doi:10.2307/1970290. JSTOR 1970290.
12. ^ John C. Shepherdson and H. E. Sturgis received December 1961 Computability of Recursive Functions, Journal of the ACM 10:217-255, 1963