In a nutshell, what is:
- Functional programming
- Declarative programming
- Imperative programming
Are there other (more exotic) types?
What type is jQuery? I really like it but don't know what it's called.
closed as too broad by Robert Harvey♦ Feb 10 '14 at 2:32
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Functional programming is a subtype of declarative programming. So you've really asked the question "what is functional/declarative programming versus imperative programming"?
Imperative Programming is what most professional programmers use in their day-to-day jobs. It's the name given to languages like C, C++, Java, COBOL, etc. In imperative programming, you tell the computer what to do. "Computer, add x and y," or "Computer, slap a dialog box onto the screen." And (usually) the computer goes and does it. This is where most of us spend our lives, in looping structures and if-then-else statements and the like.
Functional Programming, as far as I understand it, seeks to describe what you want done rather than specify how you want something done. It's probably best understood in contrast to imperative programming. For instance, if you have a list in C and you want to pull out every Nth element, you have to point at the first element, set a counter at one, move to the next element, increment the counter, check to see if you're at the Nth element and so on. The functional equivalent would be to write a function that recognizes when the size of a list is a multiple of N, and then pass that function to the list, possibly with another snippet of code to hand back the head of the list if your N-recognizer evaluates to true and discarding it if it evaluates to false. The two functions recurse through the list, and finally hand back a list consisting of every Nth element.
The latter method might seem like the more confusing way to go about things, and that's because it is. Functional programming can be a mind-bender, which is one reason why Lisp, Scheme, and Haskell have never really surpassed C, C++, Java and COBOL in commercial popularity. But there are benefits to the functional way. For one, if you can get the logic correct, functional programming requires orders of magnitude less code than imperative programming. That means fewer points of failure, less code to test, and a more productive (and, many would say, happier) programming life. As systems get bigger, this has become more and more important.
Are there more exotic types? Not yet. There are hybrids between the two of them (like Scala), but these merely seek to leverage the strengths of both types. Then there's Object-oriented programming, which is really just a new way to organize data in an imperative program. And even with strange new technologies like quantum computing, the (planned-for) underlying languages fall somewhere in the declarative/imperative spectrum.
At the time of writing this, the top voted answers on this page are imprecise and muddled on the declarative vs. imperative definition, including the answer that quotes Wikipedia. Some answers are conflating the terms in different ways.
Refer also to my explanation of why spreadsheet programming is declarative, regardless that the formulas mutate the cells.
Also, several answers claim that functional programming must be a subset of declarative. On that point it depends if we differentiate "function" from "procedure". Lets handle imperative vs. declarative first.
Definition of declarative expression
The only attribute that can possibly differentiate a declarative expression from an imperative expression is the referential transparency (RT) of its sub-expressions. All other attributes are either shared between both types of expressions, or derived from the RT.
A 100% declarative language (i.e. one in which every possible expression is RT) does not (among other RT requirements) allow the mutation of stored values, e.g. HTML and most of Haskell.
Definition of RT expression
RT is often referred to as having "no side-effects". The term effects does not have a precise definition, so some people don't agree that "no side-effects" is the same as RT. RT has a precise definition.
Since every sub-expression is conceptually a function call, RT requires that the implementation of a function (i.e. the expression(s) inside the called function) may not access the mutable state that is external to the function (accessing the mutable local state is allowed). Put simply, the function (implementation) should be pure.
Definition of pure function
A pure function is often said to have "no side-effects". The term effects does not have a precise definition, so some people don't agree.
Pure functions have the following attributes.
Remember that RT applies to expressions (which includes function calls) and purity applies to (implementations of) functions.
An obscure example of impure functions that make RT expressions is concurrency, but this is because the purity is broken at the interrupt abstraction layer. You don't really need to know this. To make RT expressions, you call pure functions.
Derivative attributes of RT
Any other attribute cited for declarative programming, e.g. the citation from 1999 used by Wikipedia, either derives from RT, or is shared with imperative programming. Thus proving that my precise definition is correct.
Note, immutability of external values is a subset of the requirements for RT.
The choice of evaluation order of sub-expressions can only give a varying result when any of the function calls are not RT (i.e. the function is not pure), e.g. some mutable state external to a function is accessed within the function.
For example, given some nested expressions, e.g.
Whereas, if the functions
Note, nested expressions are conceptually nested functions, since expression operators are just function calls masquerading as unary prefix, unary postfix, or binary infix notation.
Tangentially, if all identifiers, e.g.
By the way, Haskell has a different syntax,
Evaluation order details
A function is a state transition (not a mutable stored value) from the input to the output. For RT compositions of calls to pure functions, the order-of-execution of these state transitions is independent. The state transition of each function call is independent of the others, due to lack of side-effects and the principle that an RT function may be replaced by its cached value. To correct a popular misconception, pure monadic composition is always declarative and RT, in spite of the fact that Haskell's
Eager evaluation means the functions arguments are evaluated before the function is called, and lazy evaluation means the arguments are not evaluated until (and if) they are accessed within the function.
Definition: function parameters are declared at the function definition site, and function arguments are supplied at the function call site. Know the difference between parameter and argument.
Conceptually, all expressions are (a composition of) function calls, e.g. constants are functions without inputs, unary operators are functions with one input, binary infix operators are functions with two inputs, constructors are functions, and even control statements (e.g.
Caveat, no Turing complete language (i.e. that allows unbounded recursion) is perfectly declarative, e.g. lazy evaluation introduces memory and time indeterminism. But these side-effects due to the choice of evaluation order are limited to memory consumption, execution time, latency, non-termination, and external hysteresis thus external synchronization.
Because declarative programming cannot have loops, then the only way to iterate is functional recursion. It is in this sense that functional programming is related to declarative programming.
But functional programming is not limited to declarative programming. Functional composition can be contrasted with subtyping, especially with respect to the Expression Problem, where extension can be achieved by either adding subtypes or functional decomposition. Extension can be a mix of both methodologies.
Functional programming usually makes the function a first-class object, meaning the function type can appear in the grammar anywhere any other type may. The upshot is that functions can input and operate on functions, thus providing for separation-of-concerns by emphasizing function composition, i.e. separating the dependencies among the subcomputations of a deterministic computation.
For example, instead of writing a separate function (and employing recursion instead of loops if the function must also be declarative) for each of an infinite number of possible specialized actions that could be applied to each element of a collection, functional programming employs reusable iteration functions, e.g.
However, note that if a function is not pure, then it is really a procedure. We can perhaps argue that functional programming that uses impure functions, is really procedural programming. Thus if we agree that declarative expressions are RT, then we can say that procedural programming is not declarative programming, and thus we might argue that functional programming is always RT and must be a subset of declarative programming.
This functional composition with first-class functions can express the depth in the parallelism by separating out the independent function.
Both concurrency and parallelism also require declarative programming, i.e. immutability and RT.
FP evaluation order
Note the evaluation order also impacts the termination and performance side-effects of functional composition.
Eager (CBV) and lazy (CBN) are categorical duels, because they have reversed evaluation order, i.e. whether the outer or inner functions respectively are evaluated first. Imagine an upside-down tree, then eager evaluates from function tree branch tips up the branch hierarchy to the top-level function trunk; whereas, lazy evaluates from the trunk down to the branch tips. Eager doesn't have conjunctive products ("and", a/k/a categorical "products") and lazy doesn't have disjunctive coproducts ("or", a/k/a categorical "sums").
At compile-time, due to the Halting problem and mutual recursion in a Turing complete language, functions can't generally be guaranteed to terminate.
 Declarative Continuations and Categorical Duality, Filinski, sections 2.5.4 A comparison of CBV and CBN, and 3.6.1 CBV and CBN in the SCL.
 Declarative Continuations and Categorical Duality, Filinski, sections 2.2.1 Products and coproducts, 2.2.2 Terminal and initial objects, 2.5.2 CBV with lazy products, and 2.5.3 CBN with eager coproducts.
There are more exotic concepts in programming, e.g. higher-kinded subtyping, dependently typed, functional reactive, etc..
I don't know enough about jQuery to answer your question about it.
1) There's not really any non-ambiguous, objective definition for these. Here is how I would define them:
Imperative - The focus is on what steps the computer should take rather than what the computer will do (ex. C, C++, Java).
Declarative - The focus is on what the computer should do rather than how it should do it (ex. SQL).
Functional - a subset of declarative languages that has heavy focus on recursion
In a nutshell:
An imperative language specfies a series of instructions that the computer executes in sequence (do this, then do that).
A declarative language declares a set of rules about what outputs should result from which inputs (eg. if you have A, then the result is B). An engine will apply these rules to inputs, and give an output.
A functional language declares a set of mathematical/logical functions which define how input is translated to output. eg. f(y) = y * y. it is a type of declarative language.
jQuery is a library.
imperative and declarative describe two opposing styles of programming. imperative is the traditional "step by step recipe" approach while declarative is more "this is what i want, now you work out how to do it".
these two approaches occur throughout programming - even with the same language and the same program. generally the declarative approach is considered preferable, because it frees the programmer from having to specify so many details, while also having less chance for bugs (if you describe the result you want, and some well-tested automatic process can work backwards from that to define the steps then you might hope that things are more reliable than having to specify each step by hand).
on the other hand, an imperative approach gives you more low level control - it's the "micromanager approach" to programming. and that can allow the programmer to exploit knowledge about the problem to give a more efficient answer. so it's not unusual for some parts of a program to be written in a more declarative style, but for the speed-critical parts to be more imperative.
as you might imagine, the language you use to write a program affects how declarative you can be - a language that has built-in "smarts" for working out what to do given a description of the result is going to allow a much more declarative approach than one where the programmer needs to first add that kind of intelligence with imperative code before being able to build a more declarative layer on top. so, for example, a language like prolog is considered very declarative because it has, built-in, a process that searches for answers.
so far, you'll notice that i haven't mentioned functional programming. that's because it's a term whose meaning isn't immediately related to the other two. at its most simple, functional programming means that you use functions. in particular, that you use a language that supports functions as "first class values" - that means that not only can you write functions, but you can write functions that write functions (that write functions that...), and pass functions to functions. in short - that functions are as flexible and common as things like strings and numbers.
it might seem odd, then, that functional, imperative and declarative are often mentioned together. the reason for this is a consequence of taking the idea of functional programming "to the extreme". a function, in it's purest sense, is something from maths - a kind of "black box" that takes some input and always gives the same output. and that kind of behaviour doesn't require storing changing variables. so if you design a programming language whose aim is to implement a very pure, mathematically influenced idea of functional programming, you end up rejecting, largely, the idea of values that can change (in a certain, limited, technical sense).
and if you do that - if you limit how variables can change - then almost by accident you end up forcing the programmer to write programs that are more declarative, because a large part of imperative programming is describing how variables change, and you can no longer do that! so it turns out that functional programming - particularly, programming in a functional language - tends to give more declarative code.
to summarise, then:
so "functional programming" is often described as "declarative".
Imperative Programming means any style of programming where your program is structured out of instructions describing how the operations performed by a computer will happen.
Declarative Programming means any style of programming where your program is a description either of the problem or the solution - but doesn't explicitly state how the work will be done.
Functional Programming is programming by evaluating functions and functions of functions... As (strictly defined) functional programming means programming by defining side-effect free mathematical functions so it is a form of declarative programming but it isn't the only kind of declarative programming.
Logic Programming (for example in Prolog) is another form of declarative programming. It involves computing by deciding whether a logical statement is true (or whether it can be satisfied). The program is typically a series of facts and rules - i.e. a description rather than a series of instructions.
Term Rewriting (for example CASL) is another form of declarative programming. It involves symbolic transformation of algebraic terms. It's completely distinct from logic programming and functional programming.
Imperative: how to achieve our goal
Declarative: what we want to achieve
imperative - expressions describe sequence of actions to perform (associative)
declarative - expressions are declarations that contribute to behavior of program (associative, commutative, idempotent, monotonic)
functional - expressions have value as only effect; semantics support equational reasoning
Answering 2: Are there other (more exotic) types?
There are many axes by which one might classify programming styles. I'll just name a few styles that I fancy:
dataflow - expressions describe data plumbing, a sort of spatial logic (sources, sinks, pipes or wires)
rewriting (term rewriting, graph rewriting, state transition system, rules systems) - program describes non-deterministic (typically non-deterministic) rules for recognizing and rewriting a data structure. The rules are declared, but the effects are very stateful and imperative. (State machines seem to be part of the rewriting class.)
linear logic (or linear types) - far stricter than functional; explicitly model information-effects (duplication, deletion, etc. as effects)
temporal logic (also: synchronous reactive, functional reactive, discrete event calculus) - model time explicitly; logical delay, logical synchronization
There are many hybrids that don't really have a distinct style. Multimethods, for example, hybridize some aspects of logical dispatch and imperative action.
This video from channel9 with Erik Meijer helped me a lot in understanding what functional programming really is.
A good point in the video starts around 16 minutes.
Since I wrote my prior answer, I have formulated a new definition of the declarative property which is quoted below. I have also defined imperative programming as the dual property.
This definition is superior to the one I provided in my prior answer, because it is succinct and it is more general. But it may be more difficult to grok, because the implication of the incompleteness theorems applicable to programming and life in general are difficult for humans to wrap their mind around.
The quoted explanation of the definition discusses the role pure functional programming plays in declarative programming.
All exotic types of programming fit into the following taxonomy of declarative versus imperative, since the following definition claims they are duals.
I don't know enough about jQuery to comment on it.
Some good answers here regarding the noted "types".
I submit some additional, more "exotic" concepts often associated with the functional programming crowd:
Wikipedia is a good place to start with this type of question
In a nutshell, the more a programming style emphasizes What (to do) abstracting away the details of How (to do it) the more that style is considered to be declarative. The opposite is true for imperative. Functional programming is associated with the declarative style.
Declarative programming is programming by expressing some timeless logic between the input and the output, for instance, in pseudocode, the following example would be declarative:
We just define a relationship called the 'factorial' here, and defined the relationship between the output and the input as the that relationship. As should be evident here, about any structured language allows declarative programming to some extend. A central idea of declarative programming is immutable data, if you assign to a variable, you only do so once, and then never again. Other, stricter definitions entail that there may be no side-effects at all, these languages are some times called 'purely declarative'.
The same result in an imperative style would be:
In this example, we expressed no timeless static logical relationship between the input and the output, we changed memory addresses manually until one of them held the desired result. It should be evident that all languages allow declarative semantics to some extend, but not all allow imperative, some 'purely' declarative languages permit side effects and mutation altogether.
Declarative languages are often said to specify 'what must be done', as opposed to 'how to do it', I think that is a misnomer, declarative programs still specify how one must get from input to output, but in another way, the relationship you specify must be effectively computable (important term, look it up if you don't know it). Another approach is nondeterministic programming, that really just specifies what conditions a result much meet, before your implementation just goes to exhaust all paths on trial and error until it succeeds.
As you can read about jQuery at Wikipedia,
The set of jQuery core features — DOM element selections, traversal and manipulation —, enabled by its selector engine (...), created a new "programming style", fusing algorithms and DOM-data-structures
Probably the present question is just focusing on this "new programming style"... So, for me, as I have not seen this focus in other answers, you have two possible good answers,