theory FirstStepsimports Basebeginchapter {* First Steps *}text {* Isabelle programming is done in ML. Just like lemmas and proofs, ML-code in Isabelle is part of a theory. If you want to follow the code given in this chapter, we assume you are working inside the theory starting with \begin{center} \begin{tabular}{@ {}l} \isacommand{theory} FirstSteps\\ \isacommand{imports} Main\\ \isacommand{begin}\\ \ldots \end{tabular} \end{center} We also generally assume you are working with HOL. The given examples might need to be adapted slightly if you work in a different logic.*}section {* Including ML-Code *}text {* The easiest and quickest way to include code in a theory is by using the \isacommand{ML}-command. For example:\begin{isabelle}\begin{graybox}\isacommand{ML}~@{text "\<verbopen>"}\isanewline\hspace{5mm}@{ML "3 + 4"}\isanewline@{text "\<verbclose>"}\isanewline@{text "> 7"}\smallskip\end{graybox}\end{isabelle} Like normal Isabelle proof scripts, \isacommand{ML}-commands can be evaluated by using the advance and undo buttons of your Isabelle environment. The code inside the \isacommand{ML}-command can also contain value and function bindings, and even those can be undone when the proof script is retracted. As mentioned in the Introduction, we will drop the \isacommand{ML}~@{text "\<verbopen> \<dots> \<verbclose>"} scaffolding whenever we show code. The lines prefixed with @{text [quotes] ">"} are not part of the code, rather they indicate what the response is when the code is evaluated. Once a portion of code is relatively stable, you usually want to export it to a separate ML-file. Such files can then be included in a theory by using the \isacommand{uses}-command in the header of the theory, like: \begin{center} \begin{tabular}{@ {}l} \isacommand{theory} FirstSteps\\ \isacommand{imports} Main\\ \isacommand{uses} @{text "\"file_to_be_included.ML\""} @{text "\<dots>"}\\ \isacommand{begin}\\ \ldots \end{tabular} \end{center}*}section {* Debugging and Printing\label{sec:printing} *}text {* During development you might find it necessary to inspect some data in your code. This can be done in a ``quick-and-dirty'' fashion using the function @{ML "warning"}. For example @{ML_response_fake [display,gray] "warning \"any string\"" "\"any string\""} will print out @{text [quotes] "any string"} inside the response buffer of Isabelle. This function expects a string as argument. If you develop under PolyML, then there is a convenient, though again ``quick-and-dirty'', method for converting values into strings, namely the function @{ML makestring}: @{ML_response_fake [display,gray] "warning (makestring 1)" "\"1\""} However @{ML makestring} only works if the type of what is converted is monomorphic and not a function. The function @{ML "warning"} should only be used for testing purposes, because any output this function generates will be overwritten as soon as an error is raised. For printing anything more serious and elaborate, the function @{ML tracing} is more appropriate. This function writes all output into a separate tracing buffer. For example: @{ML_response_fake [display,gray] "tracing \"foo\"" "\"foo\""} It is also possible to redirect the ``channel'' where the string @{text "foo"} is printed to a separate file, e.g.~to prevent ProofGeneral from choking on massive amounts of trace output. This redirection can be achieved with the code:*}ML{*val strip_specials =let fun strip ("\^A" :: _ :: cs) = strip cs | strip (c :: cs) = c :: strip cs | strip [] = [];in implode o strip o explode end;fun redirect_tracing stream = Output.tracing_fn := (fn s => (TextIO.output (stream, (strip_specials s)); TextIO.output (stream, "\n"); TextIO.flushOut stream)) *}text {* Calling @{ML "redirect_tracing"} with @{ML "(TextIO.openOut \"foo.bar\")"} will cause that all tracing information is printed into the file @{text "foo.bar"}. You can print out error messages with the function @{ML error}; for example:@{ML_response_fake [display,gray] "if 0=1 then true else (error \"foo\")" "Exception- ERROR \"foo\" raisedAt command \"ML\"."} Most often you want to inspect data of type @{ML_type term}, @{ML_type cterm} or @{ML_type thm}. Isabelle contains elaborate pretty-printing functions for printing them, but for quick-and-dirty solutions they are far too unwieldy. A simple way to transform a term into a string is to use the function @{ML Syntax.string_of_term}. @{ML_response_fake [display,gray] "Syntax.string_of_term @{context} @{term \"1::nat\"}" "\"\\^E\\^Fterm\\^E\\^E\\^Fconst\\^Fname=HOL.one_class.one\\^E1\\^E\\^F\\^E\\^E\\^F\\^E\""} This produces a string with some additional information encoded in it. The string can be properly printed by using the function @{ML warning}. @{ML_response_fake [display,gray] "warning (Syntax.string_of_term @{context} @{term \"1::nat\"})" "\"1\""} A @{ML_type cterm} can be transformed into a string by the following function.*}ML{*fun str_of_cterm ctxt t = Syntax.string_of_term ctxt (term_of t)*}text {* In this example the function @{ML term_of} extracts the @{ML_type term} from a @{ML_type cterm}. If there are more than one @{ML_type cterm}s to be printed, you can use the function @{ML commas} to separate them.*} ML{*fun str_of_cterms ctxt ts = commas (map (str_of_cterm ctxt) ts)*}text {* The easiest way to get the string of a theorem is to transform it into a @{ML_type cterm} using the function @{ML crep_thm}. Theorems also include schematic variables, such as @{text "?P"}, @{text "?Q"} and so on. In order to improve the readability of theorems we convert these schematic variables into free variables using the function @{ML Variable.import_thms}.*}ML{*fun no_vars ctxt thm =let val ((_, [thm']), _) = Variable.import_thms true [thm] ctxtin thm'endfun str_of_thm ctxt thm = str_of_cterm ctxt (#prop (crep_thm (no_vars ctxt thm)))*}text {* Again the function @{ML commas} helps with printing more than one theorem. *}ML{*fun str_of_thms ctxt thms = commas (map (str_of_thm ctxt) thms)*}section {* Combinators\label{sec:combinators} *}text {* For beginners perhaps the most puzzling parts in the existing code of Isabelle are the combinators. At first they seem to greatly obstruct the comprehension of the code, but after getting familiar with them, they actually ease the understanding and also the programming. The simplest combinator is @{ML I}, which is just the identity function defined as*}ML{*fun I x = x*}text {* Another simple combinator is @{ML K}, defined as *}ML{*fun K x = fn _ => x*}text {* @{ML K} ``wraps'' a function around the argument @{text "x"}. However, this function ignores its argument. As a result, @{ML K} defines a constant function always returning @{text x}. The next combinator is reverse application, @{ML "|>"}, defined as: *}ML{*fun x |> f = f x*}text {* While just syntactic sugar for the usual function application, the purpose of this combinator is to implement functions in a ``waterfall fashion''. Consider for example the function *}ML %linenosgray{*fun inc_by_five x = x |> (fn x => x + 1) |> (fn x => (x, x)) |> fst |> (fn x => x + 4)*}text {* which increments its argument @{text x} by 5. It does this by first incrementing the argument by 1 (Line 2); then storing the result in a pair (Line 3); taking the first component of the pair (Line 4) and finally incrementing the first component by 4 (Line 5). This kind of cascading manipulations of values is quite common when dealing with theories (for example by adding a definition, followed by lemmas and so on). The reverse application allows you to read what happens in a top-down manner. This kind of coding should also be familiar, if you have been exposed to Haskell's do-notation. Writing the function @{ML inc_by_five} using the reverse application is much clearer than writing*}ML{*fun inc_by_five x = fst ((fn x => (x, x)) (x + 1)) + 4*}text {* or *}ML{*fun inc_by_five x = ((fn x => x + 4) o fst o (fn x => (x, x)) o (fn x => x + 1)) x*}text {* and typographically more economical than *}ML{*fun inc_by_five x = let val y1 = x + 1 val y2 = (y1, y1) val y3 = fst y2 val y4 = y3 + 4 in y4 end*}text {* Another reason why the let-bindings in the code above are better to be avoided: it is more than easy to get the intermediate values wrong, not to mention the nightmares the maintenance of this code causes! In the context of Isabelle, a ``real world'' example for a function written in the waterfall fashion might be the following code:*}ML %linenosgray{*fun apply_fresh_args pred ctxt = pred |> fastype_of |> binder_types |> map (pair "z") |> Variable.variant_frees ctxt [pred] |> map Free |> (curry list_comb) pred *}text {* This code extracts the argument types of a given predicate and then generates for each argument type a distinct variable; finally it applies the generated variables to the predicate. For example @{ML_response_fake [display,gray]"apply_fresh_args @{term \"P::nat \<Rightarrow> int \<Rightarrow> unit \<Rightarrow> bool\"} @{context} |> Syntax.string_of_term @{context} |> warning" "P z za zb"} You can read off this behaviour from how @{ML apply_fresh_args} is coded: in Line 2, the function @{ML fastype_of} calculates the type of the predicate; @{ML binder_types} in the next line produces the list of argument types (in the case above the list @{text "[nat, int, unit]"}); Line 4 pairs up each type with the string @{text "z"}; the function @{ML variant_frees in Variable} generates for each @{text "z"} a unique name avoiding the given @{text pred}; the list of name-type pairs is turned into a list of variable terms in Line 6, which in the last line is applied by the function @{ML list_comb} to the predicate. We have to use the function @{ML curry}, because @{ML list_comb} expects the predicate and the variables list as a pair. The combinator @{ML "#>"} is the reverse function composition. It can be used to define the following function*}ML{*val inc_by_six = (fn x => x + 1) #> (fn x => x + 2) #> (fn x => x + 3)*}text {* which is the function composed of first the increment-by-one function and then increment-by-two, followed by increment-by-three. Again, the reverse function composition allows you to read the code top-down. The remaining combinators described in this section add convenience for the ``waterfall method'' of writing functions. The combinator @{ML tap} allows you to get hold of an intermediate result (to do some side-calculations for instance). The function *}ML %linenosgray{*fun inc_by_three x = x |> (fn x => x + 1) |> tap (fn x => tracing (makestring x)) |> (fn x => x + 2)*}text {* increments the argument first by @{text "1"} and then by @{text "2"}. In the middle (Line 3), however, it uses @{ML tap} for printing the ``plus-one'' intermediate result inside the tracing buffer. The function @{ML tap} can only be used for side-calculations, because any value that is computed cannot be merged back into the ``main waterfall''. To do this, you can use the next combinator. The combinator @{ML "`"} is similar to @{ML tap}, but applies a function to the value and returns the result together with the value (as a pair). For example the function *}ML{*fun inc_as_pair x = x |> `(fn x => x + 1) |> (fn (x, y) => (x, y + 1))*}text {* takes @{text x} as argument, and then increments @{text x}, but also keeps @{text x}. The intermediate result is therefore the pair @{ML "(x + 1, x)" for x}. After that, the function increments the right-hand component of the pair. So finally the result will be @{ML "(x + 1, x + 1)" for x}. The combinators @{ML "|>>"} and @{ML "||>"} are defined for functions manipulating pairs. The first applies the function to the first component of the pair, defined as*}ML{*fun (x, y) |>> f = (f x, y)*}text {* and the second combinator to the second component, defined as*}ML{*fun (x, y) ||> f = (x, f y)*}text {* With the combinator @{ML "|->"} you can re-combine the elements from a pair. This combinator is defined as*}ML{*fun (x, y) |-> f = f x y*}text {* and can be used to write the following roundabout version of the @{text double} function: *}ML{*fun double x = x |> (fn x => (x, x)) |-> (fn x => fn y => x + y)*}text {* Recall that @{ML "|>"} is the reverse function applications. Recall also that the related reverse function composition is @{ML "#>"}. In fact all the combinators @{ML "|->"}, @{ML "|>>"} and @{ML "||>"} described above have related combinators for function composition, namely @{ML "#->"}, @{ML "#>>"} and @{ML "##>"}. Using @{ML "#->"}, for example, the function @{text double} can also be written as:*}ML{*val double = (fn x => (x, x)) #-> (fn x => fn y => x + y)*}text {* (FIXME: find a good exercise for combinators) \begin{readmore} The most frequently used combinator are defined in the files @{ML_file "Pure/library.ML"} and @{ML_file "Pure/General/basics.ML"}. Also \isccite{sec:ML-linear-trans} contains further information about combinators. \end{readmore}*}section {* Antiquotations *}text {* The main advantage of embedding all code in a theory is that the code can contain references to entities defined on the logical level of Isabelle. By this we mean definitions, theorems, terms and so on. This kind of reference is realised with antiquotations. For example, one can print out the name of the current theory by typing @{ML_response [display,gray] "Context.theory_name @{theory}" "\"FirstSteps\""} where @{text "@{theory}"} is an antiquotation that is substituted with the current theory (remember that we assumed we are inside the theory @{text FirstSteps}). The name of this theory can be extracted using the function @{ML "Context.theory_name"}. Note, however, that antiquotations are statically linked, that is their value is determined at ``compile-time'', not ``run-time''. For example the function*}ML{*fun not_current_thyname () = Context.theory_name @{theory} *}text {* does \emph{not} return the name of the current theory, if it is run in a different theory. Instead, the code above defines the constant function that always returns the string @{text [quotes] "FirstSteps"}, no matter where the function is called. Operationally speaking, the antiquotation @{text "@{theory}"} is \emph{not} replaced with code that will look up the current theory in some data structure and return it. Instead, it is literally replaced with the value representing the theory name. In a similar way you can use antiquotations to refer to proved theorems: @{text "@{thm \<dots>}"} for a single theorem @{ML_response_fake [display,gray] "@{thm allI}" "(\<And>x. ?P x) \<Longrightarrow> \<forall>x. ?P x"} and @{text "@{thms \<dots>}"} for more than one@{ML_response_fake [display,gray] "@{thms conj_ac}" "(?P \<and> ?Q) = (?Q \<and> ?P)(?P \<and> ?Q \<and> ?R) = (?Q \<and> ?P \<and> ?R)((?P \<and> ?Q) \<and> ?R) = (?P \<and> ?Q \<and> ?R)"} You can also refer to the current simpset. To illustrate this we implement the function that extracts the theorem names stored in a simpset.*}ML{*fun get_thm_names_from_ss simpset =let val {simps,...} = MetaSimplifier.dest_ss simpsetin map #1 simpsend*}text {* The function @{ML dest_ss in MetaSimplifier} returns a record containing all information stored in the simpset. We are only interested in the names of the simp-rules. So now you can feed in the current simpset into this function. The simpset can be referred to using the antiquotation @{text "@{simpset}"}. @{ML_response_fake [display,gray] "get_thm_names_from_ss @{simpset}" "[\"Nat.of_nat_eq_id\", \"Int.of_int_eq_id\", \"Nat.One_nat_def\", \<dots>]"} Again, this way or referencing simpsets makes you independent from additions of lemmas to the simpset by the user that potentially cause loops. While antiquotations have many applications, they were originally introduced in order to avoid explicit bindings for theorems such as:*}ML{*val allI = thm "allI" *}text {* These bindings are difficult to maintain and also can be accidentally overwritten by the user. This often broke Isabelle packages. Antiquotations solve this problem, since they are ``linked'' statically at compile-time. However, this static linkage also limits their usefulness in cases where data needs to be build up dynamically. In the course of this chapter you will learn more about these antiquotations: they can simplify Isabelle programming since one can directly access all kinds of logical elements from th ML-level.*}text {* (FIXME: say something about @{text "@{binding \<dots>}"}*}section {* Terms and Types *}text {* One way to construct terms of Isabelle is by using the antiquotation \mbox{@{text "@{term \<dots>}"}}. For example: @{ML_response [display,gray] "@{term \"(a::nat) + b = c\"}" "Const (\"op =\", \<dots>) $ (Const (\"HOL.plus_class.plus\", \<dots>) $ \<dots> $ \<dots>) $ \<dots>"} This will show the term @{term "(a::nat) + b = c"}, but printed using the internal representation of this term. This internal representation corresponds to the datatype @{ML_type "term"}. The internal representation of terms uses the usual de Bruijn index mechanism where bound variables are represented by the constructor @{ML Bound}. The index in @{ML Bound} refers to the number of Abstractions (@{ML Abs}) we have to skip until we hit the @{ML Abs} that binds the corresponding variable. However, in Isabelle the names of bound variables are kept at abstractions for printing purposes, and so should be treated only as ``comments''. Application in Isabelle is realised with the term-constructor @{ML $}. \begin{readmore} Terms are described in detail in \isccite{sec:terms}. Their definition and many useful operations are implemented in @{ML_file "Pure/term.ML"}. \end{readmore} Sometimes the internal representation of terms can be surprisingly different from what you see at the user-level, because the layers of parsing/type-checking/pretty printing can be quite elaborate. \begin{exercise} Look at the internal term representation of the following terms, and find out why they are represented like this: \begin{itemize} \item @{term "case x of 0 \<Rightarrow> 0 | Suc y \<Rightarrow> y"} \item @{term "\<lambda>(x,y). P y x"} \item @{term "{ [x::int] | x. x \<le> -2 }"} \end{itemize} Hint: The third term is already quite big, and the pretty printer may omit parts of it by default. If you want to see all of it, you can use the following ML-function to set the printing depth to a higher value: @{ML [display,gray] "print_depth 50"} \end{exercise} The antiquotation @{text "@{prop \<dots>}"} constructs terms of propositional type, inserting the invisible @{text "Trueprop"}-coercions whenever necessary. Consider for example the pairs@{ML_response [display,gray] "(@{term \"P x\"}, @{prop \"P x\"})" "(Free (\"P\", \<dots>) $ Free (\"x\", \<dots>), Const (\"Trueprop\", \<dots>) $ (Free (\"P\", \<dots>) $ Free (\"x\", \<dots>)))"} where a coercion is inserted in the second component and @{ML_response [display,gray] "(@{term \"P x \<Longrightarrow> Q x\"}, @{prop \"P x \<Longrightarrow> Q x\"})" "(Const (\"==>\", \<dots>) $ \<dots> $ \<dots>, Const (\"==>\", \<dots>) $ \<dots> $ \<dots>)"} where it is not (since it is already constructed by a meta-implication). Types can be constructed using the antiquotation @{text "@{typ \<dots>}"}. For example: @{ML_response_fake [display,gray] "@{typ \"bool \<Rightarrow> nat\"}" "bool \<Rightarrow> nat"} \begin{readmore} Types are described in detail in \isccite{sec:types}. Their definition and many useful operations are implemented in @{ML_file "Pure/type.ML"}. \end{readmore}*}section {* Constructing Terms and Types Manually\label{sec:terms_types_manually} *} text {* While antiquotations are very convenient for constructing terms, they can only construct fixed terms (remember they are ``linked'' at compile-time). However, you often need to construct terms dynamically. For example, a function that returns the implication @{text "\<And>(x::\<tau>). P x \<Longrightarrow> Q x"} taking @{term P}, @{term Q} and the type @{term "\<tau>"} as arguments can only be written as:*}ML{*fun make_imp P Q tau =let val x = Free ("x", tau)in Logic.all x (Logic.mk_implies (P $ x, Q $ x))end *}text {* The reason is that you cannot pass the arguments @{term P}, @{term Q} and @{term "tau"} into an antiquotation. For example the following does \emph{not} work.*}ML{*fun make_wrong_imp P Q tau = @{prop "\<And>x. P x \<Longrightarrow> Q x"} *}text {* To see this apply @{text "@{term S}"}, @{text "@{term T}"} and @{text "@{typ nat}"} to both functions. With @{ML make_imp} we obtain the intended term involving the given arguments @{ML_response [display,gray] "make_imp @{term S} @{term T} @{typ nat}" "Const \<dots> $ Abs (\"x\", Type (\"nat\",[]), Const \<dots> $ (Free (\"S\",\<dots>) $ \<dots>) $ (Free (\"T\",\<dots>) $ \<dots>))"} whereas with @{ML make_wrong_imp} we obtain a term involving the @{term "P"} and @{text "Q"} from the antiquotation. @{ML_response [display,gray] "make_wrong_imp @{term S} @{term T} @{typ nat}" "Const \<dots> $ Abs (\"x\", \<dots>, Const \<dots> $ (Const \<dots> $ (Free (\"P\",\<dots>) $ \<dots>)) $ (Const \<dots> $ (Free (\"Q\",\<dots>) $ \<dots>)))"} (FIXME: handy functions for constructing terms: @{ML list_comb}, @{ML lambda}) Although types of terms can often be inferred, there are many situations where you need to construct types manually, especially when defining constants. For example the function returning a function type is as follows:*} ML{*fun make_fun_type tau1 tau2 = Type ("fun", [tau1, tau2]) *}text {* This can be equally written with the combinator @{ML "-->"} as: *}ML{*fun make_fun_type tau1 tau2 = tau1 --> tau2 *}text {* A handy function for manipulating terms is @{ML map_types}: it takes a function and applies it to every type in a term. You can, for example, change every @{typ nat} in a term into an @{typ int} using the function:*}ML{*fun nat_to_int t = (case t of @{typ nat} => @{typ int} | Type (s, ts) => Type (s, map nat_to_int ts) | _ => t)*}text {* An example as follows:@{ML_response_fake [display,gray] "map_types nat_to_int @{term \"a = (1::nat)\"}" "Const (\"op =\", \"int \<Rightarrow> int \<Rightarrow> bool\") $ Free (\"a\", \"int\") $ Const (\"HOL.one_class.one\", \"int\")"} \begin{readmore} There are many functions in @{ML_file "Pure/term.ML"}, @{ML_file "Pure/logic.ML"} and @{ML_file "HOL/Tools/hologic.ML"} that make such manual constructions of terms and types easier.\end{readmore} Have a look at these files and try to solve the following two exercises:*}text {* \begin{exercise}\label{fun:revsum} Write a function @{text "rev_sum : term -> term"} that takes a term of the form @{text "t\<^isub>1 + t\<^isub>2 + \<dots> + t\<^isub>n"} (whereby @{text "n"} might be zero) and returns the reversed sum @{text "t\<^isub>n + \<dots> + t\<^isub>2 + t\<^isub>1"}. Assume the @{text "t\<^isub>i"} can be arbitrary expressions and also note that @{text "+"} associates to the left. Try your function on some examples. \end{exercise} \begin{exercise}\label{fun:makesum} Write a function which takes two terms representing natural numbers in unary notation (like @{term "Suc (Suc (Suc 0))"}), and produce the number representing their sum. \end{exercise} There are a few subtle issues with constants. They usually crop up when pattern matching terms or types, or when constructing them. While it is perfectly ok to write the function @{text is_true} as follows*}ML{*fun is_true @{term True} = true | is_true _ = false*}text {* this does not work for picking out @{text "\<forall>"}-quantified terms. Because the function *}ML{*fun is_all (@{term All} $ _) = true | is_all _ = false*}text {* will not correctly match the formula @{prop "\<forall>x::nat. P x"}: @{ML_response [display,gray] "is_all @{term \"\<forall>x::nat. P x\"}" "false"} The problem is that the @{text "@term"}-antiquotation in the pattern fixes the type of the constant @{term "All"} to be @{typ "('a \<Rightarrow> bool) \<Rightarrow> bool"} for an arbitrary, but fixed type @{typ "'a"}. A properly working alternative for this function is*}ML{*fun is_all (Const ("All", _) $ _) = true | is_all _ = false*}text {* because now@{ML_response [display,gray] "is_all @{term \"\<forall>x::nat. P x\"}" "true"} matches correctly (the first wildcard in the pattern matches any type and the second any term). However there is still a problem: consider the similar function that attempts to pick out @{text "Nil"}-terms:*}ML{*fun is_nil (Const ("Nil", _)) = true | is_nil _ = false *}text {* Unfortunately, also this function does \emph{not} work as expected, since @{ML_response [display,gray] "is_nil @{term \"Nil\"}" "false"} The problem is that on the ML-level the name of a constant is more subtle than you might expect. The function @{ML is_all} worked correctly, because @{term "All"} is such a fundamental constant, which can be referenced by @{ML "Const (\"All\", some_type)" for some_type}. However, if you look at @{ML_response [display,gray] "@{term \"Nil\"}" "Const (\"List.list.Nil\", \<dots>)"} the name of the constant @{text "Nil"} depends on the theory in which the term constructor is defined (@{text "List"}) and also in which datatype (@{text "list"}). Even worse, some constants have a name involving type-classes. Consider for example the constants for @{term "zero"} and \mbox{@{text "(op *)"}}: @{ML_response [display,gray] "(@{term \"0::nat\"}, @{term \"op *\"})" "(Const (\"HOL.zero_class.zero\", \<dots>), Const (\"HOL.times_class.times\", \<dots>))"} While you could use the complete name, for example @{ML "Const (\"List.list.Nil\", some_type)" for some_type}, for referring to or matching against @{text "Nil"}, this would make the code rather brittle. The reason is that the theory and the name of the datatype can easily change. To make the code more robust, it is better to use the antiquotation @{text "@{const_name \<dots>}"}. With this antiquotation you can harness the variable parts of the constant's name. Therefore a functions for matching against constants that have a polymorphic type should be written as follows.*}ML{*fun is_nil_or_all (Const (@{const_name "Nil"}, _)) = true | is_nil_or_all (Const (@{const_name "All"}, _) $ _) = true | is_nil_or_all _ = false *}text {* Occasional you have to calculate what the ``base'' name of a given constant is. For this you can use the function @{ML Sign.extern_const} or @{ML Long_Name.base_name}. For example: @{ML_response [display,gray] "Sign.extern_const @{theory} \"List.list.Nil\"" "\"Nil\""} The difference between both functions is that @{ML extern_const in Sign} returns the smallest name that is still unique, whereas @{ML base_name in Long_Name} always strips off all qualifiers. \begin{readmore} Functions about naming are implemented in @{ML_file "Pure/General/name_space.ML"}; functions about signatures in @{ML_file "Pure/sign.ML"}. \end{readmore}*}section {* Type-Checking *}text {* You can freely construct and manipulate @{ML_type "term"}s and @{ML_type typ}es, since they are just arbitrary unchecked trees. However, you eventually want to see if a term is well-formed, or type-checks, relative to a theory. Type-checking is done via the function @{ML cterm_of}, which converts a @{ML_type term} into a @{ML_type cterm}, a \emph{certified} term. Unlike @{ML_type term}s, which are just trees, @{ML_type "cterm"}s are abstract objects that are guaranteed to be type-correct, and they can only be constructed via ``official interfaces''. Type-checking is always relative to a theory context. For now we use the @{ML "@{theory}"} antiquotation to get hold of the current theory. For example you can write: @{ML_response_fake [display,gray] "cterm_of @{theory} @{term \"(a::nat) + b = c\"}" "a + b = c"} This can also be written with an antiquotation: @{ML_response_fake [display,gray] "@{cterm \"(a::nat) + b = c\"}" "a + b = c"} Attempting to obtain the certified term for @{ML_response_fake_both [display,gray] "@{cterm \"1 + True\"}" "Type unification failed \<dots>"} yields an error (since the term is not typable). A slightly more elaborate example that type-checks is:@{ML_response_fake [display,gray] "let val natT = @{typ \"nat\"} val zero = @{term \"0::nat\"}in cterm_of @{theory} (Const (@{const_name plus}, natT --> natT --> natT) $ zero $ zero)end" "0 + 0"} In Isabelle not just types need to be certified, but also types. For example, you obtain the certified type for the Isablle type @{typ "nat \<Rightarrow> bool"} on the ML-level as follows: @{ML_response_fake [display,gray] "ctyp_of @{theory} (@{typ nat} --> @{typ bool})" "nat \<Rightarrow> bool"} \begin{readmore} For functions related to @{ML_type cterm}s and @{ML_type ctyp}s see the file @{ML_file "Pure/thm.ML"}. \end{readmore} \begin{exercise} Check that the function defined in Exercise~\ref{fun:revsum} returns a result that type-checks. \end{exercise} Remember Isabelle foolows the Church-style typing for terms, i.e.~a term contains enough typing information (constants, free variables and abstractions all have typing information) so that it is always clear what the type of a term is. Given a well-typed term, the function @{ML type_of} returns the type of a term. Consider for example: @{ML_response [display,gray] "type_of (@{term \"f::nat \<Rightarrow> bool\"} $ @{term \"x::nat\"})" "bool"} To calculate the type, this function traverses the whole term and will detect any typing inconsistency. For examle changing the type of the variable @{term "x"} from @{typ "nat"} to @{typ "int"} will result in the error message: @{ML_response_fake [display,gray] "type_of (@{term \"f::nat \<Rightarrow> bool\"} $ @{term \"x::int\"})" "*** Exception- TYPE (\"type_of: type mismatch in application\" \<dots>"} Since the complete traversal might sometimes be too costly and not necessary, there is the function @{ML fastype_of}, which also returns the type of a term. @{ML_response [display,gray] "fastype_of (@{term \"f::nat \<Rightarrow> bool\"} $ @{term \"x::nat\"})" "bool"} However, efficiency is gained on the expense of skipping some tests. You can see this in the following example @{ML_response [display,gray] "fastype_of (@{term \"f::nat \<Rightarrow> bool\"} $ @{term \"x::int\"})" "bool"} where no error is detected. Sometimes it is a bit inconvenient to construct a term with complete typing annotations, especially in cases where the typing information is redundant. A short-cut is to use the ``place-holder'' type @{ML "dummyT"} and then let type-inference figure out the complete type. An example is as follows: @{ML_response_fake [display,gray] "let val c = Const (@{const_name \"plus\"}, dummyT) val o = @{term \"1::nat\"} val v = Free (\"x\", dummyT)in Syntax.check_term @{context} (c $ o $ v)end""Const (\"HOL.plus_class.plus\", \"nat \<Rightarrow> nat \<Rightarrow> nat\") $ Const (\"HOL.one_class.one\", \"nat\") $ Free (\"x\", \"nat\")"} Instead of giving explicitly the type for the constant @{text "plus"} and the free variable @{text "x"}, the type-inference filles in the missing information. \begin{readmore} See @{ML_file "Pure/Syntax/syntax.ML"} where more functions about reading, checking and pretty-printing of terms are defined. Fuctions related to the type inference are implemented in @{ML_file "Pure/type.ML"} and @{ML_file "Pure/type_infer.ML"}. \end{readmore} (FIXME: say something about sorts)*}section {* Theorems *}text {* Just like @{ML_type cterm}s, theorems are abstract objects of type @{ML_type thm} that can only be build by going through interfaces. As a consequence, every proof in Isabelle is correct by construction. This follows the tradition of the LCF approach \cite{GordonMilnerWadsworth79}. To see theorems in ``action'', let us give a proof on the ML-level for the following statement:*} lemma assumes assm\<^isub>1: "\<And>(x::nat). P x \<Longrightarrow> Q x" and assm\<^isub>2: "P t" shows "Q t" (*<*)oops(*>*) text {* The corresponding ML-code is as follows:\footnote{Note that @{text "|>"} is reverse application. See Section~\ref{sec:combinators}.}@{ML_response_fake [display,gray]"let val assm1 = @{cprop \"\<And>(x::nat). P x \<Longrightarrow> Q x\"} val assm2 = @{cprop \"(P::nat\<Rightarrow>bool) t\"} val Pt_implies_Qt = assume assm1 |> forall_elim @{cterm \"t::nat\"}; val Qt = implies_elim Pt_implies_Qt (assume assm2);in Qt |> implies_intr assm2 |> implies_intr assm1end" "\<lbrakk>\<And>x. P x \<Longrightarrow> Q x; P t\<rbrakk> \<Longrightarrow> Q t"} This code-snippet constructs the following proof: \[ \infer[(@{text "\<Longrightarrow>"}$-$intro)]{\vdash @{prop "(\<And>x. P x \<Longrightarrow> Q x) \<Longrightarrow> P t \<Longrightarrow> Q t"}} {\infer[(@{text "\<Longrightarrow>"}$-$intro)]{@{prop "\<And>x. P x \<Longrightarrow> Q x"} \vdash @{prop "P t \<Longrightarrow> Q t"}} {\infer[(@{text "\<Longrightarrow>"}$-$elim)]{@{prop "\<And>x. P x \<Longrightarrow> Q x"}, @{prop "P t"} \vdash @{prop "Q t"}} {\infer[(@{text "\<And>"}$-$elim)]{@{prop "\<And>x. P x \<Longrightarrow> Q x"} \vdash @{prop "P t \<Longrightarrow> Q t"}} {\infer[(assume)]{@{prop "\<And>x. P x \<Longrightarrow> Q x"} \vdash @{prop "\<And>x. P x \<Longrightarrow> Q x"}}{}} & \infer[(assume)]{@{prop "P t"} \vdash @{prop "P t"}}{} } } } \] However, while we obtained a theorem as result, this theorem is not yet stored in Isabelle's theorem database. So it cannot be referenced later on. How to store theorems will be explained in Section~\ref{sec:storing}. \begin{readmore} For the functions @{text "assume"}, @{text "forall_elim"} etc see \isccite{sec:thms}. The basic functions for theorems are defined in @{ML_file "Pure/thm.ML"}. \end{readmore} (FIXME: how to add case-names to goal states - maybe in the next section)*}section {* Theorem Attributes *}text {* Theorem attributes are @{text "[simp]"}, @{text "[OF \<dots>]"}, @{text "[symmetric]"} and so on. Such attributes are \emph{neither} tags \emph{nor} flags annotated to theorems, but functions that do further processing once a theorem is proven. In particular, it is not possible to find out what are all theorems that have a given attribute in common, unless of course the function behind the attribute stores the theorems in a retrivable datastructure. If you want to print out all currently known attributes a theorem can have, you can use the function: @{ML_response_fake [display,gray] "Attrib.print_attributes @{theory}" "COMP: direct composition with rules (no lifting)HOL.dest: declaration of Classical destruction ruleHOL.elim: declaration of Classical elimination rule \<dots>"} To explain how to write your own attribute, let us start with an extremely simple version of the attribute @{text "[symmetric]"}. The purpose of this attribute is to produce the ``symmetric'' version of an equation. The main function behind this attribute is*}ML{*val my_symmetric = Thm.rule_attribute (fn _ => fn thm => thm RS @{thm sym})*}text {* where the function @{ML "Thm.rule_attribute"} expects a function taking a context (which we ignore in the code above) and a theorem (@{text thm}), and returns another theorem (namely @{text thm} resolved with the lemma @{thm [source] sym}: @{thm sym[no_vars]}). The function @{ML "Thm.rule_attribute"} then returns an attribute. Before we can use the attribute, we need to set it up. This can be done using the function @{ML Attrib.setup} as follows.*}setup %gray {* Attrib.setup @{binding "my_sym"} (Scan.succeed my_symmetric) "applying the sym rule"*}text {* The attribute does not expect any further arguments (unlike @{text "[OF \<dots>]"}, for example, which can take a list of theorems as argument). Therefore we use the parser @{ML Scan.succeed}. Later on we will also consider attributes taking further arguments. An example for the attribute @{text "[my_sym]"} is the proof*} lemma test[my_sym]: "2 = Suc (Suc 0)" by simptext {* which stores the theorem @{thm test} under the name @{thm [source] test}. We can also use the attribute when referring to this theorem. \begin{isabelle} \isacommand{thm}~@{text "test[my_sym]"}\\ @{text "> "}~@{thm test[my_sym]} \end{isabelle} The purpose of @{ML Thm.rule_attribute} is to directly manipulate theorems. Another usage of attributes is to add and delete theorems from stored data. For example the attribute @{text "[simp]"} adds or deletes a theorem from the current simpset. For these applications, you can use @{ML Thm.declaration_attribute}. To illustrate this function, let us introduce a reference containing a list of theorems.*}ML{*val my_thms = ref ([]:thm list)*}text {* A word of warning: such references must not be used in any code that is meant to be more than just for testing purposes! Here it is only used to illustrate matters. We will show later how to store data properly without using references. The function @{ML Thm.declaration_attribute} expects us to provide two functions that add and delete theorems from this list. For this we use the two functions:*}ML{*fun my_thms_add thm ctxt = (my_thms := Thm.add_thm thm (!my_thms); ctxt)fun my_thms_del thm ctxt = (my_thms := Thm.del_thm thm (!my_thms); ctxt)*}text {* These functions take a theorem and a context and, for what we are explaining here it is sufficient that they just return the context unchanged. They change however the reference @{ML my_thms}, whereby the function @{ML Thm.add_thm} adds a theorem if it is not already included in the list, and @{ML Thm.del_thm} deletes one. Both functions use the predicate @{ML Thm.eq_thm_prop} which compares theorems according to their proved propositions (modulo alpha-equivalence). You can turn both functions into attributes using*}ML{*val my_add = Thm.declaration_attribute my_thms_addval my_del = Thm.declaration_attribute my_thms_del *}text {* and set up the attributes as follows*}setup %gray {* Attrib.setup @{binding "my_thms"} (Attrib.add_del my_add my_del) "maintaining a list of my_thms" *}text {* Now if you prove the lemma attaching the attribute @{text "[my_thms]"}*}lemma trueI_2[my_thms]: "True" by simptext {* then you can see the lemma is added to the initially empty list. @{ML_response_fake [display,gray] "!my_thms" "[\"True\"]"} You can also add theorems using the command \isacommand{declare}.*}declare test[my_thms] trueI_2[my_thms add]text {* The @{text "add"} is the default operation and does not need to be given. This declaration will cause the theorem list to be updated as follows. @{ML_response_fake [display,gray] "!my_thms" "[\"True\", \"Suc (Suc 0) = 2\"]"} The theorem @{thm [source] trueI_2} only appears once, since the function @{ML Thm.add_thm} tests for duplicates, before extending the list. Deletion from the list works as follows:*}declare test[my_thms del]text {* After this, the theorem list is again: @{ML_response_fake [display,gray] "!my_thms" "[\"True\"]"} We used in this example two functions declared as @{ML Thm.declaration_attribute}, but there can be any number of them. We just have to change the parser for reading the arguments accordingly. However, as said at the beginning of this example, using references for storing theorems is \emph{not} the received way of doing such things. The received way is to start a ``data slot'' in a context by using the functor @{text GenericDataFun}:*}ML {*structure Data = GenericDataFun (type T = thm list val empty = [] val extend = I fun merge _ = Thm.merge_thms) *}text {* To use this data slot, you only have to change @{ML my_thms_add} and @{ML my_thms_del} to:*}ML{*val thm_add = Data.map o Thm.add_thmval thm_del = Data.map o Thm.del_thm*}text {* where @{ML Data.map} updates the data appropriately in the context. Since storing theorems in a special list is such a common task, there is the functor @{text NamedThmsFun}, which does most of the work for you. To obtain such a named theorem lists, you just declare *}ML{*structure FooRules = NamedThmsFun (val name = "foo" val description = "Rules for foo"); *}text {* and set up the @{ML_struct FooRules} with the command*}setup %gray {* FooRules.setup *}text {* This code declares a data slot where the theorems are stored, an attribute @{text foo} (with the @{text add} and @{text del} options for adding and deleting theorems) and an internal ML interface to retrieve and modify the theorems. Furthermore, the facts are made available on the user-level under the dynamic fact name @{text foo}. For example you can declare three lemmas to be of the kind @{text foo} by:*}lemma rule1[foo]: "A" sorrylemma rule2[foo]: "B" sorrylemma rule3[foo]: "C" sorrytext {* and undeclare the first one by: *}declare rule1[foo del]text {* and query the remaining ones with: \begin{isabelle} \isacommand{thm}~@{text "foo"}\\ @{text "> ?C"}\\ @{text "> ?B"} \end{isabelle} On the ML-level the rules marked with @{text "foo"} can be retrieved using the function @{ML FooRules.get}: @{ML_response_fake [display,gray] "FooRules.get @{context}" "[\"?C\",\"?B\"]"} \begin{readmore} For more information see @{ML_file "Pure/Tools/named_thms.ML"} and also the recipe in Section~\ref{recipe:storingdata} about storing arbitrary data. \end{readmore} (FIXME What are: @{text "theory_attributes"}, @{text "proof_attributes"}?) \begin{readmore} FIXME: @{ML_file "Pure/more_thm.ML"} @{ML_file "Pure/Isar/attrib.ML"} \end{readmore}*}section {* Setups (TBD) *}text {* In the previous section we used \isacommand{setup} in order to make a theorem attribute known to Isabelle. What happens behind the scenes is that \isacommand{setup} expects a functions from @{ML_type theory} to @{ML_type theory}: the input theory is the current theory and the output the theory where the theory attribute has been stored. This is a fundamental principle in Isabelle. A similar situation occurs for example with declaring constants. The function that declares a constant on the ML-level is @{ML Sign.add_consts_i}. Recall that ML-code needs to be \isacommand{ML}~@{text "\<verbopen> \<dots> \<verbclose>"}. If you write *} ML{*Sign.add_consts_i [(Binding.name "BAR", @{typ "nat"}, NoSyn)] @{theory} *}text {* for declaring the constant @{text "BAR"} with type @{typ nat} and run the code, then you indeed obtain a theory as result. But if you query the constant with \isacommand{term} \begin{isabelle} \isacommand{term}~@{text [quotes] "BAR"}\\ @{text "> \"BAR\" :: \"'a\""} \end{isabelle} you do not obtain a constant of type @{typ nat}, but a free variable (printed in blue) of polymorphic type. The problem is that the ML-expression above did not register the declaration with the current theory. This is what the command \isacommand{setup} is for. The constant is properly declared with*}setup %gray {* Sign.add_consts_i [(Binding.name "BAR", @{typ "nat"}, NoSyn)] *}text {* Now \begin{isabelle} \isacommand{term}~@{text [quotes] "BAR"}\\ @{text "> \"BAR\" :: \"nat\""} \end{isabelle} returns a (black) constant with the type @{typ nat}. A similar command is \isacommand{local\_setup}, which expects a function of type @{ML_type "local_theory -> local_theory"}. Later on we will also use the commands \isacommand{method\_setup} for installing methods in the current theory and \isacommand{simproc\_setup} for adding new simprocs to the current simpset.*}section {* Theories, Contexts and Local Theories (TBD) *}text {* There are theories, proof contexts and local theories (in this order, if you want to order them). In contrast to an ordinary theory, which simply consists of a type signature, as well as tables for constants, axioms and theorems, a local theory also contains additional context information, such as locally fixed variables and local assumptions that may be used by the package. The type @{ML_type local_theory} is identical to the type of \emph{proof contexts} @{ML_type "Proof.context"}, although not every proof context constitutes a valid local theory.*}section {* Storing Theorems\label{sec:storing} (TBD) *}text {* @{ML PureThy.add_thms_dynamic} *}(* FIXME: some code below *)(*<*)(*setup {* Sign.add_consts_i [(Binding"bar", @{typ "nat"},NoSyn)] *}*)lemma "bar = (1::nat)" oops(*setup {* Sign.add_consts_i [("foo", @{typ "nat"},NoSyn)] #> PureThy.add_defs false [((Binding.name "foo_def", Logic.mk_equals (Const ("FirstSteps.foo", @{typ "nat"}), @{term "1::nat"})), [])] #> snd*}*)(*lemma "foo = (1::nat)" apply(simp add: foo_def) donethm foo_def*)(*>*)section {* Pretty-Printing (TBD) *}text {* @{ML Pretty.big_list}, @{ML Pretty.brk}, @{ML Pretty.block}, @{ML Pretty.chunks}*}section {* Misc (TBD) *}ML {*DatatypePackage.get_datatype @{theory} "List.list"*}end