;;;; (sxml-tolerant xpath) -- SXPath
;;;;
;;;; Copyright (C) 2009 Free Software Foundation, Inc.
;;;; Modified 2004 by Andy Wingo .
;;;; Written 2001 by Oleg Kiselyov SXPath.scm.
;;;;
;;;; This library is free software; you can redistribute it and/or
;;;; modify it under the terms of the GNU Lesser General Public
;;;; License as published by the Free Software Foundation; either
;;;; version 3 of the License, or (at your option) any later version.
;;;;
;;;; This library is distributed in the hope that it will be useful,
;;;; but WITHOUT ANY WARRANTY; without even the implied warranty of
;;;; MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
;;;; Lesser General Public License for more details.
;;;;
;;;; You should have received a copy of the GNU Lesser General Public
;;;; License along with this library; if not, write to the Free Software
;;;; Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
;;;;
;;; Commentary:
;;
;;@heading SXPath: SXML Query Language
;;
;; SXPath is a query language for SXML, an instance of XML Information
;; set (Infoset) in the form of s-expressions. See @code{(sxml-tolerant ssax)}
;; for the definition of SXML and more details. SXPath is also a
;; translation into Scheme of an XML Path Language,
;; @uref{http://www.w3.org/TR/xpath,XPath}. XPath and SXPath describe
;; means of selecting a set of Infoset's items or their properties.
;;
;; To facilitate queries, XPath maps the XML Infoset into an explicit
;; tree, and introduces important notions of a location path and a
;; current, context node. A location path denotes a selection of a set of
;; nodes relative to a context node. Any XPath tree has a distinguished,
;; root node -- which serves as the context node for absolute location
;; paths. Location path is recursively defined as a location step joined
;; with a location path. A location step is a simple query of the
;; database relative to a context node. A step may include expressions
;; that further filter the selected set. Each node in the resulting set
;; is used as a context node for the adjoining location path. The result
;; of the step is a union of the sets returned by the latter location
;; paths.
;;
;; The SXML representation of the XML Infoset (see SSAX.scm) is rather
;; suitable for querying as it is. Bowing to the XPath specification,
;; we will refer to SXML information items as 'Nodes':
;;@example
;; ::= | |
;; | "text string" |
;;@end example
;; This production can also be described as
;;@example
;; ::= (name . ) | "text string"
;;@end example
;; An (ordered) set of nodes is just a list of the constituent nodes:
;;@example
;; ::= ( ...)
;;@end example
;; Nodesets, and Nodes other than text strings are both lists. A
;; however is either an empty list, or a list whose head is not
;; a symbol. A symbol at the head of a node is either an XML name (in
;; which case it's a tag of an XML element), or an administrative name
;; such as '@@'. This uniform list representation makes processing rather
;; simple and elegant, while avoiding confusion. The multi-branch tree
;; structure formed by the mutually-recursive datatypes and
;; lends itself well to processing by functional languages.
;;
;; A location path is in fact a composite query over an XPath tree or
;; its branch. A singe step is a combination of a projection, selection
;; or a transitive closure. Multiple steps are combined via join and
;; union operations. This insight allows us to @emph{elegantly}
;; implement XPath as a sequence of projection and filtering primitives
;; -- converters -- joined by @dfn{combinators}. Each converter takes a
;; node and returns a nodeset which is the result of the corresponding
;; query relative to that node. A converter can also be called on a set
;; of nodes. In that case it returns a union of the corresponding
;; queries over each node in the set. The union is easily implemented as
;; a list append operation as all nodes in a SXML tree are considered
;; distinct, by XPath conventions. We also preserve the order of the
;; members in the union. Query combinators are high-order functions:
;; they take converter(s) (which is a Node|Nodeset -> Nodeset function)
;; and compose or otherwise combine them. We will be concerned with only
;; relative location paths [XPath]: an absolute location path is a
;; relative path applied to the root node.
;;
;; Similarly to XPath, SXPath defines full and abbreviated notations
;; for location paths. In both cases, the abbreviated notation can be
;; mechanically expanded into the full form by simple rewriting
;; rules. In case of SXPath the corresponding rules are given as
;; comments to a sxpath function, below. The regression test suite at
;; the end of this file shows a representative sample of SXPaths in
;; both notations, juxtaposed with the corresponding XPath
;; expressions. Most of the samples are borrowed literally from the
;; XPath specification, while the others are adjusted for our running
;; example, tree1.
;;
;;; Code:
(define-module (sxml-tolerant xpath)
#:use-module (ice-9 pretty-print)
#:export (nodeset? node-typeof? node-eq? node-equal? node-pos
filter take-until take-after map-union node-reverse
node-trace select-kids node-self node-join node-reduce
node-or node-closure node-parent
sxpath))
;; Upstream version:
; $Id: SXPath.scm,v 3.5 2001/01/12 23:20:35 oleg Exp oleg $
(define (nodeset? x)
(or (and (pair? x) (not (symbol? (car x)))) (null? x)))
;-------------------------
; Basic converters and applicators
; A converter is a function
; type Converter = Node|Nodeset -> Nodeset
; A converter can also play a role of a predicate: in that case, if a
; converter, applied to a node or a nodeset, yields a non-empty
; nodeset, the converter-predicate is deemed satisfied. Throughout
; this file a nil nodeset is equivalent to #f in denoting a failure.
; The following function implements a 'Node test' as defined in
; Sec. 2.3 of XPath document. A node test is one of the components of a
; location step. It is also a converter-predicate in SXPath.
;
; The function node-typeof? takes a type criterion and returns a function,
; which, when applied to a node, will tell if the node satisfies
; the test.
; node-typeof? :: Crit -> Node -> Boolean
;
; The criterion 'crit' is a symbol, one of the following:
; id - tests if the Node has the right name (id)
; @ - tests if the Node is an
; * - tests if the Node is an
; *text* - tests if the Node is a text node
; *PI* - tests if the Node is a PI node
; *any* - #t for any type of Node
(define (node-typeof? crit)
(lambda (node)
(case crit
((*) (and (pair? node) (not (memq (car node) '(@ *PI*)))))
((*any*) #t)
((*text*) (string? node))
(else
(and (pair? node) (eq? crit (car node))))
)))
; Curried equivalence converter-predicates
(define (node-eq? other)
(lambda (node)
(eq? other node)))
(define (node-equal? other)
(lambda (node)
(equal? other node)))
; node-pos:: N -> Nodeset -> Nodeset, or
; node-pos:: N -> Converter
; Select the N'th element of a Nodeset and return as a singular Nodeset;
; Return an empty nodeset if the Nth element does not exist.
; ((node-pos 1) Nodeset) selects the node at the head of the Nodeset,
; if exists; ((node-pos 2) Nodeset) selects the Node after that, if
; exists.
; N can also be a negative number: in that case the node is picked from
; the tail of the list.
; ((node-pos -1) Nodeset) selects the last node of a non-empty nodeset;
; ((node-pos -2) Nodeset) selects the last but one node, if exists.
(define (node-pos n)
(lambda (nodeset)
(cond
((not (nodeset? nodeset)) '())
((null? nodeset) nodeset)
((eqv? n 1) (list (car nodeset)))
((negative? n) ((node-pos (+ n 1 (length nodeset))) nodeset))
(else
(or (positive? n) (error "yikes!"))
((node-pos (1- n)) (cdr nodeset))))))
; filter:: Converter -> Converter
; A filter applicator, which introduces a filtering context. The argument
; converter is considered a predicate, with either #f or nil result meaning
; failure.
(define (filter pred?)
(lambda (lst) ; a nodeset or a node (will be converted to a singleton nset)
(let loop ((lst (if (nodeset? lst) lst (list lst))) (res '()))
(if (null? lst)
(reverse res)
(let ((pred-result (pred? (car lst))))
(loop (cdr lst)
(if (and pred-result (not (null? pred-result)))
(cons (car lst) res)
res)))))))
; take-until:: Converter -> Converter, or
; take-until:: Pred -> Node|Nodeset -> Nodeset
; Given a converter-predicate and a nodeset, apply the predicate to
; each element of the nodeset, until the predicate yields anything but #f or
; nil. Return the elements of the input nodeset that have been processed
; till that moment (that is, which fail the predicate).
; take-until is a variation of the filter above: take-until passes
; elements of an ordered input set till (but not including) the first
; element that satisfies the predicate.
; The nodeset returned by ((take-until (not pred)) nset) is a subset --
; to be more precise, a prefix -- of the nodeset returned by
; ((filter pred) nset)
(define (take-until pred?)
(lambda (lst) ; a nodeset or a node (will be converted to a singleton nset)
(let loop ((lst (if (nodeset? lst) lst (list lst))))
(if (null? lst) lst
(let ((pred-result (pred? (car lst))))
(if (and pred-result (not (null? pred-result)))
'()
(cons (car lst) (loop (cdr lst)))))
))))
; take-after:: Converter -> Converter, or
; take-after:: Pred -> Node|Nodeset -> Nodeset
; Given a converter-predicate and a nodeset, apply the predicate to
; each element of the nodeset, until the predicate yields anything but #f or
; nil. Return the elements of the input nodeset that have not been processed:
; that is, return the elements of the input nodeset that follow the first
; element that satisfied the predicate.
; take-after along with take-until partition an input nodeset into three
; parts: the first element that satisfies a predicate, all preceding
; elements and all following elements.
(define (take-after pred?)
(lambda (lst) ; a nodeset or a node (will be converted to a singleton nset)
(let loop ((lst (if (nodeset? lst) lst (list lst))))
(if (null? lst) lst
(let ((pred-result (pred? (car lst))))
(if (and pred-result (not (null? pred-result)))
(cdr lst)
(loop (cdr lst))))
))))
; Apply proc to each element of lst and return the list of results.
; if proc returns a nodeset, splice it into the result
;
; From another point of view, map-union is a function Converter->Converter,
; which places an argument-converter in a joining context.
(define (map-union proc lst)
(if (null? lst) lst
(let ((proc-res (proc (car lst))))
((if (nodeset? proc-res) append cons)
proc-res (map-union proc (cdr lst))))))
; node-reverse :: Converter, or
; node-reverse:: Node|Nodeset -> Nodeset
; Reverses the order of nodes in the nodeset
; This basic converter is needed to implement a reverse document order
; (see the XPath Recommendation).
(define node-reverse
(lambda (node-or-nodeset)
(if (not (nodeset? node-or-nodeset)) (list node-or-nodeset)
(reverse node-or-nodeset))))
; node-trace:: String -> Converter
; (node-trace title) is an identity converter. In addition it prints out
; a node or nodeset it is applied to, prefixed with the 'title'.
; This converter is very useful for debugging.
(define (node-trace title)
(lambda (node-or-nodeset)
(display "\n-->")
(display title)
(display " :")
(pretty-print node-or-nodeset)
node-or-nodeset))
;-------------------------
; Converter combinators
;
; Combinators are higher-order functions that transmogrify a converter
; or glue a sequence of converters into a single, non-trivial
; converter. The goal is to arrive at converters that correspond to
; XPath location paths.
;
; From a different point of view, a combinator is a fixed, named
; _pattern_ of applying converters. Given below is a complete set of
; such patterns that together implement XPath location path
; specification. As it turns out, all these combinators can be built
; from a small number of basic blocks: regular functional composition,
; map-union and filter applicators, and the nodeset union.
; select-kids:: Pred -> Node -> Nodeset
; Given a Node, return an (ordered) subset its children that satisfy
; the Pred (a converter, actually)
; select-kids:: Pred -> Nodeset -> Nodeset
; The same as above, but select among children of all the nodes in
; the Nodeset
;
; More succinctly, the signature of this function is
; select-kids:: Converter -> Converter
(define (select-kids test-pred?)
(lambda (node) ; node or node-set
(cond
((null? node) node)
((not (pair? node)) '()) ; No children
((symbol? (car node))
((filter test-pred?) (cdr node))) ; it's a single node
(else (map-union (select-kids test-pred?) node)))))
; node-self:: Pred -> Node -> Nodeset, or
; node-self:: Converter -> Converter
; Similar to select-kids but apply to the Node itself rather
; than to its children. The resulting Nodeset will contain either one
; component, or will be empty (if the Node failed the Pred).
(define node-self filter)
; node-join:: [LocPath] -> Node|Nodeset -> Nodeset, or
; node-join:: [Converter] -> Converter
; join the sequence of location steps or paths as described
; in the title comments above.
(define (node-join . selectors)
(lambda (nodeset) ; Nodeset or node
(let loop ((nodeset nodeset) (selectors selectors))
(if (null? selectors) nodeset
(loop
(if (nodeset? nodeset)
(map-union (car selectors) nodeset)
((car selectors) nodeset))
(cdr selectors))))))
; node-reduce:: [LocPath] -> Node|Nodeset -> Nodeset, or
; node-reduce:: [Converter] -> Converter
; A regular functional composition of converters.
; From a different point of view,
; ((apply node-reduce converters) nodeset)
; is equivalent to
; (foldl apply nodeset converters)
; i.e., folding, or reducing, a list of converters with the nodeset
; as a seed.
(define (node-reduce . converters)
(lambda (nodeset) ; Nodeset or node
(let loop ((nodeset nodeset) (converters converters))
(if (null? converters) nodeset
(loop ((car converters) nodeset) (cdr converters))))))
; node-or:: [Converter] -> Converter
; This combinator applies all converters to a given node and
; produces the union of their results.
; This combinator corresponds to a union, '|' operation for XPath
; location paths.
; (define (node-or . converters)
; (lambda (node-or-nodeset)
; (if (null? converters) node-or-nodeset
; (append
; ((car converters) node-or-nodeset)
; ((apply node-or (cdr converters)) node-or-nodeset)))))
; More optimal implementation follows
(define (node-or . converters)
(lambda (node-or-nodeset)
(let loop ((result '()) (converters converters))
(if (null? converters) result
(loop (append result (or ((car converters) node-or-nodeset) '()))
(cdr converters))))))
; node-closure:: Converter -> Converter
; Select all _descendants_ of a node that satisfy a converter-predicate.
; This combinator is similar to select-kids but applies to
; grand... children as well.
; This combinator implements the "descendant::" XPath axis
; Conceptually, this combinator can be expressed as
; (define (node-closure f)
; (node-or
; (select-kids f)
; (node-reduce (select-kids (node-typeof? '*)) (node-closure f))))
; This definition, as written, looks somewhat like a fixpoint, and it
; will run forever. It is obvious however that sooner or later
; (select-kids (node-typeof? '*)) will return an empty nodeset. At
; this point further iterations will no longer affect the result and
; can be stopped.
(define (node-closure test-pred?)
(lambda (node) ; Nodeset or node
(let loop ((parent node) (result '()))
(if (null? parent) result
(loop ((select-kids (node-typeof? '*)) parent)
(append result
((select-kids test-pred?) parent)))
))))
; node-parent:: RootNode -> Converter
; (node-parent rootnode) yields a converter that returns a parent of a
; node it is applied to. If applied to a nodeset, it returns the list
; of parents of nodes in the nodeset. The rootnode does not have
; to be the root node of the whole SXML tree -- it may be a root node
; of a branch of interest.
; Given the notation of Philip Wadler's paper on semantics of XSLT,
; parent(x) = { y | y=subnode*(root), x=subnode(y) }
; Therefore, node-parent is not the fundamental converter: it can be
; expressed through the existing ones. Yet node-parent is a rather
; convenient converter. It corresponds to a parent:: axis of SXPath.
; Note that the parent:: axis can be used with an attribute node as well!
(define (node-parent rootnode)
(lambda (node) ; Nodeset or node
(if (nodeset? node) (map-union (node-parent rootnode) node)
(let ((pred
(node-or
(node-reduce
(node-self (node-typeof? '*))
(select-kids (node-eq? node)))
(node-join
(select-kids (node-typeof? '@))
(select-kids (node-eq? node))))))
((node-or
(node-self pred)
(node-closure pred))
rootnode)))))
;-------------------------
; Evaluate an abbreviated SXPath
; sxpath:: AbbrPath -> Converter, or
; sxpath:: AbbrPath -> Node|Nodeset -> Nodeset
; AbbrPath is a list. It is translated to the full SXPath according
; to the following rewriting rules
; (sxpath '()) -> (node-join)
; (sxpath '(path-component ...)) ->
; (node-join (sxpath1 path-component) (sxpath '(...)))
; (sxpath1 '//) -> (node-or
; (node-self (node-typeof? '*any*))
; (node-closure (node-typeof? '*any*)))
; (sxpath1 '(equal? x)) -> (select-kids (node-equal? x))
; (sxpath1 '(eq? x)) -> (select-kids (node-eq? x))
; (sxpath1 ?symbol) -> (select-kids (node-typeof? ?symbol)
; (sxpath1 procedure) -> procedure
; (sxpath1 '(?symbol ...)) -> (sxpath1 '((?symbol) ...))
; (sxpath1 '(path reducer ...)) ->
; (node-reduce (sxpath path) (sxpathr reducer) ...)
; (sxpathr number) -> (node-pos number)
; (sxpathr path-filter) -> (filter (sxpath path-filter))
(define (sxpath path)
(lambda (nodeset)
(let loop ((nodeset nodeset) (path path))
(cond
((null? path) nodeset)
((nodeset? nodeset)
(map-union (sxpath path) nodeset))
((procedure? (car path))
(loop ((car path) nodeset) (cdr path)))
((eq? '// (car path))
(loop
((if (nodeset? nodeset) append cons) nodeset
((node-closure (node-typeof? '*any*)) nodeset))
(cdr path)))
((symbol? (car path))
(loop ((select-kids (node-typeof? (car path))) nodeset)
(cdr path)))
((and (pair? (car path)) (eq? 'equal? (caar path)))
(loop ((select-kids (apply node-equal? (cdar path))) nodeset)
(cdr path)))
((and (pair? (car path)) (eq? 'eq? (caar path)))
(loop ((select-kids (apply node-eq? (cdar path))) nodeset)
(cdr path)))
((pair? (car path))
(let reducer ((nodeset
(if (symbol? (caar path))
((select-kids (node-typeof? (caar path))) nodeset)
(loop nodeset (caar path))))
(reducing-path (cdar path)))
(cond
((null? reducing-path) (loop nodeset (cdr path)))
((number? (car reducing-path))
(reducer ((node-pos (car reducing-path)) nodeset)
(cdr reducing-path)))
(else
(reducer ((filter (sxpath (car reducing-path))) nodeset)
(cdr reducing-path))))))
(else
(error "Invalid path step: " (car path)))))))
;;; arch-tag: c4e57abf-6b61-4612-a6aa-d1536d440774
;;; xpath.scm ends here