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|
This is Info file slib.info, produced by Makeinfo-1.64 from the input
file slib.texi.
This file documents SLIB, the portable Scheme library.
Copyright (C) 1993 Todd R. Eigenschink Copyright (C) 1993, 1994, 1995
Aubrey Jaffer
Permission is granted to make and distribute verbatim copies of this
manual provided the copyright notice and this permission notice are
preserved on all copies.
Permission is granted to copy and distribute modified versions of this
manual under the conditions for verbatim copying, provided that the
entire resulting derived work is distributed under the terms of a
permission notice identical to this one.
Permission is granted to copy and distribute translations of this
manual into another language, under the above conditions for modified
versions, except that this permission notice may be stated in a
translation approved by the author.
File: slib.info, Node: Weight-Balanced Trees, Next: Structures, Prev: Relational Database, Up: Data Structures
Weight-Balanced Trees
=====================
`(require 'wt-tree)'
Balanced binary trees are a useful data structure for maintaining
large sets of ordered objects or sets of associations whose keys are
ordered. MIT Scheme has an comprehensive implementation of
weight-balanced binary trees which has several advantages over the
other data structures for large aggregates:
* In addition to the usual element-level operations like insertion,
deletion and lookup, there is a full complement of collection-level
operations, like set intersection, set union and subset test, all
of which are implemented with good orders of growth in time and
space. This makes weight balanced trees ideal for rapid
prototyping of functionally derived specifications.
* An element in a tree may be indexed by its position under the
ordering of the keys, and the ordinal position of an element may
be determined, both with reasonable efficiency.
* Operations to find and remove minimum element make weight balanced
trees simple to use for priority queues.
* The implementation is *functional* rather than *imperative*. This
means that operations like `inserting' an association in a tree do
not destroy the old tree, in much the same way that `(+ 1 x)'
modifies neither the constant 1 nor the value bound to `x'. The
trees are referentially transparent thus the programmer need not
worry about copying the trees. Referential transparency allows
space efficiency to be achieved by sharing subtrees.
These features make weight-balanced trees suitable for a wide range of
applications, especially those that require large numbers of sets or
discrete maps. Applications that have a few global databases and/or
concentrate on element-level operations like insertion and lookup are
probably better off using hash-tables or red-black trees.
The *size* of a tree is the number of associations that it contains.
Weight balanced binary trees are balanced to keep the sizes of the
subtrees of each node within a constant factor of each other. This
ensures logarithmic times for single-path operations (like lookup and
insertion). A weight balanced tree takes space that is proportional to
the number of associations in the tree. For the current
implementation, the constant of proportionality is six words per
association.
Weight balanced trees can be used as an implementation for either
discrete sets or discrete maps (associations). Sets are implemented by
ignoring the datum that is associated with the key. Under this scheme
if an associations exists in the tree this indicates that the key of the
association is a member of the set. Typically a value such as `()',
`#t' or `#f' is associated with the key.
Many operations can be viewed as computing a result that, depending on
whether the tree arguments are thought of as sets or maps, is known by
two different names. An example is `wt-tree/member?', which, when
regarding the tree argument as a set, computes the set membership
operation, but, when regarding the tree as a discrete map,
`wt-tree/member?' is the predicate testing if the map is defined at an
element in its domain. Most names in this package have been chosen
based on interpreting the trees as sets, hence the name
`wt-tree/member?' rather than `wt-tree/defined-at?'.
The weight balanced tree implementation is a run-time-loadable option.
To use weight balanced trees, execute
(load-option 'wt-tree)
once before calling any of the procedures defined here.
* Menu:
* Construction of Weight-Balanced Trees::
* Basic Operations on Weight-Balanced Trees::
* Advanced Operations on Weight-Balanced Trees::
* Indexing Operations on Weight-Balanced Trees::
File: slib.info, Node: Construction of Weight-Balanced Trees, Next: Basic Operations on Weight-Balanced Trees, Prev: Weight-Balanced Trees, Up: Weight-Balanced Trees
Construction of Weight-Balanced Trees
-------------------------------------
Binary trees require there to be a total order on the keys used to
arrange the elements in the tree. Weight balanced trees are organized
by *types*, where the type is an object encapsulating the ordering
relation. Creating a tree is a two-stage process. First a tree type
must be created from the predicate which gives the ordering. The tree
type is then used for making trees, either empty or singleton trees or
trees from other aggregate structures like association lists. Once
created, a tree `knows' its type and the type is used to test
compatibility between trees in operations taking two trees. Usually a
small number of tree types are created at the beginning of a program
and used many times throughout the program's execution.
- procedure+: make-wt-tree-type KEY<?
This procedure creates and returns a new tree type based on the
ordering predicate KEY<?. KEY<? must be a total ordering, having
the property that for all key values `a', `b' and `c':
(key<? a a) => #f
(and (key<? a b) (key<? b a)) => #f
(if (and (key<? a b) (key<? b c))
(key<? a c)
#t) => #t
Two key values are assumed to be equal if neither is less than the
other by KEY<?.
Each call to `make-wt-tree-type' returns a distinct value, and
trees are only compatible if their tree types are `eq?'. A
consequence is that trees that are intended to be used in binary
tree operations must all be created with a tree type originating
from the same call to `make-wt-tree-type'.
- variable+: number-wt-type
A standard tree type for trees with numeric keys. `Number-wt-type'
could have been defined by
(define number-wt-type (make-wt-tree-type <))
- variable+: string-wt-type
A standard tree type for trees with string keys. `String-wt-type'
could have been defined by
(define string-wt-type (make-wt-tree-type string<?))
- procedure+: make-wt-tree WT-TREE-TYPE
This procedure creates and returns a newly allocated weight
balanced tree. The tree is empty, i.e. it contains no
associations. WT-TREE-TYPE is a weight balanced tree type
obtained by calling `make-wt-tree-type'; the returned tree has
this type.
- procedure+: singleton-wt-tree WT-TREE-TYPE KEY DATUM
This procedure creates and returns a newly allocated weight
balanced tree. The tree contains a single association, that of
DATUM with KEY. WT-TREE-TYPE is a weight balanced tree type
obtained by calling `make-wt-tree-type'; the returned tree has
this type.
- procedure+: alist->wt-tree TREE-TYPE ALIST
Returns a newly allocated weight-balanced tree that contains the
same associations as ALIST. This procedure is equivalent to:
(lambda (type alist)
(let ((tree (make-wt-tree type)))
(for-each (lambda (association)
(wt-tree/add! tree
(car association)
(cdr association)))
alist)
tree))
File: slib.info, Node: Basic Operations on Weight-Balanced Trees, Next: Advanced Operations on Weight-Balanced Trees, Prev: Construction of Weight-Balanced Trees, Up: Weight-Balanced Trees
Basic Operations on Weight-Balanced Trees
-----------------------------------------
This section describes the basic tree operations on weight balanced
trees. These operations are the usual tree operations for insertion,
deletion and lookup, some predicates and a procedure for determining the
number of associations in a tree.
- procedure+: wt-tree? OBJECT
Returns `#t' if OBJECT is a weight-balanced tree, otherwise
returns `#f'.
- procedure+: wt-tree/empty? WT-TREE
Returns `#t' if WT-TREE contains no associations, otherwise
returns `#f'.
- procedure+: wt-tree/size WT-TREE
Returns the number of associations in WT-TREE, an exact
non-negative integer. This operation takes constant time.
- procedure+: wt-tree/add WT-TREE KEY DATUM
Returns a new tree containing all the associations in WT-TREE and
the association of DATUM with KEY. If WT-TREE already had an
association for KEY, the new association overrides the old. The
average and worst-case times required by this operation are
proportional to the logarithm of the number of associations in
WT-TREE.
- procedure+: wt-tree/add! WT-TREE KEY DATUM
Associates DATUM with KEY in WT-TREE and returns an unspecified
value. If WT-TREE already has an association for KEY, that
association is replaced. The average and worst-case times
required by this operation are proportional to the logarithm of
the number of associations in WT-TREE.
- procedure+: wt-tree/member? KEY WT-TREE
Returns `#t' if WT-TREE contains an association for KEY, otherwise
returns `#f'. The average and worst-case times required by this
operation are proportional to the logarithm of the number of
associations in WT-TREE.
- procedure+: wt-tree/lookup WT-TREE KEY DEFAULT
Returns the datum associated with KEY in WT-TREE. If WT-TREE
doesn't contain an association for KEY, DEFAULT is returned. The
average and worst-case times required by this operation are
proportional to the logarithm of the number of associations in
WT-TREE.
- procedure+: wt-tree/delete WT-TREE KEY
Returns a new tree containing all the associations in WT-TREE,
except that if WT-TREE contains an association for KEY, it is
removed from the result. The average and worst-case times required
by this operation are proportional to the logarithm of the number
of associations in WT-TREE.
- procedure+: wt-tree/delete! WT-TREE KEY
If WT-TREE contains an association for KEY the association is
removed. Returns an unspecified value. The average and worst-case
times required by this operation are proportional to the logarithm
of the number of associations in WT-TREE.
File: slib.info, Node: Advanced Operations on Weight-Balanced Trees, Next: Indexing Operations on Weight-Balanced Trees, Prev: Basic Operations on Weight-Balanced Trees, Up: Weight-Balanced Trees
Advanced Operations on Weight-Balanced Trees
--------------------------------------------
In the following the *size* of a tree is the number of associations
that the tree contains, and a *smaller* tree contains fewer
associations.
- procedure+: wt-tree/split< WT-TREE BOUND
Returns a new tree containing all and only the associations in
WT-TREE which have a key that is less than BOUND in the ordering
relation of the tree type of WT-TREE. The average and worst-case
times required by this operation are proportional to the logarithm
of the size of WT-TREE.
- procedure+: wt-tree/split> WT-TREE BOUND
Returns a new tree containing all and only the associations in
WT-TREE which have a key that is greater than BOUND in the
ordering relation of the tree type of WT-TREE. The average and
worst-case times required by this operation are proportional to the
logarithm of size of WT-TREE.
- procedure+: wt-tree/union WT-TREE-1 WT-TREE-2
Returns a new tree containing all the associations from both trees.
This operation is asymmetric: when both trees have an association
for the same key, the returned tree associates the datum from
WT-TREE-2 with the key. Thus if the trees are viewed as discrete
maps then `wt-tree/union' computes the map override of WT-TREE-1 by
WT-TREE-2. If the trees are viewed as sets the result is the set
union of the arguments. The worst-case time required by this
operation is proportional to the sum of the sizes of both trees.
If the minimum key of one tree is greater than the maximum key of
the other tree then the time required is at worst proportional to
the logarithm of the size of the larger tree.
- procedure+: wt-tree/intersection WT-TREE-1 WT-TREE-2
Returns a new tree containing all and only those associations from
WT-TREE-1 which have keys appearing as the key of an association
in WT-TREE-2. Thus the associated data in the result are those
from WT-TREE-1. If the trees are being used as sets the result is
the set intersection of the arguments. As a discrete map
operation, `wt-tree/intersection' computes the domain restriction
of WT-TREE-1 to (the domain of) WT-TREE-2. The time required by
this operation is never worse that proportional to the sum of the
sizes of the trees.
- procedure+: wt-tree/difference WT-TREE-1 WT-TREE-2
Returns a new tree containing all and only those associations from
WT-TREE-1 which have keys that *do not* appear as the key of an
association in WT-TREE-2. If the trees are viewed as sets the
result is the asymmetric set difference of the arguments. As a
discrete map operation, it computes the domain restriction of
WT-TREE-1 to the complement of (the domain of) WT-TREE-2. The
time required by this operation is never worse that proportional to
the sum of the sizes of the trees.
- procedure+: wt-tree/subset? WT-TREE-1 WT-TREE-2
Returns `#t' iff the key of each association in WT-TREE-1 is the
key of some association in WT-TREE-2, otherwise returns `#f'.
Viewed as a set operation, `wt-tree/subset?' is the improper subset
predicate. A proper subset predicate can be constructed:
(define (proper-subset? s1 s2)
(and (wt-tree/subset? s1 s2)
(< (wt-tree/size s1) (wt-tree/size s2))))
As a discrete map operation, `wt-tree/subset?' is the subset test
on the domain(s) of the map(s). In the worst-case the time
required by this operation is proportional to the size of
WT-TREE-1.
- procedure+: wt-tree/set-equal? WT-TREE-1 WT-TREE-2
Returns `#t' iff for every association in WT-TREE-1 there is an
association in WT-TREE-2 that has the same key, and *vice versa*.
Viewing the arguments as sets `wt-tree/set-equal?' is the set
equality predicate. As a map operation it determines if two maps
are defined on the same domain.
This procedure is equivalent to
(lambda (wt-tree-1 wt-tree-2)
(and (wt-tree/subset? wt-tree-1 wt-tree-2
(wt-tree/subset? wt-tree-2 wt-tree-1)))
In the worst-case the time required by this operation is
proportional to the size of the smaller tree.
- procedure+: wt-tree/fold COMBINER INITIAL WT-TREE
This procedure reduces WT-TREE by combining all the associations,
using an reverse in-order traversal, so the associations are
visited in reverse order. COMBINER is a procedure of three
arguments: a key, a datum and the accumulated result so far.
Provided COMBINER takes time bounded by a constant, `wt-tree/fold'
takes time proportional to the size of WT-TREE.
A sorted association list can be derived simply:
(wt-tree/fold (lambda (key datum list)
(cons (cons key datum) list))
'()
WT-TREE))
The data in the associations can be summed like this:
(wt-tree/fold (lambda (key datum sum) (+ sum datum))
0
WT-TREE)
- procedure+: wt-tree/for-each ACTION WT-TREE
This procedure traverses the tree in-order, applying ACTION to
each association. The associations are processed in increasing
order of their keys. ACTION is a procedure of two arguments which
take the key and datum respectively of the association. Provided
ACTION takes time bounded by a constant, `wt-tree/for-each' takes
time proportional to in the size of WT-TREE. The example prints
the tree:
(wt-tree/for-each (lambda (key value)
(display (list key value)))
WT-TREE))
File: slib.info, Node: Indexing Operations on Weight-Balanced Trees, Prev: Advanced Operations on Weight-Balanced Trees, Up: Weight-Balanced Trees
Indexing Operations on Weight-Balanced Trees
--------------------------------------------
Weight balanced trees support operations that view the tree as sorted
sequence of associations. Elements of the sequence can be accessed by
position, and the position of an element in the sequence can be
determined, both in logarthmic time.
- procedure+: wt-tree/index WT-TREE INDEX
- procedure+: wt-tree/index-datum WT-TREE INDEX
- procedure+: wt-tree/index-pair WT-TREE INDEX
Returns the 0-based INDEXth association of WT-TREE in the sorted
sequence under the tree's ordering relation on the keys.
`wt-tree/index' returns the INDEXth key, `wt-tree/index-datum'
returns the datum associated with the INDEXth key and
`wt-tree/index-pair' returns a new pair `(KEY . DATUM)' which is
the `cons' of the INDEXth key and its datum. The average and
worst-case times required by this operation are proportional to
the logarithm of the number of associations in the tree.
These operations signal an error if the tree is empty, if
INDEX`<0', or if INDEX is greater than or equal to the number of
associations in the tree.
Indexing can be used to find the median and maximum keys in the
tree as follows:
median: (wt-tree/index WT-TREE (quotient (wt-tree/size WT-TREE) 2))
maximum: (wt-tree/index WT-TREE (-1+ (wt-tree/size WT-TREE)))
- procedure+: wt-tree/rank WT-TREE KEY
Determines the 0-based position of KEY in the sorted sequence of
the keys under the tree's ordering relation, or `#f' if the tree
has no association with for KEY. This procedure returns either an
exact non-negative integer or `#f'. The average and worst-case
times required by this operation are proportional to the logarithm
of the number of associations in the tree.
- procedure+: wt-tree/min WT-TREE
- procedure+: wt-tree/min-datum WT-TREE
- procedure+: wt-tree/min-pair WT-TREE
Returns the association of WT-TREE that has the least key under
the tree's ordering relation. `wt-tree/min' returns the least key,
`wt-tree/min-datum' returns the datum associated with the least
key and `wt-tree/min-pair' returns a new pair `(key . datum)'
which is the `cons' of the minimum key and its datum. The average
and worst-case times required by this operation are proportional
to the logarithm of the number of associations in the tree.
These operations signal an error if the tree is empty. They could
be written
(define (wt-tree/min tree) (wt-tree/index tree 0))
(define (wt-tree/min-datum tree) (wt-tree/index-datum tree 0))
(define (wt-tree/min-pair tree) (wt-tree/index-pair tree 0))
- procedure+: wt-tree/delete-min WT-TREE
Returns a new tree containing all of the associations in WT-TREE
except the association with the least key under the WT-TREE's
ordering relation. An error is signalled if the tree is empty.
The average and worst-case times required by this operation are
proportional to the logarithm of the number of associations in the
tree. This operation is equivalent to
(wt-tree/delete WT-TREE (wt-tree/min WT-TREE))
- procedure+: wt-tree/delete-min! WT-TREE
Removes the association with the least key under the WT-TREE's
ordering relation. An error is signalled if the tree is empty.
The average and worst-case times required by this operation are
proportional to the logarithm of the number of associations in the
tree. This operation is equivalent to
(wt-tree/delete! WT-TREE (wt-tree/min WT-TREE))
File: slib.info, Node: Structures, Prev: Weight-Balanced Trees, Up: Data Structures
Structures
==========
`(require 'struct)' (uses defmacros)
`defmacro's which implement "records" from the book `Essentials of
Programming Languages' by Daniel P. Friedman, M. Wand and C.T. Haynes.
Copyright 1992 Jeff Alexander, Shinnder Lee, and Lewis Patterson
Matthew McDonald <mafm@cs.uwa.edu.au> added field setters.
- Macro: define-record TAG (VAR1 VAR2 ...)
Defines several functions pertaining to record-name TAG:
- Function: make-TAG VAR1 VAR2 ...
- Function: TAG? OBJ
- Function: TAG->VAR1 OBJ
- Function: TAG->VAR2 OBJ
...
- Function: set-TAG-VAR1! OBJ VAL
- Function: set-TAG-VAR2! OBJ VAL
...
Here is an example of its use.
(define-record term (operator left right))
=> #<unspecified>
(define foo (make-term 'plus 1 2))
=> foo
(term-left foo)
=> 1
(set-term-left! foo 2345)
=> #<unspecified>
(term-left foo)
=> 2345
- Macro: variant-case EXP (TAG (VAR1 VAR2 ...) BODY) ...
executes the following for the matching clause:
((lambda (VAR1 VAR ...) BODY)
(TAG->VAR1 EXP)
(TAG->VAR2 EXP) ...)
File: slib.info, Node: Macros, Next: Numerics, Prev: Data Structures, Up: Top
Macros
******
* Menu:
* Defmacro:: Supported by all implementations
* R4RS Macros:: 'macro
* Macro by Example:: 'macro-by-example
* Macros That Work:: 'macros-that-work
* Syntactic Closures:: 'syntactic-closures
* Syntax-Case Macros:: 'syntax-case
Syntax extensions (macros) included with SLIB. Also *Note Structures::.
* Fluid-Let:: 'fluid-let
* Yasos:: 'yasos, 'oop, 'collect
File: slib.info, Node: Defmacro, Next: R4RS Macros, Prev: Macros, Up: Macros
Defmacro
========
Defmacros are supported by all implementations.
- Function: gentemp
Returns a new (interned) symbol each time it is called. The symbol
names are implementation-dependent
(gentemp) => scm:G0
(gentemp) => scm:G1
- Function: defmacro:eval E
Returns the `slib:eval' of expanding all defmacros in scheme
expression E.
- Function: defmacro:load FILENAME
FILENAME should be a string. If filename names an existing file,
the `defmacro:load' procedure reads Scheme source code expressions
and definitions from the file and evaluates them sequentially.
These source code expressions and definitions may contain defmacro
definitions. The `macro:load' procedure does not affect the values
returned by `current-input-port' and `current-output-port'.
- Function: defmacro? SYM
Returns `#t' if SYM has been defined by `defmacro', `#f' otherwise.
- Function: macroexpand-1 FORM
- Function: macroexpand FORM
If FORM is a macro call, `macroexpand-1' will expand the macro
call once and return it. A FORM is considered to be a macro call
only if it is a cons whose `car' is a symbol for which a `defmacr'
has been defined.
`macroexpand' is similar to `macroexpand-1', but repeatedly
expands FORM until it is no longer a macro call.
- Macro: defmacro NAME LAMBDA-LIST FORM ...
When encountered by `defmacro:eval', `defmacro:macroexpand*', or
`defmacro:load' defines a new macro which will henceforth be
expanded when encountered by `defmacro:eval',
`defmacro:macroexpand*', or `defmacro:load'.
Defmacroexpand
--------------
`(require 'defmacroexpand)'
- Function: defmacro:expand* E
Returns the result of expanding all defmacros in scheme expression
E.
File: slib.info, Node: R4RS Macros, Next: Macro by Example, Prev: Defmacro, Up: Macros
R4RS Macros
===========
`(require 'macro)' is the appropriate call if you want R4RS
high-level macros but don't care about the low level implementation. If
an SLIB R4RS macro implementation is already loaded it will be used.
Otherwise, one of the R4RS macros implemetations is loaded.
The SLIB R4RS macro implementations support the following uniform
interface:
- Function: macro:expand SEXPRESSION
Takes an R4RS expression, macro-expands it, and returns the result
of the macro expansion.
- Function: macro:eval SEXPRESSION
Takes an R4RS expression, macro-expands it, evals the result of the
macro expansion, and returns the result of the evaluation.
- Procedure: macro:load FILENAME
FILENAME should be a string. If filename names an existing file,
the `macro:load' procedure reads Scheme source code expressions and
definitions from the file and evaluates them sequentially. These
source code expressions and definitions may contain macro
definitions. The `macro:load' procedure does not affect the
values returned by `current-input-port' and `current-output-port'.
File: slib.info, Node: Macro by Example, Next: Macros That Work, Prev: R4RS Macros, Up: Macros
Macro by Example
================
`(require 'macro-by-example)'
A vanilla implementation of `Macro by Example' (Eugene Kohlbecker,
R4RS) by Dorai Sitaram, (dorai@cs.rice.edu) using `defmacro'.
* generating hygienic global `define-syntax' Macro-by-Example macros
*cheaply*.
* can define macros which use `...'.
* needn't worry about a lexical variable in a macro definition
clashing with a variable from the macro use context
* don't suffer the overhead of redefining the repl if `defmacro'
natively supported (most implementations)
Caveat
------
These macros are not referentially transparent (*note Macros:
(r4rs)Macros.). Lexically scoped macros (i.e., `let-syntax' and
`letrec-syntax') are not supported. In any case, the problem of
referential transparency gains poignancy only when `let-syntax' and
`letrec-syntax' are used. So you will not be courting large-scale
disaster unless you're using system-function names as local variables
with unintuitive bindings that the macro can't use. However, if you
must have the full `r4rs' macro functionality, look to the more
featureful (but also more expensive) versions of syntax-rules available
in slib *Note Macros That Work::, *Note Syntactic Closures::, and *Note
Syntax-Case Macros::.
- Macro: define-syntax KEYWORD TRANSFORMER-SPEC
The KEYWORD is an identifier, and the TRANSFORMER-SPEC should be
an instance of `syntax-rules'.
The top-level syntactic environment is extended by binding the
KEYWORD to the specified transformer.
(define-syntax let*
(syntax-rules ()
((let* () body1 body2 ...)
(let () body1 body2 ...))
((let* ((name1 val1) (name2 val2) ...)
body1 body2 ...)
(let ((name1 val1))
(let* (( name2 val2) ...)
body1 body2 ...)))))
- Macro: syntax-rules LITERALS SYNTAX-RULE ...
LITERALS is a list of identifiers, and each SYNTAX-RULE should be
of the form
`(PATTERN TEMPLATE)'
where the PATTERN and TEMPLATE are as in the grammar above.
An instance of `syntax-rules' produces a new macro transformer by
specifying a sequence of hygienic rewrite rules. A use of a macro
whose keyword is associated with a transformer specified by
`syntax-rules' is matched against the patterns contained in the
SYNTAX-RULEs, beginning with the leftmost SYNTAX-RULE. When a
match is found, the macro use is trancribed hygienically according
to the template.
Each pattern begins with the keyword for the macro. This keyword
is not involved in the matching and is not considered a pattern
variable or literal identifier.
File: slib.info, Node: Macros That Work, Next: Syntactic Closures, Prev: Macro by Example, Up: Macros
Macros That Work
================
`(require 'macros-that-work)'
`Macros That Work' differs from the other R4RS macro implementations
in that it does not expand derived expression types to primitive
expression types.
- Function: macro:expand EXPRESSION
- Function: macwork:expand EXPRESSION
Takes an R4RS expression, macro-expands it, and returns the result
of the macro expansion.
- Function: macro:eval EXPRESSION
- Function: macwork:eval EXPRESSION
`macro:eval' returns the value of EXPRESSION in the current top
level environment. EXPRESSION can contain macro definitions.
Side effects of EXPRESSION will affect the top level environment.
- Procedure: macro:load FILENAME
- Procedure: macwork:load FILENAME
FILENAME should be a string. If filename names an existing file,
the `macro:load' procedure reads Scheme source code expressions and
definitions from the file and evaluates them sequentially. These
source code expressions and definitions may contain macro
definitions. The `macro:load' procedure does not affect the
values returned by `current-input-port' and `current-output-port'.
References:
The `Revised^4 Report on the Algorithmic Language Scheme' Clinger and
Rees [editors]. To appear in LISP Pointers. Also available as a
technical report from the University of Oregon, MIT AI Lab, and Cornell.
Macros That Work. Clinger and Rees. POPL '91.
The supported syntax differs from the R4RS in that vectors are allowed
as patterns and as templates and are not allowed as pattern or template
data.
transformer spec ==> (syntax-rules literals rules)
rules ==> ()
| (rule . rules)
rule ==> (pattern template)
pattern ==> pattern_var ; a symbol not in literals
| symbol ; a symbol in literals
| ()
| (pattern . pattern)
| (ellipsis_pattern)
| #(pattern*) ; extends R4RS
| #(pattern* ellipsis_pattern) ; extends R4RS
| pattern_datum
template ==> pattern_var
| symbol
| ()
| (template2 . template2)
| #(template*) ; extends R4RS
| pattern_datum
template2 ==> template
| ellipsis_template
pattern_datum ==> string ; no vector
| character
| boolean
| number
ellipsis_pattern ==> pattern ...
ellipsis_template ==> template ...
pattern_var ==> symbol ; not in literals
literals ==> ()
| (symbol . literals)
Definitions
-----------
Scope of an ellipsis
Within a pattern or template, the scope of an ellipsis (`...') is
the pattern or template that appears to its left.
Rank of a pattern variable
The rank of a pattern variable is the number of ellipses within
whose scope it appears in the pattern.
Rank of a subtemplate
The rank of a subtemplate is the number of ellipses within whose
scope it appears in the template.
Template rank of an occurrence of a pattern variable
The template rank of an occurrence of a pattern variable within a
template is the rank of that occurrence, viewed as a subtemplate.
Variables bound by a pattern
The variables bound by a pattern are the pattern variables that
appear within it.
Referenced variables of a subtemplate
The referenced variables of a subtemplate are the pattern
variables that appear within it.
Variables opened by an ellipsis template
The variables opened by an ellipsis template are the referenced
pattern variables whose rank is greater than the rank of the
ellipsis template.
Restrictions
------------
No pattern variable appears more than once within a pattern.
For every occurrence of a pattern variable within a template, the
template rank of the occurrence must be greater than or equal to the
pattern variable's rank.
Every ellipsis template must open at least one variable.
For every ellipsis template, the variables opened by an ellipsis
template must all be bound to sequences of the same length.
The compiled form of a RULE is
rule ==> (pattern template inserted)
pattern ==> pattern_var
| symbol
| ()
| (pattern . pattern)
| ellipsis_pattern
| #(pattern)
| pattern_datum
template ==> pattern_var
| symbol
| ()
| (template2 . template2)
| #(pattern)
| pattern_datum
template2 ==> template
| ellipsis_template
pattern_datum ==> string
| character
| boolean
| number
pattern_var ==> #(V symbol rank)
ellipsis_pattern ==> #(E pattern pattern_vars)
ellipsis_template ==> #(E template pattern_vars)
inserted ==> ()
| (symbol . inserted)
pattern_vars ==> ()
| (pattern_var . pattern_vars)
rank ==> exact non-negative integer
where V and E are unforgeable values.
The pattern variables associated with an ellipsis pattern are the
variables bound by the pattern, and the pattern variables associated
with an ellipsis template are the variables opened by the ellipsis
template.
If the template contains a big chunk that contains no pattern
variables or inserted identifiers, then the big chunk will be copied
unnecessarily. That shouldn't matter very often.
|