Annotation of OpenXM/src/asir-doc/parts/builtin/array.texi, Revision 1.2
1.2 ! noro 1: @comment $OpenXM$
! 2: \BJP
1.1 noro 3: @node �$BG[Ns�(B,,, �$BAH$_9~$_H!?t�(B
4: @section �$BG[Ns�(B
1.2 ! noro 5: \E
! 6: \BEG
! 7: @node Arrays,,, Built-in Function
! 8: @section Arrays
! 9: \E
1.1 noro 10:
11: @menu
12: * newvect::
13: * vtol::
14: * newmat::
15: * size::
16: * det::
17: * qsort::
18: @end menu
19:
1.2 ! noro 20: \JP @node newvect,,, �$BG[Ns�(B
! 21: \EG @node newvect,,, Arrays
1.1 noro 22: @subsection @code{newvect}
23: @findex newvect
24:
25: @table @t
26: @item newvect(@var{len}[,@var{list}])
1.2 ! noro 27: \JP :: �$BD9$5�(B @var{len} �$B$N%Y%/%H%k$r@8@.$9$k�(B.
! 28: \EG :: Creates a new vector object with its length @var{len}.
1.1 noro 29: @end table
30:
31: @table @var
32: @item return
1.2 ! noro 33: \JP �$B%Y%/%H%k�(B
! 34: \EG vector
1.1 noro 35: @item len
1.2 ! noro 36: \JP �$B<+A3?t�(B
! 37: \EG non-negative integer
1.1 noro 38: @item list
1.2 ! noro 39: \JP �$B%j%9%H�(B
! 40: \EG list
1.1 noro 41: @end table
42:
43: @itemize @bullet
1.2 ! noro 44: \BJP
1.1 noro 45: @item
46: �$BD9$5�(B @var{len} �$B$N%Y%/%H%k$r@8@.$9$k�(B. �$BBh�(B 2 �$B0z?t$,$J$$>l9g�(B,
47: �$B3F@.J,$O�(B 0 �$B$K=i4|2=$5$l$k�(B. �$BBh�(B 2 �$B0z?t$,$"$k>l9g�(B,
48: �$B%$%s%G%C%/%9$N>.$5$$@.J,$+$i�(B, �$B%j%9%H$N�(B
49: �$B3FMWAG$K$h$j=i4|2=$5$l$k�(B. �$B3FMWAG$O�(B, �$B@hF,$+$i=g$K�(B
50: �$B;H$o$l�(B, �$BB-$j$J$$J,$O�(B 0 �$B$,Kd$a$i$l$k�(B.
51: @item
52: �$B%Y%/%H%k$N@.J,$O�(B, �$BBh�(B 0 �$B@.J,$+$iBh�(B @var{len}-1 �$B@.J,$H$J$k�(B.
53: (�$BBh�(B 1 �$B@.J,$+$i$G$O$J$$;v$KCm0U�(B. )
54: @item
55: �$B%j%9%H$O3F@.J,$,�(B, �$B%]%$%s%?$rC)$k;v$K$h$C$F%7!<%1%s%7%c%k$K�(B
56: �$B8F$S=P$5$l$k$N$KBP$7�(B, �$B%Y%/%H%k$O3F@.J,$,�(B
57: �$BBh0l@.J,$+$i$N%a%b%j>e$N�(B displacement (�$BJQ0L�(B)�$B$K$h$C$F%i%s%@%`%"%/%;%9$G�(B
58: �$B8F$S=P$5$l�(B, �$B$=$N7k2L�(B, �$B@.J,$N%"%/%;%9;~4V$KBg$-$J:9$,=P$F$/$k�(B.
59: �$B@.J,%"%/%;%9$O�(B, �$B%j%9%H$G$O�(B, �$B@.J,$NNL$,A}$($k$K=>$C$F�(B
60: �$B;~4V$,$+$+$k$h$&$K$J$k$,�(B, �$B%Y%/%H%k$G$O�(B, �$B@.J,$NNL$K0MB8$;$:$[$\0lDj$G$"$k�(B.
61: @item
62: @b{Asir} �$B$G$O�(B, �$B=D%Y%/%H%k�(B, �$B2#%Y%/%H%k$N6hJL$O$J$$�(B.
63: �$B9TNs$r:8$+$i3]$1$l$P=D%Y%/%H%k$H$_$J$5$l$k$7�(B, �$B1&$+$i3]$1$l$P2#%Y%/%H%k$H�(B
64: �$B$_$J$5$l$k�(B.
65: @item
66: �$B%Y%/%H%k$ND9$5$O�(B @code{size()} �$B$K$h$C$FF@$i$l$k�(B.
67: @item
68: �$BH!?t$N0z?t$H$7$F%Y%/%H%k$rEO$7$?>l9g�(B, �$BEO$5$l$?H!?t$O�(B, �$B$=$N%Y%/%H%k$N@.J,�(B
69: �$B$r=q$-49$($k$3$H$,$G$-$k�(B.
1.2 ! noro 70: \E
! 71: \BEG
! 72: @item
! 73: Creates a new vector object with its length @var{len} and its elements
! 74: all cleared to value 0.
! 75: If the second argument, a list, is given, the vector is initialized by
! 76: the list elements.
! 77: Elements are used from the first through the last.
! 78: If the list is short for initializing the full vector,
! 79: 0's are filled in the remaining vector elements.
! 80: @item
! 81: Elements are indexed from 0 through @var{len}-1. Note that the first
! 82: element has not index 1.
! 83: @item
! 84: List and vector are different types in @b{Asir}.
! 85: Lists are conveniently used for representing many data objects whose
! 86: size varies dynamically as computation proceeds.
! 87: By its flexible expressive power, it is also conveniently used to
! 88: describe initial values for other structured objects as you see
! 89: for vectors.
! 90: Access for an element of a list is performed by following pointers to
! 91: next elements. By this, access costs for list elements differ for
! 92: each element.
! 93: In contrast to lists, vector elements can be accessed in a same time,
! 94: because they are accessed by computing displacements from the top memory
! 95: location of the vector object.
! 96:
! 97: Note also, in @b{Asir}, modification of an element of a vector causes
! 98: modification of the whole vector itself,
! 99: while modification of a list element does not cause the modification
! 100: of the whole list object.
! 101:
! 102: By this, in @b{Asir} language,
! 103: a vector element designator can be a left value of
! 104: assignment statement, but a list element designator can NOT be a left
! 105: value of assignment statement.
! 106:
! 107: @item
! 108: No distinction of column vectors and row vectors in @b{Asir}.
! 109: If a matrix is applied to a vector from left, the vector shall be taken
! 110: as a column vector, and if from right it shall be taken as a row vector.
! 111: @item
! 112: The length (or size or dimension) of a vector is given by function
! 113: @code{size()}.
! 114: @item
! 115: When a vector is passed to a function as its argument
! 116: (actual parameter), the vector element can be modified in that
! 117: function.
! 118:
! 119: @item
! 120: A vector is displayed in a similar format as for a list.
! 121: Note, however, there is a distinction: Elements of a vector are
! 122: separated simply by a `blank space', while those of a list by a `comma.'
! 123: \E
1.1 noro 124: @end itemize
125:
126: @example
127: [0] A=newvect(5);
128: [ 0 0 0 0 0 ]
129: [1] A=newvect(5,[1,2,3,4,[5,6]]);
130: [ 1 2 3 4 [5,6] ]
131: [2] A[0];
132: 1
133: [3] A[4];
134: [5,6]
135: [4] size(A);
136: [5]
137: [5] def afo(V) @{ V[0] = x; @}
138: [6] afo(A)$
139: [7] A;
140: [ x 2 3 4 [5,6] ]
141: @end example
142:
143: @table @t
1.2 ! noro 144: \JP @item �$B;2>H�(B
! 145: \EG @item References
1.1 noro 146: @fref{newmat}, @fref{size}.
147: @end table
148:
1.2 ! noro 149: \JP @node vtol,,, �$BG[Ns�(B
! 150: \EG @node vtol,,, Arrays
1.1 noro 151: @subsection @code{vtol}
152: @findex vtol
153:
154: @table @t
155: @item vtol(@var{vect})
1.2 ! noro 156: \JP :: �$B%Y%/%H%k$r%j%9%H$KJQ49$9$k�(B.
! 157: \EG :: Converts a vector into a list.
1.1 noro 158: @end table
159:
160: @table @var
161: @item return
1.2 ! noro 162: \JP �$B%j%9%H�(B
! 163: \EG list
1.1 noro 164: @item vect
1.2 ! noro 165: \JP �$B%Y%/%H%k�(B
! 166: \EG vector
1.1 noro 167: @end table
168:
169: @itemize @bullet
1.2 ! noro 170: \BJP
1.1 noro 171: @item
172: �$BD9$5�(B @var{n} �$B$N%Y%/%H%k�(B @var{vect} �$B$r�(B
173: @code{[@var{vect}[0],...,@var{vect}[@var{n}-1]]} �$B$J$k%j%9%H$KJQ49$9$k�(B.
174: @item
175: �$B%j%9%H$+$i%Y%/%H%k$X$NJQ49$O�(B @code{newvect()} �$B$G9T$&�(B.
1.2 ! noro 176: \E
! 177: \BEG
! 178: @item
! 179: Converts a vector @var{vect} of length @var{n} into
! 180: a list @code{[@var{vect}[0],...,@var{vect}[@var{n}-1]]}.
! 181: @item
! 182: A conversion from a list to a vector is done by @code{newvect()}.
! 183: \E
1.1 noro 184: @end itemize
185:
186: @example
187: [3] A=newvect(3,[1,2,3]);
188: [ 1 2 3 ]
189: [4] vtol(A);
190: [1,2,3]
191: @end example
192:
193: @table @t
1.2 ! noro 194: \JP @item �$B;2>H�(B
! 195: \EG @item References
1.1 noro 196: @fref{newvect}.
197: @end table
198:
1.2 ! noro 199: \JP @node newmat,,, �$BG[Ns�(B
! 200: \EG @node newmat,,, Arrays
1.1 noro 201: @subsection @code{newmat}
202: @findex newmat
203:
204: @table @t
205: @item newmat(@var{row},@var{col} [,@var{[[a,b,}...@var{],[c,d,}...@var{],}...@var{]}])
1.2 ! noro 206: \JP :: @var{row} �$B9T�(B @var{col} �$BNs$N9TNs$r@8@.$9$k�(B.
! 207: \EG :: Creates a new matrix with @var{row} rows and @var{col} columns.
1.1 noro 208: @end table
209:
210: @table @var
211: @item return
1.2 ! noro 212: \JP �$B9TNs�(B
! 213: \EG matrix
1.1 noro 214: @item row,col
1.2 ! noro 215: \JP �$B<+A3?t�(B
! 216: \EG non-negative integer
1.1 noro 217: @item a,b,c,d
1.2 ! noro 218: \JP �$BG$0U�(B
! 219: \EG arbitrary
1.1 noro 220: @end table
221:
222: @itemize @bullet
1.2 ! noro 223: \BJP
1.1 noro 224: @item
225: @var{row} �$B9T�(B @var{col} �$BNs$N9TNs$r@8@.$9$k�(B. �$BBh�(B 3 �$B0z?t$,$J$$>l9g�(B,
226: �$B3F@.J,$O�(B 0 �$B$K=i4|2=$5$l$k�(B. �$BBh�(B 3 �$B0z?t$,$"$k>l9g�(B,
227: �$B%$%s%G%C%/%9$N>.$5$$@.J,$+$i�(B, �$B3F9T$,�(B, �$B%j%9%H$N�(B
228: �$B3FMWAG�(B (�$B$3$l$O$^$?%j%9%H$G$"$k�(B) �$B$K$h$j=i4|2=$5$l$k�(B. �$B3FMWAG$O�(B, �$B@hF,$+$i=g$K�(B
229: �$B;H$o$l�(B, �$BB-$j$J$$J,$O�(B 0 �$B$,Kd$a$i$l$k�(B.
230: @item
231: �$B9TNs$N%5%$%:$O�(B @code{size()} �$B$GF@$i$l$k�(B.
232: @item
233: @code{M} �$B$,9TNs$N$H$-�(B, @code{M[I]} �$B$K$h$jBh�(B @code{I} �$B9T$r%Y%/%H%k$H$7$F�(B
234: �$B<h$j=P$9$3$H$,$G$-$k�(B. �$B$3$N%Y%/%H%k$O�(B, �$B$b$H$N9TNs$H@.J,$r6&M-$7$F$*$j�(B,
235: �$B$$$:$l$+$N@.J,$r=q$-49$($l$P�(B, �$BB>$NBP1~$9$k@.J,$b=q$-49$o$k$3$H$K$J$k�(B.
236: @item
237: �$BH!?t$N0z?t$H$7$F9TNs$rEO$7$?>l9g�(B, �$BEO$5$l$?H!?t$O�(B, �$B$=$N9TNs$N@.J,�(B
238: �$B$r=q$-49$($k$3$H$,$G$-$k�(B.
1.2 ! noro 239: \E
! 240: \BEG
! 241: @item
! 242: If the third argument, a list, is given, the newly created matrix
! 243: is initialized so that each element of the list (again a list)
! 244: initializes each of the rows of the matrix.
! 245: Elements are used from the first through the last.
! 246: If the list is short, 0's are filled in the remaining matrix elements.
! 247: If no third argument is given all the elements are cleared to 0.
! 248: @item
! 249: The size of a matrix is given by function @code{size()}.
! 250: @item
! 251: Let @code{M} be a program variable assigned to a matrix.
! 252: Then, @code{M[I]} denotes a (row) vector which corresponds with
! 253: the @code{I}-th row of the matrix.
! 254: Note that the vector shares its element with the original matrix.
! 255: Subsequently, if an element of the vector is modified, then the
! 256: corresponding matrix element is also modified.
! 257: @item
! 258: When a matrix is passed to a function as its argument
! 259: (actual parameter), the matrix element can be modified within that
! 260: function.
! 261: \E
1.1 noro 262: @end itemize
263:
264: @example
265: [0] A = newmat(3,3,[[1,1,1],[x,y],[x^2]]);
266: [ 1 1 1 ]
267: [ x y 0 ]
268: [ x^2 0 0 ]
269: [1] det(A);
270: -y*x^2
271: [2] size(A);
272: [3,3]
273: [3] A[1];
274: [ x y 0 ]
275: [4] A[1][3];
276: getarray : Out of range
277: return to toplevel
278: @end example
279:
280: @table @t
1.2 ! noro 281: \JP @item �$B;2>H�(B
! 282: \EG @item References
1.1 noro 283: @fref{newvect}, @fref{size}, @fref{det}.
284: @end table
285:
1.2 ! noro 286: \JP @node size,,, �$BG[Ns�(B
! 287: \EG @node size,,, Arrays
1.1 noro 288: @subsection @code{size}
289: @findex size
290:
291: @table @t
292: @item size(@var{vect|mat})
1.2 ! noro 293: \JP :: @code{[@var{vect} �$B$ND9$5�(B]} �$B$^$?$O�(B @code{[@var{mat} �$B$N9T?t�(B,@var{mat} �$B$NNs?t�(B]}.
! 294: \BEG
! 295: :: A list containing the number of elements of the given vector,
! 296: @code{[size of @var{vect}]},
! 297: or a list containing row size and column size of the given matrix,
! 298: @code{[row size of @var{mat}, column size of @var{mat}]}.
! 299: \E
1.1 noro 300: @end table
301:
302: @table @var
303: @item return
1.2 ! noro 304: \JP �$B%j%9%H�(B
! 305: \EG list
1.1 noro 306: @item vect
1.2 ! noro 307: \JP �$B%Y%/%H%k�(B
! 308: \EG vector
1.1 noro 309: @item mat
1.2 ! noro 310: \JP �$B9TNs�(B
! 311: \EG matrix
1.1 noro 312: @end table
313:
314: @itemize @bullet
1.2 ! noro 315: \BJP
1.1 noro 316: @item
317: @var{vect} �$BKt$O�(B, @var{mat} �$B$N%5%$%:$r%j%9%H$G=PNO$9$k�(B.
318: @item
319: @var{list} �$B$N%5%$%:$O�(B @code{length()}�$B$r�(B, �$BM-M}<0$K8=$l$kC19`<0$N?t$O�(B @code{nmono()} �$B$rMQ$$$k�(B.
1.2 ! noro 320: \E
! 321: \BEG
! 322: @item
! 323: Return a list consisting of the dimension of the vector @var{vect},
! 324: or a list consisting of the row size and column size of the matrix
! 325: @var{matrix}.
! 326: @item
! 327: Use @code{length()} for the size of @var{list}, and
! 328: @code{nmono()} for the number of monomials with non-zero coefficients
! 329: in a rational expression.
! 330: \E
1.1 noro 331: @end itemize
332:
333: @example
334: [0] A = newvect(4);
335: [ 0 0 0 0 ]
336: [1] size(A);
337: [4]
338: [2] B = newmat(2,3,[[1,2,3],[4,5,6]]);
339: [ 1 2 3 ]
340: [ 4 5 6 ]
341: [3] size(B);
342: [2,3]
343: @end example
344:
345: @table @t
1.2 ! noro 346: \JP @item �$B;2>H�(B
! 347: \EG @item References
1.1 noro 348: @fref{car cdr cons append reverse length}, @fref{nmono}.
349: @end table
350:
1.2 ! noro 351: \JP @node det,,, �$BG[Ns�(B
! 352: \EG @node det,,, Arrays
1.1 noro 353: @subsection @code{det}
354: @findex det
355:
356: @table @t
357: @item det(@var{mat}[,@var{mod}])
1.2 ! noro 358: \JP :: @var{mat} �$B$N9TNs<0$r5a$a$k�(B.
! 359: \EG :: Determinant of @var{mat}.
1.1 noro 360: @end table
361:
362: @table @var
363: @item return
1.2 ! noro 364: \JP �$B<0�(B
! 365: \EG expression
1.1 noro 366: @item mat
1.2 ! noro 367: \JP �$B9TNs�(B
! 368: \EG matrix
1.1 noro 369: @item mod
1.2 ! noro 370: \JP �$BAG?t�(B
! 371: \EG prime
1.1 noro 372: @end table
373:
374: @itemize @bullet
1.2 ! noro 375: \BJP
1.1 noro 376: @item
377: �$B9TNs�(B @var{mat} �$B$N9TNs<0$r5a$a$k�(B.
378: @item
379: �$B0z?t�(B @var{mod} �$B$,$"$k;~�(B, GF(@var{mod}) �$B>e$G$N9TNs<0$r5a$a$k�(B.
380: @item
381: �$BJ,?t$J$7$N%,%&%9>C5nK!$K$h$C$F$$$k$?$a�(B, �$BB?JQ?tB?9`<0$r@.J,$H$9$k�(B
382: �$B9TNs$KBP$7$F$O>.9TNs<0E83+$K$h$kJ}K!$N$[$&$,8zN($,$h$$>l9g$b$"$k�(B.
1.2 ! noro 383: \E
! 384: \BEG
! 385: @item
! 386: Determinant of matrix @var{mat}.
! 387: @item
! 388: The computation is done over GF(@var{mod}) if @var{mod} is specitied.
! 389: @item
! 390: The fraction free Gaussian algorithm is employed. For matrices with
! 391: multi-variate polynomial entries, minor expansion algorithm sometimes
! 392: is more efficient than the fraction free Gaussian algorithm.
! 393: \E
1.1 noro 394: @end itemize
395:
396: @example
397: [91] A=newmat(5,5)$
398: [92] V=[x,y,z,u,v];
399: [x,y,z,u,v]
400: [93] for(I=0;I<5;I++)for(J=0,B=A[I],W=V[I];J<5;J++)B[J]=W^J;
401: [94] A;
402: [ 1 x x^2 x^3 x^4 ]
403: [ 1 y y^2 y^3 y^4 ]
404: [ 1 z z^2 z^3 z^4 ]
405: [ 1 u u^2 u^3 u^4 ]
406: [ 1 v v^2 v^3 v^4 ]
407: [95] fctr(det(A));
408: [[1,1],[u-v,1],[-z+v,1],[-z+u,1],[-y+u,1],[y-v,1],[-y+z,1],[-x+u,1],[-x+z,1],
409: [-x+v,1],[-x+y,1]]
410: @end example
411:
412: @table @t
1.2 ! noro 413: \JP @item �$B;2>H�(B
! 414: \EG @item References
1.1 noro 415: @fref{newmat}.
416: @end table
417:
1.2 ! noro 418: \JP @node qsort,,, �$BG[Ns�(B
! 419: \EG @node qsort,,, Arrays
1.1 noro 420: @subsection @code{qsort}
421: @findex qsort
422:
423: @table @t
424: @item qsort(@var{array}[,@var{func}])
1.2 ! noro 425: \JP :: �$B0l<!85G[Ns�(B @var{array} �$B$r%=!<%H$9$k�(B.
! 426: \EG :: Sorts an array @var{array}.
1.1 noro 427: @end table
428:
429: @table @var
430: @item return
1.2 ! noro 431: \JP @var{array} (�$BF~NO$HF1$8�(B; �$BMWAG$N$_F~$lBX$o$k�(B)
! 432: \EG @var{array} (The same as the input; Only the elements are exchanged.)
1.1 noro 433: @item array
1.2 ! noro 434: \JP �$B0l<!85G[Ns�(B
! 435: \EG array
1.1 noro 436: @item func
1.2 ! noro 437: \JP �$BHf3SMQ4X?t�(B
! 438: \EG function for comparison
1.1 noro 439: @end table
440:
441: @itemize @bullet
1.2 ! noro 442: \BJP
1.1 noro 443: @item
444: �$B0l<!85G[Ns$r�(B quick sort �$B$G%=!<%H$9$k�(B.
445: @item
446: �$BHf3SMQ4X?t$,;XDj$5$l$F$$$J$$>l9g�(B, �$B%*%V%8%'%/%H$I$&$7$NHf3S7k2L$G�(B
447: �$B=g=x$,2<$N$b$N$+$i=g$KJB$Y49$($i$l$k�(B.
448: @item
449: 0, 1, -1 �$B$rJV$9�(B 2 �$B0z?t4X?t$,�(B @var{func} �$B$H$7$FM?$($i$l$?>l9g�(B,
450: @code{@var{func}(A,B)=1} �$B$N>l9g$K�(B @code{A<B} �$B$H$7$F�(B, �$B=g=x$,2<$N�(B
451: �$B$b$N$+$i=g$KJB$Y49$($i$l$k�(B.
452: @item
453: �$BG[Ns$O?7$?$K@8@.$5$l$:�(B, �$B0z?t$NG[Ns$NMWAG$N$_F~$lBX$o$k�(B.
1.2 ! noro 454: \E
! 455: \BEG
! 456: @item
! 457: This function sorts an array by @var{quick sort}.
! 458: @item
! 459: If @var{func} is not specified, the built-in comparison function
! 460: is used and the array is sorted in increasing order.
! 461: @item
! 462: If a function of two arguments @var{func} which returns 0, 1, or -1
! 463: is provided, then an ordering is detemined so that
! 464: @code{A<B} if @code{@var{func}(A,B)=1} holds, and
! 465: the array is sorted in increasing order with respect to the ordering.
! 466: @item
! 467: The returned array is the same as the input. Only the elements
! 468: are exchanged.
! 469: \E
1.1 noro 470: @end itemize
471:
472: @example
473: [0] qsort(newvect(10,[1,4,6,7,3,2,9,6,0,-1]));
474: [ -1 0 1 2 3 4 6 6 7 9 ]
475: [1] def rev(A,B) @{ return A>B?-1:(A<B?1:0); @}
476: [2] qsort(newvect(10,[1,4,6,7,3,2,9,6,0,-1]),rev);
477: [ 9 7 6 6 4 3 2 1 0 -1 ]
478: @end example
479:
480: @table @t
1.2 ! noro 481: \JP @item �$B;2>H�(B
! 482: \EG @item References
1.1 noro 483: @fref{ord}, @fref{vars}.
484: @end table
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