本画面之网址是: http://mavang2.tripod.com/square/index.txt 欢迎来信 mailto:[email protected] Date:05-20-2002 作者 黄彦杰 我是黄彦杰,毕业於民国76年, 於民国72年至76年就读於中山大学电机系,校长是李焕先生,李焕先生曾经当过行政院长, 别人( 释迦牟尼佛、爱因斯坦)说的法都不够究竟!只有我黄彦杰现在准备要说的才是究竟圆满! 我将要解说一切世界、宇宙的真实结构,含一切物质世界、精神世界! 能究竟圆满解释一切的'统一哲学'! 我将这个统一哲学称作'squares theory'('正方形理论'), 正方形理论中含有'图示'、'叙述'两部份, 正方形理论有一点类似太极,正方形理论之基本道理是binary(二元的), 二元之两者是彼此complementary的(彼此相反的,彼此补足的), 比如,罗汉、菩萨两者是binary(二元的),两者是彼此complementary的(彼此相反的,彼此补足的), 另外,二元之两者彼此'必定'是处於平等ranking(地位,名次,果位)! 因此,罗汉、菩萨两者彼此'必定'是处於平等ranking(地位,名次,果位)! squares theory认定说: '一切菩萨平等!一地菩萨至十地菩萨之十种分别是妄分别! 一地菩萨至十地菩萨同样是平等的菩萨果位ranking!' '一切罗汉平等!一果罗汉至四果罗汉之四种分别是妄分别! 一果罗汉至四果罗汉同样是平等的罗汉果位ranking!' 我再简述一次:binary之两者是彼此complementary的,但是处於平等ranking! 每一个square当然有四边,我规定每一边的边长(之相对值)一定是1! 因此每一个square面积都是1, 一切square都是以两种'小矩形'来指出一个'物质'或'精神'体 在特定之'时'(time)、'处'(site)的'法', 我规定用黑白两色来代表两种小矩形, '法'只有两种,即是黑白两种小矩形, 当然,这两种法(或黑白两种小矩形)之两者是彼此complementary的, 一个square内之小矩形的'种类'虽然只有两种, 但是一个square内之黑白小矩形之'数目'极多, 黑色小矩形之面积总合一定是1/2, 白色小矩形之面积总合一定是1/2, 上述之 '时'是一个'物质'或'精神'体之周期的开始之时至结束之时, 上述之 '处'是一个'物质'或'精神'体之体系的底端之处至顶端之处,(或 体积) square可用笛卡儿座标系来标示其'时'(time)、'处'(site), 我规定 square之最左下角必须置於笛卡儿座标系之(0,0)点, square之最下边必须与笛卡儿座标系之+X axis 重叠,在+X axis的(0,0)点至(1,0)点, square之最左边必须与笛卡儿座标系之+Y axis 重叠,在+Y axis的(0,0)点至(0,1)点, 我规定 +X axis是t axis,t是time,from 0 to 1, +Y axis是s axis,s是site,from 0 to 1, square四边之意义- 最左边:t=0,time是在一个周期的开始之时,而s,site则是from 0 to 1,此边是from(0,0)点to(0,1)点, 最右边:t=1,time是在一个周期的结束之时,而s,site则是from 0 to 1,此边是from(1,0)点to(1,1)点, 最下边:s=0,site是在一个体系的底端之处,而t,time则是from 0 to 1,此边是from(0,0)点to(1,0)点, 最上边:s=1,site是在一个体系的顶端之处,而t,time则是from 0 to 1,此边是from(0,1)点to(1,1)点, 注意:s和t之'相对值'都是from 0 to 1,可是'实际值'视实际之周期与体系而定, X_1 square之图示:见[图示x1] Y_1 square之图示:见[图示y1] [图示x1]: http://mavang2.tripod.com/square/x1.bmp Y-axis | | |(0,1) (1,1) |________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | black | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________________________________________|_X-axis (0,0) (1,0) [图示y1]: http://mavang2.tripod.com/square/y1.bmp Y-axis | | |(0,1) (1,1) |________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | white | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________________________________________|_X-axis (0,0) (1,0) Higher ranking rule: X_(n+1)=X_n.Y_n. (式子A); Y_(n+1)=Y_n+X_n+ (式子B); for n=1 to positive infinity ; 狄摩根定律: (.)'=(+) (+)'=(.) (X_n)'=(Y_n) (Y_n)'=(X_n) [X_(n+1)]'=[X_n.Y_n.]'= Y_n+X_n+ = Y_(n+1) , [Y_(n+1)]'=[Y_n+X_n+]'= X_n.Y_n. = X_(n+1) , 比如: X_2=X_1.Y_1. , Y_2=Y_1+X_1+ , X_3=X_2.Y_2. , Y_3=Y_2+X_2+ , 以此类推,所以,这是recursive(递归的,反覆的,循环的)规则, 二元之两者彼此'必定'是处於平等ranking(地位,名次,果位), 比如X_2和Y_2是二元之两者,是彼此complementary的(彼此相反的,彼此补足的), 彼此'必定'是处於平等ranking(地位,名次,果位), 可是(n+1)和n比较时, X_(n+1)和Y_(n+1)是上级,higher ranking, X_n 和Y_n 是下级,lower ranking, 上级与下级是不平等的, 上级,higher ranking的果位比较高, 下级,lower ranking的果位比较低, 一切世界、宇宙的一切物质世界、精神世界都有往上级ranking去进化之'趋势', 而不是往下级ranking去退化, 可是这进化而不退化只是'趋势',并非'一定'要进化而不退化, 因此在很希罕的状况中,亦会退化而不进化, 要记得:平常时,趋势是往上级去成就,不是往下级去成就, 现在我要解释 { X_2=X_1.Y_1. } 之意义,请先看X_2 square之几个例子之图示, 这几个例子之图示在下面的[图示x2],[图示x2-2],[图示x2-3]中, [图示x2]: http://mavang2.tripod.com/square/x2.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | black | white | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|_X-axis (0,0) (1/2,0) (1,0) [图示x2-2]: http://mavang2.tripod.com/square/x2-2.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | white | black | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|_X-axis (0,0) (1/2,0) (1,0) [图示x2-3]: http://mavang2.tripod.com/square/x2-3.bmp Y-axis | | |(0,1) (1/4,1) (1/2,1) (3/4,1) (1,1) |___________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | black | white | black | white | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________|________________|________________|________________|_X-axis (0,0) (1/4,0) (1/2,0) (3/4,0) (1,0) 在上面的[图示x2]、[图示x2-2]、[图示x2-3]的X_2 square之中,其 黑色矩形当然是来自(全黑的)X_1 square, 白色矩形当然是来自(全白的)Y_1 square, X_2 square都必须合於下述两个规矩: 第一,X_2 square之中, 每个黑色矩形,其time不管分布在甚麽时段,其site分布规矩是from 0 to 1而不间断, 每个白色矩形,其time不管分布在甚麽时段,其site分布规矩是from 0 to 1而不间断, 第二,X_2 square之中, 黑色矩形面积总合一定是1/2, 白色矩形面积总合一定是1/2, 只要是合於上述两个规矩的square,便都是代表 { X_2=X_1.Y_1. } 之X_2 square! [图示x2]、[图示x2-2]、[图示x2-3]的三种X_2 square都是平等的X_2 ranking! 现在我要解释 { Y_2=Y_1+X_1+ } 之意义,请先看Y_2 square之几个例子之图示, 这几个例子之图示在下面的[图示y2],[图示y2-2],[图示y2-3]中, [图示y2]: http://mavang2.tripod.com/square/y2.bmp Y-axis | | |(0,1) (1,1) |________________________________________________________________ | | | | | | | | | | | | | | | | | black | | | | | | | | | | | | | | | |________________________________________________________________|(1,1/2) | | | | | | | | | | | | | | | | | white | | | | | | | | | | | | | |________________________________________________________________|_X-axis (0,0) (1,0) [图示y2-2]: http://mavang2.tripod.com/square/y2-2.bmp Y-axis | | |(0,1) (1,1) |________________________________________________________________ | | | | | | | | | | | | | | | | | white | | | | | | | | | | | | | | | |________________________________________________________________|(1,1/2) | | | | | | | | | | | | | | | | | black | | | | | | | | | | | | | |________________________________________________________________|_X-axis (0,0) (1,0) [图示y2-3]: http://mavang2.tripod.com/square/y2-3.bmp Y-axis | | |(0,1) (1,1) |________________________________________________________________ | | | | | | | | | black | | | | | | | |________________________________________________________________|(1,3/4) | | | | | | | | | white | | | | | | | |________________________________________________________________|(1,1/2) | | | | | | | | | black | | | | | | | |________________________________________________________________|(1,1/4) | | | | | | | white | | | | | | | |________________________________________________________________|_X-axis (0,0) (1,0) 在上面的[图示y2]、[图示y2-2]、[图示y2-3]的Y_2 square之中,其 黑色矩形当然是来自(全黑的)X_1 square, 白色矩形当然是来自(全白的)Y_1 square, Y_2 square都必须合於下述两个规矩: 第一,Y_2 square之中, 每个黑色矩形,其site不管分布在甚麽地段,其time分布规矩是from 0 to 1而不间断, 每个白色矩形,其site不管分布在甚麽地段,其time分布规矩是from 0 to 1而不间断, 第二,Y_2 square之中, 黑色矩形面积总合一定是1/2, 白色矩形面积总合一定是1/2, 只要是合於上述两个规矩的square,便都是代表 { Y_2=Y_1+X_1+ } 之Y_2 square! [图示y2]、[图示y2-2]、[图示y2-3]的三种Y_2 square都是平等的Y_2 ranking! 现在我要说如何看懂square所代表之法, 以[图示y2]Y_2 square作例子, 若设定 X_1 square是'贪嗔痴', Y_1 square是'戒定慧', 则 Y_2 square之下面白色矩形代表: 在一天的24小时中,持续於下半身作'戒定慧'之法, Y_2 square之上面黑色矩形代表: 在一天的24小时中,持续於上半身作'贪嗔痴'之法, 佛教说佛陀有法身佛、报身佛、化身佛三种, Y_2 square代表某一种佛陀, 至於Y_2 square是否为报身佛,我则不清楚, X_2 square之图示:见[图示x2], Y_2 square之图示:见[图示y2], [图示x2]: http://mavang2.tripod.com/square/x2.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | black | white | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|_X-axis (0,0) (1/2,0) (1,0) [图示y2]: http://mavang2.tripod.com/square/y2.bmp Y-axis | | |(0,1) (1,1) |________________________________________________________________ | | | | | | | | | | | | | | | | | black | | | | | | | | | | | | | | | |________________________________________________________________|(1,1/2) | | | | | | | | | | | | | | | | | white | | | | | | | | | | | | | |________________________________________________________________|_X-axis (0,0) (1,0) X_3 square之图示:见[图示x3] Y_3 square之图示:见[图示y3] [图示x3]: http://mavang2.tripod.com/square/x3.bmp Y-axis | | |(0,1) (1/4,1) (1/2,1) (1,1) |__________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | black | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________| | black | white | (1,1/2)| | | | | | | | | | | | | | | | | | | | | | | | white | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________|________________|________________________________|_X-axis (0,0) (1,0) [图示y3]: http://mavang2.tripod.com/square/y3.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | black | white | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|(1,1/2) | | | | | | | | | black | | | | | | | |_________________________________________________________________|(1,1/4) | | | | | | | white | | | | | | | |_________________________________________________________________|_X-axis (0,0) (1,0) 下述之四个图示步骤可用来表示complementary的两者之间的干系, 我要以X_3 square[图示x3]和Y_3 square[图示y3]作例子, 当然,X_3 square和Y_3 square两者是彼此complementary的, 第一. 本来是X_3 square 见[图示x3] [图示x3]: http://mavang2.tripod.com/square/x3.bmp Y-axis | | |(0,1) (1/4,1) (1/2,1) (1,1) |__________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | black | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________| | black | white | (1,1/2)| | | | | | | | | | | | | | | | | | | | | | | | white | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |________________|________________|________________________________|_X-axis (0,0) (1,0) 第二. 将X_3 square 翻转或旋转: 旋转角度: 270度: 见[图示c-1] [图示c-1]: http://mavang2.tripod.com/square/c-1.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | black | white | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|(1,1/2) | | | | | | | | | white | | | | | | | |_________________________________________________________________|(1,1/4) | | | | | | | black | | | | | | | |_________________________________________________________________|_X-axis (0,0) (1,0) 第三. 将c-1 square 翻转或旋转: 水平翻转: 见[图示c-2] [图示c-2]: http://mavang2.tripod.com/square/c-2.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | white | black | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|(1,1/2) | | | | | | | | | white | | | | | | | |_________________________________________________________________|(1,1/4) | | | | | | | black | | | | | | | |_________________________________________________________________|_X-axis (0,0) (1,0) 第四. 将c-2 square 色彩对换: 见[图示c-3] [图示c-3]: http://mavang2.tripod.com/square/c-3.bmp Y-axis | | |(0,1) (1/2,1) (1,1) |_________________________________________________________________ | | | | | | | | | | | | | | | | | | | | | | black | white | | | | | | | | | | | | | | | | | | | | | | | | | |________________________________|________________________________|(1,1/2) | | | | | | | | | black | | | | | | | |_________________________________________________________________|(1,1/4) | | | | | | | white | | | | | | | |_________________________________________________________________|_X-axis (0,0) (1,0) [图示c-3]即是Y_3 square! 由於 (X_3)'=(Y_3) , (Y_3)'=(X_3) , 故上述之四个图示步骤,亦能使第一.步骤中的Y_3 square,於第四.步骤中形成X_3 square! 因果律: 若因是X_n,则果是Y_n, 若因是Y_n,则果是X_n, 已知:罗汉、菩萨两者是X_2、Y_2,则 X_2:菩萨, Y_2:罗汉, X_3:魔, Y_3:辟支佛, X_4:众生,(不可思议解脱三昧)(请参考 维摩诘所说经) Y_4:佛陀, 已知:罗汉、菩萨两者是X_3、Y_3,则 X_3:菩萨, Y_3:罗汉, X_4:魔, Y_4:辟支佛, X_5:众生, Y_5:佛陀, 罗汉可以当作是Y_2,或Y_3,或Y_4,或Y_5,以此类推, 於是辟支佛便是Y_3,或Y_4,或Y_5,或Y_6,以此类推, X_n和Y_n不可对换,因X_n是(..),Y_n是(++), 菩萨、魔、众生 都是X_n,不是Y_n, 罗汉、辟支佛、佛陀都是Y_n,不是X_n, 佛陀并不是法界中的最高尊者! 在佛陀之上还有更高ranking(地位,名次,果位)的上级尊者,比如菩提心普作王, 菩提心普作王是'遍作王续'的'遍作王尊者', 菩提心普作王之果位是'法界遍行地',佛陀众生不二或不相属, 当然菩提心普作王之上还有更高ranking(地位,名次,果位)的上级尊者, 法界的真相是这样的:越是上级,higher ranking,越是正法! 一切世界、宇宙的一切物质世界、精神世界都有往上级ranking去进化之'趋势', 而不是往下级ranking去退化, 上面我说一个square内, 黑色小矩形之面积总合一定是1/2, 白色小矩形之面积总合一定是1/2, 可是X_1,Y_1看起来似乎不是如此, 事实上, X_1=X_0.Y_0. , Y_1=Y_0+X_0+ , X_0=X_-1.Y_-1. , Y_0=Y_-1+X_-1+ , 以此类推, 到 负无限大 ; X_0和Y_0以及其下级,都不再有黑白两种小矩形, 於是,改颜色便可以了,比如 令 X_-100 是全绿色, Y_-100 是全红色, X_1仍然是全黑色, Y_1仍然是全白色, 便OK! 中文版.html: http://mavang2.tripod.com/square/index.html 中文版.txt: http://mavang2.tripod.com/square/index.txt 英文版.html: http://mavang2.tripod.com/square/index_english.html 英文版.txt: http://mavang2.tripod.com/square/index_english.txt 高果位的生活方式 http://mavang2.tripod.com/square/higher-ranking.txt 参考经文: http://mavang2.tripod.com/square/binary.txt 参考医学 http://mavang2.tripod.com/square/binary-medicine-2.txt 阿达尔玛佛教网路 http://mavang2.tripod.com/ 真佛资讯网路 http://www.tbsn.org/