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Pub Talk and the King’s English中英对照翻译谁也说不准。
好的闲谈不需要有人想要表达什么。
虽然争辩有时会成为闲谈的一部分,但争辩的目的并不在于说服别人。
闲谈中没有胜负之分,事实上,最好的闲谈者是那些愿意放手的人。
他们突然想起一个最佳的趣闻轶事,但是转瞬间话题就转移了,机会就这样错失了。
他们愿意放手不去争取。
3.The English language has always been XXX。
andn has always been the best way to understand and enjoy thelanguage。
But there is a XXXbe called “pub talk.” Pub talk is not really XXX at all。
It is amonologue。
XXXpeople。
It is XXX。
not to clarifybut to confuse。
not to shed light but to obscure.英语一直以来都非常适合于闲谈,而闲谈也一直是理解和享受语言的最佳方式。
但是,闲谈和所谓的“酒吧闲聊”是有区别的。
酒吧闲聊实际上并不是真正的闲谈。
而是一种独白,与其他人的独白相互交织。
它的目的不是沟通,而是支配;不是澄清,而是混淆;不是照亮,而是掩盖。
4.XXX XXX at the same time。
It isXXX。
and playful because thepeople who take part in it are XXX。
It is like a game withrules。
but the rules are there to be broken。
and the best players are thosewho break them most XXX is also like a dance。
and的同义词意思是什么及例句and表示和,与的意思,是英语句子中最常见的连词之一,那么你知道and的同义词是什么吗?现在跟店铺一起来学习and的英语知识吧!and同义词withand的网络释义and而且; 逻辑和; 与门; 并列句;and yet可是,然而; 而,然而; 然而; 可是;and then于是,然后; 而且,其次,于是,然后; 而且,其次,然后; 于是;and circuit与电路; 及电路; 及电路,和电路; 释义:“与”(门)电路;and element与元件; 及组件; 及组件,与组件; 释义:“与”元件;and的常用俚语ick lame and lazy1. (陆军用语) 值班时经常或故意不到的人(尤指军人)Do you know why he always was the sick lame and lazy?你知逍他为什么老是不来值班?俚语类型: 美国俚语cop and heel1. 脱逃He jumped into a car and made his cop and heal.他跳上辆汽车仓惶逃走了。
俚语类型: 美国俚语one and only1. 心上人,未婚妻,恋人My one and only!What am I going to do if you turn me down when I'm so crazy over you?我的心上人啊!我对你如此痴情,你要是不肯嫁给我,叫我如何是好?俚语类型: 美国俚语salt and pepper1. (=pepper and salt)(吸毒者用语)含杂质的或劣质的大麻This salt and pepper is oregano, I think.我有这种含杂质的大麻是牛至吐粉。
俚语类型: 美国俚语2. 黑白色相M间的警车俚语类型: 美国俚语jive and juke1. (大学用语)过得很快活We'll jive and juke in this summer vacation.今年暑假我们会过得很快活的。
or和and的用法详解一、了解or的用法在英语中,or是一个常见的连接词,用于连接两个或多个选项,并表示其中之一的选择关系。
下面将详细介绍or的不同使用方式及其语法规则。
1. 表示选择关系:或者,表示两者中具有任意一个条件成立即可。
例如:- You can have tea or coffee.(你可以喝茶或咖啡。
)- The ticket costs ten dollars or twenty dollars.(票价为10美元或20美元。
)2. 表示排除关系:否则;得到结果与前者不同。
例如:- He must be either very brave or very foolish to do that.(他要么非常勇敢,要么非常愚蠢才会做那件事。
)- It's your decision; follow me or stay here.(这是你的决定:跟我走或者留在这里。
)3. 表示反驳或加入限制条件:用来表示对前提条件进行反驳或附加额外限制。
例如:- He said he would come tomorrow, but I doubt it—unless he gets delayed.(他说他明天会来,但我怀疑——除非他被耽搁了。
)- She likes all kinds of fruit, except for bananas and oranges.(她喜欢各种水果,除了香蕉和橙子。
)二、深入理解and的用法and也是一个常见的连接词,与or不同之处在于,and表示两个或多个选项都同时成立。
下面将详细介绍and的不同使用方式及其语法规则。
1. 表示并列关系:以及、加、还有。
例如:- I bought pens and notebooks for school.(我买了钢笔和笔记本纸供学校使用。
)- She can speak English, French, and German fluently.(她能流利地讲英语、法语和德语。
and并列的动词用法在英语中,and 作为并列连词,可以连接两个或多个并列成分,其用法包括:- 当连接三个以上的并列成分时,and 放在最后一个成分之前,其余用逗号分开,例如:He bought a book and a pen. 他买了一本书和一支笔。
- 名词+and+名词,若这种结构表示一个概念时,and+名词相当于介词 with+名词,译为“附带、兼”的意思,例如:Noodle and egg is a kind of delicious food.(and egg=with egg)鸡蛋面是一种美味食物。
- 名词复数+and+同一名词的复数,强调连续或众多的含义,例如:There are photos and photos. 照片一张接着一张。
- 形容词+and+形容词,这种结构形似并列,实际并非并列结构,例如:This room is nice and warm(= nicely warm). 这个房间既漂亮又暖和。
- 用 and 连接动词,可以作目的状语。
动词 go(come,stop 等)+and+动词,此时,and+动词相当于 in order to+动词,例如:I'll go and bring back your boots.(go and bring back=go in order to bring back)我去把你的靴子拿来。
- and+动词,起现在分词的作用,表示方式或伴随情况,例如:He sat and waited.(and waited=waiting)他坐着等。
- and+同一动词表示动作长时间地“继续”或“重复”,例如:We waited and waited. 我们等呀等。
and 并列动词的用法还有很多,在使用时需要根据具体语境和表达意图来选择合适的用法。
g oo df o 《理想的风筝》阅读及有关练习、扩展训练一、《理想的风筝》习题1、划去括号中不正确的读音。
天穹(g ōng qióng ) 沉(chén chéng )醉哽咽( y àn yè ) 枯( k ū g ū )燥2、比一比,再组词。
慨( ) 燥( ) 拄( ) 朗( )概( ) 躁( ) 驻( ) 郎( )3、给下列句子中粗体字选择正确的解释,将序号填在括号里。
(1).我故意逗她:“别光说美的,若是冬天呢,天天刮大风,冻得人出不去屋……”( )A、引逗 B、招引 C、停留 D、逗笑(2).初到北大荒,我感到一切都不习惯。
( )D、原来的(3).我怀着好奇的心情独个儿仰卧在小船里。
( )A、脸向上 B、敬慕 C、依靠,依赖 D、公文用语4、选择最恰当的动词填入句中,体会它们的意思。
染 映 吹 变(1).当春风( )绿了大地的时候,人们的身心一齐苏醒。
撑 举 托 拿(2).他总是自己手持线枴,让他的孩子或学生远远地( )着风筝。
伸 张 飘 抖(3).那纸糊的燕子便( )起翅膀,翩翩起舞,扶摇直上。
。
b 、刘老师啊,你在哪里?我深深地、深深地思念您…… 。
c 、……女娲氏用手捏泥人捏得累了,便用树枝沾起泥巴向地上甩。
。
12、看拼音,写词语。
wú ɡōnɡ jīng miào fēng zheng suān sè gěng yè( ) ( ) ( ) ( ) ( )chén zuì qīn qiè tiān qióng qū rǔ áo xiáng ( ) ( ) ( ) ( ) ( )13、在括号里填上恰当的词语。
慈祥的( ) 舒展的( ) 枯燥的( ) 酸涩的( ) 晴朗的( ) 理想的( )14、写出下列词语的反义词。
漫长( ) 舒展( ) 美妙( )15、文中“仰望”、“注视”都表示看的意思,请你再写两个表示“看”的词语。
Differences Between American Democrats and RepubliciansFrom a historical point of view, the United States is basically the implementation of the Democratic and the Republician Party, and the bipartisan turns in power by running for president, “the two-party system”.U.S. Democratic Party was built in 1791 by plantation owners and Southern slaveholders entrepreneurs, was called the Republican Party. 1794 to the Democratic Republican Party, officially known as the Democratic Party in 1840.Democratic Party after the end of the Civil War in 1861 brought to its knees. 1933 Roosevelt advantage of the economic crisis caused by the people dissatisfied with the emotion running for president to win his fourth consecutive term as president, the Democratic Party and thus continuous power for 20 years. Mass base of the Democratic Party is the labor, civil servants, minorities and blacks.U.S. Republican Party,founded in 1854, is composed of business owners against slavery northeast the Midwest developed states of the agricultural entrepreneurs representatives.In 1860, Lincoln was elected president, the Republican Party came to power, and defeated in the Civil War the Southern slaveholders forces to quell the civil war. 70 years in 1860 to 1933, except for 16 years, the United States by Republicans. The party's mass base mainly white-collar workers and young people of the suburbs and the South.World War II middle class for its new support force.Democrats and the Republicans stand for the Democratic and the Republican Party.The symbol of Democrats is Donkey and the Republicans Elephant.There are some differences between American Democrats and Republicians.1.Gun controlIn order to reduce crime and murder, the Democrats proposed firearms control, especially in the Firearms Control Act of 1968, the Brady Act of 1993 (Brady Bill), 1994 years of crime control bill. However, many Democrats, especially from the rural, southern, and western Democrats oppose the control of firearms, and the failure of the Democrats in the 2000 is considered lost the support of the rural areas because on this issue. In the 2004 election, the political views of the Democrats, the only named support gun control, and only requires the extension of the arms embargo on the 1994 attacks.White House spokesman Carney said the 18th U.S. President Barack Obama to support the Democrats plan to restart assault firearm federal ban on the sale motion. In addition, Carney said, Obama also supports to strengthen gun fairs regulatory considerations limit the high-capacity magazine sales. Firearms fairs has always been opposed to the U.S. gun control supporters, because in this trade fair share guns do not need to undergo a background check. The high-capacity magazine that can hold dozens of bullets used for the murderer in several vicious shootings, many gun control supporters hope to prohibit such magazine sales.This stance is in Conn. Newtown Sandy Hook Primary School shooting tragedy occurred, most clearly expressed the White House on Obama gun control stance.Republicians are no restrictions on gun control, because many of its supporters from the southern farmers, most of them are opposed to gun control.2.TaxesThe Democrats is advocating that the government should play a more active and important role in the national life, so advocates tax policy. For example, the Democrats is opposed to the Reagan sharply abolition of the deduction of social welfare programs.But the Democrat-controlled Congress eventually passed most of Reagan's proposed tax cuts and increased defense budget case, but refused to reduce the budget proposal3.Natrual environmentDemocrats often supports environmentalism, and advocated the retention of natural resources as well as strict environmental laws to combat pollution.The Democrats supports the retention endangered biological and environmental areas, promote land management and control of pollution sources. The most controversial issues supported by the Democrats is global warming, especially the Democrats, former Vice President Al Gore, strongly in favor of strict controls on greenhouse gases.Republicians in this regard is more diverse, in part believe that the global warming theory, part of the suspect or concerns about the impact of these controls on the industry.4.Race relationsDemocrats advocates all the American people should have equal opportunities regardless of their gender, age, race, sexual orientation, religion, occupation, or national origin. Most Democrats support the implementation of affirmative action (affirmative action) policy to encourage the hiring of minorities and disadvantaged groups, in order to improve equality in employment, but the Democrats is opposed to the use of strict employment quota system. The Democrats also supported the establishment of the Act prohibits employers refused to hire some people with physical or mental disabilitiesRepublicians support by African Americans since 1964, is considerably less, only less than 15% of the black vote (1984-2004) in the national elections in recent years. Republicians have nominated some African-American candidate to compete for governor or senator of Illinois, Ohio, Pennsylvania, and Maryland and other places, but so far have not been successful example of elected. Bush's support of the Hispanic people by slightly raised, and 35% in 2000, 44% in 2004. In 2004, 44 percent of Asian-Americans voted for Bush [18]. In the 2006 House of Representatives elections, Republicians won 51 percent of white voters support, 37% Asian, and 30% of Hispanics, but only 10% of African-Americans support.5.Minimum wageThe Democrats supports the minimum wage system, and increased regulation of business, in order to assist the poor working class.Leaders of political parties such as the Woodland Pelosi will claim that increasing the minimum wage is one of the most important agenda of the Democrats in the 110th Congress. Initiated at the local state initiatives to increase the minimum wage, all six states of the initiative by the Democrats supports.Republicians usually oppose unions, promulgated many regulations unfavorable to form trade unions and support the local state and federal level. Republicians generally oppose any increase in the minimum wage, that the minimum wage system will only increase the unemployment rate, and reduce business profits nothing.6.Gay rightsThe Democrats is divided on the issue of same-sex marriage. Some Democrats support civil unions between same-sex couples, and some people are more inclined to legal marriage, and some people due to religious reasons to oppose same-sex marriage. But almost everyone agrees that the root of discrimination based on sexual orientation is wrong. Democrats National Committee Chairman Howard Dean has been proposed by some Democrats support gay the informal requirements Democrats in the 2008 Congress must be at least 5-10% of homosexuals.The many supporters of the Republicians from the conservative southern and the Republicians religious complex heavy, so Republicians oppose gay marriage.itaryDemocrats against the arrest of the prisoners of the U.S. military tried to extract confessions, and against military prisoners classified as "unlawful combatants" (Unlawful combatant), and that they should enjoy the rights conferred by the Geneva Convention. The Democrats is of the view that to extract confessions is against humanity, and will reduce the moral legitimacy of the United States in the international community, but will also have other adverse effects.Democrats generally oppose the policy of unilateralism, that even if the United States suffered on national defense and security threat, nor the case without the support of other countries should launch a war. They think the United States should have solid alliances and broad international support for action only in the diplomatic arena and become a major issue in John Kerry 2004 presidential election campaign foreign policy, and condemned the unilateral policy caused the United States the reasons for the failure in Iraq.Republicians on the war on terror after the September 11 attacks, to support the policies of the new conservatism, including the 2001 invasion of Afghanistan and the 2003 invasion of Iraq, and trying to spread democracy in the Middle East and around the world. The Bush administration in Iraq "illegal combatants" (Unlawful combatant) does not belong to the scope of protection of the Geneva Convention, and advocated Geneva Convention only been to protect the sovereign state of the military personnel, and does not apply to the terrorists of al-Qaeda and other terrorist organizations.。
andq=2:This leads to minor improvements in (4)–(6)in the coefficient of the term arising from the case k =0.For P (m;2)and the small set of Kasami sequences of length L 01we have approximately equal maximum even correlation.The Kasami set has considerably fewer sequences,however,the best known upper bound (see [7])for their maximum aperiodic correlation has 6p 2=as the coefficient of pq ln (4L= )where we have 8= .R EFERENCES[1] A.Barg,“On small families of sequences with low periodic correlation,”in Lecture Notes in Computer Science ,vol.781.Berlin,Germany:Springer-Verlag,1994,pp.154–158.[2]S.Boztas,R.Hammons,and P.V.Kumar,“4-phase sequences withnear optimum correlation properties,”IEEE rm.Theory ,vol.38,pp.1101–1113,May 1992.[3]T.Helleseth and P.V.Kumar,“Sequences with low correlation,”inHandbook of Coding Theory ,R.Brualdi,C.Huffman,and V.Pless,Eds.,preprint.[4]T.Helleseth,P.V.Kumar,O.Moreno,and A.G.Shanbhag,“Improvedestimates for the minimum distance of weighted degree Z 4trace codes,”in Proc.1995IEEE Int.Symp.on Information Theory (Whistler,B.C.,Canada,Sept.17–22,1995).[5]S.M.Krone and D.V.Sarwate,“Quadriphase sequences for spread-spectrum multiple-access communication,”IEEE rm.Theory ,vol.30,pp.520–529,May 1984.[6]P.V.Kumar,T.Helleseth,and A.R.Calderbank,“An upper bound forWeil exponential sums over Galois rings and applications,”IEEE rm.Theory ,vol.41,pp.456–468,Mar.1995.[7]htonen,“On the odd and the aperiodic correlation propertiesof the Kasami sequences,”IEEE rm.Theory ,vol.41,pp.1506–1508,Sept.1995.[8]S.Litsyn and A.Tiet¨a v¨a inen,“Character sum constructions of con-strained error-correcting codes,”Appl.Algebra in Eng.,Commun.andComp.,vol.5,pp.45–51,1994.[9] A.A.Nechaev,“Kerdock code in a cyclic form,”Discr.Math.Appl.,vol.1,pp.365–384,1991.[10] D.V.Sarwate,“An upper bound on the aperiodic autocorrelationfunction for a maximal-length sequence,”IEEE rm.Theory ,vol.IT-30,pp.685–687,July 1984.[11] A.G.Shanbhag,P.V.Kumar,and T.Helleseth,“An upper bound for theaperiodic correlation of weighted-degree CDMA sequences,”in Proc.1995IEEE Int.Symp.on Information Theory (Whistler,B.C.,Canada,Sept.17–22,1995).[12],“Improved binary codes and sequence families from Z 4-linear codes,”IEEE rm.Theory ,vol.42,pp.1582–1587,Sept.1996.[13]H.Tarnanen,“An elementary proof to the weight distribution formulaof the first order shortened Reed–Muller coset code,”preprint.[14]P.Udaya and M.U.Siddiqi,“Optimal biphase sequences with largelinear complexity derived from sequences over Z 4,”IEEE rm.Theory ,vol.42,pp.206–217,Jan.1996.[15]I.M.Vinogradov,Elements of Number Theory.New York:Dover,1954.New Construction for Families of Binary Sequenceswith Optimal Correlation PropertiesJong-Seon No,Kyeongcheol Yang,Member,IEEE ,Habong Chung,Member,IEEE ,and Hong-Yeop Song,Member,IEEEAbstract—In this correspondence,we present a construction,in a closed form,for an optimal family of 2m binary sequences of period 22m 01with respect to Welch’s bound,whenever there exists a balanced binary sequence of period 2m 01with ideal autocorrelation property using the trace function.This construction enables us to reinterpret a small set of Kasami and No sequences as a family constructed from m -sequences.New optimal families of binary sequences are constructed from the Legendre sequences of Mersenne prime period,Hall’s sextic residue sequences,and miscellaneous sequences of unknown type.In addition,we enumerate the number of distinct families of binary sequences,which are constructed from a given binary sequence by this method.Index Terms—Kasami sequences,Legendre sequences,No sequences,optimal correlation property,signature sequences.I.I NTRODUCTIONCode-division multiple access (CDMA)systems use pseudonoise binary sequences as signature sequences,and several spread-spectrum communication systems also use them as spreading codes for low probability of intercept [18],[20].Desirable characteristics of a family of binary sequences for such applications include long-period,low out-of-phase autocorrelation values,low crosscorrelation values,low nontrivial partial-period correlation values,large linear span,balance of symbols,large family size,and ease of implementation.A binary (0or 1)sequence f b (t );t =0;1;111;N 01g of period N =2n 01is called balanced if the number of 1’s is one more than the number of 0’s [8].It is said to have the ideal autocorrelation property if its periodic autocorrelation function R ( )is given byR ( )=if there exists an integer such that c(t)=b(t+ )for all t. Otherwise,they are said to be cyclically distinct.For an integer r, the sequence f c(t)g is called the decimation by r of the sequence f b(t)g if c(t)=b(rt)for any integer t.It is easily checked that the period of f c(t)=b(rt)g is given by N divided by gcd(r;N).It is also well known that if a sequence f b(t)g of period N has the ideal autocorrelation property,so does its decimation f b(rt)g by r,where r is an integer relatively prime to N.Two sequences f b(t)g and f c(t)g are said to be equivalent if there are some integers r and such that c(t+ )=b(rt)for all t.They are said to be inequivalent,otherwise. Consider a set of J binary sequences,each with period N,denoted byf v(j)(t);t=0;1;111;N01g;j=1;2;111;J: The periodic crosscorrelation R jk( )at shift between two se-quences f v(j)(t)g and f v(k)(t)g from this collection is defined asR jk( )=N01(t):T h e m a x i m u m o u t-o f-p h a s e p e r i o d i c a u t o c o r r e l a t i o n m a g n i t u d eR Af o r t h i s s ig n a l s e t i s d efin e d a sR A=maxjmax0< <Nj R jj( )jand the maximum crosscorrelation magnitude R C between sequences in this set is given byR C=maxj=kmax0 <Nj R jk( )j:The criterion for signal design is to minimizeR max=max(R A;R C):In signal design,the Welch bound and the Sidelnikov bound are used to test the optimality of sequence sets.Some of well-known optimal families of binary sequences include Gold sequences[6], Kasami sequences[18],[20],bent sequences[12],[20],and No sequences[15].Gold sequences form an optimal set with respect to Sidelnikov’s bound[19]which states that for any set of N or more binary sequences of period NR max>(2N02)1=2:The small set of Kasami sequences is an optimal collection of binary sequences with respect to Welch’s bound[22],which implies thatR max 1+2n=2when it is applied to a set of2n=2sequences of period N=2n01 for an even integer n.Bent and No sequences also form an optimal set with respect to Welch’s bound,respectively,but they have larger linear spans than Gold sequences and Kasami sequences.In this correspondence,we show that if a binary sequence of period 2m01in a trace expression has the ideal autocorrelation property, it can be used to construct,in a closed form,a family of2m binary sequences of period22m01with optimal correlation with respect to Welch’s bound.This construction method enables us to reinterpret the small set of Kasami sequences as well as the No sequences as a family constructed from the m-sequences.New optimal families of binary sequences are constructed from the Legendre sequences of Mersenne prime period,Hall’s sextic residue sequences,and miscellaneous sequences of unknown type.In addition,we enumerate the number of distinct families of binary sequences,which are constructed from a given binary sequence by this method.This correspondence is organized as follows.In Section II,we present the main results to construct an optimal family of binary sequences with respect to Welch’s bound.In Section III,the small set of Kasami sequences and the No sequences are reinterpreted asa family constructed from the m-sequences.New optimal familiesof binary sequences are constructed from the Legendre sequences of Mersenne prime period in Section IV.Hall’s sextic residue sequences and miscellaneous sequences of unknown type are also considered in Section IV.II.C ONSTRUCTION OF A F AMILY OF B INARY S EQUENCESWITH O PTIMAL C ORRELATIONLet q be a prime power and F q be thefinitefield with q elements. Let n=em>1for some positive integers e and m.Then the trace function tr n m(1)from F2is a mapping[10],[11] given bytr n m(x)=e01a n d s e t = T w h e r e T=(2n01)=(2m01).Assume that for an index set I,the sequence f b(t1);t1=0;1;111;M01g of period M=2m01given byb(t1)=a2Itr m1([tr n m( t)]ar)also has the ideal autocorrelation property.Based on the idea of extension in Theorem1,we will provide a method to construct an optimal family of2m binary sequences of period22m01from a given binary sequence of period2m01 with ideal autocorrelation property.Throughout the correspondence, we use the following notations.Let m and n be positive integers such that m j n.Let be a primitive element in F201)=(2.From now on,we assume that the sequence f b(t1);t1=0;1;111;M01g of period M=2m01given byb(t1)=a2Itr m1([tr n m( 2t)+ j t]ar);for j2F2Then the family F is an optimal set of2m binary sequences of period N with respect to Welch’s bound.Furthermore,R ij( )takes only a value01,2m01,or02m01for any i,j,and except for the case where i=j and 0(mod N):Proof:We will show that the possible values of R ij( )are01, 2m01,or02m01for any i,j,and except for the case where i=j and 0(mod N):Let T=2m+1.Since gcd(2m01;T)=1, any integer t,0 t 22m02,can be uniquely written as t=t1T+t2(2m01);0 t1 2m02;0 t2 2m: Then each sequence f s(i)(t);t=0;1;111;2n02g becomess(i)(t)=+2t01g)+ i t(2=f22F2(2a2Itr m1f 2arta2Itr m1f 2ar(t)[f( j;t2+ 2)]ar g where ,0 22m02,is also uniquely written as= 1T+ 2(2m01);0 1 2m02;0 2 2m: Thus we get the equation at the bottom of this page.Note that the inner sum2t([f( )]+[ ;t)])) yields2m01whenf( i;t2)= 2f( j;t2+ 2)we claim that the inner sum is01.If either f( i;t2)=0or f( j;t2+ 2)=0,the exponent to(01)in the inner sum is essentially a shift of the sequence f b(2rt1)g.Since gcd(2r;M)=1, it is obvious that the sequence f b(2rt1)g is balanced and has the ideal autocorrelation property.This implies that the inner sum gives 01.On the other hand,if f( i;t2)=0and f( j;t2+ 2)=0, the inner sum is the autocorrelation of the sequence f b(2rt1)g at a nonzero shift(mod N),so it is01by the assumption.Thus the inner sum always yields01iff( i;t2)= 2f( j;t2+ 2)g: Then we haveR ij( )=(2m01)1j3j+(01)1(2m+10j3j)=2m j3j0(2m+1):(2) By defining x= 2t01)and u= 2 01),we have j3j=jf x j x+x2(ux+u2+ j)gj: Note that x2F2nf0g and x2=x,so we getx2(2= 02t01)=x01: Similarly,we have u2(ux+(ux)01+ j)gj=jf x j x2+1+ i x= 2T h e o r e m3:L e t k=2n,and let be a primitive element of F201)=(201)=(2a2Itr m1([tr n m([tr k n( 2t)+ j t]u)]ar)for j2F2a2Itr m1([tr n m( tt=0(01)s(t+ )=2t 02([f( )]+[ ;t)])):Then each sequence f s(j)(t)g becomess(j)(t)=+2t01))+ j t(2=(22F2(2a2Itr m1([tr n m( 2ut;if f( j;t3)=0c(2u(t2+l));if f( j;t3)= 2l.Since f c(2ut2);t2=0;1;111;2n02g is the decimation by2u of f c(t2)g,it also has the ideal autocorrelation property.Hence,similar arguments as in the proof of Theorem2complete theproof.a2Itr m1([tr n m( t)]ar)=a2Ia2Ia2Itr m1([tr n m([tr k n( 2t)+ j t]u)]ar)=ge r o rm o r s(j)(t)in Theorem3can be given as follows:s(j)(t)=([t r m([111tr m([tr k m)111]r)]a r01f o r e a c h i=1;2;111;d.In signal design for CDMA,it is desirable to have a lot of distinct families of binary sequences with optimal correlation for a given period.Hence it is an interesting problem tofind the number of distinct families of binary sequences constructed from a given binary sequence by Theorem2.Two families F A and F B of sequences of the same period are said to be equivalent if each sequence in F A is a cyclic shift of some sequence in F B,and vice versa.Otherwise,they are said to be distinct.Furthermore,they are said to be fully distinct if each sequence in F A is cyclically distinct from every sequence in F B. For an integer M=2m01,define the cyclotomic coset C i of an integer i,0 i M01,byC i=f j j0 j M01;j i2l(mod)M for some integer l 0g:For the sake of convenience,the cyclotomic coset representative of C i is often defined as the least integer in C i.It is easily checked that either C i=C j or C i\C j= .Hence the set f0;1;111;M01g is partitioned into pairwise disjoint cyclotomic cosets,that is,f0;1;111;M01g=t m a n d n b e p o s i t i v e i n t e g e r s s u c h t h a tn=2m.Let be a primitive element of F2.Let f b(t1);t1=0;1;111;M01g be a binary m-sequence of period M=2m01,given byb(t1)=tr m1( twhere f s (j )(t )g is the sequence of period N given bys (j )(t )=tr m 1f [tr n m ( 2t )+ j t ]rgfor j 2F2such that[(M 01)=2m ]01i =0tr n 1( ut)(7)is exactly the Legendre sequence given in (6).Consider a decimation f s (u l t )g by u l of the sequence f s (t )g given in (7).Clearly,if l is an even integer,then f s (u l t )g is the Legendre sequence given in (6).It is also easy to show that if l is an odd integer,then f s (u l t )g is the sequence given bys (u l t )=a n d s e t= Tw h e r e T =2m+1.For an integer r ,1 r M 01,let f s (j )(t );t =0;1;111;N 01g be the sequence of period N =2n 01given bys(j )(t )=[(M 01)=2m ]01:Then the family F defined byF =ff s (j )(t )gj j =1;2;111;2m gis an optimal set of 2m binary sequences of period N =2n 01with respect to Welch’s bound.Consider the number N fam of fully distinct families F of 2m binary sequences of period N =2n 01constructed from the Legendre sequence of period M =2m 01by Theorem 7.Since we haveI=for a primitive element u in Z M ,it is easy to check that N I =2.Hence we getN fam =2'(N )n:Remark 8:By Theorem 3and Remark 4,the Legendre sequences of Mersenne prime period 2m 01can be used to construct optimal families of period 2k 01,where k is any even multiple of m..The sequence f b (t 1);t 1=0;1;111;126g given byb (t 1)=8)=8,w e d e fin es(j )(t )=8B .N e w F a m i l i e s f r o m H a l l ’s S e x t i c R e s i d u e S e q u e n c eB i n a r y s e q u e n c e s o f p e r i o d M =2m01with ideal autocorrelation property associated with Hall’s difference set appears only when m is 5,7,and 17[1],[9].They are known as the Hall’s sextic residue sequences.In the case that m =5,the Hall’s sextic residue sequences are exactly the m -sequences of period 31.Let m be one of 5,7,or 17,and set M =2m 01.Let u be a primitive element in Z M ,and let be a primitive element of F 2i =0tr m 1( utNote that its decimation by any integer r also has the ideal auto-correlation property.Hence,f b(t1)g and all of its decimations are called the Hall’s sextic residue sequences.Applying Theorem2to f b(t1)g,we have an optimal family with respect to Welch’s bound in the following.Theorem10:Let n=2m,where m is one of5,7,or17,and let u be a primitive element in Z M with M=2m01.Let be a primitive element of F2i=0tr m1f[tr n m( 2t)+ j t]ru g;for j2F2I I IISa f an a a a f2n01is a very interesting problem in both theory and practice[7],[8]. Especially,the balanced binary sequences of period2n01with ideal autocorrelation propertyfind many applications in spread-spectrum communication systems.A complete search for those sequences was conducted for period127by Baumert and Fredrickson[2],255by Cheng[4],and511by Drier[5].It is well known that there are six inequivalent binary sequences of period127with ideal autocorrelation property:an m-sequence,a Legendre sequence,a Hall’s sextic residue sequence,and three others called the miscellaneous sequences of unknown type I,II,and III. Let be a primitive element of F2)+tr71( 5t)+tr71( 11t):ii)Unknown Type IIb II(t1)=tr71( t)+tr71( 7t)+tr71( 29t)+tr71( 9t) w h e r e t1r u n s f r o m0t o126.B y T h e o r e m2,n e w o p t i m a l f a m i l i e s c a n b e c o n s t r u c t e d a b o v e s e q u e n c e s o f u n k n o w n t y p e.F o r e x a m p l e,c o n s i d e r f r o m t h e s e q u e n c ef b III(t1)g.Let n=2m=14.Let be a primitiveelement of F2and set = T where T=27+1.For any integerr,1 r 126,let f s(j)(t);t=0;1;111;N01g be the sequenceof period N=21401given bys(j)(t)=a n d I=f1;9;13g.Then the family F defined byF=ff s(j)(t)gj j=1;2;111;128gis an optimal set of128binary sequences of period N=21401withrespect to Welch’s bound.It is easily checked that N I='(127)=7=18.Hence we have N fam=18'(21401)=14=13608optimalfamilies from a binary sequence of each miscellaneous type.At period255,it is found that there are four inequivalent binarysequences with ideal autocorrelation property:an m-sequence,aGMW sequence,and two others of unknown type.New optimalfamilies can be constructed from a binary sequence of each unknowntype.Note that N I='(255)=8=16in this case.At period511,there arefive inequivalent binary sequences withideal autocorrelation property:an m-sequence,a GMW sequence,and three others of unknown type.New optimal families can beconstructed from a binary sequence of each unknown type.Note thatN I='(511)=9=48in this case.In the case of period1023,a computer search found that thereis at least one binary sequence f b(t1);t1=0;1;111;1022g withideal autocorrelation property,which is inequivalent to any of knownbinary sequences such as the m-sequences,the GMW sequences,andthe extensions of the Legendre sequences.It is given byb(t1)=tr101( t)+tr101( 57t)+tr101( 121t[11] F.J.MacWilliams and N.J.A.Sloane,The Theory of Error-CorrectingCodes.Amsterdam,The Netherlands:North-Holland,1977.[12]J.D.Olsen,R.A.Scholtz,and L.R.Welch,“Bent-function sequences,”IEEE rm.Theory,vol.IT-28,pp.858–864,Nov.1982. [13]J.-S.No,“A new family of binary pseudorandom sequences havingoptimal periodic correlation properties and large linear span,”Ph.D.dissertation,Univ.of Southern California,Los Angeles,CA,May1988.[14],“Generalization of GMW sequences and No sequences,”IEEErm.Theory,vol.42,pp.260–262,Jan.1996.[15]J.-S.No and P.V.Kumar,“A new family of binary pseudorandomsequences having optimal periodic correlation properties and large linear span,”IEEE rm.Theory,vol.35,pp.371–379,Mar.1989.[16]J.-S.No,H.-K.Lee,H.Chung,H.-Y.Song,and K.Yang,“Tracerepresentation of Legendre sequences of Mersenne prime period,”IEEE rm.Theory,vol.42,pp.2254–2255,Nov.1996.[17]J.-S.No,K.Yang,H.Chung,and H.-Y.Song,“Extension of binarysequences with ideal autocorrelation property,”in Proc1996IEEE Int.Symp.on Information Theory and Its Applications(ISITA’96)(Victoria, BC,Canada,Sept.17–20,1996),pp.837–840.[18] D.V.Sarwate and M.B.Pursley,“Crosscorrelation properties of pseu-dorandom and related sequences,”Proc.IEEE,vol.68,pp.593–619, May1980.[19]V.M.Sidelnikov,“On mutual correlation of sequences,”Sov.Math.–Dokl.,vol.12,pp.197–201,1971.[20]M.K.Simon,J.K.Omura,R.A.Scholtz,and B.K.Levitt,SpreadSpectrum Communications,vol. 1.Rockville,MD:Computer Sci.Press,1985.[21]H.Y.Song and S.W.Golomb,“On the existence of cyclic Hadamarddifference sets,”IEEE rm.Theory,vol.40,pp.1266–1268, July1994.[22]L.R.Welch,“Lower bounds on the maximum cross-correlation ofsignals,”IEEE rm.Theory,vol.IT-20,pp.397–399,May 1974.Is Code Equivalence Easy to Decide?Erez Petrank and Ron M.Roth,Member,IEEE Abstract—We study the computational difficulty of deciding whether two matrices generate equivalent linear codes,i.e.,codes that consist of the same codewords up to afixed permutation on the codeword coordinates. We call this problem Code ing techniques from the area of interactive proofs,we show on the one hand,that under the assumption that the polynomial-time hierarchy does not collapse,Code Equivanence is not NP-complete.On the other hand,we present a polynomial-time reduction from the Graph Isomorphism problem to Code Equivalence. Thus if one couldfind an efficient(i.e.,polynomial-time)algorithm for Code Equivalence,then one could settle the long-standing problem of determining whether there is an efficient algorithm for solving Graph Isomorphism.Index Terms—Code Equivalence,Graph Isomorphism,interactive proofs,polynomial hierarchy.I.I NTRODUCTIONLet F be afinitefield and let G1and G2be generator matrices of two linear codes C1and C2over F:We say that G1and G2are code-equivalent,denoted G1 G2,if the sets C1and C2are the Manuscript received November30,1995;revised February12,1997.E.Petrank is with the DIMACS Center,P.O.Box1179,Piscataway,NJ 08855USA.R.M.Roth is with Hewlett-Packard Laboratories,Palo Alto,CA94304 USA,on leave from the Computer Science Department,Technion–Israel Institute of Technology,Haifa32000,Israel.Publisher Item Identifier S0018-9448(97)05216-4.same,up to afixed permutation on the coordinates of the codewordsof C1:In other words,G1 G2if and only if both matrices have the same order k2n,and there exist an n2n permutation matrix P and a nonsingular k2k matrix S over F such that G1=SG2P: The problem of deciding whether two generator matrices are code-equivalent will be referred to as the Code Equivalence problem. The purpose of this correspondence is to study the computational difficulty of the Code Equivalence problem.As one application of a related problem,we mention the public-key cryptosystems due to McEliece[9]and Niederreiter[11].Recall that an alternant code overGF(q)is defined by a parity-check matrix of the form[y j i j]r01;n01i=0;j=0, where the j’s are distinct elements in GF(q m)and the y j’s are nonzero elements in GF(q m)[8,ch.12].Goppa codes are special cases of alternant codes where certain restrictions are imposed on the values y j’s,and generalized Reed–Solomon codes are special cases of alternant codes where m=1:The mentioned cryptosystems are based on the assumption that it is difficult to identify the values j and y j out of an arbitrary generator matrix(or parity-check matrix)of an alternant ly,it is difficult to obtain a code-equivalent matrix of the form[y j i j]r01;n01i=0;j=0:On the other hand,as shown in[12],it is easy to extract the values j and y j from any systematic generator matrix of a generalized Reed–Solomon code; hence,cryptosystems based on such a code are breakable.This was pointed out explicitly by Sidelnikov and Shestakov in[13].For related work,see also the references cited in[10,p.317].The significance of the Code Equivalence problem can also be exhibited through the results of Kasami,Lin,and Peterson[6], and Kolesnik and Mironchikov[7],who showed that Reed–Muller codes are equivalent to subcodes of extended Bose–Chaudhuri–Hocquenghem(BCH)codes.Thus it should be interesting to design an efficient algorithm that decides whether two codes are indeed equivalent,and thus infer from the properties that arise from one code representation to the other.On the positive side,wefirst show that the Code Equivalence problem is unlikely to be NP-complete.The proof of this assertion relies on techniques developed in thefield of interactive proofs, which we summarize in Section II.In Section III,we invoke results of Goldwasser,Micali,and Rackoff[4],Goldreich,Micali,and Wigderson[3],Goldwasser and Sipser[5],and Boppana,H˚a stad, and Zachos[2],to show that if Code Equivalence is NP-complete, then the polynomial hierarchy collapses.Yet,we do state also a negative result,namely,that Code Equiv-alence is also unlikely to be too easy.We do this by relating Code Equivalence to the Graph Isomorphism problem.Let G1=(V;E1) and G2=(V;E2)be two undirected graphs with the same set of vertices V,and with sets of edges E1and E2,respectively. We say that G1is isomorphic to G2if there exists a permutation (isomorphism) :V!V such that f u;v g2E1if and only if f (u); (v)g2E2(we assume here that the graphs have no parallel edges;if they do,then E1and E2are multisets,in which case isomorphism requires equality of the multiplicities of f u;v g and f (u); (v)g in E1and E2,respectively).The problem of deciding efficiently(i.e.,in polynomial time)whether two graphs are isomorphic is a notoriously open question in Computer Science.The problem has been studied extensively in recent decades,but the state of the art is that there is no known efficient algorithm for determining whether two given graphs are isomorphic.In Section IV,we show a polynomial-time reduction from Graph Isomorphism to Code Equivalence.This implies that presenting an0018–9448/97$10.00©1997IEEE。
