Crutcher
Professor Hu Guoding 1923 (born April 4, 1943 in Primary and Middle Schools in Yinxian County, Zhejiang Professor Hu Guoding 1923 (born April 4, 1943 in Primary and Middle Schools in Yinxian County, Zhejiang . studying at Shanghai Jiao Tong University Department of Physics; in 1945 and joined the Communist Party of China, in 1946 and 1947 to be a traffic of the university CPC party chief, became the founders of the Communist Party of Jiaotong University and one of the leaders of the student movement studying at Shanghai Jiao Tong University Department of Physics; in 1945 and joined the Communist Party of China, in 1946 and 1947 to be a traffic of the university CPC party chief, became the founders of the Communist Party of Jiaotong University and one of the leaders of the student movement .
after college, recommended Mr. Chern, September 1947 in Nankai University majoring in mathematics teaching, while Tianjin traffic headed the party's leader, and the party branch of Nankai University, and an ex - head of the Liberated Areas is actively cultivated a revolutionary youth,Participation and leadership in the liberation of Tianjin and Nankai University to meet the nursing and other work September 1957, 1960, the former Soviet Union to Moscow University in mathematics education, engaged in probability theory and information theory of studying study September 1957, 1960, the former Soviet Union to Moscow University in mathematics education, engaged in probability theory and information theory of studying study .
after his return, he served as deputy director of the Nankai University Department of Mathematics, deputy secretary of after his return, he served as deputy director of the Nankai University Department of Mathematics, deputy secretary of . October 1979, Professor Hu Guoding served as the Deputy Party Secretary of Nankai University, Vice - President of the Russian Academy of Sciences, 1984 to October 1987, graduate school dean of Nankai University October 1979, Professor Hu Guoding served as the Deputy Party Secretary of Nankai University, Vice - President of the Russian Academy of Sciences, 1984 to October 1987, graduate school dean of Nankai University .
concurrently in the mid - 1980s to the mid - 1990s, Zeng, who is also Chairman of the Academic Degree Evaluation Committee of Nankai University in the college leadership during concurrently in the mid - 1980s to the mid - 1990s, Zeng, who is also Chairman of the Academic Degree Evaluation Committee of Nankai University in the college leadership during .,Professor Hu Guoding poured great efforts he has made a number of fruitful work, Nankai University, reform, development, and has made important contributions to ,Professor Hu Guoding poured great efforts he has made a number of fruitful work, Nankai University, reform, development, and has made important contributions to .
since 1981, Professor Hu Guoding at times with the U.S. director of the Institute of Mathematical Sciences, Mr. Chern, "" matters in 1985, established with the approval of the State Council, deputy director, Professor Hu Guoding matters in 1985, established with the approval of the State Council, deputy director, Professor Hu Guoding .
in 1992 and 1996, he became its second director in 1992 and 1996, he became its second director . Prof.Chern and always together, for the establishment, construction and development,- In their
in the mid 1980s, Professor Hu Guoding served as deputy director of National Natural Science Foundation of China (NSFC, promoting the Chinese natural sciences, especially mathematics to the whole development of in the mid 1980s, Professor Hu Guoding served as deputy director of National Natural Science Foundation of China (NSFC, promoting the Chinese natural sciences, especially mathematics to the whole development of . his push for the establishment of "Tianyuan Mathematical Fund", and has served as the vice - chairman of the board of the International Mathematical Union, President of Tianjin Science, Mathematics, director of the Tianjin of China, Chinese mathematics and science, and made positive contributions to development of his push for the establishment of "Tianyuan Mathematical Fund", and has served as the vice - chairman of the board of the International Mathematical Union, President of Tianjin Science, Mathematics, director of the Tianjin of China, Chinese mathematics and science, and made positive contributions to development of .
Professor Hu Guoding is seen as one of the earliest pioneering Shannon information theory in the research field of academic leaders, especially in the "information", "Communication with Shannon coding theorem of basic", "Shannon Information Theory in positive, theorem" and "Shannon theory significance and the application range of areas like Professor Hu Guoding is seen as one of the earliest pioneering Shannon information theory in the research field of academic leaders, especially in the "information", "Communication with Shannon coding theorem of basic", "Shannon Information Theory in positive, theorem" and "Shannon theory significance and the application range of areas like . made a significant contribution to these achievements at the international level has been highly praised, being called" Hu Guoding theorem ", which is the study of classical foundation - stone work made a significant contribution to these achievements at the international level has been highly praised, being called" Hu Guoding theorem ", which is the study of classical foundation - stone work .
Zeng in 1982 and 1985 respectively by Tianjin Science and Technology Progress Award of Ministry of Education and Professor Hu Guoding Zeng in 1982 and 1985 respectively by Tianjin Science and Technology Progress Award of Ministry of Education and Professor Hu Guoding . 's life is a life of revolution, the struggle of life, scientific research, teaching and life he 's life is a life of revolution, the struggle of life, scientific research, teaching and life he .
truth of principle, of being indifferent to it,is both about China's devotion to the revolutionary cause of the revolutionaries, was also a dedicated pursuit of scientific truth, intent on developing the science to be outstanding mathematicians, is a popular and respected and admired educator truth of principle, of being indifferent to it,is both about China's devotion to the revolutionary cause of the revolutionaries, was also a dedicated pursuit of scientific truth, intent on developing the science to be outstanding mathematicians, is a popular and respected and admired educator . Communist Party faithful, the famous mathematician, educator, former deputy director of the National Natural Science Foundation of China, the former President of Tianjin Science, Nankai University, former deputy Party secretary, vice chancellor Professor Hu Guoding, died of illness, September 21, 2011 9: 42 P.M. in Tianjin, has died at the age of 88
1 1.
Resumes
April 4, 1923 - born Zhejiang April 4, 1923 - born Zhejiang . 1943 - 1947 in Shanghai Jiaotong University's Department of Physics Learning 1943 - 1947 in Shanghai Jiaotong University's Department of Physics Learning .
1947 onwards at 1947 onwards at . Nankai University where he taught from 1957 - 1960 to the former Soviet Union to Moscow University; Nanjing 210009; China2Department of refresher Nankai University where he taught from 1957 - 1960 to the former Soviet Union to Moscow University; Nanjing 210009; China2Department of refresher .
probability scheme from 1960 to 1966 vice - dean of Nankai University majoring in mathematics in 1962 and was promoted to associate professor and probability scheme from 1960 to 1966 vice - dean of Nankai University majoring in mathematics in 1962 and was promoted to associate professor and . .
. was promoted to professor in 1979 and 1980 - 1988 and served as the Vice President of Nankai University, 1980 PhD supervisor elected was promoted to professor in 1979 and 1980 - 1988 and served as the Vice President of Nankai University, 1980 PhD supervisor elected .
. 1985 - 1993, he worked as deputy director of Nankai Mathematics 1985 - 1993, he worked as deputy director of Nankai Mathematics .
1986 - 1990 1986 - 1990. also served as the Vice President, National Natural Science Foundation of China from 1986 to 1990 he held a concurrent post as President of Tianjin Science also served as the Vice President, National Natural Science Foundation of China from 1986 to 1990 he held a concurrent post as President of Tianjin Science .
1993 - 1996: served as the Nankai Institute for Mathematics 1993 - 1996: served as the Nankai Institute for Mathematics . 1990 appointed as Adviser Science and honorary chairman of Tianjin Science 1990 appointed as Adviser Science and honorary chairman of Tianjin Science .
Academic Achievement
Hu Guoding research is mainly focused on four areas: mathematical information theory; in functional space random process; the general information; and the computer science and mathematics Hu Guoding research is mainly focused on four areas: mathematical information theory; in functional space random process; the general information; and the computer science and mathematics . 1. mathematical information theory (1) Hu Guoding solves a Shannon information theory is the basic question of the source and channel conditions to achieve fast communication problem, i. e., the so - called Shannon's positive,
Shannon theorem is an American scholar in its foundational classics to intuitive established the Shannon theorem of Shannon theorem is an American scholar in its foundational classics to intuitive established the Shannon theorem of . the most famous Soviet mathematicians A. Prominent. Xin Qin (X today?? we?? В95п.ч) Shannon will work by strictly mathematical and monographs written,It identifies the Shannon theorem are proved in his monograph of
conclusions said: "Shannon Theorem of establishing sufficient conditions are too strong. They should be properly weakened, and points out the key to the effectiveness of marngoni Necessary and sufficient conditions of the theorem is not an easy task, on the need to introduce new concepts on the essence of " Hu Guoding first pioneered the study of research based on the Shannon theorem " Hu Guoding first pioneered the study of research based on the Shannon theorem .
difficult, his model of communication from the first two aspects, i.e., the source and channel respectively discusses the In his thesis" with regard to the stability of the channel sequence information "in which" epsilon - fan type essence is a new concept.First found out successfully aspects related to the channel of sufficient
That's in Berkeley) made the first mention of the International Conference on the Law of the People's Republic of China Hu Guoding theorem " That's in Berkeley) made the first mention of the International Conference on the Law of the People's Republic of China Hu Guoding theorem ". He later from the source, and its papers in" Information Theory in the Shannon theorem 3 theorem "is first introduced into the source" epsilon - or yielding of the essence of the new concept, and once again succeeded in finding the source of aspects relating to He later from the source, and its papers in" Information Theory in the Shannon theorem 3 theorem "is first introduced into the source" epsilon - or yielding of the essence of the new concept, and once again succeeded in finding the source of aspects relating to .
sufficient to overcome the above - mentioned two key difficulties in the past, on the basis of the source and channel of the relevant polar nature are combine,in 1961 and completed a 47 - page creative "set up a communication system in the abstract of the Shannon is variable, the theorem"; In it He comprehensive and definitive settlement of Shannon's basic problems, namely to find Shannon basic proposition if and when Hu Guoding sufficient to overcome the above - mentioned two key difficulties in the past, on the basis of the source and channel of the relevant polar nature are combine,in 1961 and completed a 47 - page creative "set up a communication system in the abstract of the Shannon is variable, the theorem"; In it He comprehensive and definitive settlement of Shannon's basic problems, namely to find Shannon basic proposition if and when Hu Guoding . in the international information theory conference is carried out in the report to the General Assembly, on the spot to get a huge repercussion in the international information theory conference is carried out in the report to the General Assembly, on the spot to get a huge repercussion .
(2) the amount of information is the information theory, the basic concepts in his (2) the amount of information is the information theory, the basic concepts in his . theory in another basic work is" On information " theory in another basic work is" On information ".
Shannon in his foundational work in the introduction of a variable, two variables of information,Bott - Duffin inverse and generalized Bott - Duffin inverse are presented of the relationship between the number of Shannon in his foundational work in the introduction of a variable, two variables of information,Bott - Duffin inverse and generalized Bott - Duffin inverse are presented of the relationship between the number of . followed by the former Soviet Union School introduced three variables, i. e., the portion of the amount of information, and the tombs were discovered by A. H. Kolmogorov Golo (Ko je м Tap Tap Tap the inertia effect of the p - f), H. M. Gelfand (. GAMMA.2 л ь ф sluglike today??), Р02. je. - Lu Shen (до 3б р?? y maps of today) large number of mathematician named
Hu Guoding relationship in his thesis to promote the introduction of any finite number of variables, and found the more variable the amount of information can be added with a certain set of functions, referred to as the "accidents" of relationship (see more cloth Lu Shen 1972, 2002),Multiple variables to find the quantity relationship between all of the Hu Guoding relationship in his thesis to promote the introduction of any finite number of variables, and found the more variable the amount of information can be added with a certain set of functions, referred to as the "accidents" of relationship (see more cloth Lu Shen 1972, 2002),Multiple variables to find the quantity relationship between all of the . this theorem in modern information theory and the textbooks are often listed this theorem in modern information theory and the textbooks are often listed .
(3) subsequently Hu Guoding again in different under the criterion significance on Shannon's basic problems, in his article 3 was obtained and named Shannon basic proposition true if and only if (3) subsequently Hu Guoding again in different under the criterion significance on Shannon's basic problems, in his article 3 was obtained and named Shannon basic proposition true if and only if . (4) Communications, in the 1950s through the one - way (one transmitter and one receiver) for the Development of Communication of the 1960s after the multiplex (a plurality of satellite communication station which transmits a plurality of radio reception) (4) Communications, in the 1950s through the one - way (one transmitter and one receiver) for the Development of Communication of the 1960s after the multiplex (a plurality of satellite communication station which transmits a plurality of radio reception) .
If, 1950s single communication path in only two variables to the amount of information,In his essay in order to promote the introduction of any finite number of variables was also the amount of actual use, the satellite in the multipath communication feature in the actual use of the If, 1950s single communication path in only two variables to the amount of information,In his essay in order to promote the introduction of any finite number of variables was also the amount of actual use, the satellite in the multipath communication feature in the actual use of the . This is why the modern theory of literature and they held more books he was quoted by the paper's account This is why the modern theory of literature and they held more books he was quoted by the paper's account .
after 1970s, Hu Guoding Road in Dan Shannon, on the basis of theorem, in conjunction with any number of variables the relation between the amount of information, and overcome the multipath communication in many of the unique challenges of further Shannon will be positive, and the theorem is generalized to the multiplex communication model for general operations of the 1980s (see article 3),Continue, with international information theory after 1970s, Hu Guoding Road in Dan Shannon, on the basis of theorem, in conjunction with any number of variables the relation between the amount of information, and overcome the multipath communication in many of the unique challenges of further Shannon will be positive, and the theorem is generalized to the multiplex communication model for general operations of the 1980s (see article 3),Continue, with international information theory . spoke highly of Hu Guoding (5) In the aspect of the work of most of the major foreign criticism, see Kotz, professor of the book "Information Theory in the new results" The comprehensive review of the important books spoke highly of Hu Guoding (5) In the aspect of the work of most of the major foreign criticism, see Kotz, professor of the book "Information Theory in the new results" The comprehensive review of the important books .
). There are 83 pages, covering the countries of the world information - theoretic aspects of major work, which was dedicated to Hu Guoding part - about 9 pages, and many of the full - page personal account for the proportion of the number of full - text, he is one of the best - known of the may substantially reflect him abroad in the information - theoretic aspects of work of the international status of the evaluation in the above - mentioned why may substantially reflect him abroad in the information - theoretic aspects of work of the international status of the evaluation in the above - mentioned why .
Hu Guoding Kotz's book in The place outstanding?This is mainly because of his work to explore the basic content of the comparison, thereby causing the information theory of attention being paid to the account Hu Guoding Kotz's book in The place outstanding?This is mainly because of his work to explore the basic content of the comparison, thereby causing the information theory of attention being paid to the account . (6) Hu Guoding in Nankai for many years, and we have information - theoretic aspects of outstanding doctoral and masters, and undergraduate students, some of them are in the theoretical research department, more in the military sector, now frequently held meetings of the international information theory, our country in many of the participants is Nankai students or advanced study in Nankai (6) Hu Guoding in Nankai for many years, and we have information - theoretic aspects of outstanding doctoral and masters, and undergraduate students, some of them are in the theoretical research department, more in the military sector, now frequently held meetings of the international information theory, our country in many of the participants is Nankai students or advanced study in Nankai .
2. Functional analysis of stochastic process is a stochastic process has a "curve" so many events probability space people are clear about the "simple" random nature of the process after, using "simple" random process to the "complex"stochastic process of approximation, it may be approximated to understand the "complex" stochastic process the nature of the people are clear about the "simple" random nature of the process after, using "simple" random process to the "complex"stochastic process of approximation, it may be approximated to understand the "complex" stochastic process the nature of the .
To truly calculate both the degree of approximation, all the random process of the functional space in the topology structure of under what conditions can "measure" will become the subject in a very important topic To truly calculate both the degree of approximation, all the random process of the functional space in the topology structure of under what conditions can "measure" will become the subject in a very important topic . Hu Guoding in probability theory, the theory on the basis of a functional is a topological space in many of the sharp tool, to write a paper, "sigma - topology topology space and measures", mentioned in the article, there are two outcomes: (1) is the study of the sigma - additivity of the topological space of topological space typically measure with the measure of the relationship,found consistent if and only if both Hu Guoding in probability theory, the theory on the basis of a functional is a topological space in many of the sharp tool, to write a paper, "sigma - topology topology space and measures", mentioned in the article, there are two outcomes: (1) is the study of the sigma - additivity of the topological space of topological space typically measure with the measure of the relationship,found consistent if and only if both .
(2) In (1) it found that the above - described topology condition for metrization of a variety of other equivalent if (2) In (1) it found that the above - described topology condition for metrization of a variety of other equivalent if . paper published in the former Soviet Union's main magazine, and the later is the people cited by paper published in the former Soviet Union's main magazine, and the later is the people cited by .
3. generalized Akaike information criterion (1) in the seventies of the 20th century Hu Guoding has had several years to the actual work, with the participation of various data processing, in the general information referred to as" extraction " He's a lot of applications are summarized, and in" Multivariate Data Analysis method purely algebraic processing a monograph (421) He's a lot of applications are summarized, and in" Multivariate Data Analysis method purely algebraic processing a monograph (421) .
page book with the statistical similarity of the multivariate analysis,But it is notable for the fact that the statistical random part of it starts to boil, while only a purely algebraic treatment page book with the statistical similarity of the multivariate analysis,But it is notable for the fact that the statistical random part of it starts to boil, while only a purely algebraic treatment . for biology, medicine, geology, agriculture, engineering, meteorology, social economy has broad application, and in the Department of Mathematics Textbooks of Nankai as multiple use for biology, medicine, geology, agriculture, engineering, meteorology, social economy has broad application, and in the Department of Mathematics Textbooks of Nankai as multiple use .
Furthermore, Hu Guoding in petroleum geological survey of the research and development, will be a smooth process of the prediction based on the theory of artificial seismic survey method, in which the probability of random removethe part, pure analysis derived the so - called deconvolution and predicted in South China Sea oil exploration in actual use, the above effect is remarkable Furthermore, Hu Guoding in petroleum geological survey of the research and development, will be a smooth process of the prediction based on the theory of artificial seismic survey method, in which the probability of random removethe part, pure analysis derived the so - called deconvolution and predicted in South China Sea oil exploration in actual use, the above effect is remarkable . Discard probabilities, statistics of the random part. pure or pure algebraic analysis processing of the method,In the mathematical theory is strictly complete, while the actual workers to understand and use, it is the actual workers love
(2) the traditional Shannon are only located in a number of technological (2) the traditional Shannon are only located in a number of technological . applications but "information" as a noun is in fact of early breakthrough of the narrow communication range in the community around are widely adopted, the problem is the need of precise mathematical processing, rather than in general language applications but "information" as a noun is in fact of early breakthrough of the narrow communication range in the community around are widely adopted, the problem is the need of precise mathematical processing, rather than in general language .
daily in his paper "On information and inferential information" concerning the promotion of Shannon information and then,and the information related to the so - called reasoning of uncertainty reasoning theory daily in his paper "On information and inferential information" concerning the promotion of Shannon information and then,and the information related to the so - called reasoning of uncertainty reasoning theory . this information with the original theoretical reasoning of various uncertainty reasoning theory, not only theory is more rigorous and complete, and will be more widely and effectively applied to various fields, this information with the original theoretical reasoning of various uncertainty reasoning theory, not only theory is more rigorous and complete, and will be more widely and effectively applied to various fields, .
4. computer science and mathematics in computer science (1), except for the simplest of the so - called "Turing machine" and the like, there is no "computer," the general definition of the In his thesis" computer model "in which" the computer "class of computers is to resort to a finite multiple - instruction consisting of finite transformations (i.e., the" program ") can achieve infinite transform (i.e., a "computable function") of discrete calculator, or a "computer" is by means of the finite infinite transform which may generate a discrete transform of a calculator, a "finitary" calculator on the study of discrete
parallel computer and its software of articles which are being one of the above application parallel computer and its software of articles which are being one of the above application . (2) at the beginning of the 20th century, G. Cantor (Cantor) of infinite set theory occurs in the paradox caused by the third mathematical crisis so far did not like the first, the second crisis asexisting mathematics consistent conclusions
a Hilbert aside Cantor of infinite set theory, by means of a finitary finite infinite maps to generate a mapping of the new principles in mathematics was established on the basis of strict mathematical form 1931 K. Godel Incompleteness Theorem () was published, with the third mathematical crisis - related issues would be discussed at a relatively calm stay
the mathematical basis of problem was limited to only two basic mathematical philosophy she explores the mathematical basis of problem was limited to only two basic mathematical philosophy she explores . This is two questions: first, the mathematical truth problem This is two questions: first, the mathematical truth problem .
claims on the one hand the Incompleteness Theorem"There are at least in the form of arithmetic does not prove the theorem" claims on the one hand the Incompleteness Theorem"There are at least in the form of arithmetic does not prove the theorem" . other hand ordinary mathematicians believe the hugely popular "in any mathematical theorem that all provable"; second, the mathematics with the issue: on the one hand, common in ordinary mathematical research mathematicians believed that it would study object is the sort of objective reality, but found his form again after the mathematical theory of mathematics is to object as only a string of symbols of the finite transform other hand ordinary mathematicians believe the hugely popular "in any mathematical theorem that all provable"; second, the mathematics with the issue: on the one hand, common in ordinary mathematical research mathematicians believed that it would study object is the sort of objective reality, but found his form again after the mathematical theory of mathematics is to object as only a string of symbols of the finite transform .
"On ordinary mathematics with the form of a mathematical" using a strict mathematical way rather than from Khun attempt to answer the above question "On ordinary mathematics with the form of a mathematical" using a strict mathematical way rather than from Khun attempt to answer the above question ., argues that the general form of mathematics and mathematics is the essence of two different types of math,the free use of the former Cantor of infinite set theory, Cantor of infinite set theory without the latter strictly follows the principles only finitary , argues that the general form of mathematics and mathematics is the essence of two different types of math,the free use of the former Cantor of infinite set theory, Cantor of infinite set theory without the latter strictly follows the principles only finitary .
computer according to the general principle of Hilbert is known to be in the form of math is just not just any ordinary mathematics of computer simulation, mathematical form may also be referred to as the machine follow computer according to the general principle of Hilbert is known to be in the form of math is just not just any ordinary mathematics of computer simulation, mathematical form may also be referred to as the machine follow . finitary mathematical principles, with the aid of the finite can produce some infinite but cannot generate any infinite, that is function of the nature of the limitations of finitary mathematical principles, with the aid of the finite can produce some infinite but cannot generate any infinite, that is function of the nature of the limitations of .
So, with the aid of computers can only simulate the general mathematical fraction but not all such So, with the aid of computers can only simulate the general mathematical fraction but not all such .,(mathematics) in the form of a mathematical machine with respect to the analog of the ordinary mathematics has its similarities, but has a nature different; the first, ordinary mathematical theorems in the overall available containing any infinite set of inference rules proved to be, but does not necessarily follow the finiteness of the form (machine) inference rules are derived and proved, which is why any ordinary mathematical theorems can be proved (completely) in the form of arithmetic is not complete (theorem proving) cannot root for it; second, ordinary mathematics with some sort of objective reality, but in the form of a mathematical machine (mathematics) of the object, i.e. directly by the computer processing of the object,is simply a string of symbols of the poor are all the same, but due to the form of a mathematical machine (Mathematics) is an ordinary mathematical simulation, so ultimately, there is a string of symbols or some kind of objective and reflect the
The Main Works
1 Hu Guoding. Shannon theorem of three theorem. Acta Math Sinica, 1961, 11 (3):260 - 2942 Hu. On all kinds of information to the stability of a sequence of channels. Theory Prob. Appl., 1962, 7 (3): 271 282 (in Russian) 3 Hu. On shannon theorem and its converse for sequencein the case of abstract REDRESS. Transactions of the third conference in Prague on information theory, statistical decision function, random processes, 1962, 285 3324 Hu. Oninformation quantities. Theory Prob. Appl., 1962, 7 (4): 447 455 (in Russian) 5 Hu Guoding, Shen Shiyi. almost periodic passage of several coding theorem. Acta Math Sinica, 1962, 15 (1): 136 - 1526 Hu. Measures in sigma - and spaces.. C. sigma., 1963,T60 102 (3): 257 - 2697 Hu Guoding. Shannon theorem of criterion to measure the sufficient and necessary conditions. Acta scientiarum naturalium universitatis, 1964, 5 (5), 141 - 1588 Hu Guoding. general and periodic process communication models. Acta scientiarum naturalium universitatis, 1964, 5 (5),159 - 1989 Hu, Shen. Some new results on information theory. IEEE International Symposium on Information Theory, 198110 Hu, Shen. On channel coding theorywith burst noise. of the IEEE International Symposium on Information Theory, 198211 Hu, Shen. Some new results on information theory. IEEE International Symposium on Information Theory, Hu 198412. On, mamodel of computing machine. J. of Comp. Sci. and Tech., 1988, 3 (4): 273 28813 Hu Guoding, Zhang Chu. Multivariate data analysis method of pure algebra. Tianjin: Nankai UP,Hu 198914. Parallel computation power is sequential computation. Nankai Series in pure, applied and theoretical sunapee. World Scientific, Hu 199315. On information and infof reasoning, I., Hu. Ordinary sunapee and formal sunapee, 1998
Life Demeanor
Hu Guoding, was born in 1923 in Primary and Middle Schools in Yinxian County, Zhejiang Province Hu Guoding, was born in 1923 in Primary and Middle Schools in Yinxian County, Zhejiang Province . his father Hu Qi (1898 - 1940) is a graduate of the University of Shanghai, after studying in the U.S. for life insurance, repatriation in Shanghai after the founding of the Ningbo - Shaoxing Life Insurance Company, and is cited as the Shanghai Insurance Association, Chairman of
after 1937, Hu Qi threw himself into the anti - Japanese battle as well as for the absorption of the Communist Party who died in 1940, Zheng Zhenduo (former Minister of Culture) in the year to write a eulogy for Mr. Vernon and highly praised: ".. if she's like a tree,to stand erect in the storm and while the firm not only Mr Hu Qi like the few his stably gets off in time of danger, hardship, the horror, the distractions in the environment, like a gigantic; in his giant shadow, many millions of diazepam, the European Anti - Fraud Office, he holds a light of a lantern, in the vast darkness, guided many stepped forward and stably gets off in time of danger, hardship, the horror, the distractions in the environment, like a gigantic; in his giant shadow, many millions of diazepam, the European Anti - Fraud Office, he holds a light of a lantern, in the vast darkness, guided many stepped forward and .
"Hu Qi that he would be the property insurance company to offer all the anti - Japanese cause, and to inculcate into their family inheritance to benefit the masses of the people's revolutionary cause, Hu Guoding always put his father's will behave as their motto, and guide their life "Hu Qi that he would be the property insurance company to offer all the anti - Japanese cause, and to inculcate into their family inheritance to benefit the masses of the people's revolutionary cause, Hu Guoding always put his father's will behave as their motto, and guide their life . Hu Guoding avidly from an early age math,physical, after graduating from middle school in 1943 to be enrolled in the Physics Department of Shanghai Jiaotong University, he was diligent in his study of physics and mathematics in mind while working in the interests of the masses of the people's revolutionary cause and target Hu Guoding avidly from an early age math,physical, after graduating from middle school in 1943 to be enrolled in the Physics Department of Shanghai Jiaotong University, he was diligent in his study of physics and mathematics in mind while working in the interests of the masses of the people's revolutionary cause and target .
after the victory of the war, the revolutionary student movement have been blustery, Hu Guoding to actively take part in the student movement, and in 1945 joined the Communist Party, became the important one of the leaders of the student movement in 1947 by after the victory of the war, the revolutionary student movement have been blustery, Hu Guoding to actively take part in the student movement, and in 1945 joined the Communist Party, became the important one of the leaders of the student movement in 1947 by . after graduation was in charge of the Academia Sinica of Prof.Chern and introduced to the mathematics faculty at Nankai University, Tianjin cellar dweller, head of traffic at the same time, the transfer of cadres to the Liberated Areas,
1949 until its liberation from 1947 up to now, Hu Guoding 1949 until its liberation from 1947 up to now, Hu Guoding . Nankai University has been working from 1957 to 1960 by the State to the Soviet scheme is better as a student in the Moscow University, probability and information theory Refresher Nankai University has been working from 1957 to 1960 by the State to the Soviet scheme is better as a student in the Moscow University, probability and information theory Refresher .
during that period, he completed the theory in his paper, his tutors and scholars spoke highly of the international peers during that period, he completed the theory in his paper, his tutors and scholars spoke highly of the international peers . He came home in Nankai University pioneered the study of information theory, and became one of the study of the pioneers, and in 1961 began to recruit postgraduate students of He came home in Nankai University pioneered the study of information theory, and became one of the study of the pioneers, and in 1961 began to recruit postgraduate students of .
now he has become the research direction of academic leaders and elites in now he has become the research direction of academic leaders and elites in . Hu Guoding in "Cultural Revolution"intensive impact, but he braved blizzards, aboveboard, through that difficult period, the "Cultural Revolution" after the spring of science that Hu Guoding in "Cultural Revolution"intensive impact, but he braved blizzards, aboveboard, through that difficult period, the "Cultural Revolution" after the spring of science that .
for life and a love of science, he always make efforts to study, diligent work for life and a love of science, he always make efforts to study, diligent work . in the overthrow of the Gang of Four, He is also working against the clock, trying to be "cultural revolution, for the time I came back in in the overthrow of the Gang of Four, He is also working against the clock, trying to be "cultural revolution, for the time I came back in .
during an earthquake in 1976, he put up shelters for the organization of seminars, weekly weather during an earthquake in 1976, he put up shelters for the organization of seminars, weekly weather . later housing improvement, and his bedroom is often the Ban of classroom discussion later housing improvement, and his bedroom is often the Ban of classroom discussion .
Hu Guoding consistent pursuit of truth, the truth Hu Guoding consistent pursuit of truth, the truth . him for anything,Regardless of these is the application of the work or social work, but what you want to do this instead of that way is in it, but never sloppy, weathervane him for anything,Regardless of these is the application of the work or social work, but what you want to do this instead of that way is in it, but never sloppy, weathervane .
Once thinking it through, he'll relentlessly earnest, never indiscreet back Once thinking it through, he'll relentlessly earnest, never indiscreet back . he only asked him hold by himself, the truth, as to do so, individuals will probably encounter a big ordeal, he rarely even no he only asked him hold by himself, the truth, as to do so, individuals will probably encounter a big ordeal, he rarely even no .
Hu Guoding on fame and gain, doing revolutionary work, scholarship is Hu Guoding on fame and gain, doing revolutionary work, scholarship is . pursued his mathematical studies, learning the results of our predecessors, not satisfied to understand these results,And always thinking up these individual results in one global problem in the historic status and the role of the predecessor's intentions were trying to find out is how did they know, and how it pushes the problem further deepening, deepening the crux of the problem he is always the truth pursued his mathematical studies, learning the results of our predecessors, not satisfied to understand these results,And always thinking up these individual results in one global problem in the historic status and the role of the predecessor's intentions were trying to find out is how did they know, and how it pushes the problem further deepening, deepening the crux of the problem he is always the truth .
, , . he thought trespassing in the scholarship to do a deep and meaningful questions, not fashionable he thought trespassing in the scholarship to do a deep and meaningful questions, not fashionable .
that this spirit of perseverance and the pursuit of his academic success is one of the important reasons why that this spirit of perseverance and the pursuit of his academic success is one of the important reasons why .