层次分析法---文献翻译888大学毕业设计(论文)文献翻译题目层次分析法院、系(部) 计算机科学与技术学院专业及班级计科0903班姓名 888 指导教师 888 日期 2013年3月Analytic Hierarchy ProcessThe Analytic Hierarchy Process (AHP) is a structured technique for helpingpeople deal with complex decisions. Rather than prescribing a "correct" decision, the AHP helps people to determine one that suits their needs and wants. Based on mathematics and psychology, it was developed by Thomas L. Saaty in the 1970s and has been extensively studied and refined since then. The AHP provides a comprehensive and rational framework for structuring a problem, for representing and quantifying its elements, for relating those elements to overall goals, and for evaluating alternative solutions. It is used throughout the world in a wide variety of decision situations, in fields such as government, business, industry, healthcare, and education.Several firms supply computer software to assist in using the process.Users of the AHP first decompose their decision problem into a hierarchy of more easily comprehended sub-problems, each of which can be analyzed independently. The elements of the hierarchy can relate to anyaspect of the decision problem—tangible or intangible, carefully measured or roughly estimated, well- or poorly-understood—anything at all that applies to the decision at hand.Once the hierarchy is built, the decision makers systematically evaluate its various elements, comparing them to one another in pairs. In making the comparisons, the decision makers can use concrete data about the elements, or they can use their judgments about the elements' relative meaning and importance. It is the essence of the AHP that human judgments, and not just the underlying information, can be used in performing the evaluations.The AHP converts these evaluations to numerical values that can be processed and compared over the entire range of the problem. A numerical weight or priority is derived for each element of the hierarchy, allowing diverse and often incommensurable elements to be compared to one another in a rational and consistent way. This capability distinguishes the AHP from other decision making techniques.In the final step of the process, numerical priorities are derivedfor each of the decision alternatives. Since these numbers represent the alternatives' relative ability to achieve the decision goal, they allow a straightforward consideration of the various courses of action.Uses and applicationsWhile it can be used by individuals working on straightforward decisions, Analytic Hierarchy Process (AHP) is most useful where teamsof people are working on complex problems, especially those with high stakes, involving human perceptionsand judgments, whose resolutions have long-term repercussions. Ithas unique advantages where important elements of the decision are difficult to quantify or compare, or where communication among team members is impeded by their different specializations, terminologies, or perspectives.Decision situations to which the AHP can be applied include:, Choice - The selection of one alternative from a given set of alternatives,usually where there are multiple decision criteria involved., Ranking - Putting a set of alternatives in order from most toleastdesirable Prioritization - Determining the relative merit of a setofalternatives, as opposed to selecting a single one or merely ranking them, Resource allocation - Apportioning resources among a set of alternatives, Benchmarking - Comparing the processes in one's own organization withthose of other best-of-breed organizations, Qualitymanagement - Dealing with the multidimensional aspects of quality and quality improvementThe applications of AHP to complex decision situations have numbered in the thousands, and have produced extensive results in problems involving planning, Resource allocation, priority setting, and selection among alternatives. Other areas have included forecasting, toreotal quality management, business process re-engineering ,quality function deployment， and the Balanced Scorecard.ManyAHP applications are never reported to the world at large, because they take place at high levels of large organizations where security and privacy considerations prohibit their disclosure. But some uses of AHP are discussed in the literature. Recently thesehave included:, Deciding how best to reduce the impact of global climate change (Fondazione Eni Enrico Mattei), Quantifying the overall quality of software system(Microsoftcorporation), Selecting university faculty(Bloomsburg University of Pennsy), Deciding where to locate offshore manufacturing plants(University ofCambridge), Assessing risk in operating cross-country prtroleumpipelines(AmericanSociety of Civil Engineers), Deciding how best to manage U.S. watersheds(U.S. Department of Agriculture)AHP is sometimes used in designing highly specific procedures for particular situations, such as the rating of buildings by historic significance. It was recently applied to a project that uses video footage to assess the condition of highways inVirginia. Highway engineers first used it to determine the optimum scope of the project, then to justify its budget to lawmakers.AHP is widely used in countries around the world. At a recent international conference on AHP, over 90 papers were presented from 19 countries, including the U.S., Germany, Japan, Chile , Malaysia, andNepal. Topics covered ranged from Establishing Payment Standards for Surgical Specialists, to Strategic TechnologyRoadmapping, to Infrastructure Reconstruction in Devastated Countries. AHP wasintroduced in China in 1982, and its use in that country has expanded greatly since then—its methods are highly compatible with the traditional Chinese decision making framework, and it has been used for many decisions in the fieldsofeconomics,energy,management,environment,traffic,agriculture, industry, and the military.Though using AHP requires no specialized academic trainning, the subject is widely taught at the university level—one AHP software provider lists over a hundredcolleges and universities among its clients. AHP is considered an important subject in many institutions of higher learning, includingschools of engineering and Graduate school of Business . AHP is also an important subject in the quality field, and is taught in many specialized courses including Six Sigma, Lean Six Sigma, and QFD.In China, nearly a hundred schools offer courses in AHP, and many doctoral students choose AHP as the subject of their research and dissertations. Over 900 papers have been published on the subject inthat country, and there is at least one Chinese scholarly journal devoted exclusively to AHP.ImplementationAs can be seen in the examples that follow, using the AHP involves the mathematical synthesis of numerous judgments about the decision problem at hand. It is not uncommon for these judgments to number in the dozens or even the hundreds. While the math can be done by hand or with a calculator, it is far more common to use one of several computerized methods for entering and synthesizing the judgments. The simplest of these involve standard spreadsheet software, while the most complex use custom software, often augmented by special devices for acquiring the judgmentsof decision makers gathered in a meeting room.Steps in using the processThe procedure for using the AHP can be summarized as:1. Model the problem as a hierarchy containing the decision goal,the alternativesfor reaching it, and the criteria for evaluating the alternatives.2. Establish priorities among the elements of the hierarchy bymaking a series ofjudgments based on pairwise comparisons of the elements. For example, whencomparing potential real-estate purchases, the investors might say they preferlocation over price and price over timing.3. Synthesize these judgments to yield a set of overall prioritiesfor the hierarchy.This would combine the investors' judgments about location, priceand timingfor properties A, B, C, and D into overall priorities for each property.4. Check the consistency of the judgments.5. Come to a final decision based on the results of this process.CriticismsThe AHP is now included in most operations research and management science textbooks, and is taught in numerous universities; it is used extensively in organizations that have carefully investigated its theoretical underpinnings. While the general consensus is that it isboth technically valid and practically useful, the method does have its critics.In the early 1990s a series of debates between critics andproponents of AHP was published in Management Science and The Journal of the Operational ResearchSociety. These debates seem to have been settled in favor of AHP.Occasional criticisms still appear. A 1997 paper examined possible flaws in the verbal (vs. numerical) scale often used in AHP pairwise comparisons. Another from the same year claimed that innocuous changesto the AHP model can introduce order where no order exists. A 2006 paper found that the addition of criteria for which all alternatives perform equally can alter the priorities of alternatives. An in-depth paper discussing the academic criticisms of AHP was published in Operations Research in2001.Most of the criticisms involve a phenomenon called rank reversal, discussed inthe following section.Rank reversalMany people hear about rank reversal and assume that there is some sort of proven principle about it that needs to be upheld in making decisions. That assumption has led to much misunderstanding of AHP and other decision making techniques. In actuality, rank reversal is a complex matter about which there are many conflicting ideas and opinions. This section offers a simplified explanation of the situation.Decision making involves ranking alternatives in terms of criteriaor attributes of those alternatives. It is an axiom of some decision theories that when new alternatives are added to a decision problem, the ranking of the old alternatives must not change. But in the real world, adding new alternatives can change the rank of the old ones. These rank reversals do not occur often, but the possibility of their occurrencehassubstantial logical implications about the methodology used to make decisions, the underlying assumptions of various decision theories, etc.A simple example will demonstrate the phenomenon of rank reversal: Consider a pretty girl in a small town. She's having a party next week, and she wants to buy a dress that will impress her guests. She visitsthe town's only dress store and goes to the rack of party dresses. There are five such dresses, and after long consideration she ranks them by desirability as follows:Rank Style Color Price1 Style A Blue $1092 Style A Green $1093 Style B Red $1194 Style C Yellow $995 Style D Off-White $149Now imagine that she enters the back room and sees the store'sentire inventory of dresses. The dresses she has looked at in Styles B, C, and D are the only ones of their kind, but there are four more StyleA dresses in green and eight more Style A dresses in blue. In the language of decision science, these dresses are copies of the existing alternatives. In our one-store small town scenario, there's a reasonable chance that one or more party guests would buy and wear one of the copies.When made aware of these new alternatives, our fashion-consciousgirl might rank her choices in a different order. Considering her great embarrassment if a guest were to wear the same dress that she did, she might rank her choices like this:OldRank Style Color PriceRank1 3 Style B Red $1192 4 Style C Yellow $993 5 Style D Off-White $1494 2 Style A Green $1095 1 Style A Blue $109Notice that the rankings of the two Style A dresses have reversed (since there are more copies of the blue dress than of the green one). Not only that, but Style A has gone from the most preferred style to the least preferred. Rank reversal has occurred. Axioms of decision theories have been violated. Scholars and researchers can cry"foul," or impugn the method by which the girl has made her choice, but there is no denying that in the world of our example, ranks havebeen reversed. There is no doubt that the reversal is due to the introduction of additional alternatives that are no different from the existing ones.The above is but one example of rank reversal. Rank reversal canalso occur when additional alternatives are added/removed that are not copies of the original alternatives (e.g., red and yellow dresses in completely different styles). Another example of rank reversal occurred in the 2000 U.S. presidential election. Ralph Nader was an 'irrelevant' alternative, in that he was dominated by both the Democrat and Republican candidates. However, since he attracted more votes from those who would have voted Democrat rather than Republican, his presence caused the ranks to reverse. Put another way, if Nader were not in the race, it is widely accepted that Al Gore would have won.There are two schools of thought about rank reversal. One maintains that new alternatives that introduce no additional attributes should not cause rank reversal under any circumstances. The other maintains that there are both situations in which rank reversal is not reasonable as well as situations where they are to be expected. The current version of the AHP can accommodate both these schools — its Ideal Mode preserves rank, while its Distributive Mode allows the ranks to change. Either mode is selected according to the problem at hand.层次分析法层次分析法(AHP)是一种帮助人们处理复杂决策的结构化技术，比起一种指定的“正确”的方法，层次分析法能帮助人们决定哪一种是更适合他们的需求。