廣和中醫減重 中醫減肥 你該了解數十年有效經驗的中醫診所經驗技術~
中醫減肥需要強調身體體質,只要能識別出個人肥胖的因素,然後根據個人的體質和症狀,施以正確的為個人配製的科學中藥,減肥成功可被期待,已經有很多成功案例。這也是我們在中醫減重減肥領域有信心的原因。
廣和中醫診所使用溫和的中藥使您成功減肥而無西藥減重的副作用,也可減少病人自行使用來路不明的減肥藥所產生的副作用,不僅可以成功減重,配合飲食衛教得宜,就可以不復肥。
廣和中醫多年成功經驗,為您提供安全,有效的減肥專科門診。
中藥減重和西藥減重差異性:
目前普遍流行的是藥物減肥法,藥物減肥法分為中藥減肥法和西藥減肥法。有些人也會選擇抽脂等醫美方式。
但是在我們全套的中藥減肥計劃中,除中藥外,還有埋線幫助局部減肥的方法。
西藥減肥,除了雞尾酒療法外,早年流行的諾美婷也是許多人用西藥減肥的藥物。
但是近期大多數人都開始轉向尋求傳統中藥不傷身的方式來減肥,同時可應用針灸,穴位埋入等改善局部肥胖。
許多人不願嘗試中醫減重最大原因:
減肥的最大恐懼是飢餓。廣和中醫客製化的科學中藥。根據個人需要減少食慾,但是又不傷身,讓您不用忍受飢餓感
讓您不用為了減重,而放棄該攝取的營養。
廣和中醫還使用針灸和穴位埋線刺激穴位,促進血液循環和減肥。
許多人來看診的人,都相當讚許我們的埋線技術,口碑極好!
這類新型線埋法的效果可以維持約10-14天 但不適用於身體虛弱,皮膚有傷口,懷孕、蟹足腫病人,必須要由醫師評估情況才可。
如果您一直想要減肥,已經常試過各類坊間的西藥還是成藥,造成食慾不振或是食慾低下,甚至出現厭食的狀況,營養不良的情形
請立即尋求廣和中醫的協助,我們為您訂做客製化的減重計畫,幫助您擺脫肥胖的人生!
廣和中醫診所位置:
廣和中醫深獲在地居民的一致推薦,也有民眾跨縣市前來求診
醫師叮嚀:病狀和體質因人而異,須找有經驗的中醫師才能對症下藥都能看到滿意的減重效果。
廣和中醫數十年的調理經驗,值得你的信賴。
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「謀士」顧名思義,其職責是為人謀劃,指設謀獻計的人。在過去,常服務於君王將相,現今則服務於僱主權官。實際上,謀士主要是起到幫人分析所面臨複雜局面,並給出應對建議的作用。而三國時期,無疑也是我國謀士的一個大舞臺,人才輩出,既有鬼才郭嘉,也有臥龍、鳳雛、幼麟、冢虎等等,可以說群星閃耀,星光熠熠,那麼如果對三國謀士進行排名,誰有能更勝一籌呢?不過要進行排名,我們應該首先明確一個標準,那就是謀士只負責提供建議,而是謀士不僅僅是對軍事進行分析,還指對政治、經濟等的建議,從綜合來看,小編認為三國謀士的排名應該是這樣的。 第一、賈詡 賈詡(xǔ,147年-223年8月11日),字文和,涼州姑臧(今甘肅武威市涼州區)人。東漢末年至三國初年著名謀士、軍事戰略家,曹魏開國功臣。可以說賈詡對時局認識之清楚,在三國眾多謀士中絕對的佼佼者,是三國中真正的百無一失之人,可以說是算無遺策。賈詡原為董卓部將,董卓死後,遇見打算把軍隊解散逃跑的李傕、郭汜,於是獻計李傕、郭汜召集舊部反攻長安,結果導致天下大亂,軍閥割據真正形成,堪稱是一席話攪亂天下。 後來李傕等人失敗後,一開始投靠段達,後來輾轉成為張繡的謀士。張繡曾用他的計策兩次打敗曹操,官渡之戰前他又認清形勢,勸張繡歸降曹操而不是當時實力強大的袁紹。官渡之戰時,賈詡力主與袁紹決戰。赤壁之戰前,賈詡認為應安撫百姓而不應勞師動眾討江東,曹操不聽,結果受到嚴重的挫敗。曹操與關中聯軍相持渭南時,賈詡獻離間計瓦解馬超、韓遂,使得曹操一舉平定關中。 在曹操繼承人的確定上,賈詡以袁紹、劉表為例,暗示曹操不可廢長立幼,從而暗助了曹丕成為世子。黃初元年(220年),曹丕稱帝,拜其為太尉,封魏壽鄉侯。曹丕曾問賈詡應先滅蜀還是吳,賈詡建議應先治理好國家再動武,曹丕不聽,果然征吳無功而返。黃初四年(223年),賈詡去世,享年七十七歲,諡曰肅侯。從其經歷中可以看出,其智慧超群,算無遺策,真是奇人。 ... 第二、司馬懿 司馬懿(179年—251年9月7日[1]),字仲達,河內郡溫縣孝敬里(今河南省焦作市溫縣)人。三國時期魏國傑出的政治家、軍事家、戰略家,西晉王朝的奠基人。司馬懿曾任曹魏的大都督、大將軍、太尉、太傅,是輔佐了魏國三代的託孤輔政之重臣,一生以堅忍著稱,在牛人相繼去世後成為掌控魏國朝政的權臣。司馬懿一生善謀奇策,多次征伐有功,其中最顯著的功績是兩次率大軍成功抵禦諸葛亮北伐和遠征平定遼東。在政治、經濟上也頗有建樹,對屯田、水利等農耕經濟發展有重要貢獻。73歲去世,辭郡公和殊禮,葬於首陽山。 ... 第三、諸葛亮 諸葛亮,字孔明,號臥龍(也作伏龍),徐州瑯琊陽都(今山東臨沂市沂南縣)人,三國時期蜀漢丞相,傑出的政治家、軍事家、外交家、文學家、書法家、發明家。諸葛亮本在襄陽隆中隱居,後劉備三顧茅廬,其提出著名的《隆中對》,爾後出山,輔佐劉備建立蜀漢。 蜀漢建立後,諸葛亮被封為丞相、武鄉侯,對內撫百姓,示儀軌,約官職,從權制,開誠心,布公道,對外聯吳抗魏,為實現興復漢室的政治理想,數次北伐,但因各種不同因素而失敗,最後於蜀漢建興十二年(234年)病逝於五丈原(今陝西寶雞岐山境內),享年54歲。劉禪追諡其為忠武侯,後世常以武侯、諸葛武侯尊稱諸葛亮。據說諸葛亮還善於發明,曾發明饅頭、木牛流馬、孔明燈等,並改造連弩,叫做諸葛連弩,可一弩十矢俱發。但是諸葛孔明在政治上的能力遠超軍事,其在軍事上的經典戰役也很少,赤壁是周瑜,收益州靠的是法正、龐統,正如司馬懿所說孔明是謹慎有餘而冒險精神不足,這也是其數次北伐無功而返的原因之一。 ... 第四、周瑜 周瑜(175年-210年),字公瑾,廬江舒縣(今安徽省合肥市舒縣)人,身體長壯有姿貌、精音律,江東有「曲有誤,周郎顧」之語。周瑜少與孫策交好,21歲追隨孫策奔赴戰場平定江東。孫策遇刺身亡,孫權繼任,周瑜將兵赴喪,以中護軍與長史張昭共掌眾事。建安十三年(208年),周瑜率軍與劉備聯合,於赤壁之戰中大敗曹軍,由此奠定了「三分天下」的基礎。建安十四年(209年),拜偏將軍,領南郡太守。建安十五年(210年)周瑜在準備攻伐益州時,病逝於巴丘,年僅36歲。在歷史上,周瑜年長諸葛亮6歲,其實倆人交集很少,赤壁之戰的首功之臣也非周瑜莫屬,三國演義中的很多橋段也只是演義故事為了突出諸葛亮。 ... 第五、郭嘉 郭嘉(170年-207年),字奉孝,潁川陽翟(今河南禹州)人。東漢末年曹操帳下著名謀士。郭嘉原為袁紹部下,後轉投曹操,助曹操平呂布、定河北,滅烏桓,為曹操統一中國北方立下了不少功勳,官至軍師祭酒,封洧陽亭侯。在曹操征伐烏桓時病逝,年僅三十八歲。諡曰貞侯。史書上稱他「才策謀略,世之奇士」。曹操稱讚他見識過人,是自己的「奇佐」。郭嘉是三國早期最為出彩的謀士,只可惜英年早逝。 ... 第六、荀彧 荀彧(163年-212年),字文若。潁川潁陰(今河南許昌)人。東漢末年著名政治家、戰略家。荀彧早年被稱為「王佐之才」,初舉孝廉,任守宮令。後棄官歸鄉,又率宗族避難冀州,被袁紹待為上賓。其後投奔曹操。官至侍中,守尚書令,封萬歲亭侯。因其任尚書令,居中持重達十數年,處理軍國事務,被人敬稱為「荀令君」。 荀彧在戰略方面為曹操規劃制定了統一北方的藍圖和軍事路線,曾多次修正曹操的戰略方針而得到曹操的讚賞,包括「深根固本以制天下」,「迎奉天子」等;戰術方面曾面對呂布叛亂而保全兗州三城,奇謀扼袁紹於官渡,險出宛、葉而間行輕進以掩其不意奇襲荊州等諸多建樹;政治方面為曹操舉薦了鍾繇、荀攸、陳群、杜襲、戲志才、郭嘉等大量人才。荀彧在建計、密謀、匡弼、舉人多有建樹,被曹操稱為「吾之子房」,是一位難得的全才。 第七、魯肅 魯肅(172年-217年),字子敬,漢族,臨淮郡東城縣(今安徽定遠)人,中國東漢末年傑出戰略家、外交家。魯肅出生於一士族家庭,體貌魁偉,性格豪爽,喜讀書、好騎射。東漢末年,他眼見朝廷昏庸,官吏腐敗,社會動盪,常召集鄉里青少年練兵習武。他還仗義疏財,深得鄉人敬慕。當時,周瑜為居巢長,因缺糧向魯肅求助,魯肅將一倉三千斛糧食慷慨贈給周瑜。從此,二人結為好友,共謀大事。 建安二年,魯肅率領部屬投奔孫權,為其提出鼎足江東的戰略規劃,也就是人們常說的東吳版的《隆中對》,得到孫權的賞識。建安十三年,曹操率大軍南下。孫權部下多主降,而魯肅與周瑜力排眾議,堅決主戰。結果,孫、劉聯軍大敗曹軍於赤壁,從此,奠定了三國鼎立格局。赤壁大戰後,魯肅被任命為贊軍校尉。 周瑜逝世後,孫權採納周瑜生前建議,令魯肅代周瑜職務領兵四千人,因魯肅治軍有方,軍隊很快發展到萬餘人。孫權根據當時政治軍事形勢需要,又任命魯肅為漢昌太守,授偏將軍;魯肅隨從孫權破皖城後,被授為橫江將軍,守陸口。此後魯肅為索取荊州而邀荊州守將關羽相見,然而卻無功而返。建安二十二年,魯肅去世,終年46歲,孫權親自為魯肅發喪,諸葛亮亦為其發哀。魯肅也是一個很有時局觀的智慧人物,可以說也是一個擁有戰略眼光的頂級謀士。 第八、毛玠 毛玠(?—216年),字孝先,陳留平丘(今河南封丘)人。年少時為縣吏,以清廉公正著稱。因戰亂而打算到荊州避亂,但中途知道劉表政令不嚴明,因而改往魯陽。後來投靠曹操,提出「奉天子以令不臣,脩耕植,畜軍資」的戰略規劃,得到曹操的欣賞,而就憑這一點,毛玠就不失為頂級謀士,正是因為他的這一建議,曹操才握住了一張王牌,從而發展自己,為曹魏集團贏得了主動權。毛玠與崔琰主持選舉,所舉用的都是清廉正直之士。而毛玠為人廉潔,激起天下廉潔之風,一改朝中奢華風氣。曹操大為讚賞,曹丕也親自去拜訪他。曹操獲封魏公後,毛玠改任尚書僕射,再典選舉。又密諫曹操應該立嫡長子曹丕為魏國太子。 第九、龐統、陳宮 龐統(179年-214年),字士元,號鳳雛,漢時荊州襄陽(治今湖北襄陽)人。東漢末年劉備帳下重要謀士,與諸葛亮同拜為軍師中郎將。與劉備一同入川,在劉備奪取益州的過程中發揮了重要作用。進圍雒縣時,龐統率眾攻城,不幸中流矢而亡,年僅三十六歲,追賜統為關內侯,諡曰靖侯。後來龐統所葬之處遂名為落鳳坡。 ... 陳宮,字公臺,東漢末年呂布帳下首席謀士,東郡東武陽(今山東莘縣)人。性情剛直,足智多謀,年少時與海內知名之士相互結交。192年,兗州刺史劉岱在討伐青州黃巾時戰死,陳宮等人主張曹操接任兗州牧因而被曹操視為心腹。但此後陳宮因曹操殺害邊讓等漢末名士而與曹操反目,並遊說張邈背叛曹操迎呂布入兗州,輔助呂布攻打曹操並先後取得兗州與徐州。下邳城中,呂布不聽陳宮兩面互補之計,以致失敗。呂布戰敗後,隨呂布等一同被曹操所擒,決意赴死。 第十、陳群 陳群,字長文,潁川許昌(今河南許昌東)人。三國時期著名政治家、曹魏重臣,魏晉南北朝選官制度「九品中正制」和曹魏律法《魏律》的主要創始人。陳群出身名門,是士族階層的代表,其通過自己的智慧其實最終實現了本階層的最大利益——九品中正制。早年被劉備闢為豫州別駕,曹操入主徐州時,被闢為司空西曹掾屬,後轉任參丞相軍事。曹操封魏公時,任魏國的御史中丞。後拜吏部尚書,封昌武亭侯。曹魏建立後,歷任尚書令、鎮軍大將軍、中護軍、錄尚書事。陳群歷仕曹操、曹丕、曹叡三代,以其突出的治世之才,為曹魏政權的禮制及其政治制度的建設,做出了突出的貢獻。 以上謀士都是三國時期的翹楚,當然也要一些牛人比如田豐、沮授等人也都是智慧超群,只可惜沒有遇到明主,只能遺憾落選。
內容簡介
Multiobjective Resource Management Problems (m-RMP) involves deciding how to divide a resource of limited availability among multiple demands in a way that optimizes current objectives. RMP is widely used to plan the optimal allocating or management resources process among various projects or business units for the maximum product and the minimum cost. “Resources” might be manpower, assets, raw materials, capital or anything else in limited supply. The solution method of RMP, however, has its own problems; this book identifies four of them along with the proposed methods to solve them. Mathematical models combined with effective multistage Genetic Algorithm (GA) approach help to develop a method for handling the m-RMP. The proposed approach not only can solve relatively large size problems but also has better performance than the conventional GA. And the proposed method provides more flexibility to m-RMP model which is the key to survive under severely competitive environment. We also believe that the proposed method can be adapted to other production-distribution planning and all m-RAP models.
In this book, four problems with m-RMP models will be clearly outlined and a multistage hybridized GA method for finding the best solution is then implemented. Comparison results with the conventional GA methods are also presented. This book also mentions several useful combinatorial optimization models in process system and proposed effective solution methods by using multistage GA.
Note:Part of this book, once published in international journals SCI (Science Direct) inside, be accepted have five articles.
作者簡介:
林吉銘 (Chi-Ming Lin)
電子信箱:chiminglin.tw@gmail.com
學歷
日本國立兵庫教育大學 教育學碩士
日本早稻田大學資訊生產系統研究所5年研究
日本公立前橋工科大學工學研究所 工學博士
經歷
教育部 專員
國立台北教育大學 兼任講師
台北市立教育大學 兼任講師
中央警察大學 兼任講師
國立台南師範大學 兼任講師
美和技術學院 專任講師
長庚技術學院 專任講師
桃園縣公、私立托兒所 評鑑委員
開南大學 專任講師(現職)
目錄
Acknowledgements3
Absract of Chinese 4
Abstract8
Chapter 1 Introduction2
1.1 Background of the Study2
1.2 Related Work7
1.2.1 Genetic Algorithm7
1.2.2 Multiobjective Genetic Algorithm36
1.3 Resource Management Problems54
1.4 Problems in this Dissertation58
1.4.1 A Solution Method for Human RMP Optimization58
1.4.2 A Solution Method for Asset RMP Optimization58
1.4.3 A Solution Method for Capital RMP Optimization58
1.4.4 A Solution Method for Staff Training RMP Optimization59
1.5 Organization of the Dissertation59
Chapter 2 Multistage Genetic Algorithm in Resource Management System65
2.1 Introduction65
2.2 Basic Idea67
2.2.1 Basic Idea Description67
2.2.2 Structure of Resource Management Solution System71
2.2.3 Multistage Network Framework74
2.2.4 Linearization76
2.2.5 Local Search78
2.3 Mathematical Formulations78
2.4 Constructing Multistage Network Structure81
2.4.1 Example One82
2.4.2 Example Two84
2.5 Solving Method by Multistage Genetic Algorithm90
2.5.1 Example Three93
2.5.2 Example Four99
2.6 Experimental Results102
2.6.1 Facility Allocation Problem102
2.6.2 Problem Description of Multiobjective Human RMP104
2.6.3 Experimental Results of Multiobjective Human RMP105
2.7 Summary110
Chapter 3 Optimization for Multiobjective Assets RMP by Multistage GA112
3.1 Introduction112
3.2 Problem Description113
3.2.1 There is Assets Resources Now113
3.2.2 The Data in the Past113
3.2.3 The Problem of Enterprise Boss Expects to be Solved114
3.3 Mathematical Model of Multiobjective Assets RMP115
3.4 Experimental Results and Discussion in First Part122
3.4.1 Experiments Results in the First Part122
3.4.2 Discussion in First Part125
3.5 Experimental Results and Discussion in Second Part134
3.5.1 Experimental Results in Second Part134
3.5.2 Discussion in Second Part139
3.6 Summary144
Chapter 4 Multistage GA for Optimization of Multiobjective Capital RMP149
4.1 Introduction149
4.2 Mathematical Model of Multiobjective Capital RMP153
4.3 Solution Approaches for Multiobjective Capital RMP155
4.3.1 Candidate Mutual Funds Selection155
4.3.2 Multistage Hybrid GA of Multiobjective Capital RMP156
4.3.3 Pareto Optimal Solution159
4.3.4 Adaptive Weight GA161
4.4 Numerical Example of Multiobjective Capital RMP164
4.4.1 Problem Description164
4.4.2 The Goal of the Problem Reached in Research166
4.4.3 Numerical Example of Multiobjective Capital RMP167
4.5 Discussion of Multiobjective Capital RMP175
4.6 Summary178
Chapter 5 Optimization of Staff Training RMP by Multistage GA182
5.1 Introduction182
5.2 Concepts of Competence Set183
5.3 Mathematical Model187
5.4 Solution Approaches by Multistage Hybrid GA191
5.4.1 Genetic Representation191
5.4.2 Evaluation193
5.4.3Selection193
5.5 Numerical Examples195
5.5.1 Problem Description195
5.5.2 The Goal of the Problem Reached in Research196
5.6 Summary209
Chapter 6 Conclusions and Future Research 213
6.1 Conclusions213
6.2 Future Research219
Glossary220
Notations220
Abbreviations222
Bibliography223
List of Publications231
International Journal Papers231
International Conference Papers with Review232
Index235
List of Figure
Figure 1.1: The Flow Chart of Genetic Algorithm11
Figure 1.2: Procedure-code of Basic GA12
Figure 1.3: Coding Space and Solution Space17
Figure 1.4: Feasibility and Legality18
Figure 1.5: The Mapping from Chromosomes to Solutions21
Figure 1.6: An Example of One-cut Point Crossover Operation24
Figure 1.7: Procedure-code of One-cut Point Crossover Operation25
Figure 1.8: An Example of Mutation Operation by Random27
Figure 1.9: An Example of Mutation Operation by Random27
Figure 1.10: Procedure-code of Multiobjective GA54
Figure 2.1: Proposed Structure of Resource Management Solution System72
Figure 2.2: Proposed a Flowchart of Resource Management Solution System73
Figure 2.3: An Example of Complex Multistage Network Framework74
Figure 2.4: Representation of Multistage Network Approach for RMP75
Figure 2.5: Representation Process for RMP83
Figure 2.6: Representation Process for RMP84
Figure 2.7: A Multistage Network of Human RMP90
Figure 2.8: The Code of Random Key-based Encoding in Procedure 194
Figure 2.9: The Code of Weight Generating in Procedure 295
Figure 2.10: An Example of Weight Generating96
Figure 2.11: An Example of One-cut Point Crossover Operator96
Figure 2.12: The Example of Insertion Mutation98
Figure 2.13: Proposed Structure of a Chromosome100
Figure 2.14: An Example of Optimal Allocation Path101
Figure 2.15: Proposed Chromosome Structure for Four Stages Allocation Path101
Figure 2.16: The Pareto Optimal Solutions of Weighted-sum Method107
Figure 2.17: The Pareto Optimal Solutions of Proposed Method108
Figure 3.1: An Example of Complex Multistage Network Framework114
Figure 3.2: The Path Process of Two Objectives in Each Node119
Figure 3.3: Simulation Results for Multiobjective Assets RMP121
Figure 3.4: The Simulation Results of pri-GA124
Figure 3.5: The Simulation Results of msh-GA124
Figure 3.6: Preference Solutions with Pareto Optimal Solutions by pri-GA137
Figure 3.7: Preference Solutions with Pareto Optimal Solutions by msh-GA137
Figure 4.1: Simple Case with Two Objectives160
Figure 4.2: The Procedure of Pareto GA161
Figure 4.3: Adaptive Weights and Adaptive Hyperplane163
Figure 4.4: The Process Path of Two Objectives in Each Node168
Figure 4.5: An Example for Multiobjective Capital RMP169
Figure 4.6: Experiment Results by Two Methods172
Figure 5.1: The Cost Function of CSE184
Figure 5.2: CSE in Multistage Network Model186
Figure 5.3: An Example of State Permutation Encoding for CSE Operation.192
Figure 5.4: An Example of State Permutation Decoding for CSE Operation.192
Figure 5.5: An Example of Evaluation for CSE193
Figure 5.6: An Example of Selection for CSE193
Figure 5.7: The Procedure of msh-GA for Multistage CSE194
Figure 5.8: An Example of CSE for Staff Training RMP198
Figure 5.9: The Process Path of Two Objectives in Each Arc199
Figure 5.10: A Solution Example of Pareto Optimal Solutions for CSE200
Figure 5.11: Simulation Results of CSE for Staff Training RMP205
List of Table
Table 2.1: Transportation Costs102
Table 2.2: Maintenance Costs of Each Facility102
Table 2.3: The Parameters Setting of Experiment102
Table 2.4: Transportation Amounts from Each Facility to Each Consumer103
Table 2.5: Total Cost of Facility Allocate Transportation by Two Methods103
Table 2.6: An Example of Expected Wage of Programmer (Workers)106
Table 2.7: An Example of Expected Product Number of Task (Job)106
Table 2.8: The Parameter Settings of Experiment106
Table 2.9: Experiment Results of Two Methods108
Table 2.10: Experiment Results of Overall Average by Two Methods109
Table 3.1: The Data of the Company in the Past 4 Years117
Table 3.2: An Example of Expected Cost in 4 Districts 118
Table 3.3: An Example of Expected Selling Goods in 4 Districts118
Table 3.4: The Total Number of Feasible Solutions for Process Planning120
Table 3.5: The Parameter Settings of Experiment122
Table 3.6: Experiment Rs of the Pareto Optimal Solutions123
Table 3.7: Experiment Result of Two Methods125
Table 3.8: Same Preference Solution for Minimum Cost127
Table 3.9: Same Preference Solution for Maximum Selling Goods Number129
Table 3.10: Preference for Golden Mean within Pareto Optimal Solutions131
Table 3.11: The Parameter Settings of msh-GA136
Table 3.12: Experiment Results for Pareto Optimal Solutions138
Table 3.13: Preference for Golden Mean within Pareto Optimal Solutions141
Table 4.1: 3-months and 12-months Return Rates for 60 Sample Companies165
Table 4.2: Reordering Data Sets of Mutual Funds165
Table 4.3: The Total Number of Feasible Solutions for Process Planning169
Table 4.4: The Covariance Matrix170
Table 4.5: The Parameters Setting of Experiment170
Table 4.6: Experiment Results of Pareto Optimal Solutions by Two Methods171
Table 4.7: Experiment Results for the Optimal Portfolio174
Table 4.8: The Optimal Portfolio Solution of Sharpe Ratio174
Table 5.1: Total Numbers of Feasible Solutions for CSE200
Table 5.2: An Example of Data for CSE203
Table 5.3: Parameters Settings204
Table 5.4: Pareto Optimal Solutions for Multiobjective CSE204
Table 5.5: Experiment Results of the Pareto Optimal Solutions207
Table 5.6: Experiment Results of Pareto Optimal Solutions208
序
Abstract
Multiobjective Resource Management Problems (m-RMP) involves deciding how to divide a resource of limited availability among multiple demands in a way that optimizes current objectives. RMP is widely used to plan the optimal allocating or management resources process among various projects or business units for the maximum product and the minimum cost. “Resources” might be manpower, assets, raw materials, capital or anything else in limited supply.
The solution method of RMP, however, has its own problems; this thesis identifies four of them along with the proposed methods to solve them. Mathematical models combined with effective multistage Genetic Algorithm (GA) approach help to develop a method for handling the m-RMP. The proposed approach not only can solve relatively large size problems but also has better performance than the conventional GA. And the proposed method provides more flexibility to m-RMP model which is the key to survive under severely competitive environment. We also believe that the proposed method can be adapted to other production-distribution planning and all m-RAP models.
In this thesis, four problems with m-RMP models will be clearly outlined and a multistage hybridized GA method for finding the best solution is then implemented. Comparison results with the conventional GA methods are also presented. This study also mentions several useful combinatorial optimization models in process system and proposed effective solution methods by using multistage GA. In the areas of future research, the methods outlined in this study might be applied to combinatorial optimization of m-RMP involving areas of education, portfolio selection or areas of industrial engineering design, product process planning system amongst many others.
詳細資料
- ISBN:9789866231483
- 規格:平裝 / 258頁 / 16k菊 / 14.8 x 21 cm / 普通級 / 單色印刷 / 初版
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