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Boolean Algebra and 的問題,透過圖書和論文來找解法和答案更準確安心。 我們找到下列免費下載的地點或者是各式教學
Boolean Algebra and 的問題,我們搜遍了碩博士論文和台灣出版的書籍,推薦Movsisyan, Yuri寫的 Hyperidentities: Boolean and de Morgan Structures 和的 Security and Privacy: Select Proceedings of Icsp 2020都 可以從中找到所需的評價。
這兩本書分別來自 和所出版 。
中原大學 工業與系統工程學系 項衛中所指導 古峻嘉的 影像擴增手法對半導體封裝超音波斷層成像檢驗績效之評估 (2021),提出Boolean Algebra and 關鍵因素是什麼,來自於半導體封裝、人工智慧模型、缺陷擴增、卷積神經網路。
而第二篇論文高雄醫學大學 護理學系碩士班 陳幼梅所指導 蘇佩真的 桌遊對改善輕微失智老年人憂鬱與認知功能之成效:系統性文獻回顧 (2021),提出因為有 桌遊、失智、老年人、憂鬱、認知功能、系統性文獻回顧的重點而找出了 Boolean Algebra and 的解答。
除了Boolean Algebra and ,大家也想知道這些:
Hyperidentities: Boolean and de Morgan Structures
為了解決Boolean Algebra and 的問題,作者Movsisyan, Yuri 這樣論述:
Hyperidentities are important formulae of second-order logic, and research in hyperidentities paves way for the study of second-order logic and second-order model theory.This book illustrates many important current trends and perspectives for the field of hyperidentities and their applications, of i
nterest to researchers in modern algebra and discrete mathematics. It covers a number of directions, including the characterizations of the Boolean algebra of n-ary Boolean functions and the distributive lattice of n-ary monotone Boolean functions; the classification of hyperidentities of the variet
y of lattices, the variety of distributive (modular) lattices, the variety of Boolean algebras, and the variety of De Morgan algebras; the characterization of algebras with aforementioned hyperidentities; the functional representations of finitely-generated free algebras of various varieties of latt
ices and bilattices via generalized Boolean functions (De Morgan functions, quasi-De Morgan functions, super-Boolean functions, super-De Morgan functions, etc); the structural results for De Morgan algebras, Boole-De Morgan algebras, super-Boolean algebras, bilattices, among others.While problems of
Boolean functions theory are well known, the present book offers alternative, more general problems, involving the concepts of De Morgan functions, quasi-De Morgan functions, super-Boolean functions, and super-De Morgan functions, etc. In contrast to other generalized Boolean functions discovered a
nd investigated so far, these functions have clearly normal forms. This quality is of crucial importance for their applications in pure and applied mathematics, especially in discrete mathematics, quantum computation, quantum information theory, quantum logic, and the theory of quantum computers.
影像擴增手法對半導體封裝超音波斷層成像檢驗績效之評估
為了解決Boolean Algebra and 的問題,作者古峻嘉 這樣論述:
台灣半導體封裝產業的各項品質檢測皆朝自動化發展,人工智慧技術近年來快速發展並應用於各領域中,將人工智慧技術用於分辨產品好壞,改善目前使用人工目視檢查耗時且標準不一的困難,以提升工作效率。卷積神經網路預測模型需要相當大量且品質好的圖形以建立訓練集,但現今高良率的製程反而造成不良品的資料過於稀少。本研究開發程式針對不良品影像進行擴增,產生大量且貼近實際缺陷樣貌的不良品資料,再以卷積神經網路進行模型訓練。本研究提出自行開發的擴增方法,再以不同的擴增倍率與縮小比例,建立個別的訓練資料與預測模型,進而找出影響績效的因子,以提高模型的預測績效。本研究建立模型可大致上分為四個步驟,第一步是將原始影像切割成
單顆晶片影像,並對單顆晶片標示好壞作為訓練模型的資料,第二步是將切割後的不良品影像以不同的方法進行擴增處理,第三步將擴增後的影像以不同的擴增參數建立個別的訓練資料,再以卷積神經網路進行預測模型的訓練,第四部分將完成訓練的預測模型進行盲測,並將計算出模型的績效指標,對不同模型之績效指標進行變異數分析。研究結果發現本研究提出之原缺陷輪廓與數值擴增手法對於預測模型的效果優於之前採用的矩形輪廓相差擴增法,主因是原缺陷輪廓擴增能更準確的保有實際缺陷影像。越高倍率的擴增對於預測模型的績效表現越好,但隨著擴增倍率的調高改善的效果越來越趨緩。本研究認為考慮良品影像不足時,為使良品與不良品影像仍能夠保持等比例,
以30倍率的擴增可以有效的幫助模型正確學習不良品影像。進行缺陷比例調整的預測模型績效比未進行缺陷比例調整的高,原因是進行缺陷比例調整後的擴增影像更貼近於真實不良品影像,能夠讓模型在缺陷的認定上效率更好。
Security and Privacy: Select Proceedings of Icsp 2020
為了解決Boolean Algebra and 的問題,作者 這樣論述:
A Score Level Fusion Method for Protecting Fingerprint and Palmprint Templates.- Combining Human Ear and Profile Face Biometrics for Identity Recognition.- Computation And Communication Efficient Chinese Remainder Theorem Based Multi-Party Key Generation Using Modified RSA.- Efficient Random Grid Vi
sual Cryptographic Schemes having Essential Members.- Further results on bent-negabent Boolean functions.- Generalization of Lattice Based Cryptography on Hypercomplex Algebras.- Health Monitoring of Hydraulic System Using Feature based Multivariate Time-series Classification Model.- Image Security
using Hyperchaos and Multidimensional Playfair Cipher.- Iris recognition using improved Xor-Sum Code.- Linear Complementary Dual Codes over $mathbb{Z}_2mathbb{Z}_4$.- Low c-differential uniformity for the Gold function modified on a subfield.- Post-Quantum Secure Identity Based Encryption from Multi
variate Public Key Cryptography.- Provably insecure group authentication Not all security proofs are what they claim to be.- Terahertz Communication Merit Demerit and Future challenges regarding 6G Wireless Networks. Pantelimon Stanica is currently working as a Professor in the Department of Appli
ed Mathematics, Graduate School of Engineering & Applied Sciences (GSEAS) at Naval Postgraduate School, Monterey, USA. He is also associated with the Institute of Mathematics of Romanian Academy as a researcher. He received his doctoral degree in mathematics from the State University of New York at
Buffalo in 1998. He also received a doctorate in algebra from the Institute of Mathematics of the Romanian Academy in 1998. He has published over 150 research articles in internationally reputed journals and conferences and has co-authored a book on Cryptographic Boolean Functions (now in the second
edition) and co-edited two conference proceedings. His research interests include number theory, cryptography, coding theory, combinatorics, finite fields, Boolean functions, valuation theory, class field theory, and theoretical computer science.Sugata Gangopadhyay is currently working as a Profess
or in the Department of Computer Science, Indian Institute of Technology Roorkee, India. He received his doctoral degree in mathematics from the Indian Institute of Technology Kharagpur, India, in 1998. He received an Outstanding Teacher Award in 2016 from IIT Roorkee and ONR-Global VSP award to vis
it Naval Postgraduate School, Monterey, California USA. He served in the program committee of NSUCRYPTO the International Students’ Olympiad in Cryptography organized by Novosibirsk State University, Russia. He has published several research articles in internationally reputed journals and conferenc
es. His research interests include cryptology, cryptographic Boolean functions, and stream cipher cryptanalysis. Sumit Kumar Debnath is an Assistant Professor in the Department of Mathematics, National Institute of Technology Jamshedpur, India. He received his doctoral degree in cryptology & network
security from the Indian Institute of Technology Kharagpur, India, in 2017. He has published several research articles in internationally reputed journals and conferences. He is a life member of the Cryptology Research Society of India (CRSI). His research interests include multivariate cryptograph
y, lattice-based cryptography, isogeny-based cryptography, quantum cryptography, secure two-party/multi-party computation, secure set intersection, electronic voting, functional encryption, identity-based cryptography, and oblivious transfer.
桌遊對改善輕微失智老年人憂鬱與認知功能之成效:系統性文獻回顧
為了解決Boolean Algebra and 的問題,作者蘇佩真 這樣論述:
背景:全世界人口正走向高齡化,潛在支持比/扶老比的數據更凸顯青壯年勞動力人口比例下降。台灣於2018年達高齡社會,推估將於2025年邁入超高齡社會,2020年失智症已成為第12大死因。預防失智症的策略著重早期治療活動,文獻搜尋發現預防介入活動十分多元,許多介入活動已有統合分析的研究結果作為實證建議之依據。近年來研究者開始將桌遊活動作為預防失智症的介入措施,然而至今仍無系統性文獻回顧探討桌遊介入措施的有效性。目的:本研究運用系統性文獻回顧,探討以桌遊為介入活動對改善輕微失智老人憂鬱與認知功能的成效。方法:依據JBI(Joanna Briggs Institute)系統性文獻回顧的步驟擬定PIC
OS,以「布林邏輯運算元」進行關鍵字聯集或交集,採用PRISMA 2020版文獻篩選流程,於六個英文資料庫、二個中文資料庫進行文獻檢索,文獻納入標準為(1)隨機分派試驗或類實驗研究設計、(2)符合Oxford 2011證據等級Level 2以上的研究文獻。共選出8篇Level 2之文獻(3篇類實驗研究、5篇隨機分派試驗研究;7篇英文、1篇中文),依研究設計類型選用相對應的JBI檢核表,由二位評讀者評價文獻品質,以Cohen's kappa測量評讀者間一致性k= .948。結果:桌遊介入活動分二大類:(1)每組2人的棋盤類活動(2)每組3人以上的系列活動(如:卡牌、疊杯、搶答按鈴、模型等);活動
進行時間大致分布為每週1~12次,每次50~120分鐘,持續介入達5~24週;介入措施執行人有醫事人員(護理師、醫師、心理師、社工師),也有非醫療專業人員(休閒治療師、運動科學家、玩家或教練);測量介入成效的指標定義和測量工具歧異大,憂鬱程度有3種測量工具,認知功能更有記憶力、注意力、整體認知功能、語意流暢性、抑制能力、衝動控制能力等多種指標。3篇探討憂鬱成效的研究中,4個測量中有3個顯示有成效(75%),關鍵成效是桌遊介入持續時間較長,憂鬱改善程度則較大。7篇研究探討認知功能成效的指標十分多樣,各有不同的測量工具且成效各異。測量記憶力有5篇研究共用了15種測量工具,有效測量為37%(9/24
),以每組2人的棋盤類活動的有效測量(4/5=80%)多於每組三人以上的桌遊活動(5/19=26%),記憶力改善成效與人數及活動類型的相關性值得進一步探究。測量注意力有2篇研究使用2種工具,有效測量(2/3=67%)的活動設計相對頻率較不密集。測量整體認知功能有3篇研究,工具各異但皆有成效(3/3=100%)。同一篇研究採每組2-8人的系列活動,測量語意流暢性、抑制能力及衝動控制能力皆有成效,可能與桌遊活動過程的不斷互動及溝通有關。但另一篇以2人圍棋作為桌遊活動的研究,測量語意流暢性卻未見成效。由於測量指標眾多且測量工具多元,無法進一步統合分析。建議與結論:本研究經系統性文獻評讀8篇研究顯示,
桌遊對於改善輕微失智老年人的憂鬱與認知功能的成效,與桌遊活動類型、進行時間、分組人數、及測量指標有關。2人一組之棋盤類桌遊活動可能改善記憶力及注意力,而3人以上系列桌遊活動則可能改善憂鬱程度、語意流暢性、抑制能力及衝動控制能力。桌遊活動時間安排每次1-2小時、每週少於3次、持續週期大於3個月較為合宜。本研究發現實務意義包括:(1)在老人長期照顧領域中導入桌遊活動是可行的;(2)學校教育需要加入桌遊設計課程;(3)在老人照護機構中進行更多介入性研究,控制桌遊類型、活動時間和頻率是必要的;(4)使用一致性的工具測量結果指標,應該有助於更多實證數據,進行後續的統合分析,方能提出更具體的實證建議,為台
灣即將來臨的超高齡時代做更周全之準備。