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200 10$aBiomechanics of the human urinary bladder /$fR. N. Miftahof, Hong Gil Nam
205   $a1st ed. 2013.
210   $aBerlin ;$aNew York $cSpringer$dc2013
215   $a1 online resource (187 p.)
300   $aDescription based upon print version of record.
311   $a3-642-43647-1 
311   $a3-642-36145-5 
320   $aIncludes bibliographical references and index.
327   $aThe Bladder as a Dynamic System -- Investigations into Biomechanics of the Bladder -- Geometry of Thin Shells -- Essentials of the Theory of Soft Shells -- Continual Model of the Detrusor -- A Model of the Detrusor Fasciculus -- The Intrinsic Regulatory Pathways -- The Synaptic Transmission -- Pharmacology of Detrusor Activity -- Human Urinary Bladder as a Soft Biological Shell -- Challenges in Human Urinary Bladder Mechanics.
330   $aAs a research subject, the biomechanics of the urinary bladder are relatively young, yet medical problems associated with them are as old as mankind. Offering an update on recent achievements in the field, the authors highlight the underlying biological, chemical and physical processes of bladder function and present the systematic development of a mathematical model of the organ as a thin, soft biological shell. The book will be a valuable resource for postgraduate students and researchers interested in the applications of computational mathematics and solid mechanics to modern problems in biomedical engineering and medicine.
606   $aBladder$xMechanical properties
606   $aBladder$xHistology
615  0$aBladder$xMechanical properties.
615  0$aBladder$xHistology.
676   $a612.4/673
676   $a612.4673
700   $aMiftahof$b Roustem$0869092
701   $aNam$b Hong Gil$01638602
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200 14$aThe mathematics of politics /$fE. Arthur Robinson, Jr., George Washington University Washington, D.C., USA; Daniel H. Ullman, George Washington University Washington, D.C., USA
205   $aSecond edition.
210  1$aBoca Raton :$cCRC Press,$d[2017]
210  4$dİ2017
215   $a1 online resource (478 pages) $cillustrations
300   $a"A Chapman & Hall book."
311 08$a1-4987-9886-1 
320   $aIncludes bibliographical references and index.
327   $aI. Voting -- II. Apportionment -- III. Conflict -- IV. The electoral college.
330   $aIt is because mathematics is often misunderstood, it is commonly believed it has nothing to say about politics. The high school experience with mathematics, for so many the lasting impression of the subject, suggests that mathematics is the study of numbers, operations, formulas, and manipulations of symbols. Those believing this is the extent of mathematics might conclude mathematics has no relevance to politics. This book counters this impression. The second edition of this popular book focuses on mathematical reasoning about politics. In the search for ideal ways to make certain kinds of decisions, a lot of wasted effort can be averted if mathematics can determine that finding such an ideal is actually impossible in the first place. In the first three parts of this book, we address the following three political questions: (1) Is there a good way to choose winners of elections? (2) Is there a good way to apportion congressional seats? (3) Is there a good way to make decisions in situations of conflict and uncertainty? In the fourth and final part of this book, we examine the Electoral College system that is used in the United States to select a president. There we bring together ideas that are introduced in each of the three earlier parts of the book.
606   $aPolitical science$xMathematical models
615  0$aPolitical science$xMathematical models.
676   $a320.01/513
700   $aRobinson$b E. Arthur$f1955-,$01241531
702   $aUllman$b Daniel
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801  1$bFlBoTFG
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