%PDF-1.4
%
1 0 obj
null
endobj
2 0 obj
<<
/Type /Catalog
/Names 3 0 R
/Pages 4 0 R
/Metadata 5 0 R
/Outlines 6 0 R
/PageMode /UseOutlines
/OpenAction 7 0 R
/PageLabels <<
/Nums [0 <<
/S /D
/St 1194
>>]
>>
/PageLayout /OneColumn
/ViewerPreferences <<
/FitWindow true
>>
>>
endobj
3 0 obj
<<
/Dests 8 0 R
>>
endobj
4 0 obj
<<
/Kids [9 0 R 10 0 R]
/Type /Pages
/Count 52
>>
endobj
5 0 obj
<<
/Type /Metadata
/Length 3850
/Subtype /XML
>>
stream
Quantum Entropy and Its Applications to Quantum Communication and Statistical Physics
Masanori Ohya
Noboru Watanabe
Quantum entropy is a fundamental concept for quantum information recently developed in various directions. We will review the mathematical aspects of quantum entropy (entropies) and discuss some applications to quantum communication, statistical physics. All topics taken here are somehow related to the quantum entropy that the present authors have been studied. Many other fields recently developed in quantum information theory, such as quantum algorithm, quantum teleportation, quantum cryptography, etc., are totally discussed in the book (reference number 60).
quantum entropy
quantum information
quantum entropy; quantum information
False
endstream
endobj
6 0 obj
<<
/Last 11 0 R
/Type /Outlines
/Count 30
/First 12 0 R
>>
endobj
7 0 obj
<<
/D [13 0 R /Fit]
/S /GoTo
>>
endobj
8 0 obj
<<
/Kids [14 0 R 15 0 R]
/Limits [(Doc-Start) (theorem.9)]
>>
endobj
9 0 obj
<<
/Kids [16 0 R 17 0 R 18 0 R 19 0 R 20 0 R 21 0 R]
/Type /Pages
/Count 36
/Parent 4 0 R
>>
endobj
10 0 obj
<<
/Kids [22 0 R 23 0 R 24 0 R]
/Type /Pages
/Count 16
/Parent 4 0 R
>>
endobj
11 0 obj
<<
/A 25 0 R
/Prev 26 0 R
/Title 27 0 R
/Parent 6 0 R
>>
endobj
12 0 obj
<<
/A 28 0 R
/Next 29 0 R
/Title 30 0 R
/Parent 6 0 R
>>
endobj
13 0 obj
<<
/Type /Page
/Annots [31 0 R]
/Parent 16 0 R
/Contents 32 0 R
/MediaBox [0 0 595.276 841.89]
/Resources 33 0 R
>>
endobj
14 0 obj
<<
/Kids [34 0 R 35 0 R 36 0 R 37 0 R 38 0 R 39 0 R]
/Limits [(Doc-Start) (subsection.14.1)]
>>
endobj
15 0 obj
<<
/Kids [40 0 R 41 0 R 42 0 R]
/Limits [(subsection.14.2) (theorem.9)]
>>
endobj
16 0 obj
<<
/Kids [13 0 R 43 0 R 44 0 R 45 0 R 46 0 R 47 0 R]
/Type /Pages
/Count 6
/Parent 9 0 R
>>
endobj
17 0 obj
<<
/Kids [48 0 R 49 0 R 50 0 R 51 0 R 52 0 R 53 0 R]
/Type /Pages
/Count 6
/Parent 9 0 R
>>
endobj
18 0 obj
<<
/Kids [54 0 R 55 0 R 56 0 R 57 0 R 58 0 R 59 0 R]
/Type /Pages
/Count 6
/Parent 9 0 R
>>
endobj
19 0 obj
<<
/Kids [60 0 R 61 0 R 62 0 R 63 0 R 64 0 R 65 0 R]
/Type /Pages
/Count 6
/Parent 9 0 R
>>
endobj
20 0 obj
<<
/Kids [66 0 R 67 0 R 68 0 R 69 0 R 70 0 R 71 0 R]
/Type /Pages
/Count 6
/Parent 9 0 R
>>
endobj
21 0 obj
<<
/Kids [72 0 R 73 0 R 74 0 R 75 0 R 76 0 R 77 0 R]
/Type /Pages
/Count 6
/Parent 9 0 R
>>
endobj
22 0 obj
<<
/Kids [78 0 R 79 0 R 80 0 R 81 0 R 82 0 R 83 0 R]
/Type /Pages
/Count 6
/Parent 10 0 R
>>
endobj
23 0 obj
<<
/Kids [84 0 R 85 0 R 86 0 R 87 0 R 88 0 R 89 0 R]
/Type /Pages
/Count 6
/Parent 10 0 R
>>
endobj
24 0 obj
<<
/Kids [90 0 R 91 0 R 92 0 R 93 0 R]
/Type /Pages
/Count 4
/Parent 10 0 R
>>
endobj
25 0 obj
<<
/D (section.15)
/S /GoTo
>>
endobj
26 0 obj
<<
/A 94 0 R
/Last 95 0 R
/Next 11 0 R
/Prev 96 0 R
/Count 7
/First 97 0 R
/Title 98 0 R
/Parent 6 0 R
>>
endobj
27 0 obj
(Conclusion)
endobj
28 0 obj
<<
/D (section.1)
/S /GoTo
>>
endobj
29 0 obj
<<
/A 99 0 R
/Next 100 0 R
/Prev 12 0 R
/Title 101 0 R
/Parent 6 0 R
>>
endobj
30 0 obj
(Introduction)
endobj
31 0 obj
<<
/A <<
/D (cite.Sama48)
/S /GoTo
>>
/C [0 1 0]
/H /I
/Rect [160.412 186.277 168.382 196.423]
/Type /Annot
/Border [0 0 0]
/Subtype /Link
>>
endobj
32 0 obj
<<
/Filter [/FlateDecode]
/Length 2206
>>
stream
xڥXK6ϯm9lƳ+Il` 12AZQ~vAйlʀݍRzB,ɓy%d5DI}J;.NX)Zqo$,A5Pal^/**sm}K
ozhՕŊٔYO1wm]QF5mW;UdrpviRy2ɽſe3)ҷzը^r #!xŐɑkm>whڮ]C^&Q&/
ܛ);LwK E{Ԅ#Cs+AnHp:fHz[C`]ͱm
d{ =ǣoTY 8a83C~0L#)1ŏЂN?w:ckbd,qA/!Mչ%n]>eV]Y}JslQ=RfVW?NV͘q~UHa ЉBObH;/ps&^+&Ϲ/
-(P^H9({(:Ys:x,[{[
B*%2o \ZZem&$pSYU4miS lemY%SA,&a
B"cike0q\+ "7➊