Index for The Cauchy-Schwarz Master Class

Abel inequality, 208, 221

Abel, Niels Henrik, 208

Aczel, J., 287

additive bound, 4, 9, 66, 106

and Holder, 137, 264

Akerberg’s refinement, 34

al-Khazin, Abu Ja’far, 286

Alexanderson, G., 286

AM-GM inequality, 20, 21

and Kantorovich, 247

Akerberg’s refinement, 34

algorithmic proof, 245

and investments, 100

and the exponential, 91

betweeness induction, 83

general weights, 23

geometric interpretation, 33

integral analog, 113

Polya’s proof, 23

rational weights, 22

smoothing proof, 244

stability, 35

via cyclic shifts, 84

via integral analog, 114

via rearrangement, 84

via Schur concavity, 194

American Mathematical Monthly, 96,

192, 253

Andreescu, T., 251

anti-symmetric forms, 237

arithmetic mean-geometric mean

inequality, see AM-GM inequality

Arithmetica of Diophantus, 40

arrangement of spheres, 52

Artin, Emil, 47

backtracking, 137

backwards induction, 236

baseball inequality, 82

Belentepe, C., vi

Bennett, C., 288, 289

Bernoulli inequality, 31

Bessel inequality, 71, 225

betweeness, exploitation of, 74

Birkhoff’s Theorem, 207

birthday problem, 206

Bledsoe, W.W., 283

Bombieri, E., 284

box, thinking outside, 52

Brahmagupta, 286

identity, 47

Brunn–Minkowski inequality, 245, 287

Bunyakovsky, Victor Yacovlevich, 10,

190, 285

and AM-GM inequality, 115

Chebyshev contact, 76

vis-a-vis Schwarz, 11

Buzano, M.L., 286

Cai, T., vi, 246

cancellation, origins of, 210

Carleman inequality, 118

Carleson proof, 173

Polya’s proof, 27

refined via Knopp, 128

Carleson inequality, 173

Carlson inequality, 165

Cauchy inequality, 1

and quadratic forms, 14

beating, 15

by induction, 2

case of equality, 37

in an array, 16

interpolation, 48

Polya–Szego converse, 83

three term, 13

302

Page 2

Index

303

vector-scalar melange, 69

via inner product identity, 68

via monotone interpolation, 85

Cauchy’s induction argument

AM-GM inequality, 20

Cauchy inequality, 31

Jensen inequality, 101

Cauchy, Augustin-Louis, 10

Cauchy–Binet identity, 49

Cauchy–Schwarz inequality, 8

as accidental corollary, 57

cross term defects, 83

geometric proof, 58

self-generalization, 16

via Gram–Schmidt, 71

centered inequality, 115

Chebyshev

order inequality, 76

tail inequality, 86

Chebyshev, Pafnuty Lvovich, 76, 287

Chong, K.M., 244

Chung, F.R.K., 289

Clevenson, M.L., 277

closest point problem, 56

completing the square, 57

conjugate powers, 137

consistency principles, 134

convex functions, continuity of, 254

convex minorant, 98

convexity

defined, 87

differential criterion, 90

geometric characterizations, 87

strict, 89

versus J-convexity, 101

via transformation, 102

Cours d’Analyse Algebrique, 10

Cramer–Rao inequality, 18

Cronin–Kardon, C., vi

crystallographic inequality, 13

cyclic shifts, 84

cyclic sum inequality, 104

D’Angelo, J.P, 242

Davis, P.J., 287

Debeau, F., 285

Dellacherie, C., vi, 254, 290

determinant, 49

Diaconis, P., vi

Diophantus, 40, 286

Diophantus identity

and Brahmagupta, 47, 237

and complex factorization, 237

and Pythagoras, 47, 237

dissection of integrals, 106

doubly stochastic, 196

Dragomir, S.S., 241, 285

Dudley, R.M., vi

elementary symmetric function, 178

Elliot, E.B., 290

Enflo inequality, 225

Engel, A., 94, 246, 251

equality

in AM-GM inequality, 22

in Cauchy inequality, 5, 37

in Cauchy–Schwarz, 8

in Holder, 137

in Jensen inequality, 89

Erd˝os, P., 261

Euclidean distance

in R

, 51

triangle inequality, 53

exponential sums, 210

extend and conquer, 222

Feng, Z., 251

Fermat, Pierre de, 40

Fibonacci, 286

Fisher information, 18

Flor, P., 238

four letter identity, 49

Fuji, M., 287

gamma function, 165

Gauss, C.F., 288

general means, 120

generic improvement, 94

geometric mean

as a limit, 120

as minimum, 133

superadditivity, 100, 133

George, C., 231, 288

Gram–Schmidt process, 70

Gross–Erdmann, K.-G., 290

Gruss inequality, 119

Hadwiger–Finsler inequality, 102

Hajela, D., 289

Halmos, P., 278

Hammer, D., 231

Hardy’s inequality, 166

and Hilbert, 176

discrete, 169

geometric refinement, 177

in L

, 176

special instance, 177

Hardy, G.H., 197, 290

Harker–Kasper inequality, 14

harmonic mean, 126

minimax characterization, 132

harmonic series

divergence, 99, 255

Heisenberg principle, 288

Page 3

304

Index

Hewitt, E., 243

Hilbert inequality, 155

homogeneous kernel, 164

integral version, 163

max version, 163

via Toeplitz method, 165

Hilbert’s 17th problem, 46

Hilbert, David, 46, 55

HM-GM and HM-AM inequalities, 126

Holder inequality, 135, 136

case of equality, 137

converse, 139

defect estimate, 94

historical form, 151

stability, 144, 145

Holder, Otto Ludwig, 94, 135, 263, 290

homogeneity in Σ, 132

homogenization trick, 189

How to Solve It, 30

humble bound, 284

inclusion radius, 148

inner product space

Cauchy–Schwarz inequality, 8

definition, 7

integral representations, 116

interpolation

in Cauchy inequality, 48

intuition

how much, 55

refining, 53

investment inequalities, 100

isometry, 60

isoperimetric property, 19

for the cube, 34

Israel, R., 253

iteration

and discovery, 149

J-convexity, 101

Janous, Walther, 177

Jensen inequality, 87, 263

and Schur convexity, 201

case of equality, 89

for integrals, 113

geometric applications, 93

Holder’s defect estimate, 94

implies Minkowski, 150

via Cauchy’s induction, 101

Jensen, J.L.W.V., 101

Joag–Dev, K., 277

Kahane, J.-P., vi

Karayannakis, D., 286

Kedlaya, K., vi, 152, 264, 274

Knuth, D., 260

Komlos, J., 277

Korner, T., vi

Kronecker’s lemma, 177

Kubo, F., 287

Kufner, A., 290

Kuniyeda, M., 262

Lagrange identity, 39

continuous analogue, 48

simplest case, 42

Lagrange, Joseph Louis de, 40

Landau’s notation, 120

leap-forward fall-back induction, 20, 31,

36, 101

Lee, H., vi, 247, 251

light cone defined, 62

light cone inequality, 63, 245

Littlewood, J.E., 197

looking back, 25, 26

Loomis–Whitney inequality, 16

Lorentz product, 62

Lovasz, L., 278

Lozansky, E., 264

Lyusternik, L.A., 245

Maclaurin inequality, 285

Magiropoulos, M., 286

majorant principles, 284

majorization, 191

Maligranda, L., vi, 264, 288, 289

marriage lemma, 206

Marshall, A., 277

Matousek, J., vi, 285

McConnell, T.R., 277

Meng, X., vi

Mengoli, P., 99, 248

method

of halves, 122

of parameterized parameters, 164

metric space, 54

Mignotte, M., 262

Milne inequality, 50

minimal surfaces, 10

Minkowski inequality, 141

Riesz proof, 141

via Jensen, 150

Minkowski’s

conjecture, 44, 46

light cone, 62

Minkowski, Hermann, 44

Mitrinovic, D.S., 277, 283

Mobius transformation, 242

moment sequences, 149

monotonicity

and integral estimates, 118

Montgomery, H.L., 284

Motzkin, T.S., 46, 286

Muirhead condition

Page 4

Index

305

and majorization, 195

Nakhash, A., 253

names of inequalities, 11

Naor, E., 259

Needham, T., 242

Nesbitt inequality, 84, 131, 246

Neyman–Pearson lemma, 287

Niculescu, C.P., 290

Nievergelt, Y., 253

Niven, I., 260

nonnegative polynomials, 43

norm

p-norm, or

-norm, 140

defined, 55

normalization method, 5, 25, 26, 66

normed linear space, 55

obvious

and not, 56

Hilbert story, 56

triangle inequality, 56

Olkin, I., 277

one-trick, see 1-trick

Opic, B., 290

optimality principles, 33

order inequality, 76

order relationship

systematic exploitation, 73

to quadratic, 76

order-to-quadratic conversion, 78, 287

orthogonality, definition, 58

orthonormal, 217

orthonormal sequence, 70

other inequality of Chebyshev, 77

parameterized parameters, 164

Persson, L.E., 288, 289

pillars, three great, 87

Pitman, J., 190, 276

Plummer, M.D., 278

polarization identity, 49, 70

Polya’s

dream, 23

questions, 30

Polya, George, 30, 197, 286

Polya–Szego converse, 83

positive definite, 228

power mean continuity relations, 127

power mean curve, 124

power mean inequality, 123

simplest, 36

Prekopa–Leindler inequality, 287

principle of maximal effectiveness, 27

principle of similar sides, 139

probability model, 17

product of linear forms, 59

projection formula, 56

guessing, 58

proportionality, 50

gages of, 39

Proschan, F., 277

Ptak, V., 247

Ptolemy inequality, 69

Pythagorean theorem, 47, 51

Qian, Z., vi

quadratic form, 228

quadratic inequality, 76

qualitative inference principle, 3, 27

quasilinear representation

geometric mean, 259

Rademacher–Menchoff inequality, 217,

223

ratio monotone, 189

reflection, 60

Reznick, B., vi

Richberg, R., 272

Riesz proof of Minkowski inequality, 141

Riesz, F., 288

Riesz, M., 288

Rogers inequality, 152, 153

Rogers, L.C., 135, 152, 290

Rolle’s theorem, 102, 251

Rosset, S., 290

Rousseau, C., 264

rule of first finder, 12

Schur convexity, 191

defined, 192

Schur criterion, 193

Schur inequality, 83

Schur’s lemma, 15

Schur, Issai, 192

Schwarz inequality, 10, 11

centered, 115

pointwise proof, 115

Schwarz’s argument, 11, 63

failure, 136

in inner product space, 15

in light cone, 63

Schwarz, Hermann Amandus, 10

Selberg inequality, 225

self-generalization, 21

Holder’s inequality, 151

Cauchy inequality, 16

Cauchy–Schwarz inequality, 66

Seymour, P.D., 289

Shaman, P., vi

Sharpley, R., 288, 289

Shen, A., 231

Shepp, L., vi

Shparlinski, I.E., vi, 281

Page 5

306

Index

Siegel’s method of halves, 122

Siegel, Carl Ludwig, 122

Sigillito, V.G., 244

Simonovits, M., 277

Skillen, S., vi

slip-in trick, 117

sphere arrangement, 52

splitting trick, 106, 123, 147, 154, 227,

263, 267

defined, 226

first used, 12

grand champion, 266

stability

in Holder inequality, 145

of AM-GM inequality, 35

steepest ascent, 67

Stef˘anescu, D., 262

stress testing, 268

Stromberg, K., 243

sum of squares, 42–44, 46

superadditivity

geometric mean, 34, 100, 133

symmetry and reflection, 62

Szego, Gabor, 234

Szemeredi Regularity Lemma, 205

Tang, H., vi

telescoping, 29

thinking outside the box, 52

Three Chord Lemma, 104

tilde transformation, 193

Tiskin, A., 231

Toeplitz method, 165

Treibergs, A., 242

triangle inequality, 54

unbiased estimator, 17

van Dam, E.R., 230

van der Corput inequality, 214

van der Corput, J.G., 214

variance, 18, 116

Vaughn, H.E., 278

Vi`ete identity, 133

Vince, A., 81

Vinogradov, I.M., 281

Vitale, R., vi

von Neumann, John, 51, 286

Wagoner, S.S., 238

Walker, A.W., 192

Ward, N., vi

Watkins, W., 277

Weierstrass inequality, 190

Weitzenbock inequality, 93, 102

Weyl, H., 206, 288

Wiles, Andrew, 40

Wilf, H., vi, 235

Young inequality, 136

Zuckerman, H.S., 260

Zukav, G., 286

Mathematical Inequalities ... Getting a Good List

1-trick, 110, 144, 146, 215, 219, 227, 231

I have been struggling to get a good version of the index of the Cauchy-Schwarz Master Class on the web. What I really want is a great list of all the named inequalites and a snippet about what the CSMC says about them. This would be a ton of work, so I looked for an easy way out. Originally I just posted the PDF file from the text.

This was not very satisfactory. The problem was that I could not find any good way to add introductory material or to provide navigation, such as links back to my home page or to the back to the main Cauchy-Schwarz Master Class page. It's better now but there is still room to go.

defined, 226

It's a List of Mathematical Inequalities --- but not yet beautiful

refinement, 205, 288

first used, 12

My next idea was to use the Latex to HTML translation tools. This should have worked but didn't. Maybe you can help me. At last, I resorted to use the kind of trick that I (at least partially) understand --- Google!

When Google sees a PDF file, it converts it on the fly to an HTML file so that indexing and other actions can be done in a systematic way. Still, Google saves the converted file, and you can use it. You have to strip out the stuff at the top, and then you have to deal with the fact that what is left specifies absolute position. You can change the position co-ordinates with a Perl program, or (if you are lazy like me) you can fill the gap at with introductory material --- as I have done. NOW, we have the index. Cheers!