LEADER 04303nam  2200985z- 450 
001 9910576872203321
005 20231214133240.0
035   $a(CKB)5720000000008454
035   $a(oapen)https://directory.doabooks.org/handle/20.500.12854/84528
035   $a(EXLCZ)995720000000008454
100   $a20202206d2022      |y             0
101 0 $aeng
135   $aurmn|---annan
181   $ctxt$2rdacontent
182   $cc$2rdamedia
183   $acr$2rdacarrier
200 10$aSymmetry in the Mathematical Inequalities
210   $aBasel$cMDPI - Multidisciplinary Digital Publishing Institute$d2022
215   $a1 electronic resource (276 p.)
311   $a3-0365-4005-9 
311   $a3-0365-4006-7 
330   $aThis Special Issue brings together original research papers, in all areas of mathematics, that are concerned with inequalities or the role of inequalities. The research results presented in this Special Issue are related to improvements in classical inequalities, highlighting their applications and promoting an exchange of ideas between mathematicians from many parts of the world dedicated to the theory of inequalities. This volume will be of interest to mathematicians specializing in inequality theory and beyond. Many of the studies presented here can be very useful in demonstrating new results. It is our great pleasure to publish this book. All contents were peer-reviewed by multiple referees and published as papers in our Special Issue in the journal Symmetry. These studies give new and interesting results in mathematical inequalities enabling readers to obtain the latest developments in the fields of mathematical inequalities. Finally, we would like to thank all the authors who have published their valuable work in this Special Issue. We would also like to thank the editors of the journal Symmetry for their help in making this volume, especially Mrs. Teresa Yu.
606   $aResearch & information: general$2bicssc
606   $aGeography$2bicssc
610   $aOstrowski inequality
610   $aHo?lder's inequality
610   $apower mean integral inequality
610   $an-polynomial exponentially s-convex function
610   $aweight coefficient
610   $aEuler-Maclaurin summation formula
610   $aAbel's partial summation formula
610   $ahalf-discrete Hilbert-type inequality
610   $aupper limit function
610   $aHermite-Hadamard inequality
610   $a(p, q)-calculus
610   $aconvex functions
610   $atrapezoid-type inequality
610   $afractional integrals
610   $afunctions of bounded variations
610   $a(p,q)-integral
610   $apost quantum calculus
610   $aconvex function
610   $aa priori bounds
610   $a2D primitive equations
610   $acontinuous dependence
610   $aheat source
610   $aJensen functional
610   $aA-G-H inequalities
610   $aglobal bounds
610   $apower means
610   $aSimpson-type inequalities
610   $athermoelastic plate
610   $aPhragme?n-Lindelo?f alternative
610   $aSaint-Venant principle
610   $abiharmonic equation
610   $asymmetric function
610   $aSchur-convexity
610   $ainequality
610   $aspecial means
610   $aShannon entropy
610   $aTsallis entropy
610   $aFermi-Dirac entropy
610   $aBose-Einstein entropy
610   $aarithmetic mean
610   $ageometric mean
610   $aYoung's inequality
610   $aSimpson's inequalities
610   $apost-quantum calculus
610   $aspatial decay estimates
610   $aBrinkman equations
610   $amidpoint and trapezoidal inequality
610   $aSimpson's inequality
610   $aharmonically convex functions
610   $aSimpson inequality
610   $a(n,m)-generalized convexity
615  7$aResearch & information: general
615  7$aGeography
700   $aMinculete$b Nicusor$4edt$01291005
702   $aFuruichi$b Shigeru$4edt
702   $aMinculete$b Nicusor$4oth
702   $aFuruichi$b Shigeru$4oth
906   $aBOOK
912   $a9910576872203321
996   $aSymmetry in the Mathematical Inequalities$93021744
997   $aUNINA