TY - BOOK ID - 137454017 TI - Symmetry in the Mathematical Inequalities AU - Minculete, Nicusor AU - Furuichi, Shigeru PY - 2022 PB - Basel MDPI - Multidisciplinary Digital Publishing Institute DB - UniCat KW - Ostrowski inequality KW - Hölder’s inequality KW - power mean integral inequality KW - n-polynomial exponentially s-convex function KW - weight coefficient KW - Euler–Maclaurin summation formula KW - Abel’s partial summation formula KW - half-discrete Hilbert-type inequality KW - upper limit function KW - Hermite–Hadamard inequality KW - (p, q)-calculus KW - convex functions KW - trapezoid-type inequality KW - fractional integrals KW - functions of bounded variations KW - (p,q)-integral KW - post quantum calculus KW - convex function KW - a priori bounds KW - 2D primitive equations KW - continuous dependence KW - heat source KW - Jensen functional KW - A-G-H inequalities KW - global bounds KW - power means KW - Simpson-type inequalities KW - thermoelastic plate KW - Phragmén-Lindelöf alternative KW - Saint-Venant principle KW - biharmonic equation KW - symmetric function KW - Schur-convexity KW - inequality KW - special means KW - Shannon entropy KW - Tsallis entropy KW - Fermi–Dirac entropy KW - Bose–Einstein entropy KW - arithmetic mean KW - geometric mean KW - Young’s inequality KW - Simpson’s inequalities KW - post-quantum calculus KW - spatial decay estimates KW - Brinkman equations KW - midpoint and trapezoidal inequality KW - Simpson’s inequality KW - harmonically convex functions KW - Simpson inequality KW - (n,m)–generalized convexity KW - n/a KW - Hölder's inequality KW - Euler-Maclaurin summation formula KW - Abel's partial summation formula KW - Hermite-Hadamard inequality KW - Phragmén-Lindelöf alternative KW - Fermi-Dirac entropy KW - Bose-Einstein entropy KW - Young's inequality KW - Simpson's inequalities KW - Simpson's inequality KW - (n,m)-generalized convexity UR - https://www.unicat.be/uniCat?func=search&query=sysid:137454017 AB - This 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. ER -