| 000 | 04129naaaa2200949uu 4500 | ||
|---|---|---|---|
| 003 | BUT | ||
| 005 | 20230501113741.0 | ||
| 006 | m o d | ||
| 007 | cr|mn|---annan | ||
| 008 | 20230405s2023 xx |||||o ||| eng|| d | ||
| 020 | _a9783036565910 | ||
| 020 | _a9783036565903 | ||
| 040 |
_aoapen _coapen |
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| 041 | 0 | _aeng | |
| 080 | _a004 | ||
| 100 | 1 |
_aOlteanu, Octav _4edt |
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| 245 | 1 | 0 | _aSymmetry in Mathematical Analysis and Functional Analysis |
| 260 |
_aBasel _bMDPI - Multidisciplinary Digital Publishing Institute _c2023 |
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| 300 | _a1 electronic resource (190 p.) | ||
| 506 | 0 |
_aOpen Access _2star _fUnrestricted online access |
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| 520 | _aThe present reprint provides some theoretical results (and their applications) in the fields of mathematical analysis and functional analysis, in which the concept of symmetry plays an essential role. More specifically, various problems are investigated in areas, such as: optimization problems, polynomial approximation on unbounded subsets, moment problems, variational inequalities, evolutionary problems, dynamical systems, generalized convexity, partial differential equations, and special spaces of self-adjoint operators. With various examples and applications to complement and substantiate the mathematical developments, the present reprint is a valuable guide for researchers, engineers, and students in the field of mathematics, operations research, optimal control science, artificial intelligence, management science, and economics. | ||
| 540 |
_aCreative Commons _fhttps://creativecommons.org/licenses/by/4.0/ _2cc |
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| 546 | _aEnglish | ||
| 650 | 0 |
_aПрограммирование _2bicssc _91403 |
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| 650 | 0 |
_aИскусственный интеллект _94518 |
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| 653 | _anon homogenous boussinesq equations | ||
| 653 | _aglobal well-posedness | ||
| 653 | _alittlewood-paley decomposition | ||
| 653 | _amultiobjective programming | ||
| 653 | _anonlinear programming | ||
| 653 | _aconvex optimization | ||
| 653 | _asaddle point | ||
| 653 | _apreinvex fuzzy interval-valued function | ||
| 653 | _afuzzy fractional integral operator | ||
| 653 | _aHermite-Hadamard type inequality | ||
| 653 | _aHermite-Hadamard Fejér type inequality | ||
| 653 | _aleft and right convex interval-valued function | ||
| 653 | _afractional integral operator | ||
| 653 | _aHermite–Hadamard type inequality | ||
| 653 | _aHermite–Hadamard Fejér type inequality | ||
| 653 | _ainvex set | ||
| 653 | _acoordinated preinvex functions | ||
| 653 | _aHermite–Hadamard inequalities | ||
| 653 | _ainterval-valued functions | ||
| 653 | _apolynomial bounds | ||
| 653 | _aL’Hôpital’s rule of monotonicity | ||
| 653 | _aJordan’s inequality | ||
| 653 | _atrigonometric functions | ||
| 653 | _atripled fixed point | ||
| 653 | _aedge-preserving | ||
| 653 | _adirected graph | ||
| 653 | _ab-metric space | ||
| 653 | _adifferential equation with infinite delay | ||
| 653 | _aconvex operator | ||
| 653 | _auniform boundedness | ||
| 653 | _asymmetric operators | ||
| 653 | _aHahn–Banach type theorems | ||
| 653 | _aMarkov moment problems | ||
| 653 | _aconstrained minimization | ||
| 653 | _aϕ-fixed points | ||
| 653 | _ainterpolative Kannan contraction | ||
| 653 | _aabstract interpolative Reich-Rus-Ćirić-type contractions with a shrink map | ||
| 653 | _aoptimal control | ||
| 653 | _amixed constraints | ||
| 653 | _afree final end-point | ||
| 653 | _asufficiency | ||
| 653 | _aweak minima | ||
| 653 | _acoincidence point | ||
| 653 | _acommon fixed point | ||
| 653 | _arelation-theoretic | ||
| 653 | _aauxiliary functions | ||
| 653 | _ahybrid contractions | ||
| 653 | _aextended rectangular b-metric space | ||
| 653 | _an/a | ||
| 700 | 1 |
_aTreanta, Savin _4edt |
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| 700 | 1 |
_aOlteanu, Octav _4oth |
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| 700 | 1 |
_aTreanta, Savin _4oth |
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| 856 | 4 | 0 |
_awww.oapen.org _uhttps://mdpi.com/books/pdfview/book/6756 _70 _zDownload |
| 856 | 4 | 0 |
_awww.oapen.org _uhttps://directory.doabooks.org/handle/20.500.12854/98749 _70 _zDescription |
| 909 |
_c4 _dDarya Shvetsova |
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| 942 |
_2udc _cEE |
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| 999 |
_c6530 _d6530 |
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