LEADER 03406nam 2200889z- 450 001 9910639987303321 005 20231214133500.0 010 $a3-0365-6073-4 035 $a(CKB)5470000001633481 035 $a(oapen)https://directory.doabooks.org/handle/20.500.12854/95898 035 $a(EXLCZ)995470000001633481 100 $a20202301d2022 |y 0 101 0 $aeng 135 $aurmn|---annan 181 $ctxt$2rdacontent 182 $cc$2rdamedia 183 $acr$2rdacarrier 200 10$aSoft Photonic Crystals and Metamaterials 210 $aBasel$cMDPI - Multidisciplinary Digital Publishing Institute$d2022 215 $a1 electronic resource (138 p.) 311 $a3-0365-6074-2 330 $aThis Special Issue on ?Soft Photonic Crystals and Metamaterials? from Materials consists of 10 papers that highlight recent advances in a broad scope of optical-wavelength and sub-wavelength structures made of soft materials and particles. Soft matter shows plenty of unique and improved optical properties for deep scientific understanding, thereby promoting fabrication, characterization and device performance for potential photonic applications that include, but are not limited to, photovoltaic cells, photodetectors, light-emitting diodes, tunable microlasers, optical filters for biosensors, smart windows, virtual/augmented reality head-mounted elements, and high-speed spatial light modulators in glasses-free 3D displays. 606 $aMaterials science$2bicssc 610 $alocalization of light 610 $aphotonic crystals 610 $achirality 610 $adye-doped cholesteric liquid crystal 610 $aoptical Tamm states 610 $aresonant frequency dispersion 610 $asmart window 610 $acholesteric liquid crystal 610 $aphotochromic dichroic dye 610 $aTamm plasmon 610 $aBragg mirror 610 $arugate filter 610 $aband gap 610 $alight reflection and transmission 610 $ametasurfaces 610 $atamm plasmon polaritons 610 $auniform lying helix 610 $apolymer network 610 $afrequency modulation 610 $aelectro-optic response 610 $amesogenic dimer 610 $aflexoelectric effect 610 $adielectric effect 610 $anematic liquid crystal 610 $a2D periodic structures 610 $ahexagonal diffraction patterns 610 $aphotoalignment 610 $aout-of-plane reorientation 610 $aflat optical elements 610 $aoptical Freedericksz transition 610 $adye-doped liquid crystal 610 $amolecular reorientation 610 $acolloidal crystals 610 $amagnetite 610 $amicroparticles 610 $aBragg reflection 610 $amagnetic response 610 $asilica particles 610 $aopals 610 $apolydispersity index 610 $adisLocate 610 $aVoronoi tessellations 610 $abond order parameters 610 $ametasurface 610 $ametagratings 615 7$aMaterials science 700 $aTimofeev$b Ivan V$4edt$01279484 702 $aLee$b Wei$4edt 702 $aTimofeev$b Ivan V$4oth 702 $aLee$b Wei$4oth 906 $aBOOK 912 $a9910639987303321 996 $aSoft Photonic Crystals and Metamaterials$93015481 997 $aUNINA LEADER 04034nam 2200985z- 450 001 9910557782803321 005 20210501 035 $a(CKB)5400000000045561 035 $a(oapen)https://directory.doabooks.org/handle/20.500.12854/68991 035 $a(oapen)doab68991 035 $a(EXLCZ)995400000000045561 100 $a20202105d2020 |y 0 101 0 $aeng 135 $aurmn|---annan 181 $ctxt$2rdacontent 182 $cc$2rdamedia 183 $acr$2rdacarrier 200 00$aApplied Functional Analysis and Its Applications 210 $aBasel, Switzerland$cMDPI - Multidisciplinary Digital Publishing Institute$d2020 215 $a1 online resource (184 p.) 311 08$a3-03936-776-5 311 08$a3-03936-777-3 330 $aApplied functional analysis has an extensive history. In the last century, this field has often been used in physical sciences, such as wave and heat phenomena. In recent decades, with the development of nonlinear functional analysis, this field has been used to model a variety of engineering, medical, and computer sciences. Two of the most significant issues in this area are modeling and optimization. Thus, we consider some recently published works on fixed point, variational inequalities, and optimization problems. These works could lead readers to obtain new novelties and familiarize them with some applications of this area. 606 $aMathematics and Science$2bicssc 606 $aResearch and information: general$2bicssc 610 $aalgebraic interior 610 $aasymptotically nonexpansive mapping 610 $abenson proper efficiency 610 $acommon fixed point 610 $aconjugate gradient method 610 $acontraction 610 $aFan-KKM theorem 610 $afixed point 610 $afractional calculus 610 $afractional differential equations 610 $ahigher-order mond-weir type dual 610 $ahigher-order weak adjacent epiderivatives 610 $ahybrid contractions 610 $ahybrid projection 610 $ahyperspace 610 $ainclusion problem 610 $ainertial Mann 610 $ainertial-like subgradient-like extragradient method with line-search process 610 $ainformal norms 610 $ainformal open sets 610 $alimiting (p,r)-?-(?,?)-invexity 610 $aLipschitz continuity 610 $amethod with line-search process 610 $amodified implicit iterative methods with perturbed mapping 610 $anonexpansive mapping 610 $anonlinear scalarizing functional 610 $anull set 610 $aopen balls 610 $apseudocontractive mapping 610 $apseudomonotone variational inequality 610 $apseudomonotone variational inequality problem 610 $asequentially weak continuity 610 $aset optimization 610 $aset relations 610 $aset-valued optimization problems 610 $ashrinking projection 610 $asignal processing 610 $asteepest descent method 610 $astrict pseudo-contraction 610 $astrictly pseudocontractive mapping 610 $astrictly pseudocontractive mappings 610 $astrongly convergence 610 $astrongly pseudocontractive mapping 610 $avariational inequality problem 610 $avector closure 610 $avector optimization problems 610 $avector variational-like inequalities 610 $avolterra fractional integral equations 610 $aweakly continuous duality mapping 610 $a?-fractional integrals 615 7$aMathematics and Science 615 7$aResearch and information: general 700 $aYao$b Jen-Chih$4edt$01332372 702 $aShahram Rezapour$b Shahram$4edt 702 $aYao$b Jen-Chih$4oth 702 $aShahram Rezapour$b Shahram$4oth 906 $aBOOK 912 $a9910557782803321 996 $aApplied Functional Analysis and Its Applications$93040902 997 $aUNINA