Search results:
Found 2
Listing 1  2 of 2 
Sort by

Choose an application
Since the 1980s, attention has increased in the research of fluid mechanics due to its wide application in industry and phycology. Major advances have occurred in the modeling of key topics such Newtonian and nonNewtonian fluids, nanoparticles, thermal management, and physiological fluid phenomena in biological systems, which have been published in this Special Issue on symmetry and fluid mechanics for Symmetry. Although, this book is not a formal textbook, it will be useful for university teachers, research students, and industrial researchers and for overcoming the difficulties that occur when considering the nonlinear governing equations. For such types of equations, obtaining an analytic or even a numerical solution is often more difficult. This book addresses this challenging job by outlining the latest techniques. In addition, the findings of the simulation are logically realistic and meet the standard of sufficient scientific value.
stagnation point flow  numerical solution  magnetic field  nanofuid  unsteady rotating flow  porous medium  aqueous suspensions of CNT’s  nonlinear thermal radiation  viscous dissipation effect  HAM  chemical reaction  activation energy  peristalsis  couple stress fluid  nanoparticle  Kellerbox method  Newtonian heating  nonlinear thermal radiation  nonlinear stretching cylinder  homogeneous/heterogeneous reactions  nanofluid  steady laminar flow  nanofluid  heat source/sink  magnetic field  stretching sheet  SWCNT/MWCNT nanofluid  thin needle  classical and fractional order problems  APCM technique  SWCNTs  MWCNTs  stretched surface  rotating system  nanofluid  MHD  thermal radiation  HAM  nonlinear hydroelastic waves  uniform current  thin elastic plate  solitary waves  PLK method  Permeable walls  suction/injection  nanofluids  porous medium  mixed convection  magnetohydrodynamic (MHD)  dual solution  stability analysis  Darcy Forchheimer model  nanofluid  exponential sheet  Jeffrey fluid  laminar gJitter flow  inclined stretching sheet  heat source/sink  Magnetohydrodynamic (MHD)  Jefferey, Maxwell and OldroydB fluids  Cattaneo–Christov heat flux  homogeneous–heterogeneous reactions  analytical technique  Numerical technique  viscous fluid  Caputo–Fabrizio timefractional derivative  Laplace and Fourier transformations  side walls  oscillating shear stress  forced convection  microducts  Knudsen number  Nusselt number  artificial neural networks  particle swarm optimization  Casson fluid  chemical reaction  cylinder  heat generation  magnetohydrodynamic (MHD)  slip  Carreau fluid  Cattaneo–Christov heat flux model  convective heat boundary condition  temperature dependent thermal conductivity  homogeneousheterogeneous reactions  integer and noninteger order derivatives  GOW/GOEG nanofluids  Marangoni convection  FDE12 numerical method  couple stress fluid  Hafnium particles  Couette–Poiseuille flow  shooting method  magnetic field  Darcy–Brinkman porous medium  viscous dissipation  slip conditions  porous dissipation  permeable sheet  stretchable rotating disk  CNTs (MWCNTs and SWCNTs)  velocity slip  convective boundary condition  OHAM  Casson fluid model  rotating rigid disk  nanoparticles  Magnetohydrodynamics (MHD)  Oil/MWCNT nanofluid  heat transfer  finite volume method  laminar flow  slip coefficient  microchannel  arched surface  nonlinear thermal radiation  molecular diameter  Al2O3 nanoparticles  streamlines  isotherms  RK scheme  peristaltic transport  tapered channel  porous medium  smart pumping for hemodialysis  thermal radiation  compressible viscous flow  symmetric linear equations  generalized finite difference scheme  kernel gradient free  Lagrangian approach  Newtonian and nonNewtonian fluids  nanofluids and particle shape effects  convective heat and mass transfer  steady and unsteady flow problems  multiphase flow simulations  fractional order differential equations  thermodynamics  physiological fluid phenomena in biological systems
Choose an application
Researches and investigations involving the theory and applications of integral transforms and operational calculus are remarkably widespread in many diverse areas of the mathematical, physical, chemical, engineering and statistical sciences.
highly oscillatory  convolution quadrature rule  volterra integral equation  Bessel kernel  convergence  higher order Schwarzian derivatives  Janowski starlike function  Janowski convex function  bound on derivatives  tangent numbers  tangent polynomials  Carlitztype qtangent numbers  Carlitztype qtangent polynomials  (p,q)analogue of tangent numbers and polynomials  (p,q)analogue of tangent zeta function  symmetric identities  zeros  Lommel functions  univalent functions  starlike functions  convex functions  inclusion relationships  analytic function  Hankel determinant  exponential function  upper bound  nonlinear boundary value problems  fractionalorder differential equations  RiemannStieltjes functional integral  LiouvilleCaputo fractional derivative  infinitepoint boundary conditions  advanced and deviated arguments  existence of at least one solution  Fredholm integral equation  Schauder fixed point theorem  Hölder condition  generalized Kuramoto–Sivashinsky equation  modified Kudryashov method  exact solutions  Maple graphs  analytic function  Hadamard product (convolution)  partial sum  Srivastava–Tomovski generalization of Mittag–Leffler function  subordination  differential equation  differential inclusion  Liouville–Caputotype fractional derivative  fractional integral  existence  fixed point  Bernoulli spiral  Grandi curves  Chebyshev polynomials  pseudoChebyshev polynomials  orthogonality property  symmetric  encryption  password  hash  cryptography  PBKDF  q–Bleimann–Butzer–Hahn operators  (p,q)integers  (p,q)Bernstein operators  (p,q)Bleimann–Butzer–Hahn operators  modulus of continuity  rate of approximation  Kfunctional  HurwitzLerch zeta function  generalized functions  analytic number theory  ?generalized HurwitzLerch zeta functions  derivative properties  series representation  basic hypergeometric functions  generating functions  qpolynomials  analytic functions  Mittag–Leffler functions  starlike functions  convex functions  Hardy space  vibrating string equation  initial conditions  spectral decomposition  regular solution  the uniqueness of the solution  the existence of a solution  analytic  ?convex function  starlike function  stronglystarlike function  subordination  q Sheffer–Appell polynomials  generating relations  determinant definition  recurrence relation  q Hermite–Bernoulli polynomials  q Hermite–Euler polynomials  q Hermite–Genocchi polynomials  Volterra integral equations  highly oscillatory Bessel kernel  Hermite interpolation  direct Hermite collocation method  piecewise Hermite collocation method  differential operator  qhypergeometric functions  meromorphic function  Mittag–Leffler function  Hadamard product  differential subordination  starlike functions  Bell numbers  radius estimate  (p, q)integers  Dunkl analogue  generating functions  generalization of exponential function  Szász operator  modulus of continuity  function spaces and their duals  distributions  tempered distributions  Schwartz testing function space  generalized functions  distribution space  wavelet transform of generalized functions  Fourier transform  analytic function  subordination  Dziok–Srivastava operator  nonlinear boundary value problem  nonlocal  multipoint  multistrip  existence  Ulam stability  functions of bounded boundary and bounded radius rotations  subordination  functions with positive real part  uniformly starlike and convex functions  analytic functions  univalent functions  starlike and qstarlike functions  qderivative (or qdifference) operator  sufficient conditions  distortion theorems  Janowski functions  analytic number theory  ?generalized Hurwitz–Lerch zeta functions  derivative properties  recurrence relations  integral representations  Mellin transform  natural transform  Adomian decomposition method  Caputo fractional derivative  generalized mittagleffler function  analytic functions  Hadamard product  starlike functions  qderivative (or qdifference) operator  Hankel determinant  qstarlike functions  fuzzy volterra integrodifferential equations  fuzzy general linear method  fuzzy differential equations  generalized Hukuhara differentiability  spectrum symmetry  DCT  MFCC  audio features  anuran calls  analytic functions  convex functions  starlike functions  strongly convex functions  strongly starlike functions  uniformly convex functions  Struve functions  truncatedexponential polynomials  monomiality principle  generating functions  Apostoltype polynomials and Apostoltype numbers  Bernoulli, Euler and Genocchi polynomials  Bernoulli, Euler, and Genocchi numbers  operational methods  summation formulas  symmetric identities  Euler numbers and polynomials  qEuler numbers and polynomials  HurwitzEuler eta function  multiple HurwitzEuler eta function  higher order qEuler numbers and polynomials  (p, q)Euler numbers and polynomials of higher order  symmetric identities  symmetry of the zero
Listing 1  2 of 2 
Sort by
