FaridKhan Posted June 20, 2023 Report Share Posted June 20, 2023 Stochastic Partial Differential Equations in Fluid Mechanics | 206 | Kenneth S. Miller | 2020 | Dover Publications; Reprint edition | 978-0486843292Requiring only an elementary knowledge of ordinary differential equations, this concise text is dedicated to helping engineering students solve problems in their field involving partial differential equations. No emphasis is placed upon questions of existence, uniqueness, and convergence; the treatment's focus remains firmly on the practical solution of partial differential equations. The first chapter derives some of the more common partial differential equations associated with such phenomena as vibration, heat flow, electricity and elasticity. Subsequent chapters examine and apply the techniques of Fourier analysis to these equations, and then extend the discussion to the Fourier integral. The final chapters explore Legendre, Bessel, and Mathieu functions as well as the general structure of differential operators. For undergraduate engineering students.Files:Flandoli F. Stochastic Partial Differential Equations in Fluid Mechanics 2023.pdf (2.54 MB)NitroFlare Link(s)https://nitroflare.com/view/5E5293DB7720BB4/Flandoli_F._Stochastic_Partial_Differential_Equations_in_Fluid_Mechanics_2023.rarRapidGator Link(s)https://rapidgator.net/file/59388b57ffa9740da955d57508d41ae6/Flandoli_F._Stochastic_Partial_Differential_Equations_in_Fluid_Mechanics_2023.rar Link to comment Share on other sites More sharing options...
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