19. Giải tích phức: Hàm chỉnh hình, phương trình Cauchy-Riemann - KPTN

Volumes 17 and 18 have dealt with the real analysis of real functions. Now let us extend this to complex variables and consider complex functions. Things get a lot more interesting. We begin Volume 19 with complex maps with their conformal properties. An elegant way to represent these is through the Riemann (sphere) surface with the Mobius transform. Next, we will examine the analytic properties of functions, now in the complex case also called holomorphic functions. These are functions whose real and imaginary parts satisfy the Cauchy-Riemann equation. Finally, an important concept in complex analysis, the analytic extension, is discussed. References: https://anphia.co/w8m1TLg ___________________ SUPPORT ANPHIA ❤️ https://donate.anphia.com Youtube: https://anphia.co/youtube Facebook: https://anphia.co/facebook Instagram: https://anphia.co/instagram Tiktok: https://anphia.co/tiktok ___________________ #anphia #khamphatunhien #kptn