Continuity & Dis-continuity of a Complex Function
2In complex analysis, the continuity of a complex function is a key concept that ensures the smooth behavior of the function across the complex plane. A complex function f(z)f(z) is continuous at a point z0z0 if the limit of the function as zz approaches z0z0 equals the function's value at that point,
i.e., limz→z0f(z)=f(z0)limz→z0f(z)=f(z0).
Continuity is essential for understanding more advanced topics like differentiability and analyticity.
This guide explains the formal definition of continuity for complex functions, introduces related theorems, and discusses examples and problems to help illustrate how continuity works in the complex plane.
Key Sub-Parts of the Topic:
Definition of Continuity for Complex Functions:
A complex function f(z)f(z) is continuous at a point z0z0 if:
limz→z0f(z)=f(z0)
z→z0limf(z)=f(z0)
Continuity on a Domain:
A function is continuous on a domain DD if it is continuous at every point in DD. If the function is continuous at all points in a closed and bounded region, it is said to be uniformly continuous.
How to Check for Continuity:
Direct Substitution: If a function f(z)f(z) is expressed in simple forms like polynomials, direct substitution often works to check continuity.
Approaching from Different Paths: For functions involving division by zero or branch cuts, checking the limit as zz approaches from different directions in the complex plane is important. A function is continuous if the limit is the same from all directions.
🔗Connect with Us:
👍 Follow us on Facebook : / slandroidd
🛩️ Follow us on Telegram : https://t.me/SL_Android
#Continuity #ComplexFunctions #ComplexAnalysis #MathSolutions #ContinuityTheorems #MathProblems #EpsilonDelta #MaximumModulus #STEM #Mathematics
𝗔𝗹𝗹 𝗥𝗶𝗴𝗵𝘁𝘀 𝗥𝗲𝘀𝗲𝗿𝘃𝗲𝗱 © 𝗖𝗼𝗽𝘆𝗿𝗶𝗴𝗵𝘁𝗲𝗱 | 𝗦𝗟 𝗔𝗻𝗱𝗿𝗼𝗶𝗱 🇱🇰 | 𝗦𝗶𝗻𝗰𝗲 𝟮𝟬𝟭𝟴