 |
VOOZH | about |
|
VOOZH | about |
The Residue Theorem is a powerful tool in complex analysis used to evaluate contour integrals, especially when functions have singularities. It helps simplify real integrals, compute series, and is applied in many areas of science and engineering, including quantum physics.
Holomorphic functions, also known as analytic functions, are differentiable functions at every point in an open subset of the complex plane. A function f(z) is holomorphic in a region if it has a complex derivative f′(z) at every point in that region.
Singularities are points where a function ceases to be holomorphic. They are classified into three types:
Removable Singularities: At a removable singularity, a function f(z) can be redefined at the point to make it holomorphic. For example, sinz/z has a removable singularity at z = 0 because sinz/z approaches 1 as z approaches 0.
Poles: A pole is a point where a function goes to infinity. Poles can be:
Essential Singularities: At an essential singularity, the behaviour of the function is chaotic. An example is
The Residue Theorem is a powerful tool in complex analysis for evaluating contour integrals. The Residue Theorem states that if a function f(z) is analytic inside and on a simple closed contour C, except for a finite number of isolated singularities inside C, then the integral of f(z) around C is 2πi times the sum of the residues of f at those singularities.
Mathematically, this is explained as:
where,
The proof of the Residue Theorem involves deforming the contour and applying Cauchy's theorem. By considering small circles around the singularities and larger contours avoiding them, we can sum the residues at the singularities.
Step 1: Consider a function f(z) with isolated singularities z1, z2,…, zn inside a contour C. Deform the contour to avoid these singularities.
Step 2: According to Cauchy's theorem, the integral over a contour that encloses no singularities is zero.
Step 3: The integral around C can be broken into smaller integrals around each singularity:
Step 4:
Step 5: Summing these integrals gives the final result:
Residues at Simple Poles
For a simple pole at z = c:
Residues at Higher-Order Poles
For a pole of order n at z = c, the residue is obtained using the Laurent series expansion:
Res(f,c) =
The application of the residue theorem is as follows:
Example 1: Calculate the residue of f(z) = ez/(z2 + 1) at z = i.
Solution:
At z = i, the residue is:
Res(f, i) =
Example 2: Calculate the residue of f(z) = 1/(z – 1)3 at z = 1.
Solution:
Since it is a pole of order 3, the residue is:
Res(f, 1) =
Example 3: Evaluate the integral: ez/(z2 + 1) dz where, C is circle |z| = 2.
Solution:
ez/(z2 + 1) has singularities where z2 + 1 = 0
z = i and z = -i
Both singularities i and -i lie within the contour ∣z∣ = 2
Residue at z = i
Res{ ez/(z2 + 1), i} = limz→i(z - i){ez/(z - i)(z + i)}
= limz→i{ez/(z + i)}
= ei/2i
Residue at z = -i
Res{ ez/(z2 + 1), -i} = limz→-i(z + i){ez/(z - i)(z + i)}
= limz→-i{ez/(z - i)}
= e-i/(-2i)
= -e-i/(2i)
Apply the Residue Theorem
ez/(z2 + 1) dz = 2πi{ei/2i + (-e-i/2i)}
= π{ei - e-i}
= π(2isin1) = 2πisin1
Question 1: Computeusing residues.
Question 2: Evaluate .
Question 3: Calculate the residue of f(z) = sin z / z3 .
Question 4: Use residues to evaluate for −1 < p < 1.
