Complex Analysis

Complex Analysis

Open Disks or Neighborhoods • Definition. The set of all points z which satisfy the inequality |z – z0|<, where  is a positive real number is called an open disk or neighborhood of z0 . • Remark. The unit disk, i.e., the neighborhood |z|< 1, is of particular significance. 1

Interior Point • Definition. A point is called an interior point of S if and only if there exists at least one neighborhood of z0which is completely contained in S. z0 S

Open Set. Closed Set. • Definition. If every point of a set S is an interior point of S, we say that S is an open set. • Definition. If B(S)  S, i.e., if S contains all of its boundary points, then it is called a closed set. • Sets may be neither open nor closed. Neither Open Closed

Connected • An open set S is said to be connected if every pair of points z1and z2in S can be joined by a polygonal line that lies entirely in S. Roughly speaking, this means that S consists of a “single piece”, although it may contain holes. S z1 z2

Domain, Region, Closure, Bounded, Compact • An open, connected set is called a domain. A region is a domain together with some, none, or all of its boundary points. The closure of a set S denoted , is the set of S together with all of its boundary. Thus . • A set of points S is bounded if there exists a positive real number R such that |z|<R for every z  S. • A region which is both closed and bounded is said to be compact.

Review: Real Functions of Real Variables • Definition. Let   . A function f is a rule which assigns to each element a   one and only one element b  ,   . We write f:  , or in the specific case b = f(a), and call b “the image of a under f.” We call  “the domain of definition of f ” or simply “the domain of f ”. We call  “the range of f.” We call the set of all the images of , denoted f (), the image of the function f . We alternately call f a mapping from  to .

Real Function • In effect, a function of a real variable maps from one real line to another. f  

Complex Function • Definition. Complex function of a complex variable. Let   C. A function f defined on  is a rule which assigns to each z   a complex number w. The number w is called a value of f at z and is denoted by f(z), i.e., w = f(z). The set  is called the domain of definition of f. Although the domain of definition is often a domain, it need not be.

Remark • Properties of a real-valued function of a real variable are often exhibited by the graph of the function. But when w = f(z), where z and w are complex, no such convenient graphical representation is available because each of the numbers z and w is located in a plane rather than a line. • We can display some information about the function by indicating pairs of corresponding points z = (x,y) and w = (u,v). To do this, it is usually easiest to draw the z and w planes separately.

Graph of Complex Function y v w = f(z) x u domain ofdefinition range z-plane w-plane

Example 1 Describe the range of the function f(z) = x2 + 2i, defined on (the domain is) the unit disk |z| 1. Solution: We have u(x,y) = x2and v(x,y) = 2. Thus as z varies over the closed unit disk, u varies between 0 and 1, and v is constant (=2). Therefore w = f(z) = u(x,y) + iv(x,y) = x2 +2i is a line segment from w = 2i to w = 1 + 2i. v y f(z) range u x domain

Example 2 Describe the function f(z) = z3for z in the semidisk given by |z| 2, Im z  0. Solution: We know that the points in the sector of the semidisk from Arg z = 0 to Arg z = 2/3, when cubed cover the entire disk |w| 8 because The cubes of the remaining points of z also fall into this disk, overlapping it in the upper half-plane as depicted on the next screen.

w = z3 y v 8 2 u x -2 2 -8 8 -8

Sequence • Definition. A sequence of complex numbers, denoted , is a function f, such that f: N  C, i.e, it is a function whose domain is the set of natural numbers between 1 and k, and whose range is a subset of the complex numbers. If k = , then the sequence is called infinite and is denoted by , or more often, zn . (The notation f(n) is equivalent.) • Having defined sequences and a means for measuring the distance between points, we proceed to define the limit of a sequence.

Limit of a Sequence • Definition. A sequence of complex numbers is said to have the limit z0 , or to converge to z0, if for any  > 0, there exists an integer N such that |zn – z0| <  for all n > N. We denote this by • Geometrically, this amounts to the fact that z0is the only point of znsuch that any neighborhood about it, no matter how small, contains an infinite number of points zn .

Limit of a Function • We say that the complex number w0is the limit of the function f(z) as z approaches z0 if f(z) stays close to w0whenever z is sufficiently near z0 . Formally, we state: • Definition. Limit of a Complex Sequence. Let f(z) be a function defined in some neighborhood of z0 except with the possible exception of the point z0is the number w0if for any real number  > 0 there exists a positive real number  > 0 such that |f(z) – w0|<  whenever 0<|z - z0|< .

Limits: Interpretation We can interpret this to mean that if we observe points z within a radius  of z0, we can find a corresponding disk about w0such that all the points in the disk about z0are mapped into it. That is, any neighborhood of w0 contains all the values assumed by f in some full neighborhood of z0, except possibly f(z0). v y w = f(z)   w0 z0 u x w-plane z-plane

Properties of Limits If as z z0, lim f(z)  A and lim g(z)  B, then • lim [ f(z)  g(z) ] = A  B • lim f(z)g(z) = AB, and • lim f(z)/g(z) = A/B. if B  0.

Continuity • Definition. Let f(z) be a function such that f: C C. We call f(z) continuous at z0 iff: • F is defined in a neighborhood of z0, • The limit exists, and • A function f is said to be continuous on a set S if it is continuous at each point of S. If a function is not continuous at a point, then it is said to be singular at the point.

Note on Continuity • One can show that f(z) approaches a limit precisely when its real and imaginary parts approach limits, and the continuity of f(z) is equivalent to the continuity of its real and imaginary parts.

Properties of Continuous Functions • If f(z) and g(z) are continuous at z0, then so are f(z)  g(z) and f(z)g(z). The quotient f(z)/g(z) is also continuous at z0provided that g(z0)  0. • Also, continuous functions map compact sets into compact sets.

Derivatives • Differentiation of complex-valued functions is completely analogous to the real case: • Definition. Derivative. Let f(z) be a complex-valued function defined in a neighborhood of z0. Then the derivative of f(z) at z0is given byProvided this limit exists. F(z) is said to be differentiable at z0.

Properties of Derivatives

Analytic. Holomorphic. • Definition. A complex-valued function f (z) is said to be analytic, or equivalently, holomorphic, on an open set  if it has a derivative at every point of . (The term “regular” is also used.) • It is important that a function may be differentiable at a single point only. Analyticity implies differentiability within a neighborhood of the point. This permits expansion of the function by a Taylor series about the point. • If f (z) is analytic on the whole complex plane, then it is said to be an entire function.

Rational Function. • Definition. If f and g are polynomials in z, then h (z) = f (z)/g(z), g(z)  0 is called a rational function. • Remarks. • All polynomial functions of z are entire. • A rational function of z is analytic at every point for which its denominator is nonzero. • If a function can be reduced to a polynomial function which does not involve , then it is analytic.

Example 1 Thus f1(z) is analytic at all points except z=1.

Example 2 Thus f2(z) is nowhere analytic.

Testing for Analyticity Determining the analyticity of a function by searching for in its expression that cannot be removed is at best awkward. Observe: It would be difficult and time consuming to try to reduce this expression to a form in which you could be sure that the could not be removed. The method cannot be used when anything but algebraic functions are used.

Cauchy-Riemann Equations (1) If the function f (z) = u(x,y) + iv(x,y) is differentiable at z0 = x0 + iy0, then the limit can be evaluated by allowing z to approach zero from any direction in the complex plane.

Cauchy-Riemann Equations (2) If it approaches along the x-axis, then z = x, and we obtain But the limits of the bracketed expression are just the first partial derivatives of u and v with respect to x, so that:

Cauchy-Riemann Equations (3) If it approaches along the y-axis, then z = y, and we obtain And, therefore

Cauchy-Riemann Equations (4) By definition, a limit exists only if it is unique. Therefore, these two expressions must be equivalent. Equating real and imaginary parts, we have that must hold at z0 = x0 + iy0 . These equations are called the Cauchy-Riemann Equations. Their importance is made clear in the following theorem.

Cauchy-Riemann Equations (5) • Theorem. Let f (z) = u(x,y) + iv(x,y) be defined in some open set  containing the point z0. If the first partial derivatives of u and v exist in , and are continuous at z0 , and satisfy the Cauchy-Riemann equations at z0, then f (z) is differentiable at z0. Consequently, if the first partial derivatives are continuous and satisfy the Cauchy-Riemann equations at all points of , then f (z) is analytic in .

Example 1 Hence, the Cauchy-Riemann equations are satisfied only on the line x = y, and therefore in no open disk. Thus, by the theorem, f (z) is nowhere analytic.

Example 2 Prove that f (z) is entire and find its derivative. The first partials are continuous and satisfy the Cauchy-Riemann equations at every point.

Harmonic Functions • Definition. Harmonic. A real-valued function (x,y) is said to be harmonic in a domain D if all of its second-order partial derivatives are continuous in D and if each point of D satisfies Theorem. If f (z) = u(x,y) + iv(x,y) is analytic in a domain D, then each of the functions u(x,y) and v(x,y) is harmonic in D.

Harmonic Conjugate • Given a function u(x,y) harmonic in, say, an open disk, then we can find another harmonic function v(x,y) so that u + iv is an analytic function of z in the disk. Such a function v is called a harmonic conjugate of u.

Example Construct an analytic function whose real part is: Solution: First verify that this function is harmonic.

Example, Continued Integrate (1) with respect to y:

Example, Continued Now take the derivative of v(x,y) with respect to x: According to equation (2), this equals 6xy – 1. Thus,

Example, Continued The desired analytic function f (z) = u + iv is:

Complex Exponential • We would like the complex exponential to be a natural extension of the real case, with f (z) = ezentire. We begin by examining ez = ex+iy = exeiy. • eiy = cos y + i sin y by Euler’s and DeMoivre’s relations. • Definition. Complex Exponential Function. If z = x + iy, then ez = ex(cos y + i sin y). • That is, |ez|= ex and arg ez = y.

More on Exponentials • Recall that a function f is one-to-one on a set S if the equation f (z1) = f (z2), where z1,z2  S, implies that z1 = z2. The complex exponential function is not one-to-one on the whole plane. • Theorem. A necessary and sufficient condition that ez = 1 is that z = 2ki, where k is an integer. Also, a necessary and sufficient condition that is that z1 = z2 +2ki, where k is an integer. Thus ez is a periodic function.

Complex Analysis