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13.4. Sterling’s Series Derivation from Euler-Maclaurin Integration Formula. Euler-Maclaurin integration formula :. Let. . . . . . . . Stirling’s series. . . Stirling approx. z >> 1 :. . A = Arfken’s two-term approx. using. Mathematica. 13.5. Riemann Zeta Function.
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13.4. Sterling’s SeriesDerivation from Euler-Maclaurin Integration Formula Euler-Maclaurin integration formula : Let
Stirling’s series
Stirling approx z >> 1 : A = Arfken’s two-term approx. using Mathematica
13.5. Riemann Zeta Function Riemann Zeta Function : Mathematica Integral representation : Proof :
Definition : Contour Integral C1 • 0 for Re z >1 • diverges for Re z <1 agrees with integral representation for Re z > 1
CC1encloses no pole. CC1 encloses all poles. Analytic Continuation Re z > 1 Poles at Similar to , Definition valid for all z (except for z integers). Mathematica means n 0
Riemann’s Functional Equation Riemann’s functional equation
Zeta-Function Reflection Formula zeta-function reflection formula
Riemann’s functional equation : converges for Re z > 1 (z) is regular for Re z < 0. (0) diverges (1) diverges while (0) is indeterminate. for trivial zeros Since the integrand in is always positive, (except for the trivial zeros) or i.e., non-trivial zeros of (z) must lie in the critical strip
Critical Strip Consider the Dirichlet series : Leibniz criterion series converges if , i.e., for
(0) Simple poles :
Euler Prime Product Formula ( no terms ) ( no terms ) Euler prime product formula
Riemann Hypothesis Riemann found a formula that gives the number of primes less than a given number in terms of the non-trivial zeros of (z). Riemann hypothesis : All nontrivial zeros of (z) are on the critical lineRe z ½. • Millennium Prize problems proposed by the Clay Mathematics Institute. • 1. P versus NP • 2. The Hodge conjecture • 3. The Poincaré conjecture (proved by G.Perelman in 2003) • 4. The Riemann hypothesis • 5. Yang–Mills existence and mass gap • 6. Navier–Stokes existence and smoothness • 7. The Birch and Swinnerton-Dyer conjecture
13.6. Other Related Functions Incomplete Gamma Functions Incomplete Beta Functions Exponential Integral Error Function
Incomplete Gamma Functions Integral representation: Exponential integral
Series Representation for (a, x) & (a, x) See Ex 1.3.3 & Ex.13.6.4 For non-integral a: Pochhammer symbol Relation to hypergeometric functions: see § 18.6 .
Incomplete Beta Functions Ex.13.6.5 Relation to hypergeometric functions: see § 18.5.
Exponential Integral Ei(x) P = Cauchy principal value E1 , Ei analytic continued. Branch-cut : (x)–axis. Mathematica
Series Expansion For x << 1 : For x >> 1 :
Sine & Cosine Integrals not defined Mathematica Ci(z) & li(z) are multi-valued. Branch-cut : (x)–axis. is an entire function
Series expansions : Ex.13.6.13. Asymptotic expansions : § 12.6.
Error Function Mathematica Power expansion : Asymptotic expansion (see Ex.12.6.3) :