lizfcm/notes/Oct-18.org

Error Analysis Of Bisection Root Finding:

e_0 \le b - a = b_0 - a_0
e_1 \le b_1 - a_1 = 1/2(b_0 - a_0)
e_2 \le b_2 - a_2 = 1/2(b_1 - a_1) = (1/2)^2(b_0 - a_0)
e_k \le b_k - a_k = 1/2(b_{k-1} - a_{k-1}) = \cdots = (1/2)^k (b_0 - a_0)


e_k \le (1/2)^k (b_0 - a_0) = tolerance
\Rightarrow log(1/2^k) + log(b_0 - a_0) = log(tolerance)
\Rightarrow k log(1/2) + log(tolerance) - log(b_0 - a_0)
\Rightarrow k log(1/2) = log(tolerance / (b_0 - a_0))
\Rightarrow k \ge log(tolerance / (b_0 - a_0)) / log(1/2)

The Bisection Method applied to an interval [a, b] for a continous function will reduce the error
each time through by at least one half.

| x_{k+1} - x_k | \le 1/2|x_k - x^* |
oct 16, 18 notes. add unit tests with utest, and bisection root finding methods 2023-10-18 14:49:39 -04:00			`Error Analysis Of Bisection Root Finding:`

			`e_0 \le b - a = b_0 - a_0`
			`e_1 \le b_1 - a_1 = 1/2(b_0 - a_0)`
			`e_2 \le b_2 - a_2 = 1/2(b_1 - a_1) = (1/2)^2(b_0 - a_0)`
			`e_k \le b_k - a_k = 1/2(b_{k-1} - a_{k-1}) = \cdots = (1/2)^k (b_0 - a_0)`


			`e_k \le (1/2)^k (b_0 - a_0) = tolerance`
			`\Rightarrow log(1/2^k) + log(b_0 - a_0) = log(tolerance)`
			`\Rightarrow k log(1/2) + log(tolerance) - log(b_0 - a_0)`
			`\Rightarrow k log(1/2) = log(tolerance / (b_0 - a_0))`
			`\Rightarrow k \ge log(tolerance / (b_0 - a_0)) / log(1/2)`

			`The Bisection Method applied to an interval [a, b] for a continous function will reduce the error`
			`each time through by at least one half.`

			`\| x_{k+1} - x_k \| \le 1/2\|x_k - x^* \|`