Mathematical Programming for Power Systems Operation. Alejandro Garcés Ruiz

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Название Mathematical Programming for Power Systems Operation
Автор произведения Alejandro Garcés Ruiz
Жанр Физика
Серия
Издательство Физика
Год выпуска 0
isbn 9781119747284



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4 1 1 Ω2 = {x
: 1 ≤ x ≤ 2} 2 2 1 1 Ω3 = {x
: 3 < x ≤ 8} 8 8 3 - Ω4 = {x
: 2 ≤ x < 9} 9 - 2 2 Ω5 = {x
: 4 < x < 7} 7 - 4 -

      2.2 Norms

      In many practical problems, we may be interested in measuring the objects in a set, either as an objective function or as a way of analyzing solutions. A norm is a geometric concept that allows us to make this measurement. The most common norm is the Euclidean distance given by (Equation 2.12)

(2.12)

      However, this function is not the only way to measure a distance. In general, we can define a norm as a function ‖⋅‖:Ω→R that fulfills the following conditions:

      

(2.13)

      

(2.14)

      

(2.15)

      

(2.16)

(2.17)

      This function is known as p-norm, where p ≥ 1. Three of the most common examples of p-norms in Rnn have a well-defined representation, as presented below:

      

(2.18)

      

(2.19)

      

(2.20)

      Figure 2.2 Three ways to measure the vector

2-norm or Euclidean norm, b) 1-norm or Manhattan distance, c) infinity-norm or uniform norm.

      We can use a norm to define a set given by all the points at a distance less or equal to a given value r, as given in (Equation 2.21).

(2.21)

      This set is known as a ball of radius r. Figure 2.3 shows the shape of unit balls (i.e., balls of radius 1), generated by each of the three previously mentioned norms.