Title :
Optimal Model of Agricultural Structure
Author :
Deji, Wang ; Bo, Xu ; Guangcai, Li ; Guoqun, Chen
Author_Institution :
PetroChina Pipeline R&D Center, Langfang, China
Abstract :
Optimal model of agricultural structures is important in solving the ldquosan nongrdquo problem. In this paper, we introduce the yield function and price function of the product, which are rOptimal model of agricultural structures is important in solving the ldquosan nongrdquo problem. In this paper, we introduce the yield function and price function of the product, which are regressed from the samples by SVM, into the genetic algorithm as the fitness function. This is a novel method for solving the optimal model of the agricultural structures. At last we put the method into optimal model agricultural structures for Hefei city and get the ideal result.egressed from the samples by SVM, into the genetic algorithm as the fitness function. This is a novel method for solving the optimal model of the agricultural structures. At last we put the method into optimal model agricultural structures for Hefei city and get the ideal result.
Keywords :
agriculture; genetic algorithms; pricing; support vector machines; Hefei city; agricultural structure; fitness function; genetic algorithm; optimal model; price function; san nong problem; support vector machine; yield function; Agriculture; Biological cells; Cities and towns; Genetic algorithms; Globalization; Machine intelligence; Neural networks; Pipelines; Research and development; Support vector machines; Agricultural Structures; Genetic Algorithm; Optimal Model; SVM;
Conference_Titel :
Control and Decision Conference, 2009. CCDC '09. Chinese
Conference_Location :
Guilin
Print_ISBN :
978-1-4244-2722-2
Electronic_ISBN :
978-1-4244-2723-9
DOI :
10.1109/CCDC.2009.5192562
