storytelling (systems thinking):
https://www.group-telegram.com/storytellingsystemsthinking
demonstrators:
https://www.group-telegram.com/systemsdemonstrators
sharing and reposts:
https://www.group-telegram.com/systemssharing
talks and writings:
https://www.group-telegram.com/stochastictheoryofcommunication
cybernetic culture:
https://www.group-telegram.com/communicationsdevelopment
books and papers:
https://www.group-telegram.com/booksonsysapproaches
basics and elements:
https://www.group-telegram.com/elementsofsysapproaches
https://www.group-telegram.com/storytellingsystemsthinking
demonstrators:
https://www.group-telegram.com/systemsdemonstrators
sharing and reposts:
https://www.group-telegram.com/systemssharing
talks and writings:
https://www.group-telegram.com/stochastictheoryofcommunication
cybernetic culture:
https://www.group-telegram.com/communicationsdevelopment
books and papers:
https://www.group-telegram.com/booksonsysapproaches
basics and elements:
https://www.group-telegram.com/elementsofsysapproaches
Telegram
storytelling (systems thinking)
simulations can teach:
https://www.group-telegram.com/complexsystemssimulations.com
https://www.group-telegram.com/complexsystemssimulations.com
simulations can teach pinned «storytelling (systems thinking): https://www.group-telegram.com/storytellingsystemsthinking demonstrators: https://www.group-telegram.com/systemsdemonstrators sharing and reposts: https://www.group-telegram.com/systemssharing talks and writings: https://www.group-telegram.com/stochastictheoryofcommunication cybernetic culture:…»
Media is too big
VIEW IN TELEGRAM
Overture for the Stochastic Theory of Communication with matplotlib widgets and matplotlib animations
Description:
State of a cell is represented as RGB. Number of possible states (state space size) for each cell is limited to alphabet_size^number_of_parameters = 3^3 = 27.
alphabet_size = 3 ({0, 1, 2})
number_of_parameters = 3 (R, G, B)
Base rule (connection): 1. none of two cells in the neighborhood can have same state. 2. if no possible states remain, cell keeps its state.
Description:
State of a cell is represented as RGB. Number of possible states (state space size) for each cell is limited to alphabet_size^number_of_parameters = 3^3 = 27.
alphabet_size = 3 ({0, 1, 2})
number_of_parameters = 3 (R, G, B)
Base rule (connection): 1. none of two cells in the neighborhood can have same state. 2. if no possible states remain, cell keeps its state.