赢伽娱乐

<acronym id="ysse8"></acronym>
<rt id="ysse8"></rt>
<rt id="ysse8"><optgroup id="ysse8"></optgroup></rt><rt id="ysse8"></rt><rt id="ysse8"><small id="ysse8"></small></rt>
<acronym id="ysse8"><small id="ysse8"></small></acronym>
<acronym id="ysse8"></acronym>
<acronym id="ysse8"></acronym>
<acronym id="ysse8"><center id="ysse8"></center></acronym>
<rt id="ysse8"><small id="ysse8"></small></rt>
Home      Log In      Contacts      FAQs      INSTICC Portal
 

Special Sessions

Special sessions are very small and specialized events to be held during the conference as a set of oral and poster presentations that are highly specialized in some particular theme or consisting of the works of some particular international project. The goal of special sessions (minimum 4 papers; maximum 9) is to provide a focused discussion on innovative topics. All accepted papers will be published in a special section of the conference proceedings book, under an ISBN reference, and on digital support. All papers presented at the conference venue will be available at the SCITEPRESS Digital Library. SCITEPRESS is a member of CrossRef and every paper is given a DOI (Digital Object Identifier). The proceedings are submitted for indexation by Thomson Reuters Conference Proceedings Citation Index (ISI), DBLP, EI (Elsevier Engineering Village Index), Scopus, Semantic Scholar and Google Scholar.


Special session proposals are accepted until:

March 3, 2020


If you wish to propose a new Special Session please kindly fill out and submit this Expression of Interest form.

SPECIAL SESSIONS LIST

CTDE 2020Special Session on Control Theory and Differential Equations
Chair(s): Carlos Argáez

Special Session on Control Theory and Differential Equations - CTDE 2020

Paper Submission: May 7, 2020
Authors Notification: May 21, 2020
Camera Ready and Registration: May 29, 2020


Chair

Carlos Argáez
University of Iceland
Iceland
e-mail
 
Scope

Dynamical systems are an important topic in applied science. Previously, however, was hard to obtain a correct control function for a given dynamical system. Mathematical research allows obtaining them under the Lyapunov theory with small computational effort by solving a PDE associated to the Lyapunov function of a dynamical system. Further research allows describing their components: The orbits that represent the sections of the function in which the system has a constant behaviour and the gradient-like flow in which the system is dynamic. Applications of such function can be found in sciences as biology and in many engineering applications. Research and contributions on differential equations are important to offer stronger approaches to the perfect description of a dynamical system.


footer
<acronym id="ysse8"></acronym>
<rt id="ysse8"></rt>
<rt id="ysse8"><optgroup id="ysse8"></optgroup></rt><rt id="ysse8"></rt><rt id="ysse8"><small id="ysse8"></small></rt>
<acronym id="ysse8"><small id="ysse8"></small></acronym>
<acronym id="ysse8"></acronym>
<acronym id="ysse8"></acronym>
<acronym id="ysse8"><center id="ysse8"></center></acronym>
<rt id="ysse8"><small id="ysse8"></small></rt>

平博电竞

中博的彩首页

辽宁福彩

365bet体育在线官网

大红鹰国际

皓天彩票登录

万福彩票网址

搜球吧直播

pt老虎机官方网站