Functional Group Structure in a Novel Chaos Theory Diverging Non-Linear Significant Functions with Counters-Residues Pattern in Singular Integral – Derivative Applications

Authors

  • Elemasetty Uday Kiran
  • Mediga Haritha

Keywords:

Additive, algebraic,, diverging elements, derivative, elementary, integral

Abstract

Different mathematical function gives divergence system in chaos theory functions. To all extinct in counter integration in HU evaluation theory A(H) and C(U) are the block functions with open and closed integral loop control in linear algebraic system at large expansion of system in nonlinear algebraic expression. It sets the point in H and u with combinational sequential order of values. Additive system function (z*, x, y, n) gives derivative product in individual terms where the subtractive function (-z*, -x, -y, -n) in integral form H-U vertical mathematical in k-1 divided by 2 is maxima and minima integral form in hu theory. Properties covering in novel system give diverging elements with covering section of reforms from all the data units in nonlinear algebraic system functional groups. Maxima functions lowest sequence terms with all the unit’s analytical minima function at highest enable elementary graph mode.

Published

2019-11-26

Issue

Section

Articles