Nettet13. apr. 2024 · New non- and less-invasive techniques have been developed to overcome the procedural and operator related burden of the fractional flow reserve (FFR) for the … Nettet6. jul. 2024 · Linear fractional programming has been an important planning tool for the past four decades. The main contribution of this study is to show, under some assumptions, for a linear programming problem, that there are two different dual problems (one linear programming and one linear fractional functional programming) that are …
A new method for solving linear fractional programming problems
NettetArikoglu A Ozkol I Solution of fractional integro-differential equations by using fractional differential transform method Chaos Solitons Fractals 2009 40 2 521 529 2527812 10.1016/j.chaos.2007.08.001 1197.45001 Google Scholar; Bica AM, Ziari S, Satmari Z (2024) An iterative method for solving linear fuzzy fractional integral equation. Nettet13. apr. 2024 · An interesting generalization that includes a Riemann-Liouville fractional integral in the non-linear term, on the right hand side, can be found in [ 24 ]. Following the analysis of this phenomenon, in this work we show that the non-linearity of ( 1.1) leads to the blow-up of positive solutions in a finite time. null chris chan
Signomial Geometric Programming Approach to Solve Non-Linear …
Nettetintroduced interval-valued linear fractional programming problems. Most of the available methods solved linear fractional programming problems by using the simplex type method. But F.A.Simi and M. S. Talukder[13], in their recent paper, have shown how to solve linear fractional programming problems considering the NettetAbout this book. This book systematically presents solutions to the linear time-fractional diffusion-wave equation. It introduces the integral transform technique and discusses … The linear fractional transformations over A form a group, denoted. The group of the linear fractional transformations is called the modular group. It has been widely studied because of its numerous applications to number theory, which include, in particular, Wiles's proof of Fermat's Last Theorem . Se mer In mathematics, a linear fractional transformation is, roughly speaking, a transformation of the form $${\displaystyle z\mapsto {\frac {az+b}{cz+d}},}$$ which has an Se mer In general, a linear fractional transformation is a homography of P(A), the projective line over a ring A. When A is a commutative ring, … Se mer Möbius transformations commonly appear in the theory of continued fractions, and in analytic number theory of elliptic curves and modular forms, as it describes the automorphisms of the upper half-plane under the action of the modular group. It also provides a … Se mer • Laguerre transformations • Linear-fractional programming • H-infinity methods in control theory Se mer In the complex plane a generalized circle is either a line or a circle. When completed with the point at infinity, the generalized circles in the plane correspond to circles on the surface of the Se mer Linear fractional transformations are widely used in control theory to solve plant-controller relationship problems in mechanical Se mer The commutative rings of split-complex numbers and dual numbers join the ordinary complex numbers as rings that express angle and "rotation". In each case the exponential map applied to the imaginary axis produces an isomorphism between one-parameter groups in … Se mer null check with question mark c#