Students will develop an understanding that objects and materials have characteristics or properties. Students will be able to recognize similarities between the properties of certain objects and ...

on Matrix Analysis and Applications, 25 (2004), 947-963. [20] A.Melman, "Computation of the Newton step for the even and odd characteristic polynomials of a symmetric positive-definite Toeplitz matrix ...

De Rham cohomology is the cohomology of differential forms. This book offers a self-contained exposition to this subject and to the theory of characteristic classes from the curvature point of view.

A polynomial is a chain of algebraic terms with various values of powers. There are some words and phrases to look out for when you're dealing with polynomials: \(6{x^5} - 3{x^2} + 7\) is a ...

While there are countless characteristics that combine in an almost infinite number of ways, people have been trying to find a way to classify personalities ever since Hippocrates and the ancient ...

Method of characteristics for first order linear and quasilinear partial differential equations; Second order partial differential equations in two independent variables: classification and canonical ...

Takeshi Saito - University of Tokyo 'Logarithmic geometry was created thirty years ago in order to construct analogues in mixed characteristic of the limiting Hodge structures of the complex setting, ...

The sceptics argued that the extreme sensitivity of the super-directive illumination function to changes in the array design and feed characteristics ... hot-spot size is a polynomial increase ...

None of these other extinct groups shared the characteristic upright stance of dinosaurs. They had an upright stance, with legs perpendicular to their body. This is the main feature that sets ...

Sensors and instrumentation used in a wide variety of industrial applications. Instrument static characteristics, measurement errors, and calibration. Signal conditioning circuits including ...

If \((x \pm h)\) is a factor of a polynomial, then the remainder will be zero. Conversely, if the remainder is zero, then \((x \pm h)\) is a factor. Often, factorising a polynomial requires some ...