Sergey Skovpen scite author profile

A method allowing a desirable matrix spectrum to be constructed as an alternative to the method using matrix transformation to the Frobenius form is stated. It can be applied to implement control algorithms for technical systems without executing the variables transformation procedures that are needed for deriving a Frobenius matrix. The method can be used for simulation of systems with different spectrums for choosing an alternative that satisfies to the distinct demands.

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Direct Deadbeat Control of a Buck Converter

Iskhakov¹,

Portnoy²,

Skovpen

et al. 2019

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Exact Solution of a Linear Difference Equation in a Finite Number of Steps

Iskhakov¹,

Skovpen

2018

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An exact solution of a linear difference equation in a finite number of steps has been obtained. This refutes the conventional wisdom that a simple iterative method for solving a system of linear algebraic equations is approximate. The nilpotency of the iteration matrix is the necessary and sufficient condition for getting an exact solution. The examples of iterative equations providing an exact solution to the simplest algebraic system are presented.

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A direct deadbeat control of a PWM single-phase voltage source inverter

Iskhakov¹,

Kobylyansky²,

Bekishev³

et al. 2013

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Sergey Skovpen

A Direct Transformation of a Matrix Spectrum

Non-Frobenius Spectrum-Transformation Method

Direct Deadbeat Control of a Buck Converter

Exact Solution of a Linear Difference Equation in a Finite Number of Steps

A direct deadbeat control of a PWM single-phase voltage source inverter

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