Abstract
This paper presents direct settings and rigorous solutions of Statistical Inference problems. It shows that rigorous solutions require solving ill-posed Fredholm integral equations of the first kind in the situation where not only the right-hand side of the equation is an approximation, but the operator in the equation is also defined approximately. Using Stefanuyk-Vapnik theory for solving such operator equations, constructive methods of empirical inference are introduced. These methods are based on a new concept called \(V\)-matrix. This matrix captures geometric properties of the observation data that are ignored by classical statistical methods.
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